MegaVol34wwww'I@=t@ gB??-DT!? BP(? BP(?-DT!? BP(? BP(??  1???J4@@?333333?z$'?333333?@@@@=???zwBaB^"A?0Layer9      !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}~      !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}~wwww'I@=t@wwww'I@=t@wwww'I@=t@wwww'I@=t@wwww'I@=t@MegaCad24I?h?;f?h}+Ԛ ?f}+?VUUUUU?78VUUUUU?7@J@d,S)PYO@p$, p ?>, p ?3Ey?3Ey3Ey?7@wwww'I@=t@D  L9y? L9y?4ˏ@׵@?FD<  L9y? L9y?4ˏ@׵@?ACIS BinaryFileMegaCAD 2013 3D ACIS 22.0.1 NTFri Apr 06 16:20:35 2018?ư>|= body    string_attrib name_attribgen attrib  ATTRIB_XACIS_NAME R2 umlaufend lump    shell     face      ftreemeg attrib    face    loop   spline surface   rbblnsur blendsupsur conegK@X&Q@@f@ L9y< L9yʼ? ?@ null_curve nullbs blendsupsur toruswA@2]~̩P@f@ L9y?@? null_curve nullbs+:0yE> intcurve  exactcur nubsK?K?8Cp?K?1ݢ? X?^? .4e?P_a?F1y?rV@@8xF@a@@]0@yEW@fK@¹VN@f@]r@AC:iN@f@f%@Ǭ1N@myXf@@DN@f@t @%N@~f@&[@o+N@ZdSsf@Yͷ@cп˜N@9bFf@Wз@AE lN@9@ ~f@q}c@J?/N@L0W~f@cXC@mrkN@q׬ ~f@9ᏸ@ٶ}N@h}f@,ڸ@u.HIN@֧|f@H @ɥMN@E@|f@n%$@wCN@2H{f@bm@`ҍN@~ zf@73R@ZN@@G$N@,ǩwf@` `@IN@#wf@2@:N@ of@@_S*N@ 1ܐof@'뻒@uON@^mf@4:@) ^eN@D lf@C*@c VN@ޚ!lf@ AE@b N@>Fjf@o@'N@  if@C;@fEN@*?hf@"@vN@Lff@DmӼ@&c/N@~Ddf@,3漒@^׻ktN@t'df@mjK @/" N@\ubf@;,@rg,N@hA`f@VR<@ N@_f@uūjL@[:mN@0n2^f@ oj@6N@EH-]f@Day@"RN@LG\f@n@p+c]N@Б^[f@|d@]N@s SYf@E1@ȂN@bWf@uƽ@N@x/~Vf@aܽ@lwN@QTf@S@!ӝN@ۧ0(Rf@G] @'rN@Qf@Y @zN@\Pf@|d)@ =N@j Nf@ @S"աN@>\mMf@gz'@N@(Lf@i,@¹VN@? Kf@ null_surface null_surface nullbs nullbs K?K?8Cp?K?1ݢ? X?^? .4e?P_a?F1y?rV@@8xF@a@@]0@ ?  intcurve  exactcur nubsK?K? ??8Cp?K?i?1ݢ? X?"z?^?yEW? .4e?x[m4?P_a?F1y?i?rV@@8xF@a@ۮEd@@]0@yEW@eK@¹VN@f@c@AC:iN@f@E涒@Ǭ1N@lf@WaS4@DN@ " Կf@bз@ N@f{f@ǣ}k@zo+N@ʧf@L@dп˜N@s0f@ȃ+@wDʛN@f@N’@fEN@Uf@’@y`N@bf@ }Ò@6ÔN@ǐ݌f@(Ò@L%˔N@9f@_BÒ@ZyN@[f@5shÒ@RT(IN@]]f@_YÒ@BԆN@jf@ Ò@˜N@<0Ndf@FU Ē@rg,N@jSrf@-Ē@ N@?i;f@MĒ@[:mN@bJd}f@5ωĒ@6N@ɋ[zf@Ē@"RN@B@xf@X"Ē@p+c]N@>#Cvf@ztĒ@ΎN@ Htf@Q4Ē@N@KTrf@ѸYĒ@nN@]Urf@7nŒ@z(ݛN@qf@@+Œ@/!DN@F^?of@?LxXBŒ@`⊛N@ cmf@AznŒ@V?N@%ߞif@!˕Œ@!ӝN@OaPef@&4YŒ@'rN@rgq=cf@ Œ@zN@`f@OBŒ@ =N@nX\f@t%Œ@S"աN@y$Zf@gnsƒ@N@Q/Xf@L ƒ@¹VN@l ~:Vf@ null_surface null_surface nullbs nullbs K?K? ??8Cp?K?i?1ݢ? X?"z?^?yEW? .4e?x[m4?P_a?F1y?i?rV@@8xF@a@ۮEd@@]0@ ?  intcurve  exactcur nubsK?K? ??8Cp?K?i?1ݢ? X?"z?^?yEW? .4e?x[m4?P_a?F1y?i?rV@@8xF@a@ۮEd@@]0@yEW@oޛJ@JO@g/f@ﵷַ@ZIk#O@e&UuŹ@c{{O@M=Eպf@ G@Vgs."O@t:f@O@t@ye}O@{i.f@j.@#2+}O@΅,}@f@0^Ľ@~'}O@m3f@%F۽@\p}O@uf@8@3 ~O@QoC f@C@S~O@-3ʀf@; @ A~O@IA f@Y(@F!~O@F3Lf@I]C@i~3~O@}&~f@/U@>A~O@fFK~f@WȨ@'g~O@.'|f@l@}~O@I}_b{f@'JȾ@˶~O@8Q~zf@K侒@u~O@%|yf@ Jx@BK O@)Օuxf@)7_@ۥO@Xxf@`!@i7O@nwf@ц3@vcO@yvf@]tXH@O@A孯uf@̚s@nƼO@Ǿsf@H@UO@krf@27#}@SYO@ 6%qf@۹ȿ@{%рO@U0,pf@7@8/WO@Y6nf@?@4O@L8mf@|@q:+=O@߶.r9lf@4k-@8O@hjJ4kf@H]_@@lHeO@k-jf@Ԝ@@MpO@fj)jf@7 PS@Í|O@P%if@țe@36O@hf@qv@^'O@.gf@PH@ JO@k+ ef@`]@4neO@̞lbf@6@uXlO@daf@ށN@+^w[O@E_f@kMk@-FGO@]f@g@WUUO@Ee\f@)Q_@8?O@O>[f@r(@JO@+zZf@ null_surface null_surface nullbs nullbs K?K? ??8Cp?K?i?1ݢ? X?"z?^?yEW? .4e?x[m4?P_a?F1y?i?rV@@8xF@a@ۮEd@@]0@ ?  intcurve  ref intcurve  offintcur nubsK? .4e?@8xF@yEW@fK@¹VN@f@IM@wX+N@f@ҴV@oܘN@f1j~f@^7@r=ВN@Zxf@:Q%@r3N@i3Hsf@0+;p@1N@bӎif@0tF@h0N@df@ns@\qN@`$#Xf@:@=aAN@EѤQf@i,@¹VN@? Kf@@@ toruswA@2]~̩P@f@ L9y?@? conegK@X&Q@@f@ L9y< L9yʼ? ?@ nullbs nullbs     ? ?Nz? ??  ??i?"z?yEW?x[m4?i?ۮEd@yEW@Nz? ftreemeg attrib    face       loop    spline surface   rbblnsur blendsupsur planeCxgzǒ@X&Q@܂f@??LN7C<p ~:?p ~:?4Mic intcurve  exactcur nubs (n/=Go?Mo?R?{ScJA?fs?Po?i,@¹VN@? Kf@ٗ[;@|U K^N@(WHf@ J@a VN@B}-Ef@X@1g:N@VУBCf@Z9v@$|լN@>f@$Z@~ju N@K8f@JB@cyN@Φ>6f@_ ᦹ@[.ҒN@OpX2f@fо@9RN@zĜ$.f@׾@~\޵N@.,f@澒@ɕN@-)*f@:@b,GŷN@\%9'f@\@+N@XJ6.&f@?x# @x2eN@#f@*@4pwN@F=m f@}"@rN@a6f@Ă1@?N@W8Pf@_ @@u]N@qBo7f@iH@^5rN@f@O@$v}N@f@nW@$v}N@q ~:f@ null_surface null_surface nullbs nullbs Go?Mo?R?{ScJA?fs? ?  intcurve  exactcur nubs  (n/=Ѻ?Go?џ%?Mo?R?f*4?{ScJA?fs?Po?L ƒ@¹VN@n ~:Vf@Cƒ@>`N@,Tf@aƒ@T PgN@I+݋Sf@">4$ƒ@. iN@.4Rf@2ƒ@qUN@tLOf@R Aƒ@vHd,N@U[Lf@1Iƒ@{ N@7bKKf@@\6Uƒ@|N@乄If@haƒ@ZۭN@![[Gf@W]fƒ@"fN@kzFf@?uƒ@dN@=Cf@ ^'ƒ@<{N@42Af@bƒ@`kN@o?f@ᅟƒ@n\8N@;Y{ƒ@!N@(W2f@^ƒ@7XN@>u1f@eGƒ@7]oaN@%\l0f@ټBƒ@ N@Ւ?.f@ ƒ@4pwN@B#{+f@Ɲldǒ@rN@u#*f@`eǒ@?N@>]'f@-g!ǒ@u]N@) |T%f@5y(ǒ@^5rN@F> $f@ni0ǒ@$v}N@ꖫ"f@MQ7ǒ@$v}N@('W!f@ null_surface null_surface nullbs nullbs Ѻ?Go?џ%?Mo?R?f*4?{ScJA?fs? ?  intcurve  exactcur nubs  (n/=Ѻ?Go?џ%?Mo?R?f*4?{ScJA?fs?Po?r(@JO@+zZf@l̥9@sO@Yf@u&'J@_ԙ"O@ԣCWf@ Z@5\ΊO@#|Vf@.Ez@rO@ 'Sf@t@MPO@h2Pf@K©@8TO@Ր޿Nf@ոS@@ێO@!)KLf@D%~@cq;ŏO@HIf@ȅ@߫,"O@Hf@K’@2O@3}Ef@U{s"’@@|N0O@'\Bf@5’@'^2ВO@1ʓ@f@ 8W’@E|$דO@>Ò@5N1O@ө,rf@*ixGÒ@5N1O@Mf@ null_surface null_surface nullbs nullbs Ѻ?Go?џ%?Mo?R?f*4?{ScJA?fs? ?  intcurve  ref intcurve  offintcur nubsPo?i,@¹VN@? Kf@9@sN@T9f@@4v}N@\4:'f@nW@4v}N@q ~:f@@@ toruswA@2]~̩P@f@ L9y?@? planeCxgzǒ@X&Q@܂f@??LN7C<p ~:?p ~:?4MicNf@Mr ~:?[6Mic<%J??/??? ?@  coedge     ! coedge  " # $  % coedge  " & '  ( coedge     ) edge  * +|jc? , tangent  pcurve    exppc nubs|jc?yEW@?yEW@ spline  ref ftreemeg attrib    face - . /  0  loop  1  spline surface   rbblnsur blendsupsur cone'0В@X&Q@e@ L9y< L9y? @ null_curve nullbs blendsupsur cone("ɒ@2]~̩P@m^f@Mr ~:?[6Mic<%^ȨH;f"do߿? @ null_curve nullbs+:0yE> intcurve  exactcur nubspr?pr?(@,?pr?Jj@'v}N@e@K9@'v}N@k#e@~@FKRfN@^)Ge@b+@O17N@le@LI@тN@.??e@ @k@+XXŸN@{e@K~@Ԫ;N@h;\'e@炢 @\N@Re@cE@ dN@R+e@s@<>N@Kve@zyO’@6Z4N@c;e@ zpO’@ZkN@_(|Ye@Lk’@bgAN@M7e@qXM’@P{N@Y7ʥe@Q’@LAN@SPC e@ null_surface null_surface nullbs nullbs pr?pr?(@,? ?  intcurve  exactcur nubs+Hވ?pr?yr?pr?Ԃ\}?(@,?pr?MȒ@'v}N@He@(Ȓ@'v}N@Bae@o|,Ȓ@k`wN@tI7e@4 [Ȓ@oS/kN@}7_e@`CȒ@f|GN@Gce@5|Ȓ@+ N@ۮdhe@Ȩɒ@B_N@ e@rIɒ@2N@0!e@ɒ@)AUN@e@$ɒ@bgAN@ 릛e@%@ɒ@P{N@,e@^Kɒ@LAN@((̡e@ null_surface null_surface nullbs nullbs +Hވ?pr?yr?pr?Ԃ\}?(@,? ?  intcurve  exactcur nubs+Hވ?pr?yr?pr?Ԃ\}?(@,?pr?mwVĒ@5N1O@mw!lTe@S+Ē@5N1O@rQe@I~Œ@oz?-O@D(&Ne@Œ@+v%O@ -Le@)Œ@RQ O@b?Te@9M"Œ@%s O@;4P]e@;(Œ@~>ϗO@mhe@|4Œ@c]`O@(e@KƐ@Œ@h9EkO@1:2e@XEŒ@@4SO@ye@Z TŒ@vO@+e@DNdŒ@kժO@҇}3e@oŒ@fO@>^e@opŒ@nEԕO@gcxֻe@ x>Œ@)O@x0JTe@ FŒ@ϔO@e@A{`Œ@s+:O@n` 5e@p 4Œ@=RO@4tTe@EOŒ@^O@RE몳e@)cŒ@#0xO@R$e@5#ƒ@,zO@KBޥe@P&ƒ@jO@fo#Ӭe@9=ƒ@6O@ Ue@:UtTƒ@ΥO@=e@ null_surface null_surface nullbs nullbs +Hވ?pr?yr?pr?Ԃ\}?(@,? ?  intcurve  ref  intcurve  offintcur nubspr?Jj@3v}N@e@ P@4v}N@Vנe@@ZhcRN@(;ﮯe@Q’@LAN@SPC e@@@ cone("ɒ@2]~̩P@m^f@Mr ~:?[6Mic<%^ȨH;f"do߿? @ cone'0В@X&Q@e@ L9y< L9y? @ nullbs nullbs     ? ? d? ??+Hވ?yr?Ԃ\}?pr? d?  coedge  2 3 4 5   coedge    6 7 8 coedge    9 : ; coedge  3 2    edge  < = tangent  pcurve    exppc nubs intcurve  exactcur nubsr?r?r@,?r?'˒@LAN@M7fe@xQ̒@P{N@^3؛ee@߼T̒@bgAN@~ee@vS̒@ZkN@ ~de@c ͒@1Z4N@(}ce@#2͒@<>N@]be@A͒@ dN@=be@~GΒ@\N@ϋae@Q,Β@֪;N@?`e@ 4ϒ@0XXŸN@?t`e@]Dϒ@тN@9ܖZ`e@В@T17N@0!`e@TlGВ@SKRfN@s `e@{;В@4v}N@`e@'0В@4v}N@`e@ null_surface null_surface nullbs nullbs r?r?r@,? ?  intcurve  exactcur nubs e?r?wr?7 $Vt?r? *?wr?r@,?,?r?NNQΒ@LAN@&Ope@= fΒ@}~YN@=e@.zΒ@qƒtN@6`e@/t&Β@ÏEN@me@/BȭΒ@pnN@/o>e@Β@FN@Ũe@- Β@fB߱N@>e@dΒ@V̒@N}O@= LZe@\`̒@|O@ve@vZ̒@P~y7O@\6e@d̒@rO@Qe@N ͒@O@*~Xe@16͒@-~WO@%e@K͒@|=PO@; e@fz͒@O@1ցe@Tը͒@p&yO@IZXe@+͒@ z hO@%`e@m+c͒@iwO@tV^e@Β@J/kkO@[37e@cs<'Β@mO@G(e@`_GΒ@8(̕O@5 e@ehΒ@ϮO@i e@'soxΒ@%&O@n4e@A0Β@}poO@9|UĀe@#Β@^ZO@N;呂e@t=Β@ٜ ٖO@"e@bϒ@$4O@\Aye@[!?2Gϒ@D4SO@QB`e@\ϒ@h9EkO@9Ue@̪ϒ@1VO@hBe@B˰ϒ@#O@$u2e@Tϒ@͗O@N=-+e@В@TO@C.e@EВ@]O@'2 e@gqВ@S<*O@~ѳe@̎(ҜВ@5N1O@e@'0В@5N1O@e@ null_surface null_surface nullbs nullbs  e?r?wr?7 $Vt?r? *?wr?r@,?,? ?  intcurve  ref intcurve  offintcur nubsr?'˒@LAN@M7fe@#6>l͒@lhcRN@]J)be@ϒ@3v}N@`e@'0В@3v}N@`e@@@ coneYnƒ@2]~̩P@e@? L9y<;f;f? @ cone'0В@X&Q@e@ L9y< L9y? @ nullbs nullbs     ? ?\`$d? ?? e?wr?7 $Vt?r? *?wr?,?r?\`$d?  coedge  U V W X  Y coedge    Z [   coedge    \ ]   coedge  V U  5  ^ edge  _9 `hu-8R?  a tangent  coedge  b #  7 C  edge  =Po + (n/ 6 c tangent  pcurve   d coedge  e \  : f  edge  * (n/= <Po? 9 g tangent  pcurve   h vertex  : i vertex  7 jellipse curve  nW@$v}N@q ~:f@;n ~:ƿ R??n ~:??  Xv&t?ʒ*:%?q쌈"Ǒy?]{?Yzخ7E?: \X%G?$1< >?V1Q$T? ?ah >X+:0yE> intcurve  exactcur nubs փ3=0RZ?0RZ?ed?0RZ?~R?f S(?^ ɩ@4*{@̸@ldi@Q’@LAN@QPC e@ue@&BȒ@>|N@Ӌte@նEOȒ@xN@TЊese@břȒ@j cN@qe@#IȒ@^hǟN@YLqe@i? Ȓ@12N@pe@+*Pɒ@'CvN@ne@ɒ@BV`N@ Ame@!'pɒ@9@dN@N@(LOhe@ٯF˒@8:ͦN@sge@˒@Ωz&N@bfe@'˒@LAN@R7fe@ null_surface null_surface nullbs nullbs  0RZ?0RZ?ed?0RZ?~R?f S(?^ ɩ@4*{@̸@ ?  intcurve  exactcur nubsփ3=0RZ?lJ?0RZ?Hwp?ed?0RZ?~R?f S(?&*P@^ ɩ@4*{@̸@ldi@^Kɒ@LAN@((̡e@ zɒ@TpN@-~g$e@^S2˒@KfN@~(e@2oM˒@֜N@|Xe@i˒@3 pN@i\͎e@*˒@cN@dkWe@z<˒@)N@K[e@;B ˒@\⊜N@zwe@ qO ˒@A5;N@L`e@[˒@ ۜN@`[QȬe@qQ ̒@xN@`e@dN+̒@LN@ qe@~J̒@пhN@1e@iX̒@5ޝN@g! qN@#CIJe@Ε̒@- .ᆞN@}e@%>̒@rN@0Jqe@hH̒@j cN@@e@v̒@^hǟN@e@̒@,2N@EvOe@)7 ͒@'CvN@Owce@bR/͒@=V`N@Ѧe@}sR͒@9@dN@T%Fe@[E͒@W )N@J1x'>e@<͒@ >N@&'Re@-Β@@:ͦN@9`e@9X,Β@֩z&N@f{e@MNQΒ@LAN@(Ope@ null_surface null_surface nullbs nullbs  0RZ?lJ?0RZ?Hwp?ed?0RZ?~R?f S(?&*P@^ ɩ@4*{@̸@ ?  intcurve  exactcur nubsփ3=0RZ?lJ?0RZ?Hwp?ed?0RZ?~R?f S(?&*P@^ ɩ@4*{@̸@ldi@:UtTƒ@̥O@=e@\Ngƒ@7O@|e@|ƒ@MΩ?tO@F'e@&(ƒ@+PȻO@:A{e@:ƒ@IO@wX'e@Jƒ@^2.(SO@5B٢e@~Cƒ@{YEO@f#[e@;ƒ@֧O@8e@fm:ƒ@RO@}mx]e@mǒ@>ǙO@&kKe@z<ǒ@'T\ÈO@NbNe@CLmǒ@$2rO@V=ae@|WՄǒ@俌LJO@T~e@n`ǒ@vO@mke@/ѻǒ@\4b1O@_e@C+Zǒ@0(%O@=^.e@nǒ@}WنO@%%3Be@Ȓ@fO@߸ Õe@زqg0Ȓ@Dd;{O@Դ/Ȕe@27tQȒ@?)cO@unԓe@2~k҆Ȓ@=>RO@W/^e@r?Ȓ@ΘPO@p^֑e@?Ȓ@$RO@7Qe@Ȓ@_O@E2 Ke@3V8ɒ@0~O@koNe@Mɒ@ɡO@PɠҎe@;ɒ@"PǗO@ti(e@:aɒ@NO@87e@-!qɒ@# O@dEe@ 1ɒ@=zv.O@are@]wuɒ@+UXO@tYe@ɒ@LcO@Kl$e@uBɒ@dO@[Ze@~ɒ@{ڇO@Հӊe@^ɒ@kO@}fle@cy ʒ@o֖IO@ e@Kʒ@l3pO@]w:e@N3mvʒ@$WnuO@Le@lʒ@ [w9O@e@23ʒ@O4O@e@F膪R˒@Xv&t?ʒ*:%?q쌈"Ǒy?]{?Yzخ7E?: \X%G?$1< >?V1Q$T? ?ah >X nullbs     ? ?`}/s? ??փ3=lJ?Hwp?&*P@ldi@`}/s?  coedge  /  coedge  4 1   coedge  1 4   coedge  1 X R  edge   p hWq? 1 tangent  pcurve    exppc nubs phWq?pr??pr? spline  ref   coedge  2 [  edge  `G =[^ Z tangent  coedge  9 3 ] f  edge  <[^? _ G@ \ tangent  pcurve    exppc nubshu-8R? spline  ref   vertex   vertex  [ ellipse curve  Jj@"v}N@e@Mr ~:ƿ[6Mic%??n ~:?? 9 hu-8R? coedge  6 C intcurve curve   bldcur (n/=Ѻ?џ%?f*4?Po?})g? spline  ref null_surface nubs (n/=Po?? (n/=?Po? nullbs   intcurve curve   ref"  coedge  9 H M f  loop  \ intcurve curve   bldcur (n/=Ѻ?џ%?f*4?Po?})g? spline  ref null_surface nubs (n/=Po? (n/=Po? nullbs   intcurve curve   ref#  point  MQ7ǒ@$v}N@('W!f@ point  *ixGÒ@5N1O@Nf@ coedge  ? B q m  coedge  ? m  loop  ?  pcurve    exppc nubs`jco??o? spline  rbblnsur blendsupsur plane4T%@X&Q@f@?? L9y< null_curve nullbs blendsupsur toruswA@2]~̩P@f@ L9y?@? null_curve nullbs+:0yE> intcurve  exactcur nubso?o?EScJA?o?EScJA?o?wA@4v}N@f@w@4v}N@f@X믒@m5rN@f@ݜo@u]N@f@35Pm@?N@f@ٶ|ð@uN@f@"u@KpwN@f@LNE@2eN@f@3Q@+N@f@ vƱ@b,GŷN@f@@ɕN@f@`Ks@~\޵N@f@P4T`@9RN@f@@1@u.ҒN@f@X{@|yN@f@X@~ju N@f@`@$|լN@f@kL@?g:N@f@}ʡ@a VN@f@@U K^N@f@fK@¹VN@f@ null_surface null_surface nullbs nullbs o?o?EScJA?o?EScJA? ?  intcurve  exactcur nubs o?o?dH?EScJA?o?wΟ%?EScJA?\X?o?wA@4v}N@f@w@4v}N@f@V믒@n5rN@f@ݜo@u]N@f@35Pm@?N@f@ٶ|ð@uN@f@"u@KpwN@f@F8@ N@f@x4h@N]oaN@f@m>@7XN@f@H̱@!N@f@?@ՉCN@f@@ϐ!N@f@Җ;@ẊN@f@`Ks@~\޵N@f@R4T`@9RN@f@U@\8N@f@L.g@akN@f@d:v@8{N@f@dL@cN@f@5mK@~"fN@f@O+eh@ZۭN@f@{jɮ@|N@f@a@{ N@f@ݐ@Hd,N@f@~*s@qUN@f@ɵ@. iN@f@@` PgN@f@4 @K`N@f@fK@¹VN@f@ null_surface null_surface nullbs nullbs o?o?dH?EScJA?o?wΟ%?EScJA?\X? ?  intcurve  exactcur nubs o?o?dH?EScJA?o?wΟ%?EScJA?\X?o?wA@5N1O@f@VE˯@5N1O@f@M I@jI*O@BWf@ZH7@7j?O@Kf@= 5@G0O@cDf@ٜ@;LeO@w ͟f@%]D@UO@GKֽf@BW@jw/O@qf@@'IɖO@oVwf@r!@ ΋O@dff@?{V@TPVO@6Lf@ދ@{j" O@T/f@olc@2 O@ <'f@X߲@\?O@$PPf@qq/$@5O@wVϣ՞f@*X@O@`Tf@$ӳ@'E|$דO@zZf@sHL@3^2ВO@if@dր@K|N0O@\_f@ɚ@2O@Q[f@9 ]@&߫,"O@i_If@YnQ~@iq;ŏO@U+QҜf@r_ѵ@DێO@ًkzf@Ŗ|9#@>TO@m8f@US@MPO@xt f@4#@rO@oof@3@@\ΊO@3f@NII@gԙ"O@Qf@%]z@sO@Gx^rf@oޛJ@JO@g/f@ null_surface null_surface nullbs nullbs o?o?dH?EScJA?o?wΟ%?EScJA?\X? ?  intcurve  ref& intcurve  offintcur nubso?wA@4v}N@f@qL^fձ@4v}N@f@X@sN@f@fK@¹VN@f@@@ toruswA@2]~̩P@f@ L9y?@? plane4T%@X&Q@f@?? L9y< nullbs nullbs     ? ?T&})g? ??dH?wΟ%?\X?o?T&})g? ellipse curve  fK@¹VN@f@tm?luȿ`S?t?g/??  `jc? coedge  B C  edge  Do  B tangent  face  C   point  oޛJ@JO@g/f@ coedge  H G I  coedge  G v  edge  J"@ ,@Cq-@ u tangent  face  I   point  fK@¹VN@f@ vertex  straight curve  L ƒ@X&Q@p ~:Vf@ L9y< ftreemeg attrib  Q  face    loop  Q cone surface  Ynƒ@4v}N@`e@? L9y<?LXz?? ?@  coedge  R  coedge  T /  coedge  T /  coedge  T }  edge   bs-8R? T tangent  pcurve    exppc nubsbs-8R?r??r? spline  ref  coedge  Z U  edge  pr ` tangent  pcurve    coedge  V  edge  _ pr? tangent  pcurve    coedge   W R  coedge  W  R  pcurve    exppc nubshWq?փ3=փ3= spline  ref  vertex   vertex  ellipse curve  Q’@LAN@SPC e@Eˏݿu & e{nR@ edge  _.@"@ yd-@ tangent  point  MȒ@"v}N@He@ point  mwVĒ@5N1O@mw!lTe@ coedge  p b C  edge  ( =Vs-8R? tangent  coedge  e f  face  w f   coedge  l k m  pcurve    coedge  u l  edge   Jo? tangent  pcurve    face  m   coedge  p  edge   fs-8R? p tangent  vertex  intcurve curve   bldcurdH?wΟ%?\X?o?T&})g? spline  ref% null_surface nubso???o? nullbs   ftreemeg attrib  r   face   torus surface  wA@2]~̩P@f@ L9y?@?  coedge  t  edge  y yEW@ t tangent  coedge  u  loop   vertex  straight curve  gK@X&Q@f@ L9y< ftreemeg attrib  w  face      cone surface  gK@X&Q@@f@ L9y< L9yʼ? @  point  L ƒ@L@m ~:Vf@ftreemeg attrib  |  face       loop  | spline surface   rbblnsur blendsupsur conegK@X&Q@@f@ L9y< L9yʼ? ?@ null_curve nullbs blendsupsur toruswA@cXSI@f@ L9y<@ null_curve nullbs+:0yE> intcurve  exactcur nubsD?D?3Cp?D?~,ݢ? X?^?.4e?P_a?0y?V@7xF@a@8@0@yEW@i,@L@? Kf@\%@n3L@'7lMLf@VniG@%ǬL@1B}Mf@9m @l\L@"|zNf@5$@,L@߮X Qf@8Y콒@Eή L@BN.dSf@@߽@rf L@58Tf@H qŽ@k L@[Vf@Y)@q L@%NB(Yf@i@g> L@ XHZf@$@ )uL@l_f@OC*@O2L@ u`f@0@ PkNL@W޸bf@K 뼒@mL@>cf@ռ@IL@0KP3df@O%@C.L@פff@%,w@hB L@vhf@!U^@BL@:ʳif@X;*@sʮL@$zxkf@9y@G L@FImf@2׻@L@#nf@Z@;;L@DFof@^@L@NJyf@Xa@qٺL@fLzf@,G]@%G(L@VX.{f@ F!@]~L@*j>{f@M{@-fq$L@u 6|f@(丒@8L@˾|f@wC!@L@I+}f@yч@L@wv}f@ h@R L@J>}f@n"*@5 L@?~f@귒@+2 L@oB~f@E5˷@ Y L@sV~f@э@ L@ %<f@o&HK@T_^ L@.yf@NƔ+@OUL@[f@A붒@@DuL@rf@v@s.L@=ҥf@z@\T\L@J f@AΏk@ L@f@fK@L@f@ null_surface null_surface nullbs nullbs D?D?3Cp?D?~,ݢ? X?^?.4e?P_a?0y?V@7xF@a@8@0@ ?  intcurve  exactcur nubsD?D?0??3Cp?D?i?~,ݢ? X?#z?^?yEW?.4e?ty[m4?P_a?0y?i?V@7xF@a@Ed@8@0@yEW@L ƒ@L@l ~:Vf@Rxƒ@n3L@NnؚXf@F4LŒ@%ǬL@cF_Zf@ 2Œ@l\L@EZ]f@:þŒ@,L@;]bf@+aŒ@Eή L@\ff@sŒ@rf L@ip*if@^MŒ@a15g L@Flf@77#Œ@T L@{of@G$WŒ@ L@pf@fOĒ@#8 L@"+sf@߃dĒ@A'2 L@6ujuf@qĒ@4L@rÒ@TL@Af@1,EÒ@A_'L@}瑯f@~Ò@{nL@VZf@bsÒ@eDxL@"(f@L’@6L@B^f@}g’@hB L@Qgf@g#Ip’@BL@u gf@^n] )’@L@tf@@]@ L@&,\f@R(@L@af@>i@ѾL@\Ěf@Lp\@A2L@^8yf@8@FL@H8셝f@jz@e L@&-f@ B9@wqL@ћKf@t @L@& ,f@\|@DL@S~ f@sB@@B&L@w+9f@Q@A L@4x^>f@e쿒@a+L@fv =f@䧱@NXL@Vf@B۠@L@9f@@BL@1Yf@YZ@քjL@n팶f@a$@3 :L@vWf@g@ęL@lf@c.@HcL@ E Df@u!aD@ L@ff@|~k @\EL@f@'ʽ@,L@UMf@Q@z=nL@c$f@A/"@4dQfL@Af@DG@U*L@,f@N @{"L@L}f@]oؼ@$L@y̴f@h@\L@jIsTf@ @]~L@V|lf@3o۹@+fq$L@mf@ۼ|@6L@}of@޻@L@Wf@Bmú@L@f@Y@S L@#|zf@)sEF@9 L@if@Ԉ@+ L@4jIyf@:@U5* L@zf@ƹ@^] L@Tf@l@q, L@,ґaf@$H@O L@Žf@z߃ʸ@pqr L@i0>yf@w yK@T_^ L@]ff@n @OUL@Af@pE@@DuL@1>f@$1 @s.L@}K5f@zc:˶@\T\L@p@f@Fd@ L@f@eK@L@f@ null_surface null_surface nullbs nullbs D?D?0??3Cp?D?i?~,ݢ? X?#z?^?yEW?.4e?ty[m4?P_a?0y?i?V@7xF@a@Ed@8@0@ ?  intcurve  exactcur nubsD?D?0??3Cp?D?i?~,ݢ? X?#z?^?yEW?.4e?ty[m4?P_a?0y?i?V@7xF@a@Ed@8@0@yEW@r(@fJpK@+zZf@q4@qg )K@g[f@GD @9.K@r=fL]f@)W#@eY8 K@]LZ]^f@4)@(P!K@p4`f@YCR"@2R"K@ecf@^W@ac"K@A0df@+D@] w#K@!8ff@@_@]M$K@Dshf@џZU@ӡG$K@Bif@v>@d5H$K@ 2Djf@H'@pI%K@N<kf@@R멼B%K@[(lf@깚 @ZGl%K@?nf@eϿ@ɲN&K@of@ə@$&K@qf@$"@&K@=t:rf@!i@"^'K@!H8Ztf@ TQ@ 'K@GQuf@9@w'K@!Gvf@t@}'K@-yawf@@o '(K@hJxxf@@7a5.(K@kNxf@hپ@;شb(K@yf@WmV@Sc}+(K@m{f@T@Qɴ(K@M!|f@~ =m@(K@'}f@4_@@dᄿ(K@5~f@tK4@.v)K@mV[Sf@@Sh-)K@n#Sf@1`GU@!Io+)K@;S) Nf@/c;ݽ@_3)K@GS]5f@.\@r ;)K@o^ Ђf@fM@9?)K@ɖӳf@|dP*@-"@)K@)@f@JQn@MKGB)K@f@J@C>)K@ Ӆf@:X2@HO8:)K@emf@ o@i k3)K@|f@T=0@}y&)K@_=Շf@\w@q")K@QҢf@,h伒@j)K@XȒIf@墎ż@ 0Q)K@Rf@{-ߦ@Fz(K@4f@@Ԡ(K@_~?'f@9cl\@!n(K@+d1If@ c&@.(K@Lvnz`f@1A@v-{(K@9f@5i;*Ồ@C;dS(K@ qf@f@n+('(K@p`f@F@ ?"(K@sf@ᖻ@W'K@1[x f@Qou@15'K@gf@H-sX@`'K@iff@@BwL@{`nf@&RX@EǃL@GHwf@wr@^CL@} $zf@n|X@SA L@ߥ+M~f@c@9L@f@fK@L@f@@@ toruswA@cXSI@f@ L9y<@ conegK@X&Q@@f@ L9y< L9yʼ? ?@ nullbs nullbs     ? ?xA`z? ?? 0??i?#z?yEW?ty[m4?i?Ed@yEW@xA`z?  coedge    }  coedge   /  edge   Wq?  tangent  pcurve    exppc nubsWqldi@?ldi@ spline  ref  coedge      edge  r   tangent  pcurve    coedge    edge   r?  tangent  pcurve    coedge    }  coedge    }  vertex    vertex  ellipse curve  '0В@4v}N@`e@@?  bs-8R? coedge    intcurve curve   bldcur+Hވ?yr?Ԃ\}?pr? d? spline  ref  null_surface nubspr???pr? nullbs   intcurve curve   ref3  coedge    coedge   loop   intcurve curve   bldcur+Hވ?yr?Ԃ\}?pr? d? spline  ref  null_surface nubspr?pr? nullbs   intcurve curve   ref4  edge  փ3= ldi@  tangent  pcurve    coedge  !  " # edge  ldi փ3 $ tangent  pcurve   % point  ^Kɒ@LAN@((̡e@ point  :UtTƒ@ΥO@=e@ coedge  & '  coedge  ( ) f  vertex  ) *straight curve  MȒ@X&Q@He@ L9y<  coedge  + , -  edge  EJW DJW? . tangent  vertex  / 0ellipse curve  p[(˒@2]~̩P@\&f@Mr ~:ƿ[6Mic%?r ~:? ( -DT!? coedge  1 2  3 edge  4 yo? 5 tangent ftreemeg attrib   plane surface  Cxgzǒ@X&Q@܂f@?LN7Cp ~:ƿp ~:?4Mic 8  ? spline surface   ref%  coedge  @ A B  coedge  @ 6  loop  C  vertex  Dellipse curve  wA@2]~̩P@f@qm۶m۶<?  -DT!? edge  Y& Exg? F tangent  point  wA@5N1O@f@ftreemeg attrib    face G H "  I cone surface  ("ɒ@2]~̩P@m^f@Mr ~:?[6Mic<%^ȨH;f"do߿? @  coedge  J K L M coedge  J 1 N O pcurve   Pintcurve curve   bldcur 0??i?#z?yEW?ty[m4?i?Ed@yEW@xA`z? spline  ref- null_surface nubsyEW@yEW@ nullbs    coedge  Q R S  coedge  T K U V edge   Wzp? X tangent  face Y  Z  point  fK@L@f@ftreemeg attrib    face [ \ ]  ^  loop  cone surface  Ynƒ@2]~̩P@e@? L9y<;f;f? @ ftreemeg attrib    face _ ` a  b  loop  1 spline surface   rbblnsur blendsupsur planeCxgzǒ@X&Q@܂f@??LN7C<p ~:?p ~:?4Mic intcurve  exactcur nubso?o?ScJA?o?ScJA?o?nW@K@q ~:f@O@K@f@iH@i{ K@f@_ @@K@rBo7f@Ă1@qv.K@X8Pf@}"@V{K@b6f@*@/WK@H=m f@?x# @O~;LK@#f@\@שK@XJ6.&f@:@eIlK@\%9'f@澒@cMK@-)*f@׾@ISK@.,f@fо@wxK@zĜ$.f@_ ᦹ@mH'K@OpX2f@JB@d7XK@Φ>6f@$Z@2 (K@K8f@Z9v@׋|\K@>f@X@,K@VУBCf@ J@K@ B}-Ef@ٗ[;@K[VL@&WHf@i,@L@? Kf@ null_surface null_surface nullbs nullbs o?o?ScJA?o?ScJA? ?  intcurve  exactcur nubs o?o?H?ScJA?o?П%?ScJA?^X?o?MQ7ǒ@K@('W!f@ni0ǒ@K@ꖫ"f@5y(ǒ@h{ K@F> $f@-g!ǒ@K@* |T%f@`eǒ@qv.K@>]'f@Ɲldǒ@U{K@u#*f@ ƒ@/WK@B#{+f@ټBƒ@6K@Ւ?.f@eGƒ@K@%\l0f@^ƒ@x&K@>u1f@>{ƒ@70U|K@)W2f@[ƒ@NoK@4f@;cƒ@hK@'E4f@ƒ@n,K@_76f@ˁsƒ@HSK@ <7f@EIƒ@wxK@2A9f@ᅟƒ@Y;K@;Y4$ƒ@)fL@.4Rf@aƒ@smL@G+݋Sf@Cƒ@Á$L@,Tf@L ƒ@L@n ~:Vf@ null_surface null_surface nullbs nullbs o?o?H?ScJA?o?П%?ScJA?^X? ?  intcurve  exactcur nubs o?o?H?ScJA?o?П%?ScJA?^X?o?*ixGÒ@C@K@Mf@>>Ò@C@K@ө,rf@)+b4Ò@rK@ Df@pZ*Ò@FK@< f@nÒ@Hi?K@Jg F$f@l^’@u*K@e,_'f@/{i’@}xZK@xs)f@T’@f9|IK@+f@~’@'OhK@,ؐ.f@X O’@mK@J:/f@ն’@A!K@D_1f@邵’@OFTI'K@G&2f@,GW’@~X=K@u3f@-"’@l7rK@roJ05f@’@@gK@$?7f@jw’@*ŽrK@m 69f@ 8W’@kZK@DK@ 'Sf@ Z@ɂcK@%|Vf@u&'J@goK@ӣCWf@l̥9@ lK@Yf@r(@fJpK@+zZf@ null_surface null_surface nullbs nullbs o?o?H?ScJA?o?П%?ScJA?^X? ?  intcurve  ref9 intcurve  offintcur nubso?nW@K@q ~:f@@K@]4:'f@9@+ǻOK@T9f@i,@L@? Kf@@@ toruswA@cXSI@f@ L9y<@ planeCxgzǒ@X&Q@܂f@??LN7C<p ~:?p ~:?4Mic  coedge  n o  intcurve curve   bldcur e?wr?7 $Vt?r? *?wr?,?r?\`$d? spline  ref null_surface nubsr?r? nullbs   intcurve curve   ref?  coedge  o p  q  edge  t[l@ f @  r tangent  edge  g  t[l  s tangent  edge  .@"@ tDyd-@  u tangent  point  '0В@4v}N@e@ point  '0В@5N1O@e@ coedge  v  " w edge  x i >X?  y unknown  coedge  z { |  face } ~   intcurve curve   bldcurփ3=lJ?Hwp?&*P@ldi@`}/s? spline  ref null_surface nubsփ3=ldi@փ3=ldi@ nullbs   intcurve curve   ref@  coedge  v  i "  loop   pcurve    exppc nubs0RZ?4*{@lodi@h >Xv&t?ʒ*:%?q쌈"Ǒy?]{?Yzخ7E?: \X%G?$1< >?V1Q$T? ?ah >X spline  ref  ? 5, intcurve curve   bldcurփ3=lJ?Hwp?&*P@ldi@`}/s? spline  ref spline  ref  ? 5,  nubsփ3=ldi@?փ3=?ldi@ nubs0RZ?4*{@lodi@h >Xv&t?ʒ*:%?q쌈"Ǒy?]{?Yzخ7E?: \X%G?$1< >?V1Q$T? ?ah >X   intcurve curve   refB  coedge    '   edge  xlWx Y^ &  tangent  coedge    ) a  edge   G 4[^  tangent  point  MȒ@K@He@ coedge    / -  coedge     -  loop   ellipse curve  wA@2]~̩P@f@ L9y< Z?d|b@? mX9 T ? edge  L@ y_N@   tangent  point  Hf@2]~̩P@ޓf@ coedge   N   coedge       pcurve    vertex  intcurve curve   bldcurH?П%?^X?o?tͯ})g? spline  ref8 null_surface nubso?o? nullbs    coedge   8  coedge   ; 8  loop   ellipse curve  wA@4v}N@f@?LXz???  bs-8R? coedge      edge  xg Y&@  tangent  point  wA@4v}N@f@ftreemeg attrib    face      cone surface  Yn@4v}N@f@? L9y intcurve  exactcur nubszp?zp?LC?\<39?kqf?zp?fK@L@f@@.[L@f@k@gHK@f@L@1CjK@f@\13@^K@f@@-Ed*K@f@@<`K@f@7@,ҠK@f@@K@f@s@ӷTK@f@Ęa@T8NK@f@& DZ@GmK@f@ڛ@&rK@f@R#tE@,QLK@f@Aﰒ@jūK@f@}ð@C*{K@f@#JVm@9ȶ1K@f@Sah@K@f@//믒@vGK@f@u@K@f@yA@K@f@ null_surface null_surface nullbs nullbs zp?zp?LC?\<39?kqf? ?  intcurve  exactcur nubs iЧ?zp?R?zp?LC?^z?\<39?kqf?zp?fK@L@f@}CF @6x5L@f@@@rL@f@x\1ɵ@VkL@f@}"t@U8K@f@1I@K3K@f@>N@'K@f@*5@~LK@f@OyUh@tb7XK@f@*[tL@jK@f@z|@d4K@f@QJ@OK@f@8g@ذ K@f@ziF@T=K@f@@K@f@s@ӷTK@f@;@&iK@f@j^"@/W+K@f@%@j$(K@f@*oY̱@ Ř}K@f@*@vK@f@@b&~K@f@8@07K@f@Aﰒ@jūK@f@}ð@C*{K@f@#JVm@9ȶ1K@f@Sah@K@f@//믒@wGK@f@u@K@f@yA@K@f@ null_surface null_surface nullbs nullbs iЧ?zp?R?zp?LC?^z?\<39?kqf? ?  intcurve  exactcur nubs iЧ?zp?R?zp?LC?^z?\<39?kqf?zp?oޛJ@fJpK@g/f@9pz@AbK@ЌCrf@F)?I@)9K@Ă糚f@(@YNXdK@̠^f@3!5v@4VWK@[eof@4lS@O cK@hgf@Z;#@MK@Mf@Mѵ@۵WK@Eyf@+E@m7nK@ќf@ ]@+FK@_f@Q*@.sKK@g^Z[f@D9f@RK@ݺf@L@>cK@X)f@"h5ӳ@w[K@xqncZf@Rm$FY@&sK@f@ o$@8 $K@ndx\՞f@)Qಒ@:ЄK@~f@7@> #q>K@,&f@ 4@5'K@Bp/f@4 W@{lK@yZLf@#]!@pK@TEff@T@^hK@zwf@-i@BtK@`f@ D@lqK@ռͽf@C@O[K@Xa͟f@{<@M?K@|f@7\G7@K@Ē f@ՐE@pK@TfWf@flA˯@.@K@f@wA@.@K@f@ null_surface null_surface nullbs nullbs iЧ?zp?R?zp?LC?^z?\<39?kqf? ?  intcurve  refH intcurve  offintcur nubsi̺x@(P&@V/M@P&qB#@6q'@fK@L@f@GQ@14OCK@f@fΰ@*y)?K@f@r9L@dnK@f@DRV@*L@'f@R@̬,L@'f@>@T@L@f@ޏ@ZL@f@GX5@@UL@f@ @"IL@f@@zrDK@f@$ꔇ@tK@f@@@ toruswA@cXSI@f@ L9y<@ plane4T%@X&Q@f@?? L9y< nullbs nullbs     ? ?()g? ??iЧ?R?^z?zp?()g? null_surface nubszp?zp? nullbs   ftreemeg attrib   plane surface  4T%@X&Q@f@? L9y< ftreemeg attrib     face       loop    torus surface  ؒ@cXM@e@@ ftreemeg attrib     face       loop    cone surface  q2@K@>Nf@Mr ~:ƿ[6Mic%?J?/??? ?@  coedge    p  e  coedge      e  loop     vertex    vertex   ellipse curve  ؒ@4v}N@`e@ L9y@?  bs-8R? edge  (h >X  !  unknown  point  '˒@ۥO@i@%e@ point  NNQΒ@LAN@&Ope@ coedge  m      coedge   l     coedge   z    coedge      q  coedge    c  q  loop   ~ straight curve  Ynƒ@4v}N@e@? L9y< Pd? s^@straight curve  Ynƒ@5N1O@e@ L9y s^ Pdؿ vertex   straight curve  '0В@X&Q@e@ L9y<  coedge   !   "  pcurve    exppc nubs:.DT!-DT! spline  ref  vertex   ellipse curve  l͒@2]~̩P@e@׿==^?p"YJDU~Q?  -DT!? coedge  n     coedge     |   edge   ~r?   tangent ftreemeg attrib     face   q   cone surface  '0В@X&Q@e@ L9y< L9y? ?@  pcurve    exppc nubsj-DT!?-DT!? spline  ref  coedge   &     coedge  &  + /   loop  &  straight curve  I+@2]~̩P@ Hf@Mr ~:ƿ[6Mic%? MV 3 J#!@ coedge   ( 2  a  coedge  (    a straight curve  Œ@K@K8Yf@p ~:ƿ4Mic>? e{nR &? coedge  , +   -  coedge   A ,    edge  O L   tangent  face   -    vertex  / straight curve  Hf@..!@ޓf@? &U A=4Q@ coedge  2 1     pcurve    exppc nubsjco??o? spline  ref8  edge  v< 4Tr-8R? 2  tangent  pcurve    exppc nubsv<Tr-8R?? spline  ref8 intcurve curve   refC  point  MQ7ǒ@K@('W!f@ coedge  7 6   8  coedge  Q :    coedge    :    edge  N,DT! -DT!? :  tangent  vertex  ; straight curve  Yn@4v}N@f@? L9y<  Nv ô@ftreemeg attrib  >  face       loop   > torus surface  @cXM@f@F?@  coedge    @    edge  EZs-8R? -DT!?   tangent  coedge  A      loop   A   vertex   straight curve  Yn@2]~̩P@`f@ L9yx+R )@`$ @ftreemeg attrib  C  cone surface  Yn@2]~̩P@f@? L9y intcurve  exactcur nubs~r?~r?@,?~r?Q’@DdtK@UPC e@qXM’@`%+K@Y7ʥe@Lk’@ֽK@M7e@ zpO’@)1IK@d(|Ye@zyO’@VrŔK@f;e@s@ :K@Lve@aE@ K@R+e@炢 @7K@Re@M~@K@h;\'e@ @k@ lK@{e@LI@vK@.??e@b+@zEK@le@|@+K@^)Ge@J9@K@k#e@Jj@K@e@ null_surface null_surface nullbs nullbs ~r?~r?@,? ?  intcurve  exactcur nubs~r?f?~r?xr?@,? $Vt?~r?^Kɒ@DdtK@)(̡e@%@ɒ@`%+K@,e@$ɒ@ֽK@ 릛e@бЋɒ@)1IK@3>e@'2yɒ@4.JK@M*e@x9hɒ@Y&5K@l %e@5&wzdɒ@])K@ wye@P#SXɒ@0K@"fe@l䒻Lɒ@ PK@aVe@o%{Eɒ@Y!@K@Le@g=7ɒ@i@K@H{/e@z5*ɒ@"/)dK@xpe@聏#ɒ@;%8K@ :e@Hɒ@U)tK@|" e@i*ɒ@sK@se@ɒ@K@Œ@ɩK@x0JTe@ppŒ@Bڳ]K@gcxֻe@oŒ@>.^K@@^e@CNdŒ@5EW$K@Շ}3e@Z TŒ@H(+K@+e@XEŒ@{|K@ye@KƐ@Œ@_w1$K@1:2e@|4Œ@dSIK@'e@;(Œ@IںbK@mhe@9M"Œ@=KK@;4P]e@)Œ@^$K@b?Te@Œ@ K@ -Le@I~Œ@XK@D(&Ne@S+Ē@0@K@rQe@mwVĒ@0@K@mw!lTe@ null_surface null_surface nullbs nullbs ~r?f?~r?xr?@,? $Vt? ?  intcurve  refS intcurve  offintcur nubs~r?Q’@DdtK@UPC e@@mHK@);ﮯe@ P@K@Vנe@Jj@K@e@@@ cone("ɒ@cXSI@m^f@Mr ~:ƿ[6Mic%?^ȨH;f@"do߿? @ cone'0В@X&Q@e@ L9y< L9y? @ nullbs nullbs     ? ?z d? ??f?xr? $Vt?~r?z d?  coedge  d c 4 5 e  edge  f-DT! 6+DT!? p 7 tangent  edge  8+DT! g-DT!?  9 tangent  face : e  ;  point  ؒ@4v}N@e@ point  ؒ@5N1O@e@ vertex  < =ellipse curve  l͒@2]~̩P@e@o~Q?lb&(݊yGʿ?xo~Q? -DT!  coedge   > l  ]  edge  ? gfs-8R?  @ tangent  coedge  A B m  C  edge  ?  P  D tangent  coedge  E F n  G H edge  t Ir? n J tangent  coedge  K o L M q  coedge  p K N O q  point  '0В@K@e@ coedge  P  v  Q  edge   xDJW?  R tangent  pcurve    exppc nubsDJW?? spline  ref  point  }gxb@@2]~̩P@hw!lTe@ coedge  S T z  2 U edge  I nodi@ z V tangent  coedge  W {    X coedge  { W S Y  Z pcurve   [ vertex  | \intcurve curve   bldcurf?xr? $Vt?~r?z d? spline  refR null_surface nubs~r?~r? nullbs   ftreemeg attrib  ~  face ] C   ^ plane surface  Udڒ@X&Q@e@? L9y<  coedge    _ `   coedge   a   Q  edge  bP-& x@e  c tangent  face d e   f  coedge    g h a  edge  i,< t-8R?  j tangent  coedge  _ k   l  edge  $>JW? t,DT!?  m unknown  coedge  n  k o   vertex  o pstraight curve  wA@..!@`f@ A=4Q &U@ftreemeg attrib  - cone surface  wA@..!@f@?!Z?"|b@? ?@  point  Hf@Q@ޓf@ coedge   q     edge  o   r tangent  pcurve   s vertex   tellipse curve  nW@K@q ~:f@    ] ftreemeg attrib     face   G    loop  S  spline surface   rbblnsur blendsupsur cone'0В@X&Q@e@ L9y< L9y? @ null_curve nullbs blendsupsur spline  rbblnsur blendsupsur coneYnƒ@cXSI@e@ L9y;f@;f? @ null_curve nullbs blendsupsur cone("ɒ@cXSI@m^f@Mr ~:ƿ[6Mic%?^ȨH;f@"do߿? @ null_curve nullbs* ellipsel͒@cXSI@e@OϢoXp4X)? b- ?2QMq?%1t?; \j?zخF%7?C]bm}?쌈"wɢJ?rʒ?h >X+:0yE> intcurve  exactcur nubs B%?B%?IS[&?()?J=?.8?adA?E@Z~&i@nodi@'˒@.dtK@L7fe@˒@~ K@bfe@ٯF˒@sv+K@sge@eQʒ@K@0LOhe@bkʒ@ϑL@bN|je@!'pɒ@6L@'jL@nLqe@břȒ@hL@qe@նEOȒ@!̀L@TЊese@)BȒ@| L@te@+|ǒ@^4)a L@>ue@ovPǒ@HS L@(we@+8rRǒ@b22 L@;nxe@Z/ǒ@ lbV L@ȶye@Dƒ@t@ L@|9{e@\ƒ@0 L@R|e@e@}sR͒@6L@V%Fe@dR/͒@$ 0L@Ѧe@)7 ͒@ԉZL@Nwce@̒@NL@EvOe@v̒@;'jL@e@iH̒@hL@@e@%>̒@;BL@0Jqe@ϕ̒@HL@|e@a|̒@u8L@BIJe@Nj̒@7K L@A_e@iX̒@S L@i!WpL@lȼe@qnlʒ@QWL@c'ݼe@@ʒ@jmy=L@qe@77ɒ@K@c!Fe@Oɒ@YaK@he@ zɒ@`!K@jje@^Kɒ@4dtK@,(̡e@ null_surface null_surface nullbs nullbs  B%?B%?IS[&? {~6?()?J=?.8?adA?JJwp@E@PUa@Z~&i@ ?  intcurve  exactcur nubsB%?B%?IS[&? {~6?()?J=?.8?adA?JJwp@E@PUa@Z~&i@nodi@'˒@ y+K@i@%e@GV˒@* K@-Ze@jO˒@ 1K@AGKe@G膪R˒@Y2K@bwe@23ʒ@ L@,щe@^Ò@bztwL@5}we@Q’@>dtK@TPC e@@@ spline  ref[  ? 5, ¼ cone'0В@X&Q@e@ L9y< L9y? @ nubsB%?.8?odi@h >Xp4X)? b- ?2QMq?%1t?; \j?zخF%7?C]bm}?쌈"wɢJ?rʒ?h >X nullbs     ? ?s/s? ?? {~6?JJwp@PUa@nodi@s/s?  coedge  N   5   edge  8 6:t-8R? 4  tangent  vertex  O ellipse curve  ؒ@cXM@e@J*h?6*h?? -DT! +DT!? vertex   ellipse curve  ؒ@cXM@e@?U@ІU@? +DT! -DT!?ftreemeg attrib   torus surface  ؒ@cXM@`e@F?@  edge  @e@ P c[a&@ B  tangent  point  Ͷʒ@2]~̩P@@e@ coedge   / A  ]  vertex   ellipse curve  ؒ@1]~̩P@e@$I$I<?  -DT!? coedge    >  C  coedge    P < C  loop    straight curve  Ynƒ@2]~̩P@@e@ L9y `kgA k1@ coedge    T  G  coedge      G  loop  E 1  pcurve    vertex   intcurve curve   bldcurd?vr?$Vt?r?P*~X d? spline  rbblnsur blendsupsur cone'0В@X&Q@e@ L9y< L9y? @ null_curve nullbs blendsupsur coneYnƒ@cXSI@e@ L9y;f@;f? @ null_curve nullbs+:0yE> intcurve  exactcur nubsr?r?p@,?r?'0В@K@`e@{;В@K@`e@SlGВ@t+K@s `e@В@vEK@0!`e@]Dϒ@vK@9ܖZ`e@ 4ϒ@ lK@?t`e@Q,Β@K@@`e@~GΒ@7K@ϋae@A͒@ K@=be@"2͒@ :K@]be@d ͒@VrŔK@(}ce@vS̒@%1IK@ ~de@߼T̒@ýK@~ee@xQ̒@`%+K@^3؛ee@'˒@1dtK@N7fe@ null_surface null_surface nullbs nullbs r?r?p@,? ?  intcurve  exactcur nubsr?d?r?vr?p@,?$Vt?r?'0В@K@e@)k'В@K@e@В@t+K@ɹe@*gВ@vEK@ve@xoz<В@oXK@?#e@7В@K@"?Ae@{В@ϯZK@?Ie@ͯϒ@:|K@B,ce@ƥзϒ@,K@hκe@ϒ@Q kK@Ζe@s Jϒ@]dcGK@,Ƞe@Sh]ϒ@HK@DQe@YHϒ@eK@ e@jjs*)ϒ@{VK@mjޓRe@- ϒ@wK@{,re@講wΒ@dK@]MkDe@Β@.K@3ˡe@zΒ@619K@e@wfpΒ@$vw3K@}:he@[WΒ@4TK@ ;q`e@a%-Β@vK@ we@<pΒ@1&K@D͢e@naΒ@5KK@10e@MNQΒ@2dtK@(Ope@ null_surface null_surface nullbs nullbs r?d?r?vr?p@,?$Vt? ?  intcurve  exactcur nubsr?d?r?vr?p@,?$Vt?r?'0В@.@K@e@{;В@.@K@e@SlGВ@9K@H Me@В@p/K@G\e@ 3İϒ@zmK@?V^/e@UYϒ@K@Ve@L@Cϒ@K@2be@1.ϒ@we{0K@;e@#>Β@7soK@e@Β@ TK@sʀe@gcFΒ@bK@p e@N~%4͒@&<K@Z,We@6͒@/u,kK@ظe@;$͒@EK@8oÁe@}K͒@U8K@; e@16͒@ K@%e@2$͒@@ fK@;G2ee@̒@zK@~e@q"̒@8mUK@M҂e@݆,u̒@IK@A+e@)8̒@otK@cQe@f̒@֓LK@e@T˒@ͺK@B@e@'˒@ y+K@i@%e@ null_surface null_surface nullbs nullbs r?d?r?vr?p@,?$Vt? ?  intcurve  refb intcurve  offintcur nubsr?'0В@K@`e@ϒ@K@`e@#6>l͒@YHK@]J)be@'˒@2dtK@N7fe@@@ coneYnƒ@cXSI@e@ L9y;f@;f? @ cone'0В@X&Q@e@ L9y< L9y? @ nullbs nullbs     ? ?P*~X d? ??d?vr?$Vt?r?P*~X d? null_surface nubsr?r? nullbs    coedge      q  coedge     M   edge    tt[l   tangent  coedge   4  O   edge  6acN  ǜ   tangent  coedge  a  B < Q  loop   e ellipse curve  Ͷʒ@2]~̩P@e@??  DJW? coedge     Y 2  coedge    E  2  pcurve   intcurve curve   bldcur {~6?JJwp@PUa@nodi@s/s? spline  refZ null_surface nubsnodi@nodi@ nullbs    coedge        pcurve    exppc nubst-8R~r??~r? spline  refR  edge  _< ƑWq?   tangent  pcurve    exppc nubs_<ƑWq?? spline  refR intcurve curve   refX  point  ^Kɒ@DdtK@)(̡e@ftreemeg attrib   torus surface  @cXM@f@x+R<@x+R  coedge     ` l  edge  bA@#@ [|@   unknown  coedge   P   Q  vertex  ` straight curve  }gxb@@ M@jw!lTe@ 4s4 nl=`@ftreemeg attrib  .  face   Q   plane surface  _u@ Q@`f@%?Mr ~:?Mr ~:?%  coedge     h   edge  [^? iG@ g  tangent  vertex  h ellipse curve  Jj@K@e@Mr ~:ƿ[6Mic%??MXzp ~:?? ,< t-8R? coedge     o l  loop    ellipse curve  wA@8sQ@f@9H˪6j CeҼ@nĿ>=?  coedge        edge  mπ*@ n?`Q@   unknown  point  wA@8sQ@`f@ coedge       intcurve curve   bldcurH?П%?^X?o?tͯ})g? spline  ref8 null_surface nubso???o? nullbs   intcurve curve   refi  point  *ixGÒ@C@K@Nf@ coedge       ellipse curve  @4v}N@f@? L9yJWƿ a 8 unknown  point  }gxb@@X&Q@jw!lTe@ftreemeg attrib  e/ cone surface  Ͷʒ@ M@e@?E!Z |b? @  coedge  9 g q    loop    straight curve  , ’@6@K@IũSf@Mr ~:?[6Mic<% & e{nR@ point  mwVĒ@6@K@mw!lTe@ coedge  k : ; < l  face = > l  ?  coedge  @ n A B   coedge  ; C n  D  edge  EԽ7K% P"Ha@ n F tangent  vertex  < Gstraight curve  _u@ Q@`f@H˪?  coedge  q  H I   edge  J( Vs-8R? q K tangent  coedge  x w  L   vertex  L Mellipse curve  :B.Ȍ@cXM@f@<?PXz??  :t-8R? coedge    ~    edge   :s-8R? ~ N tangent ellipse curve  @cXM@f@?UU@?  coedge   O P Q   coedge        edge  -DT! RF,DT!?  S tangent  coedge        vertex   Tstraight curve  x@acN@`f@ L9y<^DO9 7[M /B6H point  x@cXM@`f@ coedge  U  V W   coedge   X Y Z   coedge  [ \   ]  edge  ^$@ _6@  ` unknown ftreemeg attrib  h  loop  a  plane surface  @L@d@  coedge     L   coedge  P      coedge   P     edge  s-8R? -DT!?  b tangent  edge  R fs-8R?  c tangent  vertex   dellipse curve  @cXL@f@?UІU?  edge  e &bs-8R?  f tangent ftreemeg attrib   torus surface  wA@cXSI@f@ L9y<@ ellipse curve  :B.Ȍ@cXL@f@ L9y?^DOPXz??  :t-8R?straight curve  Yn@/@K@f@? L9yX ¼   unknown  point  :UtTƒ@ y+K@=e@ellipse curve  Ͷʒ@h'I=Q@e@8H˪??5j Ce<n?@>?  coedge  3      coedge      l  coedge     < D  edge  -DT! *$   unknown ftreemeg attrib  3  face     f plane surface  @n%R@@e@:H˪??6j Ce<|FSkҼ?  coedge        coedge     B   edge  EQ|n@ GwQ@   unknown  coedge      D  loop  ;   vertex  B straight curve  @rO`f@? 6rÓ4 :"1vb@ point  @.uӜR@`f@ coedge     I   edge  eDJW JEJW? H  tangent  vertex   ellipse curve  p[(˒@cXSI@\&f@q ~:?/c(m<*r ~:? ( -DT!? edge  2]~iK 2]~iJ   tangent  point  &,t=ۅ@cXM@f@ellipse curve  x@cXM@f@$I$Ix+R?  -DT!? coedge        coedge     Q   edge  Rxg eY&@   tangent  vertex   ellipse curve  @cXL@`f@x+R?STu씹跼? )K (K? point  x@cXL@`f@ coedge        coedge     W   edge  -DT! ^-DT!? V  unknown  coedge        coedge     Z   edge  _-DT! -DT!? Y  unknown  coedge      ]  coedge      ]  loop  [   vertex    vertex   straight curve  @J`f@?  coedge       ellipse curve  x@cXL@f@$I$I?x+R@?  -DT!?ellipse curve  @cXSI@f@?$I$IXp4X)? b- ?2QMq?%1t?; \j?zخF%7?C]bm}?쌈"wɢJ?rʒ?h >X spline  ref[  ? 5, ¼intcurve curve   bldcur {~6?JJwp@PUa@nodi@s/s? spline  refZ spline  ref[  ? 5, ¼ nubsnodi@??nodi@ nubsB%?.8?odi@h >Xp4X)? b- ?2QMq?%1t?; \j?zخF%7?C]bm}?쌈"wɢJ?rʒ?h >X   intcurve curve   refr  vertex   ellipse curve  l͒@cXSI@e@׿j?n^?p"YKDU~Q? $DT! ¼ coedge    9    edge  JY^? -Wx@   tangent  coedge  :    l  coedge    :    edge  @ @   unknown  coedge  C ;   D  vertex   ellipse curve  @.uӜR@f@;H˪6j CeҼn?@>? ftreemeg attrib  >4  face       loop   >  coedge   @     coedge    @    edge  R@ LtS@ @  tangent  coedge   A C    coedge  A      loop     vertex   straight curve  @rR`f@?H˪?  edge  8CNZi9 E-DT!?   unknown  face   D    point  @,uӜR`f@ coedge   H O    coedge  H      loop  H  ellipse curve  wA@cXSI@f@ L9y? Z?T-DT!? a ? unknown  point  wA@dXSI@`f@ coedge  i  y   straight curve  Ynƒ@.@K@e@? L9y< Pd? s^@ vertex  z @ellipse curve  ؒ@dXSI@e@$I$I@?  -DT!? point  ؒ@/@K@e@ point  @dXL@@e@ point  =kWA-@&;CSQ@@e@ coedge  A y B C C  edge  DP?  @ y E tangent ellipse curve  ؒ@dXL@@e@?S@T? (K )K? coedge  | F G H C  coedge  I J |  K  edge   zJ4p@ L.@  M unknown  coedge  N } J O   coedge  } N     loop  } P  vertex   Qellipse curve  ,@v1O@@e@5j Ce<ǰQ2t<X?  Z unknown  coedge     Y  [ pcurve    exppc nubs$DT!<?$DT!?¼ spline  ref[  pcurve    exppc nubs$DT!$DT!¼ spline  ref[  edge  d;!@ \\@  c tangent  point  }gxb@@cXSI@jw!lTe@ coedge  ]      coedge   ] X   straight curve  I+@cXSI@ Hf@Mr ~:?[6Mic<% J#! MV 3@ coedge    ^ _ l  coedge  ` a   b  edge  cbAN *$  d unknown  coedge  e  a f   coedge   e     loop     vertex   gstraight curve  @rR@`f@  edge  3*Ma 3ˍ%@  h tangent  point  @rR@f@ftreemeg attrib  5  face i j k  l  loop  m  cone surface  }RHf@ǖǛYe@>%bOL2<iϣ構?"lv? @  coedge  n o p q   coedge  r  s t   coedge  u v   w  edge f  x@ ;LԠ'@  y tangent  coedge  z      coedge   z { |   loop   }  vertex   ~straight curve  wA@..!@`f@ l)6Q BH6AV@ coedge    e    coedge        edge  -DT! ,CJWƿ   unknown  face       point  wA@6sQ`f@ vertex   ellipse curve  @-uӜRf@H˪?6j CenĿ? ftreemeg attrib  C  face      cone surface  @rOf@?lvlv@? ?@  coedge        edge   N JD@   tangent  coedge   r     coedge        edge  ;LԠ'    tangent  vertex    coedge        coedge        edge  -DT! -DT!?   unknown  coedge        coedge        loop     vertex   straight curve  @J@`f@  coedge        edge  "    tangent  face       point  @E`f@ coedge     !   edge  %-DT! -DT!?   unknown  coedge      $  coedge     ( $  loop  "   vertex   straight curve  x@J`f@?  coedge        edge   "@ #  tangent  face       point  x@E`f@ coedge     ,   edge  /$@ -6@ +  unknown  vertex   straight curve  P@J`f@? {cD ?@ vertex  , straight curve   @J`f@ ? {cD@ftreemeg attrib  b  face      plane surface  @J`f@??  coedge        coedge     6   edge  @ =,@ 5  unknown  coedge        coedge     9   edge  >@ I@ 8  unknown  coedge      <  coedge      <  loop     vertex    vertex  9 ellipse curve  L@Od@?lvlv@?  point  ؒ@dXSI@@e@ coedge      C  coedge     C   edge  \ Dd;!   tangent  vertex   straight curve  Ynƒ@cXSI@@e@? L9y< k1 `kgA@ coedge      C  coedge     H   edge  L-DT! -DT!?   unknown  coedge      K  coedge     O K  loop  I   vertex   straight curve  D@@Q@@e@  coedge        edge   wr<< $@ J  tangent  face       point  D@v1O@@e@ coedge     S   edge  1zJ4p@ Ta@oZ@ R  unknown  vertex   straight curve  =kWA-@(;CSQ@@e@? <`< :`2@ftreemeg attrib  -  face       coedge        edge   DDJW?   tangent ellipse curve  l͒@cXSI@e@o~Q?݊yGʿ?xo~Q? < $DT!? pcurve    exppc nubsDJW??¼¼ spline  ref[  vertex    coedge        coedge     _   edge  $ chȟ?   tangent  coedge      b  coedge     f b  loop     vertex  _ ellipse curve  @ieR@e@;H˪??6j Ce<@nĿ@>=?  coedge        edge  3ˍ" 3*}a@   tangent  point  @rR@e@straight curve  @rOf@ :"1vb 6rÓ4@ftreemeg attrib  6  face       loop    plane surface  @L@e@??  coedge        coedge    z    coedge        coedge     q   edge b  = @ ?Nv@   tangent  coedge        coedge     t   edge h  -DT! x-DT!?   tangent  coedge  !  " # w  coedge   !  $ w  loop  ! %  vertex  t &straight curve  @P`f@? @&23? xs:d.@ coedge    n    coedge  ' "  | (  edge d  DJW DJW?  ) tangent  face * +   ,  point  wA@P`f@ coedge  -   .   edge  @ @ e / unknown  coedge   0 1 2   coedge  o n     edge  A@#@ 3[|@  4 unknown  vertex   5ellipse curve  wA@6sQf@H˪?6j Ce@n?<? ftreemeg attrib  N  face 6 7 <  8 plane surface  D@@Q@e@H˪?6j Ce<|FSk  point  @rRf@ftreemeg attrib  D  face 9 : ;  < plane surface  @rR`f@?  coedge  = >   ?  edge   DJW DJW?  @ tangent  vertex   A coedge  B C   D  edge l   -DT! E-DT!?  F tangent  coedge  G  C H   coedge   G = I   loop  G J  const_roundffblendblendsys attrib     null_surface@ vertex   Kstraight curve  @J`f@ xs:d. @&23 point  wA@J`f@ coedge  L M   N  edge  $@ 6@  O unknown  coedge  P      coedge   P L Q   loop  P R  vertex   Sellipse curve   @E@`f@x+Rx+R? H H@?  coedge    T U   edge   V"@  W tangent  face X Y   Z  point  @E@`f@ coedge  + T     edge  -DT! /-DT!?  [ unknown  vertex   \straight curve  @E`f@? {cD ?@ftreemeg attrib  \ cone surface   @E`f@? H H? $@  coedge  ]  M ^   coedge   ] "    loop  ] _  vertex   `ellipse curve  P@E@`f@x+Rx+R<? H@ H@?  coedge  # " a b $  edge  c" % " d tangent  face e f $  g  point  x@E@`f@ coedge  a + '    edge  --DT! -DT!?  h unknown  vertex  ( istraight curve  x@E`f@ ? {cD@ftreemeg attrib  )[ cone surface  P@E`f@? H@ H? $@  loop  j f straight curve  @J@e@?  point  P@J@e@ point   @J@e@ftreemeg attrib  2c  face k l m  n  loop  o 2 plane surface  Ԓ@H@e@??  coedge  p 4 q r   coedge  s t 4  ;  edge  u-DT! -DT!?  v unknown  coedge  w 5 ;    coedge  5 w s x   loop   Y  vertex  6 ystraight curve  @Ld@  coedge  7 z { |   coedge  } ~ 7    edge   $@   unknown  coedge   8 ~    coedge  8  :    loop     vertex  9 straight curve  4@Ld@  coedge  ; :   <  edge  >$    tangent  edge   =$@   tangent  point  L@Ld@ point  4@Od@ coedge   A   C  coedge    A    edge   % Ͷ A  tangent  coedge  B X     vertex  C  point  Ͷʒ@cXSI@@e@ coedge  F    C  coedge    F  m  edge  @ 9@   unknown  coedge   G     coedge  G  I    loop  G   vertex   ellipse curve  ,@K@@e@lv@lv?  coedge  J I   K  edge  $ L I  tangent  face  R K    point  D@K@@e@ coedge   R N    edge  MK TMK?   unknown  vertex  O straight curve  D@v1O@@e@ :`2 <`<@ftreemeg attrib  PT  face      cone surface  ,@v1O@@e@9qFSkҼ?kWA-@&;CSQ@d@ftreemeg attrib  W  face       loop   W cone surface  @ң"בLf@ޛVۼ<? ?@ -DT! }ellipse curve  Ͷʒ@cXSI@e@`ޓ?  DJW? edge   DJW \DJW?   tangent  point  }gxb@@Jjw!lTe@ coedge    ]    edge   \#,{V# 8B ]  tangent  coedge   ^     coedge  ^  `    loop    straight curve  aJT9_@ΏR@@e@  coedge   `   b  edge  MF!CC= c %p< `  unknown  coedge  a   . b  coedge      b  face   b    point  aJT9_@ΏR@3Ce@ vertex   straight curve  @rwqSPe@? RUF [nxRb@ftreemeg attrib  j7  face       loop   j cone surface   @?/S@e@?΀¸O<j\sQ?LF@lv? @  coedge      k  coedge   m     coedge  m      coedge    m    edge  < -DT!? m  unknown  edge  tvS R n  tangent  coedge  1  o    edge  _@ 3bE`@ o  tangent  coedge   p     coedge  p  '    loop     vertex  q  vertex   straight curve  xGT縒@Py*f@ ~:? =m? )֤('@ coedge    r    edge j  E@ @ r  tangent  coedge   s v $   coedge  s      loop     vertex  t ellipse curve  @N`f@x+R?lvlv\[1%~? 0Z 0Z? coedge  v u   w  coedge  {  u # (  edge c   D^ h? u  tangent  edge e  x  h?   tangent  face   w    point  @P`f@ coedge   {   (  loop    ellipse curve  wA@Pf@?H!Z?|b@? Ļ3O| ?ftreemeg attrib  }1  face      cone surface  wA@..!@f@?!Z?"|b@? ?@  coedge        edge  @N ˓V9   unknown straight curve  @rR@e@?  coedge        coedge     2   edge  3>JW? v,DT!? 1  unknown  vertex  2 straight curve  _u@ Q`f@`-9?j?z6  point  Hf@Qޓf@ftreemeg attrib  O  face      cone surface  L@O@e@?lvlv@? ?@ ftreemeg attrib  E  face       loop    cone surface  x@J@e@lv@lv? @  coedge     I ?  coedge      ?  loop    ellipse curve  wA@Jf@L!Z?|b@? zDJW ƻ3O|? point  Hf@Jޓf@ coedge      D  coedge     H D  loop     vertex   ellipse curve  @M`f@x+RW9?lvlv@][1%~? 0Z 0Z? coedge        edge k  :JV? -DT!? C  tangent  edge m   @^ h? =  tangent  face       point  @J`f@ coedge     Q N  coedge     ^ N  loop  L  straight curve  x@J@`f@  coedge    j    edge  "  L  tangent  face  _     point   @J@`f@ coedge   j  U   edge  V$@ X@ T  unknown  vertex  U !straight curve  @E@`f@ ? {cD@ftreemeg attrib  ]  face "    # plane surface  @J@`f@? ellipse curve   @E@e@? H H?  point  @E@e@ coedge    $ %   edge   &"@ M ' tangent  face ( )   )  point  P@J@`f@ coedge  $   b   edge  c$@ X@  * unknown  vertex  b +straight curve  x@E@`f@? {cD ?@ftreemeg attrib  `  face ,    - plane surface  x@J`f@? ellipse curve  P@E@e@? H@ H?  point  x@E@e@ coedge  T . P   ftreemeg attrib  d  face / 0 1  2  loop    plane surface  D@H@@e@  coedge  3 4 5 6   coedge  7  8 9   coedge  : ;  r <  edge  =@ u@[@ q > unknown  coedge     x ;  coedge    : ? ;  vertex  r @ellipse curve  x@Jd@lv@lv?  coedge    A B   edge  $ C  D tangent  point  x@Ld@ coedge   E F G   coedge  H I  | J  edge  K pFGs&4@  L unknown  coedge  M  I N   coedge   O     loop  ~ P  vertex   Qstraight curve  4@Zd@OL2?>%  edge   *@  R unknown  coedge     S   point  4@Zd@ coedge   A   k  edge  -DT! -DT!?  T unknown  vertex   Ustraight curve  4@O@e@? ;`< ;`2@ vertex  B Vstraight curve  L@L@e@ ;`2 ;`<@ coedge  W  X Y C  coedge  Z [   \  edge   ]-DT!  -DT!?  ^ tangent  coedge  _  ` a   coedge   b Z c   loop  b d  vertex   estraight curve  @J@e@ ؈'+    coedge  f `   g  point  Ͷʒ@J@e@ coedge   h i j C  coedge  k l   m  edge  -DT! n-DT!?  o unknown  coedge  p  l q m  coedge   p   m  vertex   rstraight curve  D@H@@e@  coedge    s t   edge   u$@  v tangent  face w x   y  point  ,@H@@e@ coedge  s      edge  @ ǜ.@  z unknown  vertex   {straight curve  D@K@@e@? ;`< ;`2@ftreemeg attrib  X plane surface  D@H@@e@? ellipse curve  ,@v1O@d@5j Ce¼ǰQ2t?jLY+Qf@[iI@´5ULŮf@B @@m&F:Ljf@}aN@T*Lf@aqIs@RLf@@\+WmLf@ @`pTLY+Qf@֛玒@҃f}6LŮf@y.)o@QLjf@Ah(@~N~\Lf@liJݒ@r=QLf@bo* @f!Lf@{>@kLY+Qf@2O@wLŮf@"7 @XiKjf@,We@&>Kf@n@ѣ"בLf@:5"IG@*jLf@\@~3pgLY+Qf@4Rݒ@&LŮf@CB’@Kjf@H'@JbKf@@ѣ"בLf@@*jLf@@~3pgLY+Qf@@&LŮf@@Kjf@@JbKf@?Pt!'c.Gb[ %= 8M{N$(6ۿ ?  ?  tcoedge coedge       ] h? ellipse curve  Ͷʒ@Je@??!Z |b?  coedge    >    coedge    f    loop    straight curve  0@J|#f@ ~:ƿ? @f+ Ⱦ! coedge        coedge        face       coedge      k  edge  "|$a aDž5,+#@   tangent  vertex   intcurve curve   surfintcur nubsA-y?-y?D6/\?-y@_yms:@^yƌ @u t @@G7;@Nzнa@-@o@c2 6@~i@R7@^sЂq @I=!G!@5"@a #@}%@O̜W&@&2'@zK(@2 N(@:Lɘh)@e*@&[h+@P,@ߥ-@7.@"/@^sЂq0@0,0@1@TE2@"͆2@">3@r"3@"T 4@ңv4@0A<4@3DI5@۾:75@a0|$6@76@"*7@Xȱt?8@ 8D8@9@ vF9@Q@TU:@!}@ 0;@@6Q;@^, <@^Kt<@xxw<@G=@n7l=@473;>@7>@TcBM?@"?@wP-@@^sЂq@@@>y\3mS@-!rXe@@ u!yS@-!rXe@J2@진S@P=aWe@R@K=oS@,&F8Ve@Y܃@<@S@ŸTe@㠠 @ZeOS@;Qe@V@ppQS@k|Pe@w;@S@EʅLLe@tyy@!S@M!Je@õV]@8?`S@>d\Ge@Ss/臑@)&S@2QÈEe@-]n@D&i T@7Be@ @3,)T@]!Ae@,T@L 7Je@:M@d+T@mLe@ZH@7(T@Qe@>O|i@6[8&T@F~tZTe@uj@T@Gl]e@L @|?T@AZde@@<@|  T@Ϯ]se@ef,@csT@{c4{e@z9@){lT@g)e@̮˗@@ttS@ste@(I;@PqQ"S@|te@@89S@ue@@89S@e@z9@){lT@fPֶe@ef,@csT@脜:e@@<@|  T@1Qwe@L @|?T@Dme@uj@T@zTe@>O|i@6[8&T@Ye@ZH@7(T@l4 e@:M@d+T@zF=e@^rVj@>,T@Re@Qe@j,`-T@9&me@)$<܏@¨ .T@"e@NupD@z.0-T@ҟe@-@D+T@IPe@ @hr*(T@Kܘde@dNy@$%T@!f@W` c@8xXT@ۊ2e@`Hge@R@K=oS@be@J2@진S@ e@@ u!yS@_nލe@@r}ȖbS@_nލe@J2@oyWS@ e@R@{H@S@be@Y܃@@5S@>`Hge@㠠 @xH^iS@bgH&e@V@ cHS@e@w;@nMS@5ze@tyy@KR@HZNe@õV]@DR@›X=e@Ss/臑@^R@ή+R@Re@:M@Er2R@zF=e@ZH@qrR@l4 e@>O|i@].R@Ye@uj@GR@zTe@L @qyR@Dme@@<@RR@1Qwe@ef,@KUR@鄜:e@z9@=(R@fPֶe@̮˗@<*DR@#>e@(I;@,gD.R@ e@@vR@O|i@].R@F~tZTe@ZH@qrR@Qe@:M@Er2R@mLe@^rVj@>+R@L 7Je@Qe@@̭R@Fe@)$<܏@I᪭R@ak]De@NupD@b6R@T -`qBe@-@8fJۯR@|Ae@ @tFԍR@#g@@e@dNy@h~R@?e@W` c@Dzh_R@%u3@e@d\Ge@tyy@KR@M!Je@w;@nMS@EʅLLe@V@ cHS@k|Pe@㠠 @xH^iS@;Qe@Y܃@@5S@ŸTe@R@{H@S@,&F8Ve@J2@oyWS@P=aWe@@r}ȖbS@-!rXe@@>y\3mS@-!rXe@kOFRi@? cone@rwqSPe@lv@lv? @ cone@>y\3mS@@e@6%? straight curve  Hf@..!@ޓf@? BH6AV l)6Q@ coedge        loop   + straight curve  }gxb@@ M@jw!lTe@ i ?- nl=ma@tcoedge coedge       ;@݆mW!@  coedge        edge _   B?   tangent  coedge        edge a   >h? '  tangent  face       point  Hf@Pޓf@ point  }gxb@@Pjw!lTe@ coedge        coedge    B    loop    straight curve  |@@K`f@ (&23? ܈'#@tcoedge coedge       ?T!  edge g  <;JV? -DT!?   tangent  face       point  |@N`f@ coedge    !    edge ,  H@ ;LԠ@ !  tangent tcoedge coedge  "    ( 0}@}3)% @  vertex   ellipse curve  wA@Pf@??  -DT!?tvertex vertex   h->ellipse curve  @Pf@??  -DT!?ftreemeg attrib  % cone surface  @Pf@x+Rx+Rlv@lv? @ tcoedge coedge   '   ( `r7@% $@  face  % (   ftreemeg attrib  +2 cone surface  Ͷʒ@ M@e@?E!Z |b? @  coedge   -     coedge    -    edge   U"{@ -  tangent  vertex   ellipse curve  @ieRe@H˪?6j Ce<@n??  coedge  0      coedge    0  C  edge  *zJ4p@ k2G>@ 0  unknown  coedge   1     vertex  2 ellipse curve  Ͷʒ@f'I=Qe@H˪?5j Ce<nĿ@>?  point  }gxb@@X&Qjw!lTe@ftreemeg attrib  7P  face       loop   7 cone surface  L@O@d@lvlv? ?@ ftreemeg attrib  :F  face       loop   : cone surface  x@J@@e@lv@lv@? @  coedge  t s   ; tcoedge coedge   =   ? +L .@+0@ tcoedge coedge  >    ? ?[Ec&@SF; @  edge q  j)JV? -DT!? >  tangent  face   ?   tcoedge coedge  C B   D QT!  edge i  Eqq5  h? 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M#1-DT!E'1-DT! MbP? torus@Nf@x+R?@?x+R<  vertex   ellipse curve  |@Nf@?x+R@?  -DT!?ftreemeg attrib   torus surface  @Nf@x+R?@?x+R< tcoedge coedge       ] h? tcoedge coedge       `h  loop    straight curve  @ΨrPf@@ tcoedge coedge      ( ps!@ -v'@ tcoedge coedge       }3)% 0} tedge edge 2  }3)% 0}   tangent 4E60? pcurve    exppc nubs0}@WX@m˽@~Q"@x4 @]@*@}3)% @;\il@aCDG1@k..rr-p@ lE@0Rf.Xh_@>Pn,5@뽚if_y@mTGh@"@Q-K@6Į,v@}"@}-DT! @MbP? toruswA@Pf@@  point  wA@ΨrPf@ point  @PrPf@tcoedge coedge       % $`r7 tedge edge >  % $ `r7   tangent p GA? pcurve    exppc nubs`r7@V@BGlGv@~|@$]@>v@% $@+]?F ,9h|?îrq ?vIddv?ؓ '?ēY*Ȝ۳?j%kixk]=?-bLPnP9,?Rf."n1|?j ??j.*׍6ɋ?cCD '~?<ֽellipse curve  |@Mf@UUUUUU? qq5 -DT!?ftreemeg attrib    torus surface  @Mf@x+R?@?x+R< tcoedge coedge       ] h? straight curve  @JbKf@  point  @IbKf@ point  wA@HbKf@ftreemeg attrib  "  face       loop    plane surface  Dxgzǒ@Qڂf@ t ~:ƿt ~:ƿ ?  edge  $@ &6@   unknown ftreemeg attrib  _ plane surface  x@J@`f@ ellipse curve   @E@@e@? H H@?  point   @J@@e@ellipse curve  P@E@@e@? H@ H@?  point  P@J@@e@ftreemeg attrib  0f  loop   0 plane surface  @n%R@@e@?j#ʧ<<<  coedge   6   1  coedge  4 3 ! "   coedge  h # 3  C  edge  #@ $6@ 3 % unknown  coedge  & ' 4    edge  (@ $9@ 4 ) unknown  coedge  * 5 ' +   coedge  5 * h b   vertex   , vertex  + -straight curve  @H@e@ ۈ'" nēL3@ coedge  . 7     coedge  / 0 7 (   edge  1@ +1@ ' 2 unknown  coedge   8 ; .   coedge  8  / 3   vertex  ( 4ellipse curve  x@J@d@lv@lv@?  coedge  ; :  5 <  edge  =$ 6 ; 7 tangent  face 8 9 <  :  point  @J@d@ vertex  5 ;straight curve  @J@e@ ۈ'" nēL3@straight curve  4@L@e@?  point  x@L@e@ coedge  E      coedge    E 7 1  edge  ; <x:@ 6 = unknown  coedge   F   :  coedge  F > H > :  loop   F  vertex   ?straight curve  @qW"Zd@OL2?>%  coedge  I H @ A J  edge  B K3@ 9 C unknown  face D  J  E  point  g+߈@Tq\d@ coedge  @ F M B G  edge  C $@ M H unknown  vertex  N Istraight curve  g+8@:;]d@? ftreemeg attrib  P>  face J K :  L plane surface  4@Z`f@>%2bOL22bOL2>%? straight curve  4@Z@e@?  coedge   W M N C  coedge  O P W K Q  edge   R-DT! O-DT!? W S tangent  coedge  T X [ R N  coedge  X T O U N  loop  T V  vertex  K Wstraight curve  @ @e@? 7nf&L 6Gtcoedge coedge  [ Z X Y \ ZS!  edge s  ["uJV? ]-DT!? [ \ tangent  face ] ^ \  _  point  @M@e@tcoedge coedge  ` a _ V b c)b;(g.P tedge edge @  d)b; Y(g.P _ e tangent jc]?,B3? pcurve    exppc nubs(g.P@H x@j#I@Hss@@@)b;@Uy@Zbݿ8B>@/ܿd#j@"-~ۿ:e0@8+,ڿTuDŽI%@ܸ5;ڿyK@~Tٿk,@4;ٿa2]E@bOuؿf@X,Xؿ>5@x$8ؿ'|k@BZؿ@t"׿r 0@G׿MbP? cone@Je@?lvlv? @ tcoedge coedge  ` f f g g h0⣔_QAk` tvertex vertex  g i{Þ?ellipse curve  Ͷʒ@Je@?  -DT!? coedge  j k b \ l  edge F  ] dUd b m tangent  vertex  \ nellipse curve  ؒ@Je@<?  -DT!?ftreemeg attrib  d+  face o } g  p cone surface  @Je@?lvlv? @  edge  f-DT! #-DT!? " q unknown  coedge  r i * s e  coedge  i r k i e  loop  c 9  vertex  j tstraight curve  Ԓ@H@@e@  coedge  l k u v m  edge  n w$@ d x tangent  point  Ԓ@F@@e@ coedge  u s p l   edge  m@ u6@ p y unknown  vertex  l zstraight curve  @H@@e@? nēL3 ۈ'"@ellipse curve  ,@K@d@?lv@lv?  point  ,@H@d@ftreemeg attrib  xS  loop   x cone surface  ,@v1Od@5j Ce;T̆b!y\3mS@d@ftreemeg attrib    face       loop    cone surface  T@@Kf@? ?@ -DT! }tcoedge coedge       Vy@<uV%? tcoedge coedge       D^Q,T!? tcoedge coedge       hhF?_ tedge edge   F?_ = hh?   tangent چbC? pcurve    exppc nubsF?_ =hh??bܪ3n0>d dMbP? spline  refv  coedge        edge   @ ;LԠ@   tangent  pcurve    exppc nubs] h?MbP? spline  refv  vertex   ellipse curve  @ԣ"בLf@?@1T???  coedge        edge .  =_{| 98B   tangent tcoedge coedge       з(U% tedge edge 4  з( U%   tangent ;?2!? pcurve    exppc nubsU%@d%@l.:|&@fWR'@7c'@E@6(@з(@ӔN@ ׿Z@%׿w$@ ؿ;Mv@z4W8ؿ3r@(@ؿx:@5fؿ/ll@i<ٿ{AVp@,Dªٿ[9Z@#<ڿh91n@>أڿ-(p @\k'T~ۿV o @r//ܿn; @MbݿMbP? conenZÒ@J<[f@_r ~:?<&E>vlv1!D׿? 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7v Mv޴%,+X_y4&zΗJ| ӿ֎?zzX@lVG@ן@ ?  ?   vertex   intcurve curve   bldcur;@ן@݆mW!@롕? spline  rbblnsur blendsupsur cone'0В@Qe@?@? @ null_curve nullbs@@Q@e@ blendsupsur cone$)Ē@Pdf@Jr ~:ƿ&?E>vlv@!D׿? @ null_curve nullbs@@Q@e@ intcurve  offintcur nubsn,O He^ _ʫ}?h;2m@ V@lw @ 3$q@*>U@Ž@݆mW!@*>?$@|l'@" *@G,@?нK-Y-@3.@S/0@mW1@O?V3@_Aoޒ@:KPpIe@pޒ@c^O fpe@r‰Œ@&GOzKe@> Ē@ \OHe@P7’@-0O؄e@.\@\(n5Og*e@ T@\(n5O'e@lr@-0OAS e@[v@ \O8GB6f@>ѧH’@&GOf爠f@nĒ@(I">Ol 2f@?Œ@84N~1w=f@+Ȓ@֯O n`Lf@_7Oɒ@)|O]cvlv@!D׿? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?롕? ??n,O 7v Mv޴%,+X_y4&zΗJ| ӿ֎?zzX@lVG@ן@݆mW!@롕?){ m He^ (~ G9 !O_N y͖5:}߿ʫ}?ʫ}?Biq?ʫ}?u?n s?9V3C?h;2m@G/d@ V@TE@lw @pjh @i"ZY@̳%@ 3$q@i5E*w@8f@b;*@*>U@K#@}#@aH@Ž@aS@io5@$) @\Rx @ null_surface nubs;@܆mW!@?;@?݆mW!@ nullbs   tcoedge coedge       (f@ Uc @ tedge edge P  (f@  Uc @   tangent rʁ-9? pcurve    exppc nubs Uc Ie0*YG>z M^@uè4?(fhBJW?X g[?hO|h@@R9?Xo ӝ?Vԇ$Z(?<*i?wHɠXI?ݠ-e'uLJއy_%пP\!po׿?LSI߿Pӡ_-L ֺB($KWMbP? sphereͶʒ@Pe@-@Hj1Nf@0[O@j UNf@^%ዒ@a)NY+Qf@#>:{@0FMŮf@?@J\Mjf@nqj@.LMf@6T<@vةMf@n+6@4!Mf@0@(MY+Qf@kx@ɴ1eMŮf@&ȋ@ SLKMjf@v_@Z;Mf@5 M@r^Mf@J@,3ŮMf@<Տ@1"MY+Qf@l{@$i7MŮf@tw@ITMjf@JE3э@d,Mf@]Δ@%Mf@@,kMf@j?@=ޙDRMY+Qf@KX@dL)LŮf@t1Õ@W2Z_Ljf@Ƹٕ@F}hLf@8+Xw@X#Mf@uAi@<ټMf@Z@ĢfkMY+Qf@';@:MŮf@lf@FاHMjf@9r@L Mf@G@BRp[Nf@ P@&|yQNf@HG@2TGNY+Qf@Lv@ 376NŮf@/C@fj&0Njf@>Uơ@H),Nf@US9뙒@#Nf@z)P@1+yNf@@3$@1РNY+Qf@W1ן@mP:NŮf@r~@ޭ{9Njf@ٺ@;Nf@yփ|@_#Of@'@dp@)DOf@S7bc@sonOY+Qf@ E@rlOŮf@Y@MOjf@*@rUzOf@&@a?6Of@WU+@NПgOf@V@OY+Qf@/i@ OŮf@Z湗@fPjf@a闒@Լ Pf@Iu@[ 4Of@ @FxeOf@@H2Gu-OY+Qf@Tꐒ@cOŮf@Nf@g_@@P"NY+Qf@&$ӈ@`yNŮf@uO͇@;^Njf@P?41@ozUNf@T@k$Nf@AVȌ@XNf@=@gNY+Qf@w6@PkMNŮf@Н@mNjf@sՈ@ƏNf@T@Nf@AVȌ@Nf@=@NY+Qf@w6@NŮf@Н@Njf@sՈ@Nf@?Pt!(t.GQ %)= M{N$6ۿ ? 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Uc MbP? spline  exactsur nubs??B++_?]%) N(fS ֒@.ޅ)Pe@CEnՒ@wT,4P (,e@p-UԒ@nhn?P+1`e@ NQ^mԒ@NBKTPYUPe@\OԒ@iG]P& re@U_.^Ԓ@OθeP{@e@?Ւ@3h٥O`&ͨe@"P_Ԓ@ P.3{e@y{Ӓ@$WPXe@ڇ:Ӓ@4Puxe@oӒ@gr@PW\cSe@[I2Ӓ@~JPǣ3*e@aIӒ@~a}Oɛ[`e@MҒ@,!OBUe@(ABҒ@Fr&OO[e@z7Tђ@nPIir̎e@Z{[ђ@Z*P(5›"e@]kђ@55 j4P:7s|e@n YВ@{kT|ROYz$e@ ~ϒ@lmO9Kge@V ]ϒ@qވOHJԛe@IP !ze@!̒@^oO ݧe@{خ̒@=ORO廢e@A̒@O{0ke@х˒@$OF%Be@3ʒ@¾DP|sYe@/[ɒ@Fi:mPy e@e ̒@B[Oe*9te@3˒@8%OOZsNe@ 7˒@f,O Ae@wOʒ@+OOnVe@R!fɒ@,O,be@2gȒ@a{0Pe@Iʒ@nY|O(e@9K˒@&ӍOQOfL{e@fZʒ@YIJO͒Ưe@Iɒ@pդOj}e@ b@Ȓ@VHCPAe@[fǒ@; PBʑe@%1ʒ@a(DOqϏe@"ʒ@ҏ]TO=e@^)Uʒ@-`JO3e@WkȒ@%Oۚe@ǒ@P| e@K4ƒ@GP',F e@56ʒ@#Ocwe@XXZʒ@2XO߹e@-ڿʒ@ЇD"O^e@(mȒ@X0@}Oe@C{lǒ@P7ake@ݏ6ƒ@J V Pwe@?_?]%) N ?  ?  tvertex vertex   ʔ?intcurve curve   bldcur Uc N(fm ? spline  rbblnsur blendsupsur cone'0В@Qe@?@? @ null_curve nullbs@@Q@e@ blendsupsur sphereͶʒ@Pe@-Oae@'ʒ@c,6$O phe@?1ɒ@F?O^$oe@N ƒ@5ryO e@jĒ@@ OuEe@Z’@^G+Oeɫe@@;8O fׯe@F?m@MƑ^OMތ~ e@>,@wOM_e@Ë@!ROje@ή/[@e΢aOKmf@’@WP77Sf@tQÒ@Z:Px0i)f@teĒ@#[PY 1f@@@ sphereͶʒ@Pe@-~}>-DT!  cone׼@%\(n5OVWf@t ~:?Gm]= t ~:ֿ? ?? -DT! }tedge edge <  h 0B "+h?  tangent ]I? pcurve    exppc nubs"+hh 0B=׼=)OT! t=e cone׼@%\(n5OVWf@t ~:?Gm]= t ~:ֿ? ?? -DT! } face  a   straight curve  sՈ@@Kf@ tcoedge coedge      QF=aT!?  pcurve    exppc nubs`h??4btt0> dMbP? spline  ref tedge edge    4P h?  tangent W7ün(C? pcurve    exppc nubs4P h?MbP? spline  ref  coedge      edge +  ;LԠ   tangent tcoedge coedge     h}@}3)% @  pcurve    exppc nubs] hxUMu<}3)% @?}3)% @MbP? spline  ref  vertex   ellipse curve  wA@.\(n5Of@@1T??  vertex  ellipse curve  t@(n5Of@H=Y۽T?? ftreemeg attrib    face     cone surface  @.\(n5Of@?ޛVۼ? ?@ -DT! }tcoedge coedge      !<V%? tcoedge coedge      Mٻ@}čP4Rf@a˳@i_ ?Pʚ.*e@%㵒@w;!MP~U,e@q2@\PaMe@"iT@I!3kDpP>9(e@-d@Z@ !tP-e@;u@ rP[||1e@'*d@r;Oe@De&@qeUs0PuZe@aRXUe@u쾯P}ze@٥%@%7P»R(e@ȝa@٦APae@t=@q"DPuf@Bⱽ@GO ƥe@sB`@jvO/zNe@3l@M}OU %e@5T @5qFZP:)e@^A@P+Pe@-t@ˑ1Pa"f@ܮT=Ē@FQOO5e@Ē@tO"Fe@qfĒ@*ñLHO@B-f@>@*HÒ@ ,Ofpf@PO’@RkP֢f@2<@2PdI$%f@at~ƒ@f7Osf@x?ƒ@kiO` "f@$3ƒ@T ꟈOl&f@1zlNĒ@ѥO*܅80f@KJD’@&PUP5f@CJm@ԀP M9f@q(ƒ@kGO/Aef@E[Sƒ@U3TO2&ff@wխgŒ@PJ_O)ܫff@7 MÒ@nRO=Bdf@\.{@jqKPhaf@X5@Bm0 Pv^f@axWĒ@PO+1f@VgGĒ@jvPO־=f@:K-۷Ò@|O҃f@B7@ Õ|kO{f@y@7!Pruf@8h@e"PhfWnf@m@Owdf@<)@Y5OO,KFf@sgY@CІO3u樥f@)@8;O#f@:L@`-*OLaG΍f@U@~HrPV;ւf@ jf@kOwJyf@6}u@%4PO,f@ǺD@TpOIL %f@^'!s@(qBOra?f@EԻ@gD^P:FEf@s@ U PK~1f@t@b[uO4IRf@AD@KTOђڽf@86Z@nQO]1f@j{@hEO£ܨf@*EI@FAe3PpV;f@@[# Pc\f@mH9ܷ@vR O(f@l% @G5NVOBLҿf@PR$.@dVEOH8;f@ BI@rOߦVf@7C@PSf@Q~)@et P'5jbf@5K@{f$Of@Iυ@@YOf@nռ@aOz5-f@@JONѫf@8[UA@ɅPܔgf@b)#S@x P~Nf@?a?a@FrM@ R@49l_!@ zb$@#G&@ ?  ?  intcurve curve   bldcurps!@ zb$@#G&@ -v'@wM=ټ? spline  rbblnsur blendsupsur conehK@Q@f@?@? ?@ null_curve nullbs@@Q@e@ blendsupsur toruswA@Pf@@ null_curve nullbs@@Q@e@ intcurve  offintcur nubsȫ?>.ga6@1YS78@?Oc͇@.Q|@s"@ @qg`!@8V&"@Cn[$@km%@ -v'@2%0(@-/}Ql*@h,@n,"-@SOZ0@ub1@]!f2@FJk4@yZ@@@QYf@i̩@8p*Q°*f@t7@< Q޷G"&f@pXਲ਼@kPf@r@LRP#7zf@Fօ@lePW2`f@]^-@MlhPg-Ef@ܵ@!7)P7e@,Pɶ@UP(\PXe@n筸@ '9O,K|7f@z.@^Q؋ONf@8@On f@ldփ@4mrOXf@G4!@?TOI`DIf@J0@;cHOv;$f@$>1@>%5O%I3f@T@Nm.Ov ;f@m>@DϐG.$OqKJf@1M@Tcb OQxRf@^:9@!ť4O!f`f@==@ʦO\gf@ /@ˠOiVsf@U6I@"=OΌxf@jK__@O| @[~f@ξ6R@0BOf@hlzS@J:(Of@ X@,^f.Ok~f@Q3ʎ@G#=OSyf@!߸@GO+uf@!jL@`OKkf@L2@è( qOdf@mʮ@yz&;O =Wf@FX@EIO@1Pf@n9@1-IOZQ@f@\tM@ʛP J9f@ @`x0?P$`N,f@]뮒@4mx[PƜ&f@ҳmdQ@.Pcռ`| f@ͩ'k@qtL6DPa(Hf@]A@xPr\!f@#{ @}Q5%f@ENw@@Q X,f@@@ toruswA@Pf@@ conehK@Q@f@?@? ?@ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?wM=ټ? ?? a?a@FrM@ R@49l_!@ zb$@#G&@ -v'@wM=ټ?3ȫ?ȫ?zc?ȫ?H?E ?G.ga6@R@G@t&@P-h@(̩ @Yтj @-@1YS78@Vv@8TQ[@Q,3@?Oc͇@q@~A@r{@.Q|@ &@"Zo'@?t)@E*@tf|,@b.@s ]0@dfd2@3@IJk4@ENw@I X,f@#{ @ I5%f@]A@>}z Jr\!f@ͩ'k@gwJa(Hf@ҳmdQ@FJcռ`| f@]뮒@%=HKƜ&f@ @>QK$`N,f@\tM@j .K J9f@n9@oҶc LZQ@f@FX@TML@1Pf@mʮ@\fL=Wf@L2@=W:Ldf@!jL@orF LKkf@!߸@D_ML+uf@Q3ʎ@}K>LSyf@ X@Lk~f@hlzS@_]Lf@ξ6R@%Lf@jK__@>$L| @[~f@U6I@ LΌxf@ /@4_8LiVsf@==@5YT;L\gf@^:9@:Z1L!f`f@1M@:LQxRf@m>@0oLrKJf@T@w%Lw ;f@$>1@L%I3f@J0@$ Lw;$f@G4!@Z3LI`DIf@ldփ@WLXf@8@~zLo f@z.@'tKLOf@n筸@:-L,K|7f@,Pɶ@X_GKXe@ܵ@¿o֭K7e@]^-@fU&/Kg-Ef@Fօ@&5JW2`f@r@gZ_J#7zf@pXਲ਼@M(R2Jf@t7@zsIݷG"&f@i̩@l9 I°*f@yZ@@IYf@@@ toruswA@Jf@?@? conehK@Q@f@?@? ?@ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?~f<ټ? ?? !@'#@ػ$@jzG'@e۰h+@/y/@fD- 2@XGN\3@IJk4@~f<ټ?3nG#xFI"@S-蝬"@86X#@@Ls#@ u#@h\/:$@\5$@PxZ%@9 a%@ɴ%@s"&@O>&@h7bK&@0?'@)'@"Zo'@=Z(@XXcͭ(@(s)@?t)@d)@6*@\?o*@E*@a+@/5(a+@vy4,@tf|,@P 'n-@,Uu-@|S.@b.@kPFB/@h=/@edK0@s ]0@ E0@-.1@2.naW1@Fl91@Z1@n 2@&0J2@dfd2@?Q2@(? 3@,P3@3@6/,:^3@nZ !4@zg4@ null_surface nubs!@!xYMcv'@?!@?!xYMcv'@ nullbs    pcurve    exppc nubs] h?+L .@VMu<+L .@MbP? spline  refx  point  dN)#S@Mv(K'Of@tcoedge coedge     ?[Ec&@SF; @ tedge edge !  < V%?  tangent a e? pcurve    exppc nubsV%ؼ??[Ec&@^ɳK=?[Ec&@MbP? spline  ref tedge edge '  r  ,h?  tangent 9CI? pcurve    exppc nubsr ,h?VO?!x @VN?Օ @MbP? spline  ref  face      point  D+i@(K%qVf@ellipse curve  wA@ף"בLf@0=@? ftreemeg attrib  $  face    plane surface  4T%@Qf@5^5^< tcoedge coedge    0v&hwmFj  coedge    tcoedge coedge     % $`r7  edge C  > ɼ=  tangent straight curve  @ 8 G  edge   B$@ >  unknown straight curve  g+8@:;]`f@@%?dOL2?  point  g+߈@Tq\`f@ftreemeg attrib  K@ plane surface  @qW"Z`f@?2bOL2?>%  coedge   M P A >  loop    straight curve  @P@e@?   @ ؈'+@tcoedge coedge  P O   Q  PS!T{C=  edge ^   huJV? R-DT!? P  tangent  point  ؒ@P@e@ coedge  T D  edge R  E : [69 T tangent  vertex  D ellipse curve  @Ne@??  -DT!?ftreemeg attrib  V* cone surface  @ e@lvlv? @ tcoedge coedge   X k _ K  ] h tcoedge coedge  X   K  >h?  loop  J  pcurve    exppc nubs<S!??,H@M?MbP? spline  exactsur nubs ??j6?P$?v@ @A @{jD@̎y @Pt!@ؒ@"בLe@ؒ@jLe@ؒ@t3pgLY+Qe@ؒ@&LŎe@ؒ@Kce@ؒ@@bKye@}$ؒ@"בLe@ݶؒ@jLe@@ 6ؒ@t3pgLY+Qe@[˭l"ْ@&LŎe@$=ْ@Kce@tLْ@@bKye@hk$ْ@l\ZLe@b-P$tْ@kLe@2ْ@㜁 lLY+Qe@KpIڒ@9bLŎe@a͐~ڒ@Kce@+ڒ@3SKye@ڒ@!7{Le@#Aے@;?̡Le@uے@I݁LY+Qe@ ݒ@6LŎe@Џ˖ݒ@UWLce@H;ݒ@YLye@;rq]ے@T~Le@RyKHܒ@ćLe@.2ݒ@+HLY+Qe@^ޒ@mEVLŎe@%iYߒ@:Lce@xߒ@^l*Lye@gܒ@9Me@6X~Cޒ@+yMe@]ߒ@ILY+Qe@e )@b}LŎe@@Lce@ԋlI@XɷLye@!a"ݒ@bDMe@Zߒ@ 4Me@usRc@%5$MY+Qe@uܖ @/ MŎe@pDS @vXLce@!R@m`oLye@Lէݒ@ӼѿMe@aaeߒ@ol Me@r@no'PMY+Qe@K8@[MŎe@杒ױ@GWsMce@ovT@S8/Mye@ +W!ݒ@}@(Me@Bzdޒ@SMe@Wߒ@T NY+Qe@oC@0!h>NŎe@Q4@iONce@z@"8ZNye@v9?ڒ@4Ne@^9 ڒ@{ifNe@jv4xے@λKNY+Qe@~ܒ@'NŎe@2cܒ@ Oce@'ݒ@&DOye@NGtfג@J[BNe@Hݍג@ TXwNe@ ڏג@6;NY+Qe@s}nג@A'_OŎe@L)naג@ɩd(Oce@#fYג@p#C=Oye@%0 Ӓ@ Ne@#aҒ@;D=?  point  *w@6Mye@ftreemeg attrib  ^) torus surface  ؒ@Ne@?@? tcoedge coedge  a `   b  (g.P@)b;@ tcoedge coedge  f  ` S Z  nClR? tedge edge 9   "Y=< Y(R? R  tangent h(K? pcurve    exppc nubs(R"Y=~7?(g.P@*a$Ĩ=(g.P@MbP? spline  ref tedge edge ?   z dj h? a  tangent T ]SG? pcurve    exppc nubszj h?f(?' ;@? ;@MbP? spline  ref  face    b    point  '0В@*K@ye@tcoedge coedge   f  Z  R{<  loop  R   pcurve    exppc nubsQAk`@0⣔_@?QAk`?0⣔_MbP? spline  exactsur nubs??0⣔_6~(5["R56ʒ@\{Lewe@sXXZʒ@4z3 \L߹e@ڿʒ@vqL`e@|(mȒ@¥ϿLe@{lǒ@U K:ake@6ƒ@SK+ze@]%1ʒ@׻KLjяe@n"ʒ@\nvLe@0)Uʒ@LauL.3e@xWkȒ@NLۚe@ǒ@BH K~ e@}K4ƒ@ܐp-K.F e@ʒ@P}Lr(e@o9K˒@,rLM{e@`fZʒ@!;MxLDƯe@Iɒ@*[I Lk}e@{ b@Ȓ@ZQnyKAe@[fǒ@cKBʑe@+ ̒@{ L+9te@3˒@j AڰLZsNe@ 7˒@yL'Be@wOʒ@8%!LoVe@!fɒ@arszLT.be@A2gȒ@KCe@!̒@Ң&Be@ô3ʒ@iwKsYe@[ɒ@}.%K e@#qsR ϒ@oƅLpmpe@Β@L)he@.oΒ@-!dL0I2e@}͒@C7LԡKe@0w̒@55KLQ3e@7F܎̒@wqKY !ze@n YВ@LZz$e@ ~ϒ@E~LUKge@V ]ϒ@&!wOLHJԛe@I,@A[C^Lde@+?m@W9nLx~ e@@dLfׯe@ ’@"ViLSjɫe@Ē@v_~LhEe@N ƒ@p!Le@Y?1ɒ@\7L$oe@'ʒ@p)L phe@@ƫ Β@=q LΌae@JBϒ@pQLղxz_e@pӒ@ T~L˒F`e@9Ւ@_Q-^L-vMde@ؒ@rULfB6 oe@Eshڒ@>K we@~k;ے@)BKM soe@@@ sphereͶʒ@Je@-!@MbP? spline  ref tvertex vertex  y 6 [f}?ellipse curve  aK@ ŁKLf@ ߴsAaK?_Hl=|=P??  coedge      pcurve    exppc nurbs,T!*T!<hK@@x(@?v % @lR{(@$k?~MaP@*)(@?BG O@Y,'@Q*k?> O@%@?:0yE> plane4T%@Qf@5^<?5^< ellipse curve  +@^aMf@ȼ&_8L#FJ=,nŭT=?  edge      7 tangent  point  T@Mf@ coedge   8 9   pcurve    exppc nubs+0si0+L .4T%Tњ(@A_JCq:(@;nQ^(@cky}(@628G9(@6ަpu(@CDcopu(@? plane4T%@Qf@5^<?5^< tcoedge coedge     : }3)% h}  point  wA@ϣ"בLf@ coedge    ;   pcurve    exppc nubs ,hr;{8B@|e|%8B@)OT!  cone=1y@أ"בLMf@t ~:ƿB`\5< ?t ~:ֿ? ?? -DT! }tedge edge -  < RR [ h?  = tangent |>n(C? pcurve    exppc nubsRR[ h?>_{|@-DT! =_{|@} cone=1y@أ"בLMf@t ~:ƿB`\5< ?t ~:ֿ? ?? -DT! } point  ΍ ,-Ē@VbK3]7e@tcoedge coedge    > ?  @ U%@з(@  pcurve    exppc nubs[ hRR:?U%@TMu<U%@MbP? spline  ref tedge edge 3  A Xؼ FR?  B tangent ZOрK? pcurve    exppc nubsXؼFR?2:ʕ?H~(@H#?R(@MbP? spline  ref  face C    D straight curve  @TT@@e@  edge  t hGjP jGj7P  E unknown ftreemeg attrib  < plane surface  dތy|7@V@d@¸O??  coedge  - F    coedge  (  F G   edge   ~ʼ4@  H unknown  vertex   I straight curve  @TT@d@?  vertex  J straight curve  4@T@`f@  point  @TT@e@ellipse curve  VA@\PS@e@?΀¸O<j\sQ?LF@lv?  coedge    k  point  VA@\PS@@e@ vertex   K straight curve  4@L@@e@? straight curve  4@Z`f@@%?dOL2?  point  @qW"Z`f@tcoedge coedge    L M > N mFj@ 0v&h@ ellipse curve  Ͷʒ@Pe@@?  -DT!?tcoedge coedge    O ݆mW!; tedge edge I  ;@ ݆mW!@ P tangent >)? pcurve    exppc nubs;@܆mW!@;@݆mW!@MbP? spline  ref tcoedge coedge    Q  R ĸ Uc (f  pcurve    exppc nubsRac(mf?hfMbP? spline  ref tvertex vertex  S JxC?ellipse curve  {Ò@V#Oke@sQ;⿀^V¿5? ?s???  vertex  T ellipse curve  Kj@\(n5Oe@/n ~:ƿ$T?4= 6?1T1?? ftreemeg attrib    face U  K  V spline surface   ref tcoedge coedge  L  W X R+ = tedge edge N  m/= Y &R?  Z tangent K? pcurve    exppc nubsm/=&R??hO %Mz>1O MbP? spline  ref  face [  \   ]  point  Ͷʒ@dV Pe@tvertex vertex  ^ y| d/T,kffgy]6,@?49ٕI?0fy3fTRA?&S͂=eZ1?yU 4ݿt>|mnz^?beːT? oūKjXt?ݏ>(S>̴׿2>8?ǿa%zh=MbP? spline  ref  vertex  a ellipse curve   T@Nf@?8T͙?? straight curve  @.\(n5Of@ tedge edge 1  h}@ }3)% @ b tangent o'? pcurve    exppc nubsh}@}3)% @h}@}3)% @MbP? spline  ref  point  wA@1\(n5Of@ point  @L(n5Of@ftreemeg attrib   cone surface  =1y@أ"בLMf@t ~:ƿB`\5< ?t ~:ֿ? ?? -DT! }tcoedge coedge    c d  e os!@ -v'@  pcurve    exppc nubs<V%?r;?=l!@FM1 ?!@MbP? spline  ref  pcurve    exppc nubsvuV%<|d)> -v'@9? -v'@MbP? spline  ref  face f     g tvertex vertex  9 h |g}?ellipse curve  rK@:~f$Of@ ߴO@aKu _*zv?I.'O?? ftreemeg attrib    spline surface   ref tedge edge =  `r7@ % $@ # i tangent sN{v9? pcurve    exppc nubs`r7@% $@`r7@% $@MbP? spline  ref tvertex vertex  j k 5c?ellipse curve  i,@Y|f$O> Kf@vzƿ^TbK?3ݎ9?8t7e?a.r?? ftreemeg attrib    spline surface   ref  edge  ,zJ4p@ .@ f l unknown  vertex  m ellipse curve  ,@v1Od@?! Kf@MzƿTbKuݎ9?p?z=}:?? tvertex vertex  w 4M.?ellipse curve  @nW@U$בL.~:f@Dg ~:ƿZ+=??Kd ~:?? ftreemeg attrib    spline surface   ref ftreemeg attrib   %  loop  c  cone surface  hK@Q@f@?@? @  coedge   ! x y  tcoedge coedge  ! Q  z (f@ĸ Uc @ tcoedge coedge  { ! W | wmFj@ 0v&h@ tedge edge U  } wmFj@ Y  0v&h@ ! ~ tangent x?? pcurve    exppc nubs 0v&h=ܙN6iBwmFj@@̫@Eq8@f%>r?h>͈R@:c? ^ @ "   edge n  T@ < pu(@  tangent  coedge  # j   pcurve    exppc nubs% $ `r7[Wj@8"\@6t?PRa@d?,:@?,p?HFY@SlV?Xڽd@a"?0T@4T? T@b'? planeDxgzǒ@Qڂf@ ?t ~:?t ~:ƿ ? straight curve  %)Ē@%\(n5Odf@p ~:ֿ? ellipse curve  ,@K@e@lv@lv@?  point  Ԓ@Fd@straight curve  4@T@d@ straight curve  @qW"Z`f@OL2?>%  coedge  = >  face   >  tcoedge coedge  @  T{CPS!? tedge edge X   T{C E PS!? @ tangent Y~Zqd? pcurve    exppc nubsPS!T{C=Ɔ+1d^)1jDT!MbP? torusؒ@Ne@?@? tvertex vertex  A ]KK?ellipse curve  ؒ@Pe@@?  -DT!?tcoedge coedge  C J  >h: tcoedge coedge  C Y h?  loop  \ straight curve  *w@ ye@@  point  *w@Nye@tcoedge coedge  J I K l _c:R!?  pcurve    exppc nubs] h?MbP? spline  ref tedge edge K   [>h? J tangent &Sh.S? pcurve    exppc nubs>h?&8/$?ԗ@?UD@MbP? spline  ref tcoedge coedge  Q   )b;(g.P tedge edge A   (g.P@  )b;@  tangent ?? pcurve    exppc nubs(g.P@)b;@(g.P@)b;@MbP? spline  ref tcoedge coedge  R Y Z 0⣔_Ak`  pcurve    exppc nubs"Y=<(R?ٽz>1P.?C_IMbP? spline  ref tvertex vertex  ??ellipse curve  HͶʒ@9Lx&umke@8*Olh ^V¿r ?,x?n$ ?? tvertex vertex   5D?ellipse curve  '0В@2"בL`e@]=b @=P=D?? ftreemeg attrib  W  spline surface   ref  pcurve    exppc nubsFRX<я?*__MbP? spline  ref  face   Z   coedge  x ]  edge G   Ud@ ! @  tangent  vertex  ellipse curve  ؒ@£"בL_e@=?? ftreemeg attrib  a  cone surface  @"בL_e@? ?@ -DT! }straight curve  Ԓ@Hd@? straight curve  D@Kd@ ;`7 ;`7@ point  4@O@@e@ coedge  j l +  straight curve  4@T@d@¸O??  coedge  m l n  edge   o 3@ ( unknown  point  dތy|7@V@d@ coedge  q .   edge  /  $@ q unknown  vertex  r straight curve  dތy|@ AV@d@?  point  @TT@@e@intcurve curve   bldcur+L .@si0@+0@? spline  ref null_surface nubs+L .@+0@+L .@+0@ nullbs   tcoedge coedge  8 { 4 "xYMcv'! tedge edge #  } !@ "xYMcv'@ 3 tangent Phݹ3w? pcurve    exppc nubs!@"xYMcv'@!@"xYMcv'@MbP? spline  ref  point  hK@+ŁKLf@straight curve  T@@Kf@@  coedge  c 3 9  edge p  U)\@ } Tњ(@ 8 tangent  pcurve    exppc nubs}3)% V`z&h}CDcoT@6ަT@62pi@c(e @ƾ;nX\B@A_Jx۾@4T%`)\@? plane4T%@Qf@5^<?5^<  edge /  t%8B@ < =_{|@ tangent  vertex  ; ellipse curve  Jj@"בLe@Oq ~:ƿ=/? ?N=t ~:?? tcoedge coedge  ?  з(U% tedge edge 5  < U%@ A з(@ > tangent Ѳ)? pcurve    exppc nubsU%@з(@U%@ з(@MbP? spline  ref tvertex vertex  ? xC?ellipse curve  {Ò@ L~e@I;+^V?5?TXYF?vD?? ftreemeg attrib    spline surface   ref straight curve  J8$Wl@I)@@e@¸O  coedge  G   edge   $@ unknown straight curve  @TT@`f@¸O?  point  @TT@`f@ point  4@T@`f@ point  4@T@d@tcoedge coedge  { M W  0v&hmFj tedge edge V   0v&h mFj tangent z]?,B3? pcurve    exppc nubsmFj@ҸB@i@N6@@=@ 0v&h@Tr 0G׿Z$׿'|kBZؿ5n$8ؿTe,Xؿ2]E4uؿTm,F4;ٿ|KTٿvDŽI%ܸ5;ڿ,e0-+,ڿd#j-~ۿj<>D/ܿUyZbݿMbP? cone@Pe@lv@lv? @  pcurve    exppc nubs݆mW!xO D0 Zq.`97Ƴ;T@ȸω@T@* &r@U5Y@8(@L]@gxm@8C1fg@L@xo@>3K@Y=o}@c|@G2@d@𝡲[@V;vk@N%)@h@%@/ X@J1s@)'=?<@Or\@I @nߒE@MbP? cone'0В@Qe@?@? @ intcurve curve   bldcur;@ן@݆mW!@롕? spline  ref null_surface nubs;@܆mW!@;@݆mW!@ nullbs   tedge edge O  Y ĸ Uc (f tangent 0c? pcurve    exppc nubsĸ Uc (fĸ Uc (fMbP? spline  ref  point  56ʒ@V#Obwe@ point  MȒ@\(n5O=e@ftreemeg attrib   spline surface   ref  loop  {  pcurve    exppc nubs&Rm/Ĩ= 0v&h@*5? 0v&h@MbP? spline  exactsur nubs ??&h!Fwb1%1j׌^%aޚܿʻ(K̿t9,,w:K@^unE@{m}n@ 0v&h@7 ؒ@^p7ODkBe@Mفؒ@ˣ#tO!te@*Mْ@{zOQ[g+e@%@ ܒ@MPe@9[ޒ@iPO%e@͐Uޒ@XﭞPe@@{^oPmJe@ؒ@M)O/4e@ oؒ@򲙚hO䟕.e@>ܒ@&#;O'9e@ޒ@*̑( P Ĩe@ZV^@JbQ P%Nle@;Oؒ@n ODBe@i;ؒ@n%aO礤e@s~ ~ْ@(A@~P^e@ y ؒ@M)O|B\e@z%0ؒ@ YOXe@jbْ@ 0Ob8e@J],Rܒ@`O'ee@a' oޒ@D50nPѨhKe@H@d)P0oe@ Pmؒ@V%ۨO`P 2e@z zؒ@VWO=e@KkYْ@4CO9se@6 Gܒ@H>Oũe@i&Icޒ@>WP߂7e@]@3$2PE-PFe@Jd@pPV,|e@Fؒ@Ss (O)Ge@\Qrؒ@ QOCYe@z<ْ@V}pO3ʕ3e@&@"ܒ@^sO e@po9ޒ@ P}e@ZJS@2 }?PP1"!e@HF~ؒ@ = OUse@/Jcؒ@;BOOpe@O,ْ@*ΒOƶFe@ߘH ܒ@.cEgO p.e@ vޒ@Pbbe@x[4@ES_Pԙ9e@Xwؒ@b/3 O{eT>e@u]ؒ@PNO.|fe@·%ْ@|tOe@Hܒ@FEOuJ檻e@ bޒ@BLP()e@'@е[PfĘe@lؒ@mO qe@bSؒ@]LO+oe@ْ@r O7e@= ے@aY1Oph Oպe@oޒ@.>P1)7e@ysB@emP!e@ʸhؒ@qOӫe@#^Oؒ@-o6WLOI ..e@cVْ@xT#O,~e@|9ے@oYOM2e@ݒ@=P Ke@I` @"kPIk4e@ -ג@&RNe@4ג@tc>O!le@/iؒ@,_OWre@:/Eے@",OVe@)ݒ@Y?OzSe@:2Eߒ@OUe@^]ג@#OYv e@>'ג@MAO腷e@qג@]OWĴe@5l:+ڒ@9~O2Me@bے@wi45Ox:e@>ݒ@ uPk@e@~xԒ@1ZOIe@>Ԓ@^ SO>-?e@Ւ@c;OMy@e@37j֒@YdO`'e@ג@o=)PD.ˍe@1cRؒ@4:PiX e@Ϫ9OӒ@ b&*.Ooe@dsHӒ@#\(aOI=we@EӒ@q!` O+e@Ԓ@X1OWmąe@FWlLՒ@hPH/e@-BՒ@pg P&k<$|e@В@ƙ6O.ee@7В@2hOWe@В@!vNOq9ʛe@xeВ@ !OxX9e@%ђ@ -ZmP=\ge@XL1 ђ@YuP)Fye@D@iϒ@Y5Oe@ϒ@HWgO69e@ϒ@ hSOTT5e@o~ϒ@ xI Oeּe@l5ƷSϒ@/F(PJ2фe@X(ϒ@GPԾ[zye@"Β@X@-O}e@DRΒ@*6R`O޵e@JΒ@?vOQU'le@QaN1͒@ plane4T%@Qf@5^<?5^< ellipse curve  @Nf@> nŭ?  point  T@Nf@intcurve curve   bldcurh}@V`z&@}3)% @? spline  ref null_surface nubsh}@}3)% @h}@}3)% @ nullbs   tcoedge coedge  8 d  -v'os! tedge edge 7  os!@  -v'@ c tangent m ݹ3w? pcurve    exppc nubsos!@ -v'@os!@ -v'@MbP? spline  ref ftreemeg attrib    spline surface   ref  point  hK@:~f$Of@intcurve curve   bldcur`r7@ @% $@b'? spline  ref null_surface nubs`r7@% $@`r7@% $@ nullbs    edge o  x2\@ fњ(@ tangent  point  L ƒ@Y|f$Od}:Vf@straight curve  D@@Qd@?  point  D@v1Od@straight curve  D@v1Od@? ;`7 ;`7@ point  D@K@e@ point  D@Kd@ellipse curve  L@O@@e@lvlv?  point  L@L@@e@straight curve  @L@@e@  pcurve    exppc nubsSF; sK!?[Ec&4T?Do(@b"?`#(@SlV?!(@?,p?\:\S(@d?@wb(@6t?VO(@[Wj@dњ(@t'? planeDxgzǒ@Qڂf@ ?t ~:?t ~:ƿ ? intcurve curve   bldcur?[Ec&@sK!@SF; @t'? spline  ref null_surface nubs?[Ec&@SF; @?[Ec&@SF; @ nullbs    point  L ƒ@PKLd}:Vf@ point  Q7ǒ@p$בL4'W!f@ coedge   y  edge \  } ,T@  t(@ x tangent  pcurve    exppc nubs(f@4?@@uè@M^@>YG>z@de0@ĸ Uc @@E@6S@a@L`@05)@-$@C)7@8-@FB@rq6@z˼A@j6@l5&@IPc6@=ܤ@?-@z0q@9~s$@l&zp@0@ƊV<_@N@a@@̫@MbP? cone'0В@Qe@?@? @ tcoedge coedge  L W g h?  pcurve    exppc nubswmFj@ 0v&h@xmFj@ 0v&h@MbP? spline  ref tvertex vertex  y I5D?intcurve curve   bldcurxmFj@{m}n@ 0v&h@RRE? spline  rbblnsur blendsupsur cone'0В@Qe@?@? @ null_curve nullbs@@Q@e@ blendsupsur cone@Pe@lv@lv? @ null_curve nullbs@@Q@e@ intcurve  offintcur nubs &@rH/?74JMBeSZ]?޶ͯ@6@!@ 0v&h@w;) ޟ @x"/#@)$S$@KT%@@^p7One@^x@S8G5O6e@*@̮2OņUle@"@wb'Oue@8µ@ r_ O2+e@n?@sqOKye@tHl}@<OX\ޡe@=gH@A Oߒ@"OK e@M,Fߒ@~nN!e@+9ݒ@OODqe@O[ܒ@mO{ee@ekgْ@<֭iO§9re@$Z|ג@Cv_$Oifje@'Ӓ@5#3OU%ae@ Kyђ@|6O;Q6G_e@[z͒@v73O"#Eae@Hn˒@Mv,O<$2,Iee@Ϙ04Ȓ@hf~O貦re@˩>|ƒ@i O|e@tÒ@m@_%OrKԧe@+ԟ’@ZcND;`^e@87k@FOӝ>e@\[@G Oɴۻe@s?@fòOURYe@ @VrO/PrRe@M@rKYO!<@e@@@ cone@Pe@lv@lv? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?RRE? ?? &h!Fwb1%1j׌^%aޚܿʻ(K̿t9,,w:K@^unE@{m}n@ 0v&h@RRE?@rH/?pbe74JM)74JMֿ74JMƿBeSZ]?BeSZ]?W?BeSZ]?h*?.$Gp?~3`ӵ?޶ͯ@d,(-@+i2^@nfs @6@ag@4@@Y<@eL@Li@!@r@&c@,@NiJ@ null_surface nubswmFj@ 0v&h@xmFj@ 0v&h@ nullbs   straight curve  MȒ@Q=e@?  coedge  3 c j  coedge    edge [  pUd@   @  tangent ftreemeg attrib    cone surface  @Pe@lv@lv? @ tcoedge coedge   Y h tcoedge coedge   $|h?  loop   pcurve    exppc nubsT{CPS!??H@@?MbP? spline  exactsur nubs ??6?nP$?iv@ @~ @EtjD@̎y @Pt!@Fqݒ@Ne@$7ߒ@Ne@|`~@NY+Qe@>X@NŎe@bYi/b@Nce@*w@Nye@Fqݒ@m$Ne@$7ߒ@XNe@|`~@7hNY+Qe@>X@kMNŎe@bYi/b@Nce@*w@eNye@5+ݒ@ mtNe@%ߒ@BNe@@\vNY+Qe@3+@_ #NŎe@oˆ1@2Nde@O`b@fNye@F!$ݒ@UzNe@(ޒ@)td5Ne@]Sߒ@N}NY+Qe@qI@P#OŎe@_QE:@<q2Ode@s7+@dZi;Oye@Z ܒ@nS.Ne@Hݒ@DP*o Oe@/ߒ@4V&OY+Qe@5O@Pk2vWOŎe@ayp)@$0kOce@ݘR@fvOye@3nے@JqOe@6 ے@mkoHOe@ ܒ@8KsOY+Qe@82ޒ@:#%OŎe@.ޒ@TOce@8Aߒ@ez-Oye@댪ْ@#@0Oe@Yڒ@?`Oe@6P&ڒ@?nNjOY+Qe@;+Ʊے@r2OŎe@F8%aܒ@Fd:Pce@;ܒ@ǡ e Pye@"bs֒@49Oe@֒@0,̱lOe@~-֒@ZNOY+Qe@+rՒ@"Ay 'OŎe@@elՒ@)y Pce@PvKՒ@fAPye@ͺՒ@na*$Oe@nu07Ԓ@HPOe@r0hӒ@!}OY+Qe@z Ғ@-}OŎe@M4Cђ@tS0Oce@>.ђ@sBxOye@x/YҒ@t.=Ne@'<В@^+Ne@}!Eϒ@ΎNY+Qe@Vɱ̒@ŰOŎe@è˒@_Fc Oce@ ˒@$Oye@"ђ@TvNe@6_=EВ@qstNe@M Β@\"AqNY+Qe@˒@:|omNŎe@ʒ@r)-lNce@]ʒ@l0kNye@ЩӒ@FMe@9$Ғ@-Mce@LZޒ@A.Lye@,۔ܒ@\z> Ne@K<ޒ@T&SMe@ߒ@) MY+Qe@XNV@J}eMŎe@z5@@EF\~Mde@k}=@UֆqMye@8Rݒ@wzFaNe@d *#ߒ@"XNe@Z9ܩ@‰PNY+Qe@O8@gBBNŎe@؞\?@%nX@GpRaNŎe@bYi/b@_{@d^Nce@*w@^a\Nye@Fqݒ@Ne@$7ߒ@Ne@|`~@NY+Qe@>X@NŎe@bYi/b@Nce@*w@Nye@?6?nP$?iv@ @~ @EtjD@̎y @ ?  ?  ellipse curve  ג@bNye@?h&>SU ?  point  ג@PrPye@ coedge   pcurve    exppc nubs>h:89@*H9@GT!  coneFqݒ@ _e@?? ?@ -DT! }tedge edge Q   E Y h? tangent n(C? pcurve    exppc nubsY h?:@-DT! :@} coneFqݒ@ _e@?? ?@ -DT! }tcoedge coedge    R!l _c tedge edge M  ! l _c: R!? tangent Ϲ? pcurve    exppc nubsl _c:p67R?p67R?R!?p67R? (Ŧ?R!?s 2>>R?R>9?޾e-??mA^0 ?܉c?9 ? x?C-(>O?(Z +?J(?Lx%q;?;_ē?}S4B?%a?Y]+0?@NI?ysDUL0Hù@ه.$?ԗ@MbP? spline  ref  vertex  ellipse curve  xFqݒ@M`e@!Qǎ=?t"=p2?? tcoedge coedge  >    Ak`@0⣔_@  pcurve    exppc nubs)b;qHssY#I@ x(g.Pt@)DT!?u@2b?pJe@U7I?BW@T$%?ȣͣ@Fq?( [@&sR? \@x`G?QG@ *?HGf@l%绰?rPy@dvO?`V@:c?{Gc@1>r?`{@̫@MbP? cone'0В@Qe@?@? @ intcurve curve   bldcur(g.P@6,@)b;@PTRE? spline  ref null_surface nubs(g.P@)b;@(g.P@)b;@ nullbs   tedge edge ;  A 0⣔_  Ak` tangent 70c? pcurve    exppc nubs0⣔_Ak`0⣔_Ak`MbP? spline  ref  point  l͒@4LTse@ point  '0В@F"בLe@ftreemeg attrib     spline surface   ref  loop  straight curve  @"בLe@@  point  ؒ@"בLe@ coedge  F - *   edge  /  ~ʼ4@ unknown  vertex  G straight curve  dތy|7@V@`f@ straight curve  dތy|@ AV@`f@¸O  point  dތy|@ AV@`f@ pcurve    exppc nubs"xYMcv'%$&E%ր*)$g.t#NW"!fњ@OJWƿa@-%bPҿlIw@ )ڿtV/n@R~멡HSfi@Ȱ'bvo[d@{b1& d@zZ. d@@OE>ii@πDzޝ1n@M[8tw@̽Ok@$o@@XJњ@`DT!MbP? conehK@Q@f@?@? ?@ intcurve curve   bldcur!@'#@ػ$@"xYMcv'@~f<ټ? spline  ref null_surface nubs!@"xYMcv'@!@"xYMcv'@ nullbs   straight curve  hK@Qf@? straight curve  nZÒ@أ"בL=[f@p ~:?  point  MȒ@"בL=e@ pcurve    exppc nubsз(E@6(;c'fWR'n.:|&d%U%[}{@ߒE@laa@Or\@S@Z1s@+k@c@%@1&R@;vk@\@j@pSaH@ c|@ {@ >3K@`^L|@L@6ْ@@xm@'Ue@8(@|pu@3&r@|pu@ȸω@MbP? cone'0В@Qe@?@? @ intcurve curve   bldcurU%@$#'@ з(@롕? spline  ref null_surface nubsU%@з(@U%@ з(@ nullbs    point  56ʒ@; Lbwe@straight curve  4@T@`f@¸O??  pcurve    exppc nubs 0v&hmFj? 0v&h@?mFj@MbP? spline  ref tvertex vertex  M  L'N?intcurve curve   bldcurmFj@{m}n@ 0v&h@RRE? spline  ref  null_surface nubsmFj@ 0v&h@?mFj@? 0v&h@ nullbs   intcurve curve   bldcurĸ Uc N(fm ? spline  ref null_surface nubsĸ Uc (fĸ Uc (f nullbs    face  W   point  l͒@O#OTse@ftreemeg attrib  \  cone surface  Fqݒ@ _e@?? ?@ -DT! } pcurve    exppc nubs -v'w&$fb%- $JTE#nž"os!k#\?`DT!qU?r@@XQwl?ԿOkɌBĜ#?޷[,-?ЀDzZm6?hAE徙j6?zZ.F Ig6?|b1&Xe2-?Ȱ'bvR#?멡0lgh?)ڿe planeUdڒ@Qe@? ellipse curve  ג@qMe@r#ȎJ#_8L@1>֤ŭ?T?  point  tFqݒ@Me@ pcurve    exppc nubsAk`@ iTR@=̑@&$@8@@0⣔_@,?{@̫@ 0~@a@܏g~Ɨm@@zp@$o$+i@Lq@d@_ܤ@x5d@vИ5&@Fd@D˼A@ *i@GB@}m@lFC)7@YOv@{)@@V|@@{@@nE@MbP? cone'0В@Qe@?@? @ intcurve curve   bldcur0⣔_6Ak`c? spline  ref null_surface nubs0⣔_Ak`0⣔_Ak` nullbs    face    straight curve  dތy|@ AV@`f@¸O?  point  dތy|7@V@`f@ point  '0В@뽨rP@ye@ftreemeg attrib   spline surface   ref tcoedge coedge  RR!  coedge   edge Z   } Ud tangent  pcurve    exppc nubsg hUd@ET! Ud  cone@?\(n5O_e@?? ?@ -DT! }ellipse curve  '0В@#(n5O`e@lqHq==T-??  pcurve    exppc nubs|h$:G`GT!  cone@?\(n5O_e@?? ?@ -DT! } face   tedge edge Y   RR!? tangent 苓? pcurve    exppc nubs67R?67R?RR!?67R?o8Ŧ?RR!?9 2>ڰ>R?䦿 R>9?#>e-??h0 ?c? ] ?x?r`6(>O?ɥ +?#(?x%q;?eē? 4B?S%a?<+0?HNI?xCUL ù@6.$?vԗ@MbP? spline  ref  vertex  ellipse curve  ג@{(n5O_e@?f3 planeUdڒ@Qe@? straight curve  @?\(n5Oe@ ftreemeg attrib   cone surface  @?\(n5O_e@?? ?@ -DT! }ellipse curve  ג@D`Ne@̤ŭ?x?1?  point  ג@v(n5Oe@ End-of-ACIS-data<B  L9y? L9y?4ˏ@׵@?-ACIS BinaryFileMegaCAD 2013 3D ACIS 22.0.1 NTFri Apr 06 16:20:35 2018?ư>|= body    string_attrib name_attribgen attrib  ATTRIB_XACIS_NAME R2 umlaufend lump    shell     face      ftreemeg attrib    face    loop   cone surface  gK@X&Q@@f@ L9y< L9yʼ? @ ftreemeg attrib    face       loop    plane surface  Cxgzǒ@X&Q@܂f@?LN7Cp ~:ƿp ~:?4Mic tangent  edge  'q @ ?7^,0@  @ tangent  coedge   A ; B %  loop  $ C  vertex   D vertex   Eintcurve curve   surfintcur nubsln:f7ӧ egK@A*]O@f@#2@iZO@f@j@ɂP-XO@/oe@f@s#@FVO@u'f@76 ,@ZIDVO@+}/f@;@vUO@Q f@<’@TVO@MYf@BĒ@3dWO@)qvf@Œ@DzYO@ ۄff@L ƒ@A*]O@o ~:Vf@D"? conegK@X&Q@@f@ L9y< L9yʼ? @ toruswA@2]~̩P@f@ L9y?@? nullbs nullbs   ftreemeg attrib    face F G H  I  loop  ;  plane surface  4T%@X&Q@f@? L9y<  coedge  J K L M   coedge  N  3 O   coedge   P Q R   coedge  S 4  1 T  edge  U Vtzy %? 0 W unknown  coedge  X  Y Z  coedge   X . O  coedge  0 [  5 T  edge  7f Uch~f.? 4 \ unknown  coedge  ]  [ ^ %  vertex  5 _intcurve curve   surfintcur nubs   ?)~dŒ@~x YO@Gif@<`z7Œ@n[O@u]f@/m'ƒ@3i `^O@ 2gQf@ƒ@Q=vbO@,)8f@ {,ƒ@occO@Ѱ,f@MQ7ǒ@occO@)'W!f@zww@wǒ@occO@Pɏf@Oǒ@U=vbO@%h f@xȒ@B`O@(qe@<5? toruswA@2]~̩P@f@ L9y?@@? planeCxgzǒ@X&Q@܂f@?LN7Cp ~:ƿp ~:?4MicȒ@1sbO@^!Ve@[Ȓ@@pcO@GIe@ Ȓ@rccO@ye@MȒ@rccO@Ge@Ȓ@rccO@Ďe@m!ɒ@H!4rcO@'6e@>-ɒ@:aO@"e@yɒ@c"`O@kIc;0e@PϢRʒ@5C]O@e@h朧ʒ@by-\O@e@YXb˒@8 YO@J e@,˒@tZ-WO@Bgbe@&vL̒@Z S(UO@R@e@5(͒@*3TO@s*e@Vi͒@3>SO@ }se@ k!? cone'0В@X&Q@e@ L9y< L9y? ?@ cone("ɒ@2]~̩P@m^f@Mr ~:?[6Mic<%^ȨH;f"do߿? @ nullbs nullbs    coedge  3 2  coedge  9 2 Z a  edge   ?εm? Y unknown  coedge  4 6 ^ T straight curve  jǒ@rccO@*e@Mr ~:?[6Mic<%  coedge  A 6 %  edge  ( 7K? [ tangent  point  MQ7ǒ@uccO@+'W!f@ coedge  9 < e a  loop  ` intcurve curve   surfintcur nubsHlfb K {aZd'L ƒ@4SJK@o ~:Vf@W.Œ@G#PLK@v cf@6*>Œ@4]NK@բtof@8Ò@<tPK@]Tf@’@p{PK@Wyf@r#\@ xQQK@ԕf@TyU@gQK@f@v@5OK@Pf@;c@+UMK@f@gK@4SJK@f@"? conegK@X&Q@@f@ L9y< L9yʼ? @ toruswA@cXSI@f@ L9y<@ nullbs nullbs    coedge  ; +  coedge  < +  edge  =еm  ` unknown  point  gK@4SJK@f@ point  L ƒ@ 4SJK@p ~:Vf@ coedge  A i p  edge   j&K? A tangent  vertex  B intcurve curve   surfintcur nubs " ?" @ @H`O@f@FT@U=vbO@f@6M(@vccO@f@wA@vccO@f@4@vccO@f@ܔ@U=vbO@f@ ]x@9i `^O@f@ܞ2E@n[O@f@GC@x YO@f@6}5? toruswA@2]~̩P@f@ L9y?@@? plane4T%@X&Q@f@? L9y< nullbs nullbs   ftreemeg attrib  C   face  T  torus surface  wA@2]~̩P@f@ L9y?@? ftreemeg attrib  G   loop  G cone surface  Yn@2]~̩P@f@? L9y cone'0В@X&Q@e@ L9y< L9y? ?@ spline  rbblnsur blendsupsur cone("ɒ@2]~̩P@m^f@Mr ~:?[6Mic<%^ȨH;f"do߿? @ null_curve nullbs blendsupsur coneYnƒ@2]~̩P@e@? L9y<;f;f? @ null_curve nullbs* ellipsel͒@2]~̩P@e@OϢo?f?i l?g2Qk c%?l WX??U?1,    coedge  [ S T  edge   V61,? unknown  point  MȒ@{ccO@He@ point  _ʒ@V=U\O@v e@ coedge  X  edge  ch~f. f? unknown  coedge  Y a  vertex  intcurve curve   surfintcur nubs  ? @xȒ@t9FK@(qe@Oǒ@rs܂DK@%h f@zww@wǒ@XMVCK@Pɏf@MQ7ǒ@XMVCK@)'W!f@ {,ƒ@XMVCK@Ѱ,f@ƒ@ws܂DK@,)8f@/m'ƒ@ HK@ 2gQf@<`z7Œ@KK@u]f@)~dŒ@Iw$NK@Fif@<5? toruswA@cXSI@f@ L9y<@@ planeCxgzǒ@X&Q@܂f@?LN7Cp ~:ƿp ~:?4MicȒ@DK@\!Ve@k!? cone'0В@X&Q@e@ L9y< L9y? ?@ cone("ɒ@cXSI@m^f@Mr ~:ƿ[6Mic%?^ȨH;f@"do߿? @ nullbs nullbs    point  MȒ@LMVCK@He@intcurve curve   surfintcur nubsy}<Џnফd(@KফdফdؿMxf0?L_ɒ@GTO@ve@eВɒ@NbSO@ge@ɒ@gSO@s"e@gʒ@O_%TO@b?e@*Ͷʒ@LUO@,e@4r˒@`phWO@c$e@{8˒@XO@| pe@̒@\O@e@ U3͒@~Ը]O@_xg? ? tangent  point  wA@2]~̩P@`f@ftreemeg attrib   spline surface   ref  ? 5,  coedge  < @ H  edge  ‡ +? >-DT!? A tangent  coedge  B 1 C  edge  D  K? E tangent  vertex  2 Fellipse curve  @cXM@f@&N! ?  coedge  G H I  edge  -DT! -DT! J unknown  coedge  K  coedge  L G M  loop  N  vertex  M Ostraight curve  UdԒ@QMVCK@e@ L9y  edge  ZW@@ f%O<@ P unknown  point  '0В@QMVCK@e@ coedge  Q H R   coedge  Q    loop  S  vertex  Tstraight curve  YX@dXSM@e@ L9y<  coedge  U V  edge  : +? W-DT!? X tangent  face Y S  Z  point  YX@cXM@e@ coedge  U [  \  edge    P  ] tangent  vertex  V ^ellipse curve  ؒ@1]~̩P@e@$I$I<?  -DT!?ftreemeg attrib   cone surface  Ynƒ@2]~̩P@e@? L9y<;f;f? @  coedge  _   ` coedge  _ K a  b loop  c  pcurve    vertex  dintcurve curve   surfintcur nubsH͇;}Uֿu̒@ps=JK@,7te@ 0_e̒@fELK@Dcp[We@í7̒@"LK@]۶e@\"4F˒@LK@X<{2me@j!ʒ@}/ELK@m e@_ʒ@ms=JK@m e@Bgꑻؓ> cone'0В@X&Q@e@ L9y< L9y? ?@ spline  rbblnsur blendsupsur coneYnƒ@cXSI@e@ L9y;f@;f? @ null_curve nullbs blendsupsur cone("ɒ@cXSI@m^f@Mr ~:ƿ[6Mic%?^ȨH;f@"do߿? @ null_curve nullbs* ellipsel͒@cXSI@e@OϢoF,DT! D-DT!? <  tangent ellipse curve  @2]~̩P@f@?$I$Iy+R<? ߵ -DT!? coedge     C  loop  1 /  vertex  @ ellipse curve  x@cXM@f@$I$Ix+R?  -DT!? point  X}@dXM@f@ coedge   M I  coedge   R I  loop   ellipse curve  ؒ@dXL@e@&N! ?  coedge  L  a  coedge  K    edge  ʇ +? -DT!? G  tangent  face  (    point  ؒ@RMVCK@e@intcurve curve   surfintcur nubs珝P@ZW@@0?@L@ Du@yaXY@d$m @ K/!@RҒ@=噍DK@D2e@jђ@BuCK@4ce@2Iђ@QMVCK@e@D?FВ@QMVCK@e@Kiѿϒ@oJW? zt,DT!? w  unknown  coedge   &   =  vertex   straight curve  wA@..!@`f@ A=4Q &U@ftreemeg attrib  (- cone surface  wA@..!@f@?!Z?"|b@? ?@  point  Hf@Q@ޓf@ coedge    +  =  edge  xg ,Y&@   tangent  edge  ,D  N@  { tangent  point  wA@dXSI@`f@ftreemeg attrib  /  face  N I   cone surface  x@acN@f@ L9y?^DO;f@;f? @  coedge  1 B 4  C straight curve  X}@dXSM@f@ L9y?^DO  coedge  5 4   6  edge  7: +? -DT!? 4  tangent  face  : 6    point  X}@dXL@f@ vertex   ellipse curve  @cXSI@f@?$I$I=?  coedge   y   =  edge  zmπ*@ n?`Q@ y  unknown  point  wA@8sQ@`f@ coedge      = straight curve  Yn@dXSI@`f@? L9yJWƿ   unknown ftreemeg attrib  / cone surface  Ͷʒ@ M@e@?E!Z |b? @  point  Ͷʒ@h'I=Q@@e@straight curve  @!9kQ@@e@`-9ƿj?z6?  point  }gxb@@X&Q@jw!lTe@ coedge        edge   DJW DJW?   tangent  coedge   ! " # =  vertex   $ftreemeg attrib  -  face % & '  (  coedge   ) * +   face , -   .  coedge  /  0 1 =  coedge  * 2   3  edge  4Խ7K% P"Ha@  5 tangent  vertex  + 6straight curve  _u@ Q@`f@H˪?  point  wA@J`f@ellipse curve  @cXL@`f@x+R?STu씹跼? )K (K? point  x@cXL@`f@ coedge  7  8 9   coedge   : ; <   coedge  = >   ?  edge  @$@ A6@  B unknown ftreemeg attrib  h  loop  C  plane surface  @L@d@ ellipse curve  ؒ@dXL@@e@?S@T? (K )K? coedge  D  E F \  edge  G\ d;!   tangent  coedge   H I J \  coedge  K L   M  edge  MK NMK?  O unknown  coedge  P  L Q   vertex   Rstraight curve  @!9kQ@@e@?H˪ ftreemeg attrib  /  coedge    S    coedge  T U   V  edge   #,{V# 8B  W tangent ftreemeg attrib  .  edge   GDJW DJW?  X tangent  point  }gxb@@Jjw!lTe@ellipse curve  Ͷʒ@h'I=Q@e@8H˪??5j Ce<n?@>?  coedge  Y  Z [   coedge   \ T ]   loop  \ ^ ellipse curve  wA@Jf@L!Z?|b@? zDJW ƻ3O|? coedge   _ ` a =  coedge  b Z  # c  edge d ;LԠ' e  f tangent  point  Hf@Jޓf@ftreemeg attrib    face g h i  j  loop  k  cone surface  @ң"בLf@ޛVۼ<? ?@ -DT! } coedge   l m n   coedge  o   + 3  edge  -DT! p*$  q unknown ftreemeg attrib  3  face r s t   plane surface  @n%R@@e@:H˪??6j Ce<|FSkҼ?  coedge  u  v w =  coedge  x y  1 z  edge  4Q|n@ {GwQ@  | unknown  coedge   o x } 3  loop  * ~  vertex  1 straight curve  @rO`f@? 6rÓ4 :"1vb@ point  @.uӜR@`f@ coedge        coedge     9   edge  -DT! @-DT!? 8  unknown  coedge        coedge     <   edge  A-DT! -DT!? ;  unknown  coedge      ?  coedge      ?  loop  =   vertex    vertex   straight curve  @J`f@?  coedge        coedge      \  coedge     F   edge   % GͶ   tangent  vertex    coedge      \  coedge     J   edge  N zJ4p@ .@ I  unknown  coedge      M  coedge     Q M  loop     vertex  J ellipse curve  ,@v1O@@e@5j Ce<ǰQ2t<jLY+Qf@[iI@´5ULŮf@B @@m&F:Ljf@}aN@T*Lf@aqIs@RLf@@\+WmLf@ @`pTLY+Qf@֛玒@҃f}6LŮf@y.)o@QLjf@Ah(@~N~\Lf@liJݒ@r=QLf@bo* @f!Lf@{>@kLY+Qf@2O@wLŮf@"7 @XiKjf@,We@&>Kf@n@ѣ"בLf@:5"IG@*jLf@\@~3pgLY+Qf@4Rݒ@&LŮf@CB’@Kjf@H'@JbKf@@ѣ"בLf@@*jLf@@~3pgLY+Qf@@&LŮf@@Kjf@@JbKf@?Pt!'c.Gb[ %= 8M{N$(6ۿ ?  ?  tcoedge coedge      ' ] h?  coedge  )      coedge    ) n   edge  p@ @ m  unknown  coedge  2 *   3  vertex  n ellipse curve  @.uӜR@f@;H˪6j CeҼn?@>? ftreemeg attrib  -4  face       loop   -  coedge   /   =  coedge    / w   edge  R@ {LtS@ /  tangent  coedge   0 2 } z  coedge  0    z  loop  y   vertex   straight curve  @rR`f@?H˪?  edge  8CNZi9 4-DT!? x  unknown  face   3    point  @,uӜR`f@ coedge   7     coedge    7    edge  $@ X@   unknown  coedge   8 >    coedge  8      loop     vertex  9 ellipse curve   @E`f@x+Rx+R<? H H?  coedge  :      coedge    :    edge  $@ X@   unknown  coedge   ;     coedge  ;  =    loop     vertex   ellipse curve  P@E`f@x+Rx+R? H@ H?  coedge  > =   ?  edge  " A< =  tangent  edge  @ "@ >  tangent  face   ?    point   @J`f@ point  P@J`f@ coedge   C     coedge  C  ! "   coedge  # $ C  %  edge  &-DT! '-DT!? C ( unknown  coedge  ) D * + \  coedge  , - D  .  edge   /-DT!  -DT!? D 0 tangent  coedge  1 E  2   coedge  E 3 , 4   loop  3 5  vertex   6straight curve  @J@e@ ؈'+    point  Ͷʒ@J@e@ coedge  H 7 8 9 \  coedge  : ; H  <  edge  -DT! =-DT!? H > unknown  coedge  ? I ; @   coedge  I ? K    loop   A  vertex  @ Bstraight curve  D@@Q@@e@  coedge  L K C D M  edge  N wr<< E$@  F tangent  face G H M  I  point  D@v1O@@e@ coedge  l P J K   coedge  C L P    edge  M1zJ4p@ a@oZ@  N unknown  vertex  D Ostraight curve  =kWA-@(;CSQ@@e@? <`< :`2@ coedge  P S U    coedge  S P  2   loop  P Q  coedge   T R S V tcoedge coedge  U  T U V VU%@з(@  edge   WEC? -DT!? U X tangent  face Y Z V  [ tcoedge coedge  \ Y \ ]  ^!@!xYMcv'@ tcoedge coedge  _ ` Y   a+0+L . tedge edge   b+0 +L . Y c tangent TF60? pcurve    exppc nubs+L .@_v.@F ,/@d/@}4 &0@m0@+0@}}N'?Į~,?Qٺ?ܗS3?RlTl/*9?뽚ig渉?~>P9,?Rf."n1|?j ??j.*׍6ɋ?cCD '~?<ֽʒ@6CKa_z/f@a,1B˒@w~KB1Jof@#Aϒ@ݥԄLf@S"DΒ@@**1CLf@S9̒@gw-MLWif@iMׇP˒@DyKF@f@=˒@C wʤK@of@,b˒@RK of@dHВ@ 2,-zLf@KΒ@/9Lf@=P͒@H͟KVf@3͓˒@κKf@cT˒@"=:Kk f@M˒@OKx孳nf@? gВ@0YsLf@iHΒ@Z3Lf@c-͒@4 K3Jf@\`˒@b+KTtЖf@"Ղ˒@KTif@u .˒@FZ雫KTsnf@ -ђ@R6`Lf@.ϒ@"Lf@%xΒ@ETK-f@igD̒@6V 4K gf@׵=˒@1AKIVԀf@h̒@틠KXmf@[ʢђ@vtTLf@4В@x_kLf@sΒ@K0K| f@h=̒@7KX*f@Iz?y=̒@mKgk~f@H*̒@UKoxtmf@h\zҒ@4;Lf@廻_В@Lf@E#ϒ@*K.:&f@͒@x6!K/ʵf@>̒@SN@qxK If@ H͒@] KPlf@JҒ@zBb-Lf@,Z1ђ@Kf@{Boϒ@:Kz;f@ U͒@ZzK9@~f@#0i͒@~7_dpK5f@t͒@|鲁K^jolf@ FQmӒ@ShLf@焦ђ@(!HKf@h'1Zϒ@!"K#o.ڵf@֐͒@..oKº/f@Jc͒@sǠcKf@V7͒@.etKkf@WF9Ӓ@6| Lf@_ђ@? Kf@В@6frKUǸ̵f@jz͒@2 àfKs f@zF+͒@]]K ~f@]"'Β@=(~nKe>5kf@v6Ԓ@-l.Lf@- Ғ@GKf@%8В@dI5KRƵf@Ck͒@D|bKU.df@.%u͒@Un#ZKx~f@SˤBΒ@Z@jKE[Wkf@o|Ԓ@9QeKf@NY~Ғ@mKf@ۏ̾В@sKiof@z6Β@Z"XKeĔf@<͒@:ÌPKGk~f@GpΒ@Qcָ`KӼSYkf@ Ԓ@( Kf@,AҒ@?8Kf@ 2В@DK,K/f@MĽ[Β@!QRKV䦔f@uΒ@R4cJK,CO\~f@_"Β@$,mZK,kf@_:Ւ@*};NKf@U!Ӓ@z,Kf@Qђ@TP zK޿f@_Β@5oEEK͸]mf@dOΒ@G;> >K ~f@ITϒ@#bMKjf@wՒ@+8Kf@-UӒ@2sKKf@+;ђ@,rKbꗵf@&PsΒ@㷉>KhQf@@rΒ@7KP}f@'ϒ@FKv=Ijf@ưՒ@3.wKf@ Ӓ@",8Kf@ԗ̱dђ@\ iKՕf@OΒ@C7K7f@cʒΒ@}F,1KX }f@gLϒ@Э?Kjf@? si0@< 1@J6]4@A ;7@A6;VNE7@νLӋ7@֨7@[Żq8@A8@e5]8@%?y9@ ?  ?  tcoedge coedge      i F?_ =hh?  coedge   k   '  coedge  k   d ' tcoedge coedge    k  i ] h tedge edge   x ] h? k  tangent rۼn(C? pcurve    exppc nubs] h?@j}@-DT!  cone@ң"בLf@ޛVۼ<? ?@ -DT! } coedge    l    edge  bAN *$   unknown  coedge   m     coedge  m  o    loop     vertex   straight curve  @rR@`f@  edge  p3*Ma 3ˍ%@   tangent  point  @rR@f@ftreemeg attrib  s5  face       loop   s cone surface  }RHf@ǖǛYe@>%bOL2<iϣ構?"lv? @  coedge      t  coedge    u    edge   @ ;LԠ'@ u  tangent  coedge   v y    coedge  v      loop     vertex  w straight curve  wA@..!@`f@ l)6Q BH6AV@ coedge   x   z  coedge  y    z  edge  {-DT! ,CJWƿ y  unknown  face   z    point  wA@6sQ`f@ vertex   ellipse curve  @-uӜRf@H˪?6j CenĿ? ftreemeg attrib  ~C  face      cone surface  @rOf@?lvlv@? ?@  coedge        coedge        edge  -DT! -DT!?   unknown  coedge        coedge        loop     vertex   straight curve  @J@`f@  coedge        edge  "    tangent  face       point  @E`f@ coedge        edge  -DT! -DT!?   unknown  coedge        coedge        loop     vertex   straight curve  x@J`f@?  coedge        edge   "@   tangent  face       point  x@E`f@ coedge        edge  $@ 6@   unknown  vertex   straight curve  P@J`f@? {cD ?@ vertex   straight curve   @J`f@ ? {cD@ftreemeg attrib  b  face      plane surface  @J`f@??  coedge        coedge        edge  @ &,@   unknown  coedge        coedge     "   edge  '@ I@ !  unknown  coedge      %  coedge      %  loop     vertex    vertex  " ellipse curve  L@Od@?lvlv@?  coedge      \  coedge     +   edge   J /I   tangent  coedge     4 .  coedge      .  loop   Z  vertex   ellipse curve  ؒ@M@e@?lv@lv@? 0Z 0Z?tcoedge coedge  3     (g.P@)b;@  edge   G |eB?   tangent  coedge   1     edge    ] h? ,  tangent  face  Q     point  ؒ@J@e@ coedge      \  coedge     9   edge  =@ 9@ 8  unknown  coedge      <  coedge     @ <  loop     vertex  9 ellipse curve  ,@K@@e@lv@lv?  coedge        edge  $    tangent  face       point  D@K@@e@ coedge     D   edge  EMK MK? C  unknown  vertex   straight curve  D@v1O@@e@ :`2 <`<@ftreemeg attrib  T  face      cone surface  ,@v1O@@e@9qFSkҼ?kWA-@&;CSQ@d@tcoedge coedge    ( )  *0⣔_QAk`  face +    ,  coedge  - .  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Q tangent  coedge  R  O S q  coedge   R  u q  loop  R T  vertex  n Ustraight curve  |@@K`f@ (&23? ܈'#@tcoedge coedge     V  WQT!  edge   qq5 X h?  Y tangent  face Z    [  point  |@M`f@ vertex   \ellipse curve  @Jf@?x+R<?  -DT!?ftreemeg attrib  !  face ] ^ _  ` cone surface  @Jf@?x+Rx+R<lvlv? @ ftreemeg attrib    face a b =  c  loop  d  cone surface  T@@Kf@? ?@ -DT! }tcoedge coedge    e f i gD^Q,T!? tcoedge coedge    t V i hQT!? tcoedge coedge  i j    khhF?_ tedge edge   XF?_ = lhh?  m tangent چbC? pcurve    exppc nubsF?_ =hh??bܪ3n0>d dMbP? spline  ref tcoedge coedge    _ A ' n] h?  coedge  e o   p  edge   @ q;LԠ@  r tangent  pcurve    exppc nubs] h?MbP? spline  ref  vertex   sellipse curve  @ԣ"בLf@?@1T???  coedge  t  " u   coedge   v     loop  w x  vertex  K yellipse curve  @ieR@e@;H˪??6j Ce<@nĿ@>=?  coedge        edge  z3ˍ" 3*}a@  { tangent  point  @rR@e@straight curve  @rOf@ :"1vb 6rÓ4@ftreemeg attrib  6  face | } ~    loop    plane surface  @L@e@??  coedge        coedge      t  coedge      t  coedge        edge   = @ ?Nv@   tangent  coedge        coedge    N    loop     vertex  n straight curve  @P`f@? @&23? xs:d.@ coedge        coedge        edge   DJW DJW?   tangent  face       point  wA@P`f@ coedge    v  z  edge  z@ @   unknown  coedge      z  coedge      t  edge  A@#@ [|@   unknown  vertex   ellipse curve  wA@6sQf@H˪?6j Ce@n?<? ftreemeg attrib  N  face   %   plane surface  D@@Q@e@H˪?6j Ce<|FSk  point  @rRf@ftreemeg attrib  D  face      plane surface  @rR`f@?  coedge        edge  $@ 6@   unknown  coedge        coedge        loop     vertex   ellipse curve   @E@`f@x+Rx+R? 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H@ H? $@  loop    straight curve  @J@e@?  point  P@J@e@ point   @J@e@ftreemeg attrib  c  face       loop    plane surface  Ԓ@H@e@??  coedge        coedge        edge  -DT! -DT!?   unknown  coedge    $    coedge        loop     vertex   straight curve  @Ld@  coedge        coedge        edge   $@   unknown  coedge   !     coedge  !  #    loop   H  vertex  " straight curve  4@Ld@  coedge  $ #   %  edge  '$    tangent  edge   &$@   tangent  point  L@Ld@ point  4@Od@ coedge   )   \  coedge    )    edge   -DT! -DT!? )  tangent  coedge   * -    coedge  *      loop     vertex   straight curve  @ @e@? 7nf&L 6Gtcoedge coedge  - ,   . S!  edge   "uJV? /-DT!? -  tangent  point  @M@e@tcoedge coedge    1   )b;(g.P tedge edge   )b; (g.P 1  tangent jc]?,B3? pcurve    exppc nubs(g.P@H x@j#I@Hss@@@)b;@Uy@Zbݿ8B>@/ܿd#j@"-~ۿ:e0@8+,ڿTuDŽI%@ܸ5;ڿyK@~Tٿk,@4;ٿa2]E@bOuؿf@X,Xؿ>5@x$8ؿ'|k@BZؿ@t"׿r 0@G׿MbP? cone@Je@?lvlv? @ tvertex vertex  ) {Þ?ellipse curve  Ͷʒ@Je@?  -DT!? coedge    3    edge    Ud 3  tangent  vertex   ellipse curve  ؒ@Je@<?  -DT!?ftreemeg attrib  5+ cone surface  @Je@?lvlv? @  coedge  7    \  coedge    7    edge  -DT! -DT!?   unknown  coedge   8     coedge  8  :    loop     vertex   straight curve  D@H@@e@  coedge  ; :   <  edge  = $@   tangent  face   <    point  ,@H@@e@ coedge   C ?    edge  @ Eǜ.@ ?  unknown  vertex   straight curve  D@K@@e@? ;`< ;`2@ftreemeg attrib  AX  face      plane surface  D@H@@e@? ellipse curve  ,@v1O@d@5j Ce¼ǰQ2t?ǰ^e@536~ʒ@@l$vL\)Ve@K1ʒ@i~sLO8e@Q Ȓ@hԤL70We@wιǒ@G$ Kȡe@eƒ@MvK?Ie@ 7>̒@̊ L{[e@5YI̒@dӍ?պL` e@dbP̒@odjC}L;e@ ʒ@?N!LW e@Wܺɒ@N?LCse@XȒ@\;Kiwe@bu͒@uM|M~}e@7_Q͒@r4Ld܁e@x5\͒@jGu[L-?h1e@mK̒@FL߸le@ 4dlw˒@c=NLye@ʒ@(9})e@1Ӓ@>P Un2Lc6e@[GӒ@TPLSe@Ғ@G|KE܃e@]U%Ғ@6leKve@] lӒ@L1 K H+he@y14Ւ@ Ʀ>Lqe@?^k7Ԓ@;NL=Je@ ^Ӓ@JzzKsTeRe@,\xӒ@mV-K\e@TӒ@YUlK)2nye@:4NӒ@vKu<me@ `F۶Ւ@V7L}6je@IhԒ@Q2Kʡͧe@^?+Ԓ@uR{K+~e@r֒@N,Kd쎵e@o ֒@ލБKe@NdÍՒ@|E4bnKF딦e@NWԞ-Ւ@O,uGK)de@J`ۛJՒ@2fh6K(e@u q\Ւ@Ⱦ)K"e@fQג@4a}aK]ݶe@MJ-￑e@P ֒@b#Je@>V֒@Je@WԦU֒@TO J3e@4pג@+mKhe@=֒@w J$6ܵe@4 ֒@^oKKJީGe@fO$֒@!uCJ$! %me@Z\*֒@1J2(e@`c֒@kAJi-*e@!8|xג@0VwJ H޼e@S֒@l\Jͤ7e@ 1֒@,J]!Ve@R /֒@e7J e@aLG4֒@.*tJB-e@UBj֒@GJ]D\юe@ԡג@iJj㻨e@ ֒@:Jvlv1!D׿? @ null_curve nullbs@@Q@e@ intcurve  offintcur nubsXl.!?(`5 @8Z1@YaФ@2I17@/o@M@t,ukm"@U%@d<(@LTj+@!.@iE0@Ÿh0@OH1@:e.2@O?V3@eo T5@}S5@N󬦋6@|;7@Jْ@RK;JK[Jf@Xؒ@hۤKo3Of@(;ג@q~K\ Vf@BwԒ@@L'r\f@|\RӒ@};aL ^f@v,d6ђ@hLc4`f@В@C>ɩL *`f@,LΒ@-G L|#^f@^2͒@OL}]f@z'Ǜ̒@vgL+ bZf@A:=˒@>ZdHL dBXf@_7Oɒ@4րL]cѧH’@`Le爠f@[v@{L8GB6f@lr@ O}LAS e@ T@"בL'e@.\@"בLg*e@P7’@ O}L؄e@> Ē@{LGe@r‰Œ@dLzKe@^Ȓ@ٶ'Lfpe@fT]ʒ@yoMSie@R͒@-)PVAL׏*be@CΒ@4րLW`e@gt(В@=ZdHL|e_e@Qzђ@wgL_e@;Ӓ@OL97ae@;Ӓ@+G L?@be@$oՒ@zC>ɩL&ee@4eP/֒@hL(*rhe@#@ؒ@w};aLWoe@OGْ@@LPte@mڒ@By Lye@yے@<Ki̱e@zYܒ@YKy0be@ݒ@'=KPmܧe@² ݒ@0K •e@k̝ݒ@j`#KDĖe@oh#ޒ@DO Kre@5MLޒ@&JorW}e@:kޒ@UJe@pޒ@8CřJROhUe@_Aoޒ@ i{JpIe@@@ conenZÒ@J<[f@_r ~:?<&E>vlv1!D׿? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?롕? ??U%@$#'@N*@Db|.@ƫlR=2@O?V3@O’@(KԢf@'<@oh6KcI$%f@зⱽ@LZLHƥe@B`@1/L$/zNe@3l@g$LS %e@x5T @rKK_8)e@˯^A@ȁ^ K?e@-t@nKa"f@)d@eaL(e@+De&@p-UKZe@RXUe@ 'K{ye@%@5RKR(e@a@\L|Kae@ft=@@ uvKֻf@a˳@"AKH.*e@%㵒@~dKU,e@q2@XFKvaMe@iT@1)wK;9(e@d@Z@xKK-e@;u@ýKϜ||1e@iBͱ@]o'K T-e@cR/@P+KÖie@X䶒@RnmoJ`%+e@S,κ@oۣJ.X_e@@pJLTe@j>Mٻ@WvJ0Rf@ @9JO e@sY?@ԎJwde@_ Q@wYvJA2:e@9B6@bJve@.&ͻ@V-J؊xe@? r@؊J^XXF f@5 @bBYJq\ZNe@l`L@մ_JYTe@xW@ hHfJ-4e@S[T@RlJv2bVe@~pͻ@H,lJ@je@ڣx@ԖhJg f@.4α@XǾIkre@0@rcI&8e@S綒@dk ,JIQe@gѺ@/ڱ*Jbe@6J@L)(j-J |e@ѩCػ@4D?%J2f@eFRͲ@K:|IC e@ @=t6 I e@yg1|@pUI?+re@a=@T2ԈJڿ-e@m@'@ؙ Je@{V(@JJf@ Xt5@Ijke@`D@JI6h^e@p@,XVI+2e@K@^B#I7 -e@ @8I !e@ z@fffffI+Af@?'#@ػ$@jzG'@e۰h+@/y/@fD- 2@XGN\3@ ?  ?  intcurve curve   bldcur!@'#@ػ$@!xYMcv'@~f<ټ? spline  rbblnsur blendsupsur conehK@Q@f@?@? ?@ null_curve nullbs@@Q@e@ blendsupsur toruswA@Jf@?@? null_curve nullbs@@Q@e@ intcurve  offintcur nubsMG?G"kHP @ڏQ@.ЈC{ @vWs@enq @Un @!@@Ls#@PxZ%@O>&@"Zo'@?t)@E*@tf|,@b.@s ]0@dfd2@3@IJk4@ENw@I X,f@#{ @ I5%f@]A@>}z Jr\!f@ͩ'k@gwJa(Hf@ҳmdQ@FJcռ`| f@]뮒@%=HKƜ&f@ @>QK$`N,f@\tM@j .K J9f@n9@oҶc LZQ@f@FX@TML@1Pf@mʮ@\fL=Wf@L2@=W:Ldf@!jL@orF LKkf@!߸@D_ML+uf@Q3ʎ@}K>LSyf@ X@Lk~f@hlzS@_]Lf@ξ6R@%Lf@jK__@>$L| @[~f@U6I@ LΌxf@ /@4_8LiVsf@==@5YT;L\gf@^:9@:Z1L!f`f@1M@:LQxRf@m>@0oLrKJf@T@w%Lw ;f@$>1@L%I3f@J0@$ Lw;$f@G4!@Z3LI`DIf@ldփ@WLXf@8@~zLo f@z.@'tKLOf@n筸@:-L,K|7f@,Pɶ@X_GKXe@ܵ@¿o֭K7e@]^-@fU&/Kg-Ef@Fօ@&5JW2`f@r@gZ_J#7zf@pXਲ਼@M(R2Jf@t7@zsIݷG"&f@i̩@l9 I°*f@yZ@@IYf@@@ toruswA@Jf@?@? conehK@Q@f@?@? ?@ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?~f<ټ? ?? !@'#@ػ$@jzG'@e۰h+@/y/@fD- 2@XGN\3@IJk4@~f<ټ?3nG#xFI"@S-蝬"@86X#@@Ls#@ u#@h\/:$@\5$@PxZ%@9 a%@ɴ%@s"&@O>&@h7bK&@0?'@)'@"Zo'@=Z(@XXcͭ(@(s)@?t)@d)@6*@\?o*@E*@a+@/5(a+@vy4,@tf|,@P 'n-@,Uu-@|S.@b.@kPFB/@h=/@edK0@s ]0@ E0@-.1@2.naW1@Fl91@Z1@n 2@&0J2@dfd2@?Q2@(? 3@,P3@3@6/,:^3@nZ !4@zg4@ null_surface nubs!@!xYMcv'@?!@?!xYMcv'@ nullbs   tcoedge coedge  ` _ o ;  <+L .@+0@ tedge edge   q ] h?  = tangent ܼn(C? pcurve    exppc nubs] h?+L .@VMu<+L .@MbP? spline  ref tedge edge   >: buV%? ` ? tangent {[eJ? pcurve    exppc nubs:uV%?T0@?B[@.0@MbP? spline  ref  point  dN)#S@Mv(K'Of@straight curve  @JbKf@ tcoedge coedge  g f @ A h B?[Ec&@SF; @ tedge edge   C< jV%? < D tangent a e? pcurve    exppc nubsV%ؼ??[Ec&@^ɳK=?[Ec&@MbP? spline  ref  tedge edge   Er  ,h? g F tangent 9CI? pcurve    exppc nubsr ,h?VO?!x @VN?Օ @MbP? spline  ref   face G H h  I  point  D+i@(K%qVf@ coedge  J m   P  coedge  m J o S P  loop  J K ellipse curve  @N`f@x+R?lvlv\[1%~? 0Z 0Z? coedge  p o i L q  edge   M<;JV? r-DT!? O N tangent  face O v q  P  point  |@N`f@tedge edge   x XQT!? t Q tangent (҈l? pcurve    exppc nubsQT!rL#1-DT! @E'1-DT!?MbP? torus@Mf@x+R?@?x+R< tvertex vertex  V R->ellipse curve  |@Mf@UUUUUU? qq5 -DT!?ftreemeg attrib  v  torus surface  @Mf@x+R?@?x+R<  point  @IbKf@ftreemeg attrib  {"  face S T U  V  loop  W { plane surface  Dxgzǒ@Qڂf@ t ~:ƿt ~:ƿ ? ftreemeg attrib  ~  face X L Y  Z spline surface   ref. tcoedge coedge  j i [ \  ]4P h? tcoedge coedge  ^   f p _,T!D^Q< tedge edge   lD^Q ,T!? e ` tangent ;I% %? pcurve    exppc nubsD^Q-p8R?Zp8R?,T!?pp8R?Ʀ?,T!?ܪ3n0>d dV,fgW6,@?40ٕI?I[TRA?R&SdZ1?] gc3տt>uf\?eː? oūWt?;\0>7 S>̴׿SB2>>?ǿ(Sc=MbP? spline  ref  pcurve    exppc nubsQT!???o bMbP? spline  ref  coedge  d  R L   coedge   d ^ a   pcurve    exppc nubshhF?_ DT!  ~ coneT@@Kf@? ?@ -DT! } vertex  f bellipse curve  2T@wnM f@v,Jb=?.4۽T=??  pcurve    exppc nubs] h?|;LԠ@-DT! ;LԠ@l} cone@ң"בLf@ޛVۼ<? ?@ -DT! }tcoedge coedge   c @ ; p d+0+L .  loop  e T  vertex   fstraight curve  @ң"בLf@@  point  @ѣ"בLf@ coedge  w  g h   edge  iMF!CC=  %p<  j unknown  coedge   w     coedge  v t k l   face m ~   n  point  aJT9_@ΏR@3Ce@ vertex   ostraight curve  @rwqSPe@? RUF [nxRb@ftreemeg attrib  7  face p q r  s  loop  t  cone surface   @?/S@e@?΀¸O<j\sQ?LF@lv? @  coedge  u v  w   coedge  x  y z   coedge   x  w   coedge        edge  {< |-DT!?  } unknown  edge  tvS R  ~ tangent  coedge        edge  _@ bE`@   tangent  coedge        coedge        loop     vertex    vertex   straight curve  xGT縒@Py*f@ ~:? =m? )֤('@ coedge        coedge        edge    D^ h?   tangent  edge     h? N  tangent  face  K     point  @P`f@ coedge        loop    ellipse curve  wA@Pf@?H!Z?|b@? Ļ3O| ?ftreemeg attrib  1  face      cone surface  wA@..!@f@?!Z?"|b@? ?@  coedge      z  edge  @N z˓V9 v  unknown straight curve  @rR@e@?  coedge      z  coedge        edge  >JW? v,DT!?   unknown  vertex   straight curve  _u@ Q`f@`-9?j?z6  point  Hf@Qޓf@ftreemeg attrib  O  face      cone surface  L@O@e@?lvlv@? ?@ ftreemeg attrib  E  face       loop    cone surface  x@J@e@lv@lv? @  coedge        coedge        loop    straight curve  x@J@`f@  coedge        edge  "    tangent  point   @J@`f@ coedge        edge  $@ X@   unknown  vertex   straight curve  @E@`f@ ? {cD@ftreemeg attrib  ]  face      plane surface  @J@`f@? ellipse curve   @E@e@? H H?  point  @E@e@ coedge        edge   "@   tangent  face       point  P@J@`f@ coedge        edge  $@ X@   unknown  vertex   straight curve  x@E@`f@? {cD ?@ftreemeg attrib  `  face      plane surface  x@J`f@? ellipse curve  P@E@e@? H@ H?  point  x@E@e@ coedge       ftreemeg attrib  d  face      plane surface  D@H@@e@  coedge        coedge        coedge        edge  @ @[@   unknown  coedge        coedge        vertex   ellipse curve  x@Jd@lv@lv?  coedge        edge  $    tangent  point  x@Ld@ coedge        coedge        edge   pFGs&4@   unknown  coedge        coedge        loop     vertex   straight curve  4@Zd@OL2?>%  edge   {*@   unknown  coedge    v    point  4@Zd@ coedge  v      edge  -DT! -DT!?   unknown  vertex   straight curve  4@O@e@? ;`< ;`2@ vertex   straight curve  L@L@e@ ;`2 ;`<@ coedge      \  coedge        edge   Ͷ@ %@   tangent  coedge        coedge        loop   9  vertex   ellipse curve  ؒ@N@e@?lv@lv? 0Z 0Z? coedge        edge    ] h?   tangent  face  5     point  @N@e@tcoedge coedge       <S!? tedge edge   < S!?   tangent pZqd? pcurve    exppc nubsS!8+1-DT!?T^)1MbP? torusؒ@Me@?@? tvertex vertex   KK?ellipse curve  @Me@?  -DT!?tcoedge coedge    '   lRnC= tcoedge coedge       zj h?  loop     pcurve    exppc nubs)b;(g.P?)b;@?(g.P@MbP? spline  exactsur nubs ??(g.P@6,@!:S@̭!@KT%@E%@&@WE&@c4X'@ @sQ2'@swy'@W'@ndb(@l͒@Lne@94͒@X3 \Ld5e@b̒@ҦqL$e@1l˒@ϿLS8e@[s'ʒ@ K<51e@Ͷʒ@$ SKfe@|͒@;VLH.e@Z͒@U5aL6}e@Y͒@n&@.oL+~Ae@ҦV̒@[QL2+e@lS˒@"|Kl7e@R˒@!Kdb~e@"Β@N#L}e@DRΒ@ɭL޵e@JΒ@lLQU'le@QaN1͒@LS+LLe@ݝӳ̒@QI"KV e@Qf6̒@?K |e@D@iϒ@Ph`Le@ϒ@LL69e@ϒ@$gLTT5e@o~ϒ@=Leּe@l5ƷSϒ@rKJ2фe@X(ϒ@qKԾ[zye@В@$9f#L.ee@7В@NoOLWe@В@&މfLq9ʛe@xeВ@?OkLwX9e@%ђ@Kq$K=\ge@XL1 ђ@pLK)Fye@Ϫ9OӒ@Loe@esHӒ@ޣyoמLI=we@EӒ@NkL+e@Ԓ@\LWmąe@FWlLՒ@/KI/e@-BՒ@!ŵ0MK&k<$|e@~xԒ@l LIe@>Ԓ@:TL>-?e@Ւ@n kuLMy@e@37j֒@kQL`'e@ג@"SKD.ˍe@1cRؒ@|tKiX e@^]ג@vf&LYv e@>'ג@ysL腷e@qג@%#LVĴe@5l:+ڒ@Jm Ɓ!L2Me@bے@Lw:e@>ݒ@%Kk@e@ -ג@w|٭Me@4ג@vAL!le@/iؒ@ u}LWre@9/Eے@"xLVe@)ݒ@pLzSe@:2Eߒ@LUe@ʸhؒ@EKLӫe@#^Oؒ@2ҐɨLH ..e@cVْ@]koL,~e@|9ے@n aLM2e@ݒ@⅝K Ke@I` @û(KIk4e@lؒ@nN\L qe@bSؒ@P3 L+oe@ْ@(]oL7e@= ے@w;Lph Oպe@oޒ@E0ƣK1)7e@ysB@5$K!e@Xwؒ@LXL{eT>e@u]ؒ@QeL.|fe@·%ْ@{R nLe@Hܒ@!LuJ檻e@ bޒ@}f?K()e@'@`IKfĘe@HF~ؒ@s>LUse@/Jcؒ@"!+Lpe@O,ْ@a1mLƶFe@ߘH ܒ@ҜmL p.e@ vޒ@Kbbe@x[4@uXAKԙ9e@Fؒ@ L)Ge@\Qrؒ@ YLCYe@z<ْ@HjL3ʕ3e@&@"ܒ@]Z L e@po9ޒ@x@K}e@ZJS@KP1"!e@ =ؒ@Lûze@Ky{ؒ@LL)]L)/8e@#Fْ@\iLe@vS/ܒ@ʛU L SXe@rHޒ@hpKFe@Jd@MKV,|e@ Pmؒ@R$WL_P 2e@z zؒ@iFyL=e@KkYْ@̼fL9se@6 Gܒ@`] Lũe@i&Icޒ@QyK߂7e@]@1KE-A@K^e@\jؒ@| L[ge@k@ؒ@ݨTCL1&we@otHqْ@,?`L[e@5dܒ@jMLm6je@#ޒ@"KŒV2e@F)0@"~n4K e@xhؒ@B#L#(e@ؒ@QmڟL}y\e@\Nyْ@v__L0*\e@(2nܒ@-aؤYLHe@ޒ@+%K7Ee@YbF@X0[{Ktve@;Oؒ@:-JLDBe@i;ؒ@MOL礤e@s~ ~ْ@uO]L1e@4'sܒ@ VhL@7ke@Аޒ@,T5Kqe@@)_K}Oe@wؒ@Ƀ FLp/Ce@3ؒ@'!LXHuYe@.ْ@Z\0hZL)>.e@>ܒ@L'9e@ޒ@gK Ĩe@ZV^@l:]K%Nle@ؒ@B L/4e@ oؒ@ MfeL䟕e@+ԟ’@p]MD;`^e@tÒ@LrKԧe@˩>|ƒ@Lc/L|e@Ϙ04Ȓ@L貦re@Hn˒@}8L<$2,Iee@[z͒@PH6L"#Eae@ Kyђ@ QL;Q6G_e@'Ӓ@MCLU%ae@$Z|ג@p鉠Lifje@ekgْ@F)RL§9re@O[ܒ@($L{ee@+9ݒ@ \'LODqe@M,Fߒ@[ouM!e@^]>ߒ@ALK e@@$xLj9ye@=gH@#1e#LL2+e@"@cLue@*@673QLņUle@^x@^L6e@@ q Lne@@@ cone@Je@?lvlv? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?PTRE? ?? (g.P@6,@!:S@̭!@KT%@E%@&@WE&@c4X'@ @sQ2'@swy'@W'@ndb(@PTRE?-@ /C@d}FM@Ğx@#j5@Jý@H?@gc^@nu@5A\@3@Q"@@phC(@B 2` @VaB,!@!@Ap}"@mWV&#@F-#@b1F$@ni[$@h߄4%@KT%@*}&@t^&@"DM&@'@, '@=(@ null_surface nubs(g.P@)b;@?(g.P@?)b;@ nullbs    point  Ͷʒ@9SKe@tcoedge coedge       j hz: tcoedge coedge       ] h?  loop    straight curve  @@bKye@  point  ؒ@AbKye@ coedge      \  coedge        edge  @ @W@   unknown  coedge        coedge        loop     vertex   ellipse curve  @F@@e@?lvlv@?  coedge        edge  $    tangent  point  @H@@e@ coedge        edge  -DT! -DT!?   unknown  vertex   straight curve  ,@H@@e@ ;`2 ;`<@ftreemeg attrib  R  face      cone surface  ,@K@@e@?lv@lv? ?@ straight curve  D@H@d@?  point  D@K@d@ftreemeg attrib  Y cone surface   @E@`f@ H H@? $@ ftreemeg attrib  V  face  A     loop  !  plane surface  4@L@d@?  coedge   ! " # #  coedge  "  $ % #  face & ' #  (  coedge  % ) * +   coedge  , " % # -  edge  $zJ4p@ .`~S@ " / unknown  vertex  # 0ellipse curve  @>y\3mS@d@<\AW<!&Be@ô3ʒ@iwKsYe@[ɒ@}.%K e@#qsR ϒ@oƅLpmpe@Β@L)he@.oΒ@-!dL0I2e@}͒@C7LԡKe@0w̒@55KLQ3e@7F܎̒@wqKY !ze@n YВ@LZz$e@ ~ϒ@E~LUKge@V ]ϒ@&!wOLHJԛe@I,@A[C^Lde@+?m@W9nLx~ e@@dLfׯe@ ’@"ViLSjɫe@Ē@v_~LhEe@N ƒ@p!Le@Y?1ɒ@\7L$oe@'ʒ@p)L phe@@ƫ Β@=q LΌae@JBϒ@pQLղxz_e@pӒ@ T~L˒F`e@9Ւ@_Q-^L-vMde@ؒ@rULfB6 oe@Eshڒ@>K we@~k;ے@)BKM soe@@@ sphereͶʒ@Je@-n(C? pcurve    exppc nubsRR[ h?>_{|@-DT! =_{|@} cone=1y@أ"בLMf@t ~:ƿB`\5< ?t ~:ֿ? ?? -DT! } face 9 : /  ;  point  ΍ ,-Ē@VbK3]7e@tcoedge coedge  3 2 < = 4 >U%@з(@  pcurve    exppc nubs[ hRR:?U%@TMu<U%@MbP? spline  ref) tedge edge   ?Xؼ WFR? 3 @ tangent ZOрK? pcurve    exppc nubsXؼFR?2:ʕ?H~(@H#?R(@MbP? spline  ref)  face A B 4  C ftreemeg attrib  9) torus surface  ؒ@Ne@?@? tcoedge coedge  < ; D E = F!@"xYMcv'@  pcurve    exppc nubsuV%:<?!@\>!@MbP? spline  ref.  pcurve    exppc nubs<V%?BK1 ?]J v'@r;?!*Xv'@MbP? spline  ref. tedge edge   q+L .@ >+0@ o G tangent Oo'? pcurve    exppc nubs+L .@+0@+L .@+0@MbP? spline  ref ellipse curve  wA@ף"בLf@0=@? tvertex vertex  ; H[f}?ellipse curve  aK@ ŁKLf@ ߴsAaK?_Hl=|=P?? tcoedge coedge  I 5 G A _ JSF; ?[Ec& tedge edge   C?[Ec&@ ESF; @ @ K tangent 4{v9? pcurve    exppc nubs?[Ec&@SF; @?[Ec&@SF; @MbP? spline  ref  tvertex vertex  E Lc?ellipse curve  i,@'KL> Kf@MzƿTbKuݎ9?p?z=}:?? tvertex vertex  A M4M.?ellipse curve  @nW@U$בL.~:f@Dg ~:ƿZ+=??Kd ~:?? ftreemeg attrib  L  face N / O  P spline surface   ref  tcoedge coedge  O N Q R P S?T!  face T T P  U  edge   X @ M @ R V tangent  vertex  S Wellipse curve  |@Nf@?x+R@?  -DT!?ftreemeg attrib  T cone surface  |@@Kf@?lv@lv? @ ellipse curve  @EMf@?@3>ϘT @?  point  ;tՈ@Mf@ftreemeg attrib  ^#  face X Y p  Z  loop  [ ^ cone surface  '0В@Qe@?@? ?@  coedge  \ ] ^ _ _ ftreemeg attrib  b  loop  ` b spline surface   exactsur nubs ??Pt!(t.GQ %)= M{N$6ۿT@Nf@AVȌ@Nf@=@NY+Qf@w6@NŮf@Н@Njf@sՈ@Nf@T@IXNf@AVȌ@7NNf@=@ɝےCNY+Qf@w6@1NŮf@Н@*Njf@sՈ@pK&Nf@z>@Hj1Nf@0[O@j UNf@^%ዒ@a)NY+Qf@#>:{@0FMŮf@?@J\Mjf@nqj@.LMf@6T<@vةMf@n+6@4!Mf@0@(MY+Qf@kx@ɴ1eMŮf@&ȋ@ SLKMjf@v_@Z;Mf@5 M@r^Mf@J@,3ŮMf@<Տ@1"MY+Qf@l{@$i7MŮf@tw@ITMjf@JE3э@d,Mf@]Δ@%Mf@@,kMf@j?@=ޙDRMY+Qf@KX@dL)LŮf@t1Õ@W2Z_Ljf@Ƹٕ@F}hLf@8+Xw@X#Mf@uAi@<ټMf@Z@ĢfkMY+Qf@';@:MŮf@lf@FاHMjf@9r@L Mf@G@BRp[Nf@ P@&|yQNf@HG@2TGNY+Qf@Lv@ 376NŮf@/C@fj&0Njf@>Uơ@H),Nf@US9뙒@#Nf@z)P@1+yNf@@3$@1РNY+Qf@W1ן@mP:NŮf@r~@ޭ{9Njf@ٺ@;Nf@yփ|@_#Of@'@dp@)DOf@S7bc@sonOY+Qf@ E@rlOŮf@Y@MOjf@*@rUzOf@&@a?6Of@WU+@NПgOf@V@OY+Qf@/i@ OŮf@Z湗@fPjf@a闒@Լ Pf@Iu@[ 4Of@ @FxeOf@@H2Gu-OY+Qf@Tꐒ@cOŮf@Nf@g_@@P"NY+Qf@&$ӈ@`yNŮf@uO͇@;^Njf@P?41@ozUNf@T@k$Nf@AVȌ@XNf@=@gNY+Qf@w6@PkMNŮf@Н@mNjf@sՈ@ƏNf@T@Nf@AVȌ@Nf@=@NY+Qf@w6@NŮf@Н@Njf@sՈ@Nf@?Pt!(t.GQ %)= M{N$6ۿ ?  ?  tcoedge coedge  Q a d \ Y b4P h tedge edge   M c4P h? d d tangent W7ün(C? pcurve    exppc nubs4P h? } -DT!  coneT@@Kf@? ?@ -DT! } coedge  e e j a p  pcurve    exppc nurbs,T!*T!<hK@@x(@?v % @lR{(@$k?~MaP@*)(@?BG O@Y,'@Q*k?> O@%@?:0yE> plane4T%@Qf@5^<?5^< ellipse curve  +@^aMf@ȼ&_8L#FJ=,nŭT=?  edge   c l ^ f tangent  point  T@Mf@ coedge  o e g h p  pcurve    exppc nubs+0si0+L .4T%Tњ(@A_JCq:(@;nQ^(@cky}(@628G9(@6ަpu(@CDcopu(@? plane4T%@Qf@5^<?5^< tcoedge coedge  c i j k p l}3)% h}  point  wA@ϣ"בLf@ coedge  $ m t h   edge  i"|$a naDž5,+#@ g o tangent  vertex  % pintcurve curve   surfintcur nubsA-y?-y?D6/\?-y@_yms:@^yƌ @u t @@G7;@Nzнa@-@o@c2 6@~i@R7@^sЂq @I=!G!@5"@a #@}%@O̜W&@&2'@zK(@2 N(@:Lɘh)@e*@&[h+@P,@ߥ-@7.@"/@^sЂq0@0,0@1@TE2@"͆2@">3@r"3@"T 4@ңv4@0A<4@3DI5@۾:75@a0|$6@76@"*7@Xȱt?8@ 8D8@9@ vF9@Q@TU:@!}@ 0;@@6Q;@^, <@^Kt<@xxw<@G=@n7l=@473;>@7>@TcBM?@"?@wP-@@^sЂq@@@>y\3mS@-!rXe@@ u!yS@-!rXe@J2@진S@P=aWe@R@K=oS@,&F8Ve@Y܃@<@S@ŸTe@㠠 @ZeOS@;Qe@V@ppQS@k|Pe@w;@S@EʅLLe@tyy@!S@M!Je@õV]@8?`S@>d\Ge@Ss/臑@)&S@2QÈEe@-]n@D&i T@7Be@ @3,)T@]!Ae@,T@L 7Je@:M@d+T@mLe@ZH@7(T@Qe@>O|i@6[8&T@F~tZTe@uj@T@Gl]e@L @|?T@AZde@@<@|  T@Ϯ]se@ef,@csT@{c4{e@z9@){lT@g)e@̮˗@@ttS@ste@(I;@PqQ"S@|te@@89S@ue@@89S@e@z9@){lT@fPֶe@ef,@csT@脜:e@@<@|  T@1Qwe@L @|?T@Dme@uj@T@zTe@>O|i@6[8&T@Ye@ZH@7(T@l4 e@:M@d+T@zF=e@^rVj@>,T@Re@Qe@j,`-T@9&me@)$<܏@¨ .T@"e@NupD@z.0-T@ҟe@-@D+T@IPe@ @hr*(T@Kܘde@dNy@$%T@!f@W` c@8xXT@ۊ2e@`Hge@R@K=oS@be@J2@진S@ e@@ u!yS@_nލe@@r}ȖbS@_nލe@J2@oyWS@ e@R@{H@S@be@Y܃@@5S@>`Hge@㠠 @xH^iS@bgH&e@V@ cHS@e@w;@nMS@5ze@tyy@KR@HZNe@õV]@DR@›X=e@Ss/臑@^R@ή+R@Re@:M@Er2R@zF=e@ZH@qrR@l4 e@>O|i@].R@Ye@uj@GR@zTe@L @qyR@Dme@@<@RR@1Qwe@ef,@KUR@鄜:e@z9@=(R@fPֶe@̮˗@<*DR@#>e@(I;@,gD.R@ e@@vR@O|i@].R@F~tZTe@ZH@qrR@Qe@:M@Er2R@mLe@^rVj@>+R@L 7Je@Qe@@̭R@Fe@)$<܏@I᪭R@ak]De@NupD@b6R@T -`qBe@-@8fJۯR@|Ae@ @tFԍR@#g@@e@dNy@h~R@?e@W` c@Dzh_R@%u3@e@d\Ge@tyy@KR@M!Je@w;@nMS@EʅLLe@V@ cHS@k|Pe@㠠 @xH^iS@;Qe@Y܃@@5S@ŸTe@R@{H@S@,&F8Ve@J2@oyWS@P=aWe@@r}ȖbS@-!rXe@@>y\3mS@-!rXe@kOFRi@? cone@rwqSPe@lv@lv? @ cone@>y\3mS@@e@6%? straight curve  Hf@..!@ޓf@? BH6AV l)6Q@ coedge        loop    straight curve  }gxb@@ M@jw!lTe@ i ?- nl=ma@tcoedge coedge       ;@݆mW!@  coedge        edge    B?   tangent  coedge        edge    >h?   tangent  face       point  Hf@Pޓf@ point  }gxb@@Pjw!lTe@ coedge      O  edge   H@ ;LԠ@   tangent tcoedge coedge       0}@}3)% @  vertex   ellipse curve  wA@Pf@??  -DT!?tvertex vertex  R h->ellipse curve  @Pf@??  -DT!?ftreemeg attrib   cone surface  @Pf@x+Rx+Rlv@lv? @ tcoedge coedge       `r7@% $@  face      ftreemeg attrib  2 cone surface  Ͷʒ@ M@e@?E!Z |b? @  coedge      z  coedge  k    r  edge   U"{@   tangent  vertex   ellipse curve  @ieRe@H˪?6j Ce<@n??  coedge      z  coedge      \  edge  *zJ4p@ k2G>@   unknown  coedge        vertex   ellipse curve  Ͷʒ@f'I=Qe@H˪?5j Ce<nĿ@>?  point  }gxb@@X&Qjw!lTe@ftreemeg attrib  P  face       loop    cone surface  L@O@d@lvlv? ?@ ftreemeg attrib  F  face       loop    cone surface  x@J@@e@lv@lv@? @  coedge        coedge        face       edge  -DT! -DT!?   unknown  vertex   straight curve   @J@`f@? {cD ?@straight curve  @J@@e@  point  @E@@e@ftreemeg attrib  ^ plane surface  4@L@e@??  coedge        edge  -DT! -DT!?   unknown  vertex   straight curve  P@J@`f@ ? {cD@ftreemeg attrib  Z cone surface  P@E@`f@? H@ H@? $@ straight curve  x@J@@e@  point  x@E@@e@ftreemeg attrib  a plane surface  x@J@@e@??  coedge       ftreemeg attrib  e  face   -    loop    plane surface  @k%Rd@?;v@Qii  coedge        coedge        coedge        edge   $@   tangent  coedge        coedge        edge  -DT! -DT!?   unknown  coedge        coedge        loop     vertex   straight curve  @L@d@  edge   $@   tangent  point  @Jd@ coedge        edge  @ 1@   unknown  vertex   straight curve  x@L@e@? nēL3 ۈ'"@ coedge        coedge        edge   $@   unknown  coedge        coedge        loop     vertex   straight curve  g+߈@Tq\d@@%dOL2  coedge        edge   3@   unknown  coedge        face       point  g+8@:;]d@straight curve  4@Zd@?  edge  |!#.@ F@   unknown ellipse curve  L@O@e@lvlv@?  point  4@O@e@ point  L@L@e@ edge  {@` _   tangent  coedge        coedge        loop     vertex   straight curve  @P@e@?   @ ؈'+@tcoedge coedge       PS!T{C=  edge   huJV? -DT!?   tangent  point  ؒ@P@e@ coedge        edge   : 69   tangent  vertex   ellipse curve  @Ne@??  -DT!?ftreemeg attrib  * cone surface  @ e@lvlv? @ tcoedge coedge       ] h tcoedge coedge       >h?  loop     pcurve    exppc nubs<S!??,H@M?MbP? spline  exactsur nubs ??j6?P$?v@ @A @{jD@̎y @Pt!@ؒ@"בLe@ؒ@jLe@ؒ@t3pgLY+Qe@ؒ@&LŎe@ؒ@Kce@ؒ@@bKye@}$ؒ@"בLe@ݶؒ@jLe@@ 6ؒ@t3pgLY+Qe@[˭l"ْ@&LŎe@$=ْ@Kce@tLْ@@bKye@hk$ْ@l\ZLe@b-P$tْ@kLe@2ْ@㜁 lLY+Qe@KpIڒ@9bLŎe@a͐~ڒ@Kce@+ڒ@3SKye@ڒ@!7{Le@#Aے@;?̡Le@uے@I݁LY+Qe@ ݒ@6LŎe@Џ˖ݒ@UWLce@H;ݒ@YLye@;rq]ے@T~Le@RyKHܒ@ćLe@.2ݒ@+HLY+Qe@^ޒ@mEVLŎe@%iYߒ@:Lce@xߒ@^l*Lye@gܒ@9Me@6X~Cޒ@+yMe@]ߒ@ILY+Qe@e )@b}LŎe@@Lce@ԋlI@XɷLye@!a"ݒ@bDMe@Zߒ@ 4Me@usRc@%5$MY+Qe@uܖ @/ MŎe@pDS @vXLce@!R@m`oLye@Lէݒ@ӼѿMe@aaeߒ@ol Me@r@no'PMY+Qe@K8@[MŎe@杒ױ@GWsMce@ovT@S8/Mye@ +W!ݒ@}@(Me@Bzdޒ@SMe@Wߒ@T NY+Qe@oC@0!h>NŎe@Q4@iONce@z@"8ZNye@v9?ڒ@4Ne@^9 ڒ@{ifNe@jv4xے@λKNY+Qe@~ܒ@'NŎe@2cܒ@ Oce@'ݒ@&DOye@NGtfג@J[BNe@Hݍג@ TXwNe@ ڏג@6;NY+Qe@s}nג@A'_OŎe@L)naג@ɩd(Oce@#fYג@p#C=Oye@%0 Ӓ@ Ne@#aҒ@;D=?  point  *w@6Mye@tcoedge coedge       (g.P@)b;@ tedge edge   "Y=< (R? '  tangent h(K? pcurve    exppc nubs(R"Y=~7?(g.P@*a$Ĩ=(g.P@MbP? spline  ref= tedge edge   z j h?   tangent T ]SG? pcurve    exppc nubszj h?f(?' ;@? ;@MbP? spline  ref=  face       point  '0В@*K@ye@ coedge        pcurve    exppc nubsj hz:Ud@ Ud@@ET!  cone@"בL_e@? ?@ -DT! }tedge edge    ] h?   tangent Ln(C? pcurve    exppc nubs] h?@-DT! @} cone@"בL_e@? ?@ -DT! } face       coedge      \  coedge        edge  -DT! -DT!?   unknown  coedge        coedge        loop     vertex   straight curve  Ԓ@H@@e@  coedge    ! "   edge   #$@  $ tangent  face % &   '  point  Ԓ@F@@e@ coedge  !      edge  @ 6@  ( unknown  vertex   )straight curve  @H@@e@? nēL3 ۈ'"@ellipse curve  ,@K@d@?lv@lv?  point  ,@H@d@ftreemeg attrib  S  loop  *  cone surface  ,@v1Od@5j Ce;T̆b!y\3mS@@e@6 unknown  coedge  0 " < ? -  loop  "   vertex  # @straight curve  @n%R@d@?  point  @>y\3mS@d@tcoedge coedge  ' & A B ( C0⣔_Ak`  pcurve    exppc nubsFRX<я?*__MbP? spline  refB  pcurve    exppc nubs"Y=<(R?ٽz>1P.?C_IMbP? spline  refB  face D E (  F  coedge  @ \ + 6 _  edge   Et%8B@ 7=_{|@ 5 G tangent  vertex  6 Hellipse curve  Jj@"בLe@Oq ~:ƿ=/? ?N=t ~:?? ftreemeg attrib  /  face I 5 J  K cone surface  =1y@أ"בLMf@t ~:ƿB`\5< ?t ~:ֿ? ?? -DT! }tcoedge coedge  L A 1 = U Mз(U% tedge edge   7U%@ ?з(@ < N tangent Ѳ)? pcurve    exppc nubsU%@з(@U%@ з(@MbP? spline  ref) tvertex vertex  = OxC?ellipse curve  {Ò@ L~e@I;+^V?5?TXYF?vD?? ftreemeg attrib  5   face P 4 Q  R spline surface   ref) tcoedge coedge  g S 8 E T U"xYMcv'! tedge edge   >!@ C"xYMcv'@ D V tangent Phݹ3w? pcurve    exppc nubs!@"xYMcv'@!@"xYMcv'@MbP? spline  ref. intcurve curve   bldcur+L .@si0@+0@? spline  ref null_surface nubs+L .@+0@+L .@+0@ nullbs    point  hK@+ŁKLf@ coedge  ] @ S W _  pcurve    exppc nubsSF; sK!?[Ec&4T?Do(@b"?`#(@SlV?!(@?,p?\:\S(@d?@wb(@6t?VO(@[Wj@dњ(@t'? planeDxgzǒ@Qڂf@ ?t ~:?t ~:ƿ ? intcurve curve   bldcur?[Ec&@sK!@SF; @t'? spline  ref" null_surface nubs?[Ec&@SF; @?[Ec&@SF; @ nullbs    point  L ƒ@PKLd}:Vf@ point  Q7ǒ@p$בL4'W!f@ftreemeg attrib  H  loop   H cone surface  @.\(n5Of@?ޛVۼ? ?@ -DT! }tcoedge coedge  ` [ J R Y X?T!? tedge edge   M ?T!? J Y tangent l҈l? pcurve    exppc nubs?T! M#1-DT!E'1-DT! MbP? torus@Nf@x+R?@?x+R< ftreemeg attrib  K torus surface  @Nf@x+R?@?x+R< straight curve  sՈ@@Kf@  point  sՈ@Nf@ftreemeg attrib  T$  face Z ^ T  [ plane surface  4T%@Qf@5^5^< tcoedge coedge  \ ] ^ _ U ` 0v&hwmFj  coedge  5 W L a _ tcoedge coedge  W I b c _ d% $`r7  coedge  e f W _ g  edge   h> iɼ= W j tangent tcoedge coedge  a Q  k Y l`h? tcoedge coedge  [ ` e m Y n QF=aT!?  pcurve    exppc nubs4P h?MbP? spline  refN  vertex  a oellipse curve   T@Nf@?8T͙?? tcoedge coedge  i ^ a m p paT! 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" unknown  vertex   #straight curve  Ԓ@F@@e@ ۈ'" nēL3@ftreemeg attrib  H  face $  r  % cone surface  @F@@e@lvlv@? @ straight curve  Ԓ@H@d@?  point  @H@d@ coedge  &   '   coedge  ( ) * +   coedge  { ! , -   coedge  !   .   coedge   / ! /   edge  0 1@ ! 2 tangent  coedge  " , 3 3 -  vertex  % 4straight curve  @>y\3mS@@e@? oēL3 و'(@ coedge  5 $ 0 3  ellipse curve  @>y\3mS@@e@ü\AW¼?! v  coedge  * ? , ? v  vertex  + @straight curve  @TT@d@¸O??  edge  . 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 ?  ellipse curve  ג@bNye@?h&>SU ?  point  ג@PrPye@ coedge        pcurve    exppc nubs>h:89@*H9@GT!  coneFqݒ@ _e@?? ?@ -DT! }tedge edge    Y h?   tangent n(C? pcurve    exppc nubsY h?:@-DT! :@} coneFqݒ@ _e@?? ?@ -DT! } face      tcoedge coedge       R!l _c tedge edge   l _c: R!?   tangent Ϲ? pcurve    exppc nubsl _c:p67R?p67R?R!?p67R? (Ŧ?R!?s 2>>R?R>9?޾e-??mA^0 ?܉c?9 ? x?C-(>O?(Z +?J(?Lx%q;?;_ē?}S4B?%a?Y]+0?@NI?ysDUL0Hù@ه.$?ԗ@MbP? spline  refT  vertex   ellipse curve  xFqݒ@M`e@!Qǎ=?t"=p2?? ftreemeg attrib    face      spline surface   refT  pcurve    exppc nubs)b;qHssY#I@ x(g.Pt@)DT!?u@2b?pJe@U7I?BW@T$%?ȣͣ@Fq?( [@&sR? \@x`G?QG@ *?HGf@l%绰?rPy@dvO?`V@:c?{Gc@1>r?`{@̫@MbP? cone'0В@Qe@?@? @ intcurve curve   bldcur(g.P@6,@)b;@PTRE? spline  ref? null_surface nubs(g.P@)b;@(g.P@)b;@ nullbs    point  l͒@4LTse@ point  '0В@F"בLe@ftreemeg attrib   cone surface  ׼@%\(n5OVWf@t ~:?Gm]= t ~:ֿ? ?? -DT! } coedge    \ K   loop    straight curve  @"בLe@@  point  ؒ@"בLe@ftreemeg attrib   spline surface   ref}  coedge  *      edge  -DT! -DT!?   unknown  coedge   !     edge  @ #@W@   unknown  vertex   straight curve  Ԓ@F@e@? nēL3 ۈ'"@ftreemeg attrib  M plane surface  Ԓ@H@@e@? ellipse curve  @F@d@lvlv@?  point  Ԓ@F@d@ftreemeg attrib  &I cone surface  @y\3mS@@e@ coedge   3 ?    coedge  |  8 7   edge   ;$@ 8  unknown  coedge   9   :  coedge  9  ; > :  loop  8 n  vertex  7 straight curve  dތy|7@V@d@?¸O  coedge  s ;   v  edge  = 3@ ;  unknown  coedge  < x 5  v  point  dތy|@ AV@d@ vertex  ? straight curve  @TT@d@?  pcurve    exppc nubsAk`@ iTR@=̑@&$@8@@0⣔_@,?{@̫@ 0~@a@܏g~Ɨm@@zp@$o$+i@Lq@d@_ܤ@x5d@vИ5&@Fd@D˼A@ *i@GB@}m@lFC)7@YOv@{)@@V|@@{@@nE@MbP? cone'0В@Qe@?@? @ intcurve curve   bldcur0⣔_6Ak`c? spline  refD null_surface nubs0⣔_Ak`0⣔_Ak` nullbs   ftreemeg attrib  E  spline surface   ref tcoedge coedge  ] L   U ݆mW!; tcoedge coedge  b    Q !<V%? tvertex vertex  W 5c?straight curve  L ƒ@Qw ~:Vf@?  edge   S,T@ t(@   tangent tcoedge coedge    ] M  ĸ Uc (f tedge edge   Tĸ Uc (f ]  tangent 0c? pcurve    exppc nubs(f@4?@@uè@M^@>YG>z@de0@ĸ Uc @@E@6S@a@L`@05)@-$@C)7@8-@FB@rq6@z˼A@j6@l5&@IPc6@=ܤ@?-@z0q@9~s$@l&zp@0@ƊV<_@N@a@@̫@MbP? cone'0В@Qe@?@? @ tcoedge coedge   ^   Q R+ = tcoedge coedge  ^    Q g h?  loop  P   pcurve    exppc nubswmFj@ 0v&h@xmFj@ 0v&h@MbP? spline  exactsur nubs ??&h!Fwb1%1j׌^%aޚܿʻ(K̿t9,,w:K@^unE@{m}n@ 0v&h@7 ؒ@^p7ODkBe@Mفؒ@ˣ#tO!te@*Mْ@{zOQ[g+e@%@ ܒ@MPe@9[ޒ@iPO%e@͐Uޒ@XﭞPe@@{^oPmJe@ؒ@M)O/4e@ oؒ@򲙚hO䟕.e@>ܒ@&#;O'9e@ޒ@*̑( P Ĩe@ZV^@JbQ P%Nle@;Oؒ@n ODBe@i;ؒ@n%aO礤e@s~ ~ْ@(A@~P^e@ y ؒ@M)O|B\e@z%0ؒ@ YOXe@jbْ@ 0Ob8e@J],Rܒ@`O'ee@a' oޒ@D50nPѨhKe@H@d)P0oe@ Pmؒ@V%ۨO`P 2e@z zؒ@VWO=e@KkYْ@4CO9se@6 Gܒ@H>Oũe@i&Icޒ@>WP߂7e@]@3$2PE-PFe@Jd@pPV,|e@Fؒ@Ss (O)Ge@\Qrؒ@ QOCYe@z<ْ@V}pO3ʕ3e@&@"ܒ@^sO e@po9ޒ@ P}e@ZJS@2 }?PP1"!e@HF~ؒ@ = OUse@/Jcؒ@;BOOpe@O,ْ@*ΒOƶFe@ߘH ܒ@.cEgO p.e@ vޒ@Pbbe@x[4@ES_Pԙ9e@Xwؒ@b/3 O{eT>e@u]ؒ@PNO.|fe@·%ْ@|tOe@Hܒ@FEOuJ檻e@ bޒ@BLP()e@'@е[PfĘe@lؒ@mO qe@bSؒ@]LO+oe@ْ@r O7e@= ے@aY1Oph Oպe@oޒ@.>P1)7e@ysB@emP!e@ʸhؒ@qOӫe@#^Oؒ@-o6WLOI ..e@cVْ@xT#O,~e@|9ے@oYOM2e@ݒ@=P Ke@I` @"kPIk4e@ -ג@&RNe@4ג@tc>O!le@/iؒ@,_OWre@:/Eے@",OVe@)ݒ@Y?OzSe@:2Eߒ@OUe@^]ג@#OYv e@>'ג@MAO腷e@qג@]OWĴe@5l:+ڒ@9~O2Me@bے@wi45Ox:e@>ݒ@ uPk@e@~xԒ@1ZOIe@>Ԓ@^ SO>-?e@Ւ@c;OMy@e@37j֒@YdO`'e@ג@o=)PD.ˍe@1cRؒ@4:PiX e@Ϫ9OӒ@ b&*.Ooe@dsHӒ@#\(aOI=we@EӒ@q!` O+e@Ԓ@X1OWmąe@FWlLՒ@hPH/e@-BՒ@pg P&k<$|e@В@ƙ6O.ee@7В@2hOWe@В@!vNOq9ʛe@xeВ@ !OxX9e@%ђ@ -ZmP=\ge@XL1 ђ@YuP)Fye@D@iϒ@Y5Oe@ϒ@HWgO69e@ϒ@ hSOTT5e@o~ϒ@ xI Oeּe@l5ƷSϒ@/F(PJ2фe@X(ϒ@GPԾ[zye@"Β@X@-O}e@DRΒ@*6R`O޵e@JΒ@?vOQU'le@QaN1͒@ߒ@"OK e@M,Fߒ@~nN!e@+9ݒ@OODqe@O[ܒ@mO{ee@ekgْ@<֭iO§9re@$Z|ג@Cv_$Oifje@'Ӓ@5#3OU%ae@ Kyђ@|6O;Q6G_e@[z͒@v73O"#Eae@Hn˒@Mv,O<$2,Iee@Ϙ04Ȓ@hf~O貦re@˩>|ƒ@i O|e@tÒ@m@_%OrKԧe@+ԟ’@ZcND;`^e@87k@FOӝ>e@\[@G Oɴۻe@s?@fòOURYe@ @VrO/PrRe@M@rKYO!<@e@@@ cone@Pe@lv@lv? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?RRE? ?? &h!Fwb1%1j׌^%aޚܿʻ(K̿t9,,w:K@^unE@{m}n@ 0v&h@RRE?@rH/?pbe74JM)74JMֿ74JMƿBeSZ]?BeSZ]?W?BeSZ]?h*?.$Gp?~3`ӵ?޶ͯ@d,(-@+i2^@nfs @6@ag@4@@Y<@eL@Li@!@r@&c@,@NiJ@ null_surface nubswmFj@ 0v&h@xmFj@ 0v&h@ nullbs   straight curve  MȒ@Q=e@?  pcurve    exppc nubs`r7@% $@`r7@% $@MbP? spline  ref intcurve curve   bldcur`r7@ @% $@b'? spline  ref null_surface nubs`r7@% $@`r7@% $@ nullbs   tedge edge   h 0B i"+h?   tangent ]I? pcurve    exppc nubs"+hh 0B=׼=)OT! t=e cone׼@%\(n5OVWf@t ~:?Gm]= t ~:ֿ? ?? -DT! }tedge edge   VzA= h` h? f tangent @n(C? pcurve    exppc nubsVzA=` h?>~}>-DT!  cone׼@%\(n5OVWf@t ~:?Gm]= t ~:ֿ? ?? -DT! } point  MȒ@\(n5O=e@ point  Q7ǒ@(n5O4'W!f@ vertex  m  ellipse curve  t@(n5Of@H=Y۽T?? ellipse curve  @Nf@> nŭ? tcoedge coedge  h H q c Q  os!@ -v'@ tedge edge   Ios!@ r -v'@ q  tangent m ݹ3w? pcurve    exppc nubs -v'w&$fb%- $JTE#nž"os!k#\?`DT!qU?r@@XQwl?ԿOkɌBĜ#?޷[,-?ЀDzZm6?hAE徙j6?zZ.F Ig6?|b1&Xe2-?Ȱ'bvR#?멡0lgh?)ڿe-DT!?   unknown  vertex    straight curve   @?/S@@e@?¸O Y 42A SI @ coedge  q 6  }   edge  @ 3@ |  unknown  point  4@T@e@ point  4@R?DS@@e@ point  @%??  point  4@Z`f@tcoedge coedge    G    ;@݆mW!@ tcoedge coedge   L     Rs$= tedge edge   ac(= R?   tangent ӘK? pcurve    exppc nubsac(=R?D#?A7-@kʕ?=,@MbP? spline  ref}  pcurve    exppc nubs` hVzASMu<݆mW!@?цmW!@MbP? spline  ref}  point  ΍ ,-Ē@ΨrP3]7e@tcoedge coedge  L  O    + R?  loop     pcurve    exppc nubs(f@ Uc @?(f? Uc MbP? spline  exactsur nubs??B++_?]%) N(fS ֒@.ޅ)Pe@CEnՒ@wT,4P (,e@p-UԒ@nhn?P+1`e@ NQ^mԒ@NBKTPYUPe@\OԒ@iG]P& re@U_.^Ԓ@OθeP{@e@?Ւ@3h٥O`&ͨe@"P_Ԓ@ P.3{e@y{Ӓ@$WPXe@ڇ:Ӓ@4Puxe@oӒ@gr@PW\cSe@[I2Ӓ@~JPǣ3*e@aIӒ@~a}Oɛ[`e@MҒ@,!OBUe@(ABҒ@Fr&OO[e@z7Tђ@nPIir̎e@Z{[ђ@Z*P(5›"e@]kђ@55 j4P:7s|e@n YВ@{kT|ROYz$e@ ~ϒ@lmO9Kge@V ]ϒ@qވOHJԛe@IP !ze@!̒@^oO ݧe@{خ̒@=ORO廢e@A̒@O{0ke@х˒@$OF%Be@3ʒ@¾DP|sYe@/[ɒ@Fi:mPy e@e ̒@B[Oe*9te@3˒@8%OOZsNe@ 7˒@f,O Ae@wOʒ@+OOnVe@R!fɒ@,O,be@2gȒ@a{0Pe@Iʒ@nY|O(e@9K˒@&ӍOQOfL{e@fZʒ@YIJO͒Ưe@Iɒ@pդOj}e@ b@Ȓ@VHCPAe@[fǒ@; PBʑe@%1ʒ@a(DOqϏe@"ʒ@ҏ]TO=e@^)Uʒ@-`JO3e@WkȒ@%Oۚe@ǒ@P| e@K4ƒ@GP',F e@56ʒ@#Ocwe@XXZʒ@2XO߹e@-ڿʒ@ЇD"O^e@(mȒ@X0@}Oe@C{lǒ@P7ake@ݏ6ƒ@J V Pwe@?_?]%) N ?  ?  intcurve curve   bldcur Uc N(fm ? spline  rbblnsur blendsupsur cone'0В@Qe@?@? @ null_curve nullbs@@Q@e@ blendsupsur sphereͶʒ@Pe@-Oae@'ʒ@c,6$O phe@?1ɒ@F?O^$oe@N ƒ@5ryO e@jĒ@@ OuEe@Z’@^G+Oeɫe@@;8O fׯe@F?m@MƑ^OMތ~ e@>,@wOM_e@Ë@!ROje@ή/[@e΢aOKmf@’@WP77Sf@tQÒ@Z:Px0i)f@teĒ@#[PY 1f@@@ sphereͶʒ@Pe@-.ga6@1YS78@?Oc͇@.Q|@s"@ @qg`!@8V&"@Cn[$@km%@ -v'@2%0(@-/}Ql*@h,@n,"-@SOZ0@ub1@]!f2@FJk4@yZ@@@QYf@i̩@8p*Q°*f@t7@< Q޷G"&f@pXਲ਼@kPf@r@LRP#7zf@Fօ@lePW2`f@]^-@MlhPg-Ef@ܵ@!7)P7e@,Pɶ@UP(\PXe@n筸@ '9O,K|7f@z.@^Q؋ONf@8@On f@ldփ@4mrOXf@G4!@?TOI`DIf@J0@;cHOv;$f@$>1@>%5O%I3f@T@Nm.Ov ;f@m>@DϐG.$OqKJf@1M@Tcb OQxRf@^:9@!ť4O!f`f@==@ʦO\gf@ /@ˠOiVsf@U6I@"=OΌxf@jK__@O| @[~f@ξ6R@0BOf@hlzS@J:(Of@ X@,^f.Ok~f@Q3ʎ@G#=OSyf@!߸@GO+uf@!jL@`OKkf@L2@è( qOdf@mʮ@yz&;O =Wf@FX@EIO@1Pf@n9@1-IOZQ@f@\tM@ʛP J9f@ @`x0?P$`N,f@]뮒@4mx[PƜ&f@ҳmdQ@.Pcռ`| f@ͩ'k@qtL6DPa(Hf@]A@xPr\!f@#{ @}Q5%f@ENw@@Q X,f@@@ toruswA@Pf@@ conehK@Q@f@?@? ?@ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?wM=ټ? ?? a?a@FrM@ R@49l_!@ zb$@#G&@ -v'@wM=ټ?3ȫ?ȫ?zc?ȫ?H?E ?G.ga6@R@G@t&@P-h@(̩ @Yтj @-@1YS78@Vv@8TQ[@Q,3@?Oc͇@q@~A@r{@.Q|@ % tcoedge coedge  !     " |h$: tcoedge coedge   ! P   # g h  loop   $ tvertex vertex   %  L'N?straight curve  @ΨrPye@@  pcurve    exppc nubs 0v&hmFj? 0v&h@?mFj@MbP? spline  ref intcurve curve   bldcurmFj@{m}n@ 0v&h@RRE? spline  ref null_surface nubsmFj@ 0v&h@?mFj@? 0v&h@ nullbs    point  Ͷʒ@dV Pe@tcoedge coedge    & '  ( RR!?  pcurve    exppc nubsY h?MbP? spline  ref tedge edge   ) $ |h?  * tangent oh.S? pcurve    exppc nubs$|h?R\/$?ԗ@?E@MbP? spline  ref  face +  $   ,  coedge   &     edge   9@ :@  - tangent  vertex   . ellipse curve  Fqݒ@N_e@?P=@? ftreemeg attrib    face /   Q  0 cone surface  Fqݒ@ _e@?? ?@ -DT! } pcurve    exppc nurbsR!@:(%@?P:R(@#g?` ?pu(@?:0yE> planeUdڒ@Qe@? ellipse curve  ג@qMe@r#ȎJ#_8L@1>֤ŭ?T?  point  tFqݒ@Me@ftreemeg attrib   spline surface   ref  coedge  &  ! 1   face 2     3  vertex   4 ellipse curve  ,@K@e@lv@lv@? straight curve  Ԓ@Hd@?  point  Ԓ@Fd@ coedge  ) ( &    edge   @  5 tangent  vertex   6 ellipse curve  ,@v1Od@?!  ;3@  ? unknown  point  dތy|7@V@d@ coedge  <  =  o  edge   $@ = @ unknown  vertex  > A straight curve  dތy|@ AV@d@?  point  @TT@@e@tedge edge   ;@ h݆mW!@ G B tangent >)? pcurve    exppc nubs݆mW!xO D0 Zq.`97Ƴ;T@ȸω@T@* &r@U5Y@8(@L]@gxm@8C1fg@L@xo@>3K@Y=o}@c|@G2@d@𝡲[@V;vk@N%)@h@%@/ X@J1s@)'=?<@Or\@I @nߒE@MbP? cone'0В@Qe@?@? @  pcurve    exppc nubs<V%?r;?=l!@FM1 ?!@MbP? spline  refo  point  L ƒ@Y|f$Od}:Vf@straight curve  '0В@Qe@?  pcurve    exppc nubsĸ Uc (fĸ Uc (fMbP? spline  ref tvertex vertex   C JxC?intcurve curve   bldcurĸ Uc N(fm ? spline  ref null_surface nubsĸ Uc (fĸ Uc (f nullbs   tedge edge   m/= T&R?  D tangent K? pcurve    exppc nubs&Rm/Ĩ= 0v&h@*5? 0v&h@MbP? spline  ref tedge edge    Sg h? P E tangent J?]SG? pcurve    exppc nubsg h??2 P@5f(?kP@MbP? spline  ref  point  '0В@#(n5Oe@ point  l͒@O#OTse@ellipse curve  7nW@(n5O.~:f@ ~:ƿ?G%?< 6? יTl0?? ellipse curve  Kj@\(n5Oe@/n ~:ƿ$T?4= 6?1T1??  point  @L(n5Of@ pcurve    exppc nubsos!@ -v'@os!@ -v'@MbP? spline  refo intcurve curve   bldcuros!@ zb$@#G&@ -v'@wM=ټ? spline  ref null_surface nubsos!@ -v'@os!@ -v'@ nullbs    pcurve    exppc nubsvuV%<|d)> -v'@9? -v'@MbP? spline  refo ellipse curve  rK@:~f$Of@ ߴO@aKu _*zv?I.'O?? ftreemeg attrib  n< plane surface  dތy|7@V@d@¸O??  coedge   F r o  coedge   q F G   edge   ~ʼ4@ r H unknown  vertex  t I straight curve  @TT@d@?  vertex  J straight curve  4@T@`f@  point  @TT@e@ellipse curve  VA@\PS@e@?΀¸O<j\sQ?LF@lv?  point  VA@\PS@@e@straight curve  4@Z`f@@%?dOL2?  point  @qW"Z`f@ pcurve    exppc nubs;@܆mW!@;@݆mW!@MbP? spline  ref}  pcurve    exppc nubsRac(mf?hfMbP? spline  ref ellipse curve  {Ò@V#Oke@sQ;⿀^V¿5? ?s???  pcurve    exppc nubsm/=&R??hO %Mz>1O MbP? spline  ref ellipse curve  i,@Y|f$O> Kf@vzƿ^TbK?3ݎ9?8t7e?a.r?? straight curve  D@H@e@  point  D@v1O@e@ellipse curve  ,@Kd@?lv@lv@?  vertex   K straight curve  L@L@d@? ;`7 ;`7@ edge  @  ,@  L unknown  point  x@L@@e@straight curve  @qW"Z`f@OL2?>%  coedge     1   pcurve    exppc nubs|h$:G`GT!  cone@?\(n5O_e@?? ?@ -DT! } pcurve    exppc nubsg hUd@ET! Ud  cone@?\(n5O_e@?? ?@ -DT! } face M     N  point  '0В@뽨rP@ye@tcoedge coedge     '  O RR! tedge edge    ) RR!? & P tangent 苓? pcurve    exppc nubs67R?67R?RR!?67R?o8Ŧ?RR!?9 2>ڰ>R?䦿 R>9?#>e-??h0 ?c? ] ?x?r`6(>O?ɥ +?#(?x%q;?eē? 4B?S%a?<+0?HNI?xCUL ù@6.$?vԗ@MbP? spline  ref  vertex  ' Q ellipse curve  ג@{(n5O_e@?f3 ~ʼ4@ < S unknown  vertex  G T straight curve  dތy|7@V@`f@ straight curve  dތy|@ AV@`f@¸O  point  dތy|@ AV@`f@intcurve curve   bldcur;@ן@݆mW!@롕? spline  ref null_surface nubs;@܆mW!@;@݆mW!@ nullbs    point  56ʒ@V#Obwe@ellipse curve  PͶʒ@X#OR&umke@C*OlJ^V?G ?Ƨ?jʝ:?? ellipse curve  '0В@#(n5O`e@lqHq==T-??  coedge   < G o  edge   > $@ U unknown straight curve  @TT@`f@¸O?  point  @TT@`f@ point  4@T@`f@ point  L@L@@e@straight curve  @L@@e@ ftreemeg attrib  $  cone surface  @?\(n5O_e@?? ?@ -DT! } pcurve    exppc nurbsRR! ?T@?:ZT@g?:"@?:0yE> planeUdڒ@Qe@? ellipse curve  ג@D`Ne@̤ŭ?x?1?  point  ג@v(n5Oe@straight curve  @?\(n5Oe@ straight curve  dތy|@ AV@`f@¸O?  point  dތy|7@V@`f@straight curve  4@T@`f@¸O??  End-of-ACIS-dataB<  L9y? L9y?4ˏ@׵@?ACIS BinaryFileMegaCAD 2013 3D ACIS 22.0.1 NTFri Apr 06 16:20:35 2018?ư>|= body    string_attrib name_attribgen attrib  ATTRIB_XACIS_NAME R2 umlaufend lump    shell     face      ftreemeg attrib    face    loop   spline surface   rbblnsur blendsupsur coneYnƒ@cXSI@e@ L9y;f@;f? @ null_curve nullbs blendsupsur cone("ɒ@cXSI@m^f@Mr ~:ƿ[6Mic%?^ȨH;f@"do߿? @ null_curve nullbs* ellipsel͒@cXSI@e@OϢo  ?  edge  @ ADJW?  B tangent  pcurve    exppc nubsDJW?? spline  ref  coedge  C D  # E  edge  ,< F$DT!?  G unknown  pcurve    exppc nubs$DT!$DT!¼ spline  ref  coedge  H I  & J  edge  F$DT! +¼  K unknown  pcurve    exppc nubs$DT!<?$DT!?¼ spline  ref  coedge  L  M N *  coedge   L O P *  loop   Q  vertex  N R vertex  S Tellipse curve  Ͷʒ@cXSI@e@`ޓ?  DJW?ftreemeg attrib    face U V J  W  loop  X  torus surface  wA@cXSI@f@ L9y<@  coedge  Y Z [ \   coedge  ]  ^ _   coedge   ] ` a   coedge  Z Y  6   edge  b c-DT!?  d tangent  coedge  e f  8 g  edge  A h-DT!?  i unknown  pcurve    exppc nubs:.DT!-DT! spline  ref  coedge  j k  ; l  edge  hL-DT! @  m unknown  pcurve    exppc nubsj-DT!?-DT!? spline  ref  coedge  n  o p ?  coedge   n q r ?  loop   s  vertex  p t vertex  uellipse curve  Ͷʒ@2]~̩P@e@??  DJW? coedge  v " w S E  coedge  " v x y E  loop  " z  vertex  { |ellipse curve  l͒@cXSI@e@o~Q?݊yGʿ?xo~Q? < $DT!? coedge  } % ~  J  coedge  % } J  loop  % / ellipse curve  l͒@cXSI@e@׿j?n^?p"YKDU~Q? $DT! ¼ coedge  ) ( *  coedge  ( N  edge  +d;!@ \@ M tangent  coedge  w ) P  edge  \ ,d;! O tangent  face  *   point  }gxb@@cXSI@jw!lTe@ edge  ,P?  @ w tangent  point  Ͷʒ@cXSI@@e@ftreemeg attrib  /  face   cone surface  ("ɒ@cXSI@m^f@Mr ~:ƿ[6Mic%?^ȨH;f@"do߿? @  coedge  } 0  coedge  5 2   coedge  2 5   coedge  2 \ 0  edge   -DT!? 2 tangent  coedge  4 3   coedge  3 _  edge  c-DT! -DT!? ^ unknown  coedge  4 a  edge  -DT! bF,DT!? ` tangent  vertex  a  vertex  ellipse curve  @cXSI@f@?$I$I = ?  coedge  = p  edge  @@e@ P c[a&@ o tangent  coedge  > r  edge  P-& A@e q tangent  face  ?   point  Ͷʒ@2]~̩P@@e@ point  }gxb@@2]~̩P@hw!lTe@ coedge  D C E  coedge  O C S  coedge  D y  edge  F A&@ x unknown  face  E   edge  h F @ unknown  point  l͒@cXSK@e@ coedge  I H X J  coedge  H   edge  ! F ~ unknown  coedge  M I  edge  Y^? +-Wx@ tangent  coedge  L  edge  DJW DJW? L tangent  coedge  M  loop   vertex  straight curve  }gxb@@ M@jw!lTe@ 4s4 nl=`@ coedge  O  loop   vertex  P straight curve  Ͷʒ@ M@@e@? nl=` 4s4@ftreemeg attrib  Q/  face   cone surface  Ͷʒ@ M@e@?E!Z |b? @  vertex  straight curve  Ynƒ@cXSI@@e@? L9y< k1 `kgA@ftreemeg attrib  V  face    loop  V torus surface  @cXM@f@x+R<@x+R  coedge  [ X 0  coedge  X [ 0  edge  ( -DT!? X tangent  coedge  ^ Y  edge  c) 7~ unknown  coedge  ` Z  edge  bxg Y&@ tangent  vertex   vertex  ellipse curve  wA@dXSI@f@? L9yJWƿ n  unknown  coedge  o     vertex    coedge   q    loop  !  vertex   "ftreemeg attrib  s/  face # $  %  coedge  & ' v (  edge   -DT!? ) tangent  coedge  w * &  coedge  + x ' ,  coedge  x {  loop  $  vertex  , -straight curve  l͒@cXSK@e@? L9y< ftreemeg attrib  z   face . /  0 cone surface  Ynƒ@cXSI@e@ L9y;f@;f? @ straight curve  l͒@cXSO@e@ L9y<  coedge  ~ {  coedge  ~ 1 2 3  loop  4  vertex   5straight curve  l͒@cXSK@e@o ~:?k4Mic<<  coedge  6 7  vertex  8straight curve  I+@cXSI@ Hf@Mr ~:?[6Mic<% J#! MV 3@ coedge  9 : ;  coedge  9 < =  loop  9 > ellipse curve  Ͷʒ@Je@??!Z |b?  coedge  ? : @  edge  #,{V# A8B B tangent  point  }gxb@@Jjw!lTe@ coedge  C D E  coedge  < F G  edge  H% Ͷ I tangent  point  Ͷʒ@J@e@ftreemeg attrib  .  face J K L  M plane surface  _u@ Q@`f@%?Mr ~:?Mr ~:?%  edge  D,DT! N-DT!? O tangent  point  ؒ@dXSI@@e@ftreemeg attrib    loop  P cone surface  x@acN@f@ L9y?^DO;f@;f? @  coedge  Q R P S  coedge  2 T U  edge  EJW DJW? V tangent  coedge  W 6 L  edge  DJW EJW? X tangent ellipse curve  p[(˒@cXSI@\&f@q ~:?/c(m<*r ~:? ( -DT!? coedge  Y T straight curve  ?1ǒ@cXSK@f@? L9y<  coedge  Z W straight curve  Yn@dXSI@`f@? L9y? ftreemeg attrib    face x y p  z cone surface  ("ɒ@2]~̩P@m^f@Mr ~:?[6Mic<%^ȨH;f"do߿? @  vertex  { |straight curve  l͒@cXSO@e@? L9y<  coedge  } ~    edge   -DT!?   tangent  coedge  + } {  coedge  * ~   vertex   straight curve  Ynƒ@2]~̩P@@e@ L9y `kgA k1@ftreemeg attrib    face   U   cone surface  Ynƒ@2]~̩P@e@? L9y<;f;f? @  coedge      coedge      loop    ellipse curve  Ͷʒ@h'I=Q@e@8H˪??5j Ce<n?@>?  coedge      edge  mπ*@ PY;@   unknown  point  Ͷʒ@h'I=Q@@e@ edge  A@#@ [|@  unknown  face  s   point  }gxb@@X&Q@jw!lTe@ftreemeg attrib  0  face    plane surface  Ԓ@H@@e@??  coedge   (  coedge   , (  loop    ellipse curve  ؒ@dXSI@e@$I$I@?  -DT!? coedge      coedge      edge  -DT! -DT!?  unknown  point  ؒ@dXSK@e@ftreemeg attrib    loop   cone surface  @2]~̩K@e@ L9y<;f;f? @  coedge   Y   coedge  T 3 U  edge  ]G" ! unknown  face      point  p[(˒@cXSK@\&f@ coedge   7 L  edge  A N D@  tangent  point  Hf@cXSI@ޓf@tcoedge coedge    0⣔_QAk`  coedge   ; @  edge 1  EC? -DT!? :  tangent  coedge   = G  edge 5   |eB? <  tangent  face      coedge     @  loop     vertex  7 straight curve  0@J|#f@ ~:ƿ? @f+ Ⱦ! coedge      coedge    E   edge  -DT! H -DT!?  tangent  coedge     G  loop     vertex  E straight curve  @J@e@ ؈'+   ftreemeg attrib  -  face       loop  cone surface  wA@..!@f@?!Z?"|b@? ?@  vertex  ellipse curve  ؒ@dXL@@e@?S@T? (K )K? coedge  S  coedge   _  coedge   d  edge  e `-DT!?  tangent  coedge  2 U  loop   ellipse curve  wA@cXSK@f@ L9y< g@,iX,  face  ! "  # sphere surface  Ͷʒ@Je@- G  =  point  ؒ@J@e@ftreemeg attrib  K  face > ? @  A  loop  B K cone surface  @ң"בLf@ޛVۼ<? ?@ -DT! } point  @dXL@@e@ coedge  R Q  C ellipse curve  x@cXM@f@$I$Ix+R?  -DT!? coedge  ^ Y  D  coedge  Z E F G  coedge  H I Z  J  edge K [;LԠ' L Z M tangent  edge  ADJW [DJW?  N tangent  point  wA@J`f@ point  ?1ǒ@cXSK@f@ coedge    ^    edge  O7~@ )@ ^ P unknown  vertex   Qellipse curve  @cXM@f@lvlv@?  point  @cXM@f@ vertex  d Rellipse curve  @cXM@`f@x+R?ST@u씹跼? (K )K? point  x@cXM@`f@ coedge  S g T U  coedge  g V W X  coedge  Y Z g  [  edge  \$@ ]6@  ^ unknown  coedge  _ h  `  coedge    h    edge  aO L h \ tangent  coedge   i  C   coedge  i   b   loop   y  vertex   cstraight curve  Yn@2]~̩P@`f@ L9yx+R )@`$ @ftreemeg attrib  lh  loop  d l plane surface  @L@d@  coedge  o n  b p  coedge  r  n    edge  EJW DJW?  e tangent  coedge   u o    edge  ODJW EJW?  f tangent  coedge   r     loop     coedge  u   D   loop     vertex  v gftreemeg attrib  y   face h    i cone surface  Yn@2]~̩P@f@? L9yJW? at,DT!?  t unknown ftreemeg attrib  3  face u v w  plane surface  @n%R@@e@:H˪??6j Ce<|FSkҼ?  coedge   x y z  coedge  { |   }  edge   zJ4p@ ~.@   unknown  coedge  p  |    loop     vertex   ellipse curve  ,@v1O@@e@5j Ce<ǰQ2t<&Be@ô3ʒ@iwKsYe@[ɒ@}.%K e@#qsR ϒ@oƅLpmpe@Β@L)he@.oΒ@-!dL0I2e@}͒@C7LԡKe@0w̒@55KLQ3e@7F܎̒@wqKY !ze@n YВ@LZz$e@ ~ϒ@E~LUKge@V ]ϒ@&!wOLHJԛe@I,@A[C^Lde@+?m@W9nLx~ e@@dLfׯe@ ’@"ViLSjɫe@Ē@v_~LhEe@N ƒ@p!Le@Y?1ɒ@\7L$oe@'ʒ@p)L phe@@ƫ Β@=q LΌae@JBϒ@pQLղxz_e@pӒ@ T~L˒F`e@9Ւ@_Q-^L-vMde@ؒ@rULfB6 oe@Eshڒ@>K we@~k;ے@)BKM soe@@@ sphereͶʒ@Je@-أڿ-(p @\k'T~ۿV o @r//ܿn; @MbݿMbP? conenZÒ@J<[f@_r ~:?<&E>vlv1!D׿? @  point  *6ƒ@zeSKkve@tcoedge coedge       )b;(g.P tedge edge  )b; (g.P   tangent jc]?,B3? pcurve    exppc nubs(g.P@H x@j#I@Hss@@@)b;@Uy@Zbݿ8B>@/ܿd#j@"-~ۿ:e0@8+,ڿTuDŽI%@ܸ5;ڿyK@~Tٿk,@4;ٿa2]E@bOuؿf@X,Xؿ>5@x$8ؿ'|k@BZؿ@t"׿r 0@G׿MbP? cone@Je@?lvlv? @  point  Ͷʒ@9SKe@ftreemeg attrib  1  face       loop    cone surface  wA@..!@f@?!Z?"|b@? ?@  coedge     %   edge  =_{| (98B   tangent tcoedge coedge      ' ?[Ec&@SF; @  loop  &  tvertex vertex   "D ѵ6?ellipse curve  LQ7ǒ@J,'W!f@^r ~:?&?  -DT!?ftreemeg attrib  '  face      cone surface  nZÒ@J<[f@_r ~:?<&E>vlv1!D׿? @  coedge       coedge     /   edge  -DT! 3-DT!?   tangent  coedge     6 2  coedge      2  loop     vertex  / straight curve  @ @e@? 7nf&L 6Gtcoedge coedge       S!  edge 2  "uJV? -DT!?   tangent  point  @M@e@ coedge     9   edge   : Ud   tangent  vertex  9 ellipse curve  ؒ@Je@<?  -DT!?ftreemeg attrib  + cone surface  @Je@?lvlv? @ ftreemeg attrib    face       loop    spline surface   exactsur nubs ??Pt!'c.Gb[ %= 8M{N$(6ۿ@ѣ"בLf@@*jLf@@~3pgLY+Qf@@&LŮf@@Kjf@@JbKf@=8@ѣ"בLf@y@@*jLf@#i㕒@~3pgLY+Qf@/+r@&LŮf@m0@Kjf@\͖@JbKf@̕t@@Lf@OP @=fLf@І˗@Ë$|LY+Qf@阒@gBg/LŮf@ҵ]@gהLjf@ϙ@/NjLY+Qf@[iI@´5ULŮf@B @@m&F:Ljf@}aN@T*Lf@aqIs@RLf@@\+WmLf@ @`pTLY+Qf@֛玒@҃f}6LŮf@y.)o@QLjf@Ah(@~N~\Lf@liJݒ@r=QLf@bo* @f!Lf@{>@kLY+Qf@2O@wLŮf@"7 @XiKjf@,We@&>Kf@n@ѣ"בLf@:5"IG@*jLf@\@~3pgLY+Qf@4Rݒ@&LŮf@CB’@Kjf@H'@JbKf@@ѣ"בLf@@*jLf@@~3pgLY+Qf@@&LŮf@@Kjf@@JbKf@?Pt!'c.Gb[ %= 8M{N$(6ۿ ?  ?  tcoedge coedge       ] h?  edge  ߵ -DT!?   tangent  edge   O7~@  P unknown  coedge       coedge     G   edge +  L -DT! -DT!?   tangent  coedge      J  coedge      J  loop     const_roundffblendblendsys attrib     null_surface@ vertex  G straight curve  @J`f@ xs:d. @&23ellipse curve  wA@Jf@L!Z?|b@? zDJW ƻ3O|? vertex   straight curve  ?1ǒ@cXSO@f@ L9y  point  @cXSO@f@ point  @2]~̩P@`f@ coedge       coedge     U   edge  -DT! \-DT!? T  unknown  coedge       coedge     X   edge  ]-DT! -DT!? W  unknown  coedge      [  coedge      [  loop  Y   vertex    vertex   straight curve  @J`f@?  coedge       edge  amπ*@ n?`Q@   unknown  vertex  `  edge   O-DT!?   tangent  point  wA@2]~̩P@`f@ coedge       ellipse curve  wA@2]~̩P@f@ L9y< Z?d|b@? mX9 T ?ellipse curve  wA@cXSO@f@ L9y? g@(iX=? ftreemeg attrib  4  face       loop     coedge       coedge     z   edge  ~-DT! -DT!?   unknown  coedge      }  coedge      }  loop  {   vertex   straight curve  D@@Q@@e@  edge   wr<< $@ |  tangent  face       point  D@v1O@@e@ellipse curve  @dXL@e@$I$I<??  -DT!? coedge    I  ' tcoedge coedge       0⣔_Ak` tcoedge coedge       {R? tedge edge  !Xؼ FR?  " tangent ZOрK? pcurve    exppc nubsFRX<я?*__MbP? spline  ref  tcoedge coedge  #     $lRnC= tedge edge  %"Y=< (R?  & tangent h(K? pcurve    exppc nubs"Y=<(R?ٽz>1P.?C_IMbP? spline  ref   face ' (   ) tcoedge coedge     *  +[ hRR:  loop   ,  pcurve    exppc nubsз(U%?з(@?U%@MbP? spline  exactsur nubs??U%@$#'@N*@Db|.@ƫlR=2@O?V3@ǰ^e@536~ʒ@@l$vL\)Ve@K1ʒ@i~sLO8e@Q Ȓ@hԤL70We@wιǒ@G$ Kȡe@eƒ@MvK?Ie@ 7>̒@̊ L{[e@5YI̒@dӍ?պL` e@dbP̒@odjC}L;e@ ʒ@?N!LW e@Wܺɒ@N?LCse@XȒ@\;Kiwe@bu͒@uM|M~}e@7_Q͒@r4Ld܁e@x5\͒@jGu[L-?h1e@mK̒@FL߸le@ 4dlw˒@c=NLye@ʒ@(9})e@1Ӓ@>P Un2Lc6e@[GӒ@TPLSe@Ғ@G|KE܃e@]U%Ғ@6leKve@] lӒ@L1 K H+he@y14Ւ@ Ʀ>Lqe@?^k7Ԓ@;NL=Je@ ^Ӓ@JzzKsTeRe@,\xӒ@mV-K\e@TӒ@YUlK)2nye@:4NӒ@vKu<me@ `F۶Ւ@V7L}6je@IhԒ@Q2Kʡͧe@^?+Ԓ@uR{K+~e@r֒@N,Kd쎵e@o ֒@ލБKe@NdÍՒ@|E4bnKF딦e@NWԞ-Ւ@O,uGK)de@J`ۛJՒ@2fh6K(e@u q\Ւ@Ⱦ)K"e@fQג@4a}aK]ݶe@MJ-￑e@P ֒@b#Je@>V֒@Je@WԦU֒@TO J3e@4pג@+mKhe@=֒@w J$6ܵe@4 ֒@^oKKJީGe@fO$֒@!uCJ$! %me@Z\*֒@1J2(e@`c֒@kAJi-*e@!8|xג@0VwJ H޼e@S֒@l\Jͤ7e@ 1֒@,J]!Ve@R /֒@e7J e@aLG4֒@.*tJB-e@UBj֒@GJ]D\юe@ԡג@iJj㻨e@ ֒@:Jvlv1!D׿? @ null_curve nullbs@@Q@e@ intcurve  offintcur nubsXl.!?(`5 @8Z1@YaФ@2I17@/o@M@t,ukm"@U%@d<(@LTj+@!.@iE0@Ÿh0@OH1@:e.2@O?V3@eo T5@}S5@N󬦋6@|;7@Jْ@RK;JK[Jf@Xؒ@hۤKo3Of@(;ג@q~K\ Vf@BwԒ@@L'r\f@|\RӒ@};aL ^f@v,d6ђ@hLc4`f@В@C>ɩL *`f@,LΒ@-G L|#^f@^2͒@OL}]f@z'Ǜ̒@vgL+ bZf@A:=˒@>ZdHL dBXf@_7Oɒ@4րL]cѧH’@`Le爠f@[v@{L8GB6f@lr@ O}LAS e@ T@"בL'e@.\@"בLg*e@P7’@ O}L؄e@> Ē@{LGe@r‰Œ@dLzKe@^Ȓ@ٶ'Lfpe@fT]ʒ@yoMSie@R͒@-)PVAL׏*be@CΒ@4րLW`e@gt(В@=ZdHL|e_e@Qzђ@wgL_e@;Ӓ@OL97ae@;Ӓ@+G L?@be@$oՒ@zC>ɩL&ee@4eP/֒@hL(*rhe@#@ؒ@w};aLWoe@OGْ@@LPte@mڒ@By Lye@yے@<Ki̱e@zYܒ@YKy0be@ݒ@'=KPmܧe@² ݒ@0K •e@k̝ݒ@j`#KDĖe@oh#ޒ@DO Kre@5MLޒ@&JorW}e@:kޒ@UJe@pޒ@8CřJROhUe@_Aoޒ@ i{JpIe@@@ conenZÒ@J<[f@_r ~:?<&E>vlv1!D׿? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?롕? ??U%@$#'@N*@Db|.@ƫlR=2@O?V3@Ԓ@:TL>-?e@Ւ@n kuLMy@e@37j֒@kQL`'e@ג@"SKD.ˍe@1cRؒ@|tKiX e@^]ג@vf&LYv e@>'ג@ysL腷e@qג@%#LVĴe@5l:+ڒ@Jm Ɓ!L2Me@bے@Lw:e@>ݒ@%Kk@e@ -ג@w|٭Me@4ג@vAL!le@/iؒ@ u}LWre@9/Eے@"xLVe@)ݒ@pLzSe@:2Eߒ@LUe@ʸhؒ@EKLӫe@#^Oؒ@2ҐɨLH ..e@cVْ@]koL,~e@|9ے@n aLM2e@ݒ@⅝K Ke@I` @û(KIk4e@lؒ@nN\L qe@bSؒ@P3 L+oe@ْ@(]oL7e@= ے@w;Lph Oպe@oޒ@E0ƣK1)7e@ysB@5$K!e@Xwؒ@LXL{eT>e@u]ؒ@QeL.|fe@·%ْ@{R nLe@Hܒ@!LuJ檻e@ bޒ@}f?K()e@'@`IKfĘe@HF~ؒ@s>LUse@/Jcؒ@"!+Lpe@O,ْ@a1mLƶFe@ߘH ܒ@ҜmL p.e@ vޒ@Kbbe@x[4@uXAKԙ9e@Fؒ@ L)Ge@\Qrؒ@ YLCYe@z<ْ@HjL3ʕ3e@&@"ܒ@]Z L e@po9ޒ@x@K}e@ZJS@KP1"!e@ =ؒ@Lûze@Ky{ؒ@LL)]L)/8e@#Fْ@\iLe@vS/ܒ@ʛU L SXe@rHޒ@hpKFe@Jd@MKV,|e@ Pmؒ@R$WL_P 2e@z zؒ@iFyL=e@KkYْ@̼fL9se@6 Gܒ@`] Lũe@i&Icޒ@QyK߂7e@]@1KE-A@K^e@\jؒ@| L[ge@k@ؒ@ݨTCL1&we@otHqْ@,?`L[e@5dܒ@jMLm6je@#ޒ@"KŒV2e@F)0@"~n4K e@xhؒ@B#L#(e@ؒ@QmڟL}y\e@\Nyْ@v__L0*\e@(2nܒ@-aؤYLHe@ޒ@+%K7Ee@YbF@X0[{Ktve@;Oؒ@:-JLDBe@i;ؒ@MOL礤e@s~ ~ْ@uO]L1e@4'sܒ@ VhL@7ke@Аޒ@,T5Kqe@@)_K}Oe@wؒ@Ƀ FLp/Ce@3ؒ@'!LXHuYe@.ْ@Z\0hZL)>.e@>ܒ@L'9e@ޒ@gK Ĩe@ZV^@l:]K%Nle@ؒ@B L/4e@ oؒ@ MfeL䟕e@+ԟ’@p]MD;`^e@tÒ@LrKԧe@˩>|ƒ@Lc/L|e@Ϙ04Ȓ@L貦re@Hn˒@}8L<$2,Iee@[z͒@PH6L"#Eae@ Kyђ@ QL;Q6G_e@'Ӓ@MCLU%ae@$Z|ג@p鉠Lifje@ekgْ@F)RL§9re@O[ܒ@($L{ee@+9ݒ@ \'LODqe@M,Fߒ@[ouM!e@^]>ߒ@ALK e@@$xLj9ye@=gH@#1e#LL2+e@"@cLue@*@673QLņUle@^x@^L6e@@ q Lne@@@ cone@Je@?lvlv? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?PTRE? ?? (g.P@6,@!:S@̭!@KT%@E%@&@WE&@c4X'@ @sQ2'@swy'@W'@ndb(@PTRE?-@ /C@d}FM@Ğx@#j5@Jý@H?@gc^@nu@5A\@3@Q"@@phC(@B 2` @VaB,!@!@Ap}"@mWV&#@F-#@b1F$@ni[$@h߄4%@KT%@*}&@t^&@"DM&@'@, '@=(@ null_surface nubs(g.P@)b;@?(g.P@?)b;@ nullbs   ftreemeg attrib  !2  loop  2 ! cone surface  Ͷʒ@ M@e@?E!Z |b? @  coedge  3 4 5 6 " tcoedge coedge  7 $ 8 9  : ,hr; tcoedge coedge  $ 7  *  ;RR[ h?  loop   < straight curve  fYL@ObK3hS f@p ~:ֿ=? tcoedge coedge  &  = > ' ?!@!xYMcv'@ tcoedge coedge  @ 8 &  A BSF; ?[Ec& tedge edge  (SF; C?[Ec& & D tangent 3 GA? pcurve    exppc nubs?[Ec&@&.@ M@lfm@9ь@8UV @SF; @?O'vJHv?9 G?~2 &Jt?hFq.ZO`#?AbLP:9}?& %kiK?ZYv?ؓf9?Zviu?<îe78?yEngO@_?.JW?MbP? toruswA@Jf@?@?  face E  '  F  point  So}’@C5K^f@ftreemeg attrib  +(  face G    H torus surface  ؒ@Me@?@?  coedge  I - J K  coedge  L M -  N  edge  OͶ@ %@ - P tangent  coedge  Q . 1    coedge  . Q L R   loop  Q   vertex  / Sellipse curve  ؒ@N@e@?lv@lv? 0Z 0Z? coedge  1 0 T U 2  edge 4  3 V] h?  W tangent  face X  2  Y  point  @N@e@tcoedge coedge  Z [ 5  \ ]<S!? tedge edge   < :S!? 5 ^ tangent pZqd? pcurve    exppc nubsS!8+1-DT!?T^)1MbP? torusؒ@Me@?@? tvertex vertex  6 _KK?ellipse curve  @Me@?  -DT!?tcoedge coedge  ` 8  .  aj hz: tcoedge coedge  8 ` Z b  c] h?  loop   d straight curve  @@bKye@  point  ؒ@AbKye@ftreemeg attrib  ?  face e f g  h  loop  i ? spline surface   exactsur nubs ??+L .@si0@< 1@J6]4@A ;7@A6;VNE7@νLӋ7@֨7@[Żq8@A8@e5]8@%?y9@|#)b9@wA@У"בLf@wA@)jLf@wA@~3pgLY+Qf@wA@&LŮf@wA@Kif@wA@JbKf@j@У"בLf@:i@)jLf@իG@~3pgLY+Qf@q3-@&LŮf@]p67@Kif@+=@JbKf@*8W@1Lf@ecu@a5[2Lf@S\@klKiL,u8f@s yŲ@^d LdVf@pALز@:KECf@'䲒@8BE5K7UIf@L굒@ppLf@N&@&4Lf@56a@ʒoLǨûf@͆(¶@dWLb[f@&綒@1|vKK}9f@: @ݡCnK`b{f@c@ +ʒ@6CKa_z/f@a,1B˒@w~KB1Jof@#Aϒ@ݥԄLf@S"DΒ@@**1CLf@S9̒@gw-MLWif@iMׇP˒@DyKF@f@=˒@C wʤK@of@,b˒@RK of@dHВ@ 2,-zLf@KΒ@/9Lf@=P͒@H͟KVf@3͓˒@κKf@cT˒@"=:Kk f@M˒@OKx孳nf@? gВ@0YsLf@iHΒ@Z3Lf@c-͒@4 K3Jf@\`˒@b+KTtЖf@"Ղ˒@KTif@u .˒@FZ雫KTsnf@ -ђ@R6`Lf@.ϒ@"Lf@%xΒ@ETK-f@igD̒@6V 4K gf@׵=˒@1AKIVԀf@h̒@틠KXmf@[ʢђ@vtTLf@4В@x_kLf@sΒ@K0K| f@h=̒@7KX*f@Iz?y=̒@mKgk~f@H*̒@UKoxtmf@h\zҒ@4;Lf@廻_В@Lf@E#ϒ@*K.:&f@͒@x6!K/ʵf@>̒@SN@qxK If@ H͒@] KPlf@JҒ@zBb-Lf@,Z1ђ@Kf@{Boϒ@:Kz;f@ U͒@ZzK9@~f@#0i͒@~7_dpK5f@t͒@|鲁K^jolf@ FQmӒ@ShLf@焦ђ@(!HKf@h'1Zϒ@!"K#o.ڵf@֐͒@..oKº/f@Jc͒@sǠcKf@V7͒@.etKkf@WF9Ӓ@6| Lf@_ђ@? Kf@В@6frKUǸ̵f@jz͒@2 àfKs f@zF+͒@]]K ~f@]"'Β@=(~nKe>5kf@v6Ԓ@-l.Lf@- Ғ@GKf@%8В@dI5KRƵf@Ck͒@D|bKU.df@.%u͒@Un#ZKx~f@SˤBΒ@Z@jKE[Wkf@o|Ԓ@9QeKf@NY~Ғ@mKf@ۏ̾В@sKiof@z6Β@Z"XKeĔf@<͒@:ÌPKGk~f@GpΒ@Qcָ`KӼSYkf@ Ԓ@( Kf@,AҒ@?8Kf@ 2В@DK,K/f@MĽ[Β@!QRKV䦔f@uΒ@R4cJK,CO\~f@_"Β@$,mZK,kf@_:Ւ@*};NKf@U!Ӓ@z,Kf@Qђ@TP zK޿f@_Β@5oEEK͸]mf@dOΒ@G;> >K ~f@ITϒ@#bMKjf@wՒ@+8Kf@-UӒ@2sKKf@+;ђ@,rKbꗵf@&PsΒ@㷉>KhQf@@rΒ@7KP}f@'ϒ@FKv=Ijf@ưՒ@3.wKf@ Ӓ@",8Kf@ԗ̱dђ@\ iKՕf@OΒ@C7K7f@cʒΒ@}F,1KX }f@gLϒ@Э?Kjf@? si0@< 1@J6]4@A ;7@A6;VNE7@νLӋ7@֨7@[Żq8@A8@e5]8@%?y9@ ?  ?  tcoedge coedge  j k l m @ nF?_ =hh?  coedge  o B p q   coedge  B o  r  tcoedge coedge  k j B  @ s] h tedge edge  t u] h? B v tangent rۼn(C? pcurve    exppc nubs] h?@j}@-DT!  cone@ң"בLf@ޛVۼ<? ?@ -DT! }ellipse curve  @2]~̩P@f@?$I$Iy+R<? ߵ -DT!? coedge  E w x y  coedge  z { E  |  edge )  @ }@ E ~ tangent  coedge   F {    coedge  F  H    loop     vertex  G ellipse curve  @M`f@x+RW9?lvlv@][1%~? 0Z 0Z? coedge  I H  r J  edge *  t:JV? L-DT!?   tangent  edge ,  [ @^ h?   tangent  face   J    point  @J`f@ point  wA@cXSO@f@ coedge   S    coedge    S    edge  $@ X@   unknown  coedge   T Z    coedge  T      loop     vertex  U ellipse curve   @E`f@x+Rx+R<? H H?  coedge  V     coedge    V    edge  $@ X@   unknown  coedge   W     coedge  W  Y    loop     vertex   ellipse curve  P@E`f@x+Rx+R? H@ H?  coedge  Z Y   [  edge  " ]< Y  tangent  edge  \ "@ Z  tangent  face   [    point   @J`f@ point  P@J`f@ coedge   _    coedge    _    edge  Խ7K% P"Ha@ _  tangent  vertex   straight curve  _u@ Q@`f@H˪?  point  wA@8sQ@`f@ellipse curve  wA@2]~̩P@f@qm۶m۶<?  -DT!? coedge   d     coedge  d      coedge    d    edge  -DT! -DT!? d  unknown ellipse curve  @eXM@e@$I$I<?  -DT!? coedge   m     coedge    m    edge  $ hȟ? m  tangent  coedge   n p    coedge  n      vertex  o straight curve  @n%R@d@?H˪  edge  MK qMK?   unknown  point  >kWA-@&;CSQ@d@ coedge  s      coedge    s    edge  -DT! *$ s  unknown ftreemeg attrib  v5  face       loop   v cone surface  }RHf@ǖǛYe@>%bOL2<iϣ構?"lv? @  coedge      w  coedge  x     coedge    x    edge  @ 9@   unknown  coedge   y     coedge  y  {    loop  y   vertex   ellipse curve  ,@K@@e@lv@lv?  coedge  | {   }  edge  $ ~ {  tangent  face   }    point  D@K@@e@ vertex   straight curve  D@v1O@@e@ :`2 <`<@ftreemeg attrib  T  face      cone surface  ,@v1O@@e@9qFSkҼ?n(C? pcurve    exppc nubs[ hRR:?U%@TMu<U%@MbP? spline  ref  face       point  ΍ ,-Ē@VbK3]7e@tedge edge  z j h?   tangent T ]SG? pcurve    exppc nubszj h?f(?' ;@? ;@MbP? spline  ref  face       point  '0В@*K@ye@ coedge   J     coedge      "  coedge      "  coedge     6   edge #  DJW DJW?   tangent  coedge       tcoedge coedge     9 A r ,h? tedge edge  r ( ,h? 8  tangent 9CI? pcurve    exppc nubs ,hr;{8B@|e|%8B@)OT!  cone=1y@أ"בLMf@t ~:ƿB`\5< ?t ~:ֿ? ?? -DT! } pcurve    exppc nubsRR[ h?>_{|@-DT! =_{|@} cone=1y@أ"בLMf@t ~:ƿB`\5< ?t ~:ֿ? ?? -DT! } face      tcoedge coedge     >  !!xYMcv'! tedge edge  C!xYMcv' "!  # tangent Ya? pcurve    exppc nubs!@NW"@g.t#@Հ*)$@D%@%$&@!xYMcv'@,xWwl?7@?l z ^L`?#6bn@I}?q^~M?z#r֪?S-BX?"6fc5?nP(~9?ݗ0?? ?Z?ĵ?@*,d?@K?MbP? toruswA@Jf@?@? tcoedge coedge     $ A %dV%<  loop  8 &  pcurve    exppc nubsSF; ?[Ec&?SF; @??[Ec&@MbP? spline  exactsur nubs???[Ec&@sK!@ʳR␅!@O݉s%@C)@L ƒ@SKLv}:Vf@ބkƒ@L^A[]L Xf@oŒ@ϐqDqL̚k Yf@_[mÒ@Z6L_i.Yf@.*@zKǎLXf@ͱ+i@$(KK.qVf@g:ƒ@J9,Lc~LүJ$f@CAƒ@KQgL,M$f@٠ Œ@*]L>[!f@YpÒ@2FK# _G f@Cu’@7*IK| ^f@hǒ@TUfL.0f@kǒ@iRLĔf@#zǒ@gdiL{_e@/ʹŒ@5[Le@|gĒ@ *~/KPTe@" %Ò@#ͣ KxXe@VBWȒ@nULmV _e@(rdbȒ@])LI ,qe@>]Oǒ@v"qL5e@+0ƒ@eΟDL*e@kJIJĒ@9TKe@ Q'Ò@cfKwae@>Aɒ@x?-ʠLE.e@ =Mɒ@8iL-e@^խȒ@dRk|LSٿe@v!aƒ@˴!LQBce@ƇĒ@k?L6:R7e@8H’@K8 e@wOɒ@TLQ媯e@&3ɒ@zӾL]2e@[& ɒ@iZL$ Ƭe@J,uƒ@`"LNڥe@ ڛĒ@{ǏLϿɜe@'’@3׵Kԡʟe@@j1ʒ@2x̿Lgäae@M"hL3ʒ@AƎLqD e@Gaɒ@2&.{LAe@D_fƒ@2pALވ e@|·Ē@?L'e@ZڒW~’@HzK97'0e@?sK!@ʳR␅!@O݉s%@ ?  ?  tvertex vertex  > '\OJO?intcurve curve   bldcur?[Ec&@sK!@SF; @t'? spline  rbblnsur blendsupsur planeDxgzǒ@Qڂf@ ?t ~:?t ~:ƿ ? null_curve nullbs@@Q@e@ blendsupsur toruswA@Jf@?@? null_curve nullbs@@Q@e@ intcurve  offintcur nubs\ɲc@a2@?[Ec&@BicS @vI0M #@܈}&@C)@\@-[qL0sg@}v @kL_ g@-Gx@LL9f@R@Mxf@_X0O@,M z+f@rc@ V6Lcw1nf@V Qǽ@|L\f@p~@%!@ܳLޮ!@~\"@vI0M #@POY#@)meݑ$@qU%@܈}&@V-&@}$'@N0(@ null_surface nubs?[Ec&@SF; @??[Ec&@?SF; @ nullbs   ftreemeg attrib  & torus surface  wA@Jf@?@? ftreemeg attrib  ) torus surface  ؒ@Ne@?@?  coedge  (  ) *  coedge  2 +  K   edge  ,{@` O_  - tangent  coedge  .   R N  coedge   / 0 1 N  loop  . 2  vertex   3straight curve  @P@e@?   @ ؈'+@tcoedge coedge    4 5  6PS!T{C=  edge   7huJV? -DT!?  8 tangent  point  ؒ@P@e@ coedge  9 :  U ;  edge   V: 69  < tangent  vertex  U =ellipse curve  @Ne@??  -DT!?ftreemeg attrib  * cone surface  @ e@lvlv? @ tcoedge coedge  >   b \ ?] h tcoedge coedge   > 9 @ \ A>h?  loop  [ B  pcurve    exppc nubs<S!??,H@M?MbP? spline  exactsur nubs ??j6?P$?v@ @A @{jD@̎y @Pt!@ؒ@"בLe@ؒ@jLe@ؒ@t3pgLY+Qe@ؒ@&LŎe@ؒ@Kce@ؒ@@bKye@}$ؒ@"בLe@ݶؒ@jLe@@ 6ؒ@t3pgLY+Qe@[˭l"ْ@&LŎe@$=ْ@Kce@tLْ@@bKye@hk$ْ@l\ZLe@b-P$tْ@kLe@2ْ@㜁 lLY+Qe@KpIڒ@9bLŎe@a͐~ڒ@Kce@+ڒ@3SKye@ڒ@!7{Le@#Aے@;?̡Le@uے@I݁LY+Qe@ ݒ@6LŎe@Џ˖ݒ@UWLce@H;ݒ@YLye@;rq]ے@T~Le@RyKHܒ@ćLe@.2ݒ@+HLY+Qe@^ޒ@mEVLŎe@%iYߒ@:Lce@xߒ@^l*Lye@gܒ@9Me@6X~Cޒ@+yMe@]ߒ@ILY+Qe@e )@b}LŎe@@Lce@ԋlI@XɷLye@!a"ݒ@bDMe@Zߒ@ 4Me@usRc@%5$MY+Qe@uܖ @/ MŎe@pDS @vXLce@!R@m`oLye@Lէݒ@ӼѿMe@aaeߒ@ol Me@r@no'PMY+Qe@K8@[MŎe@杒ױ@GWsMce@ovT@S8/Mye@ +W!ݒ@}@(Me@Bzdޒ@SMe@Wߒ@T NY+Qe@oC@0!h>NŎe@Q4@iONce@z@"8ZNye@v9?ڒ@4Ne@^9 ڒ@{ifNe@jv4xے@λKNY+Qe@~ܒ@'NŎe@2cܒ@ Oce@'ݒ@&DOye@NGtfג@J[BNe@Hݍג@ TXwNe@ ڏג@6;NY+Qe@s}nג@A'_OŎe@L)naג@ɩd(Oce@#fYג@p#C=Oye@%0 Ӓ@ Ne@#aҒ@;D=?  point  *w@6Mye@ coedge    C D   pcurve    exppc nubsj hz:Ud@ Ud@@ET!  cone@"בL_e@? ?@ -DT! }tedge edge   E :] h?  F tangent Ln(C? pcurve    exppc nubs] h?@-DT! @} cone@"בL_e@? ?@ -DT! } face G H   I ftreemeg attrib    face J K   L  loop  M  cone surface  T@@Kf@? ?@ -DT! }tcoedge coedge   N  O  PVy@<uV%? tcoedge coedge    Q R @ SD^Q,T!? tcoedge coedge     T @ UQT!? tcoedge coedge  V W  m g XhhF?_ tedge edge  YF?_ = Zhh?  [ tangent چbC? pcurve    exppc nubsF?_ =hh??bܪ3n0>d dMbP? spline  ref tcoedge coedge    \ ]  ^] h?  coedge  Q _  q `  edge  u@ a;LԠ@ p b tangent  edge  ;LԠ t  c tangent  pcurve    exppc nubs] h?MbP? spline  ref  vertex   d vertex  q eellipse curve  @ԣ"בLf@?@1T???  coedge    f g  coedge  h i  y j  edge '  }-DT! k-DT!?  l tangent  coedge  m  i n |  coedge   m   |  loop  m o  vertex  y pstraight curve  |@@K`f@ (&23? ܈'#@tcoedge coedge    k T  qQT!  edge (  qq5 Y h?  r tangent  face s    t  point  |@M`f@ellipse curve  @Jf@?x+R<?  -DT!? vertex  r uellipse curve  wA@Jf@?  -DT!?ftreemeg attrib  !  face v w x  y cone surface  @Jf@?x+Rx+R<lvlv? @  coedge    z {  coedge  | }   ~  edge  -DT! -DT!?   unknown  coedge        coedge    |    loop     vertex   straight curve  @J@`f@  coedge        edge  "    tangent  face       point  @E`f@ coedge        edge  -DT! -DT!?   unknown  coedge        coedge        loop     vertex   straight curve  x@J`f@?  coedge        edge   "@   tangent  face       point  x@E`f@ coedge        edge  $@ 6@   unknown  vertex   straight curve  P@J`f@? {cD ?@ vertex   straight curve   @J`f@ ? {cD@ftreemeg attrib  b  face      plane surface  @J`f@??  coedge  w  3   coedge        edge  Q|n@ GwQ@   unknown  coedge        loop     vertex   straight curve  @rO`f@? 6rÓ4 :"1vb@ point  @.uӜR@`f@ coedge        coedge        edge  @ ,@   unknown  coedge        coedge        edge  @ I@   unknown  coedge        coedge        loop     vertex    vertex   ellipse curve  L@Od@?lvlv@?  coedge        edge  bAN *$   unknown  coedge        coedge        loop     vertex   straight curve  aJT9_@ΏR@@e@  coedge        coedge        edge  MK MK?   unknown  point  aJT9_@ΏR@d@ellipse curve  ,@v1O@d@5j Ce¼ǰQ2t?? ftreemeg attrib  6  face       loop    plane surface  @L@e@??  coedge        coedge    4  w  coedge      w  coedge        edge !  = @ ?Nv@   tangent  coedge       coedge        edge  -DT! -DT!?   unknown  coedge        coedge        loop     vertex   straight curve  D@H@@e@  coedge        edge   $@   tangent  face       point  ,@H@@e@ edge  @ ǜ.@   unknown  vertex   straight curve  D@K@@e@? ;`< ;`2@ftreemeg attrib  X  face   ~   plane surface  D@H@@e@?  point  D@v1O@d@ftreemeg attrib  U  face       loop    plane surface  4@L@e@? tcoedge coedge  \ i    +0+L . tedge edge  "+0 +L .   tangent TF60? pcurve    exppc nubs+L .@_v.@F ,/@d/@}4 &0@m0@+0@}}N'?Į~,?Qٺ?ܗS3?RlTl/*9?뽚ig渉?~>P9,?Rf."n1|?j ??j.*׍6ɋ?cCD '~?<ֽƗm@@zp@$o$+i@Lq@d@_ܤ@x5d@vИ5&@Fd@D˼A@ *i@GB@}m@lFC)7@YOv@{)@@V|@@{@@nE@MbP? cone'0В@Qe@?@? @ intcurve curve   bldcur0⣔_6Ak`c? spline  ref  null_surface nubs0⣔_Ak`0⣔_Ak` nullbs   tedge edge  U%@ !з(@   tangent Ѳ)? pcurve    exppc nubsU%@з(@U%@ з(@MbP? spline  ref  point  56ʒ@; Lbwe@tedge edge   %(g.P@ )b;@   tangent ?? pcurve    exppc nubs(g.P@)b;@(g.P@)b;@MbP? spline  ref  point  l͒@4LTse@ftreemeg attrib  (   loop   ( spline surface   exactsur nubs??J 6@_1@ @% $@@j1ʒ@·r3@Ogäae@M"hL3ʒ@Xc9qBOqD e@Gaɒ@>OAe@D_fƒ@:5Oވ e@|·Ē@eA{O'e@ZڒW~’@[BP97'0e@wOɒ@fC&OQ媯e@&3ɒ@ ,AO]2e@[& ɒ@t~O$ Ƭe@J,uƒ@BWBaONڥe@ ڛĒ@%8pOϿɜe@'’@g8%Pԡʟe@>Aɒ@5_ OE.e@ =Mɒ@ HO-e@^խȒ@*OSٿe@v!aƒ@5KQRVOQBce@ƇĒ@O6:R7e@8H’@P8 e@VBWȒ@EK%OmV _e@(rdbȒ@^PcZOJ ,qe@>]Oǒ@VO5e@+0ƒ@1`2O*e@kJIJĒ@+Pe@ Q'Ò@,N.L Pwae@hǒ@1O/0f@kǒ@`UdOĔf@#zǒ@96O{_e@/ʹŒ@cʤOe@|gĒ@.hPPTe@" %Ò@n.PxXe@&ǒ@袹k6O qi$f@zë%ǒ@Ӆ4ugOүJ$f@CAƒ@|O,M$f@٠ Œ@բvO>[!f@YpÒ@.~\P# _G f@Cu’@9[P| ^f@qƒ@k4OQ9S1f@ƒ@eS9fO-2f@!g`ƒ@vTuOO2f@=xA@Ē@ ROW0f@)9qÒ@P㼡/f@D(’@39P/a$W-f@< gƒ@ʝo,O` K8Ff@|_ƒ@2#`OZGf@VŒ@ ROtjZHf@;Ò@`O#Hf@JI ’@5aPs5Gf@*@H7t PlhƞEf@g:ƒ@E(Oc~O’@(KԢf@'<@oh6KcI$%f@зⱽ@LZLHƥe@B`@1/L$/zNe@3l@g$LS %e@x5T @rKK_8)e@˯^A@ȁ^ K?e@-t@nKa"f@)d@eaL(e@+De&@p-UKZe@RXUe@ 'K{ye@%@5RKR(e@a@\L|Kae@ft=@@ uvKֻf@a˳@"AKH.*e@%㵒@~dKU,e@q2@XFKvaMe@iT@1)wK;9(e@d@Z@xKK-e@;u@ýKϜ||1e@iBͱ@]o'K T-e@cR/@P+KÖie@X䶒@RnmoJ`%+e@S,κ@oۣJ.X_e@@pJLTe@j>Mٻ@WvJ0Rf@ @9JO e@sY?@ԎJwde@_ Q@wYvJA2:e@9B6@bJve@.&ͻ@V-J؊xe@? r@؊J^XXF f@5 @bBYJq\ZNe@l`L@մ_JYTe@xW@ hHfJ-4e@S[T@RlJv2bVe@~pͻ@H,lJ@je@ڣx@ԖhJg f@.4α@XǾIkre@0@rcI&8e@S綒@dk ,JIQe@gѺ@/ڱ*Jbe@6J@L)(j-J |e@ѩCػ@4D?%J2f@eFRͲ@K:|IC e@ @=t6 I e@yg1|@pUI?+re@a=@T2ԈJڿ-e@m@'@ؙ Je@{V(@JJf@ Xt5@Ijke@`D@JI6h^e@p@,XVI+2e@K@^B#I7 -e@ @8I !e@ z@fffffI+Af@?'#@ػ$@jzG'@e۰h+@/y/@fD- 2@XGN\3@ ?  ?  tvertex vertex   ,QN?intcurve curve   bldcur!@'#@ػ$@!xYMcv'@~f<ټ? spline  rbblnsur blendsupsur conehK@Q@f@?@? ?@ null_curve nullbs@@Q@e@ blendsupsur toruswA@Jf@?@? null_curve nullbs@@Q@e@ intcurve  offintcur nubsMG?G"kHP @ڏQ@.ЈC{ @vWs@enq @Un @!@@Ls#@PxZ%@O>&@"Zo'@?t)@E*@tf|,@b.@s ]0@dfd2@3@IJk4@ENw@I X,f@#{ @ I5%f@]A@>}z Jr\!f@ͩ'k@gwJa(Hf@ҳmdQ@FJcռ`| f@]뮒@%=HKƜ&f@ @>QK$`N,f@\tM@j .K J9f@n9@oҶc LZQ@f@FX@TML@1Pf@mʮ@\fL=Wf@L2@=W:Ldf@!jL@orF LKkf@!߸@D_ML+uf@Q3ʎ@}K>LSyf@ X@Lk~f@hlzS@_]Lf@ξ6R@%Lf@jK__@>$L| @[~f@U6I@ LΌxf@ /@4_8LiVsf@==@5YT;L\gf@^:9@:Z1L!f`f@1M@:LQxRf@m>@0oLrKJf@T@w%Lw ;f@$>1@L%I3f@J0@$ Lw;$f@G4!@Z3LI`DIf@ldփ@WLXf@8@~zLo f@z.@'tKLOf@n筸@:-L,K|7f@,Pɶ@X_GKXe@ܵ@¿o֭K7e@]^-@fU&/Kg-Ef@Fօ@&5JW2`f@r@gZ_J#7zf@pXਲ਼@M(R2Jf@t7@zsIݷG"&f@i̩@l9 I°*f@yZ@@IYf@@@ toruswA@Jf@?@? conehK@Q@f@?@? ?@ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?~f<ټ? ?? !@'#@ػ$@jzG'@e۰h+@/y/@fD- 2@XGN\3@IJk4@~f<ټ?3nG#xFI"@S-蝬"@86X#@@Ls#@ u#@h\/:$@\5$@PxZ%@9 a%@ɴ%@s"&@O>&@h7bK&@0?'@)'@"Zo'@=Z(@XXcͭ(@(s)@?t)@d)@6*@\?o*@E*@a+@/5(a+@vy4,@tf|,@P 'n-@,Uu-@|S.@b.@kPFB/@h=/@edK0@s ]0@ E0@-.1@2.naW1@Fl91@Z1@n 2@&0J2@dfd2@?Q2@(? 3@,P3@3@6/,:^3@nZ !4@zg4@ null_surface nubs!@!xYMcv'@?!@?!xYMcv'@ nullbs   tedge edge  -< CV%?  . tangent a e? pcurve    exppc nubsV%ؼ??[Ec&@^ɳK=?[Ec&@MbP? spline  ref*  face / 0 A  1  point  D+i@(K%qVf@ coedge  2 I 3 4  coedge  5 6 I *   edge  7*zJ4p@ ,k2G>@ ) 8 unknown  coedge  J  5 9   vertex  9 :straight curve  Ͷʒ@ M@@e@? nl=ma i ?-@ coedge  / L ; < N tcoedge coedge  M . = > N ?mFj@ 0v&h@  coedge  @  M 1   edge   AsFC? O-DT!? M B tangent  face C D N  E  point  Ͷʒ@P@e@tcoedge coedge  F G Q 5 H IT{CPS!? tedge edge   7T{C VPS!? Q J tangent Y~Zqd? pcurve    exppc nubsPS!T{C=Ɔ+1d^)1jDT!MbP? torusؒ@Ne@?@? tvertex vertex  R K]KK?ellipse curve  ؒ@Pe@@?  -DT!?tcoedge coedge  L T [ @ ; M>h: tcoedge coedge  T L F N ; OY h?  loop  : P straight curve  *w@ ye@@  point  *w@Nye@tcoedge coedge  [ Z Q R \ Sl _c:R!?  pcurve    exppc nubs] h?MbP? spline  ref/ tedge edge   T >h? [ U tangent &Sh.S? pcurve    exppc nubs>h?&8/$?ԗ@?UD@MbP? spline  ref/  face V W \  X  coedge  Y Q ` D Z  edge   Ud@ E@ C [ tangent  vertex  D \ellipse curve  ؒ@£"בL_e@=?? ftreemeg attrib  d  face ] B ^  _ cone surface  @"בL_e@? ?@ -DT! }ftreemeg attrib  f  face ` & a  b spline surface   ref< tcoedge coedge  W V c d g e4P h? tcoedge coedge  i \ _ f  g+L .@+0@ tedge edge  h: "uV%? i i tangent {[eJ? pcurve    exppc nubs:uV%?T0@?B[@.0@MbP? spline  ref tcoedge coedge  j p j R ` k,T!D^Q< tedge edge  ZD^Q u,T!? Q l tangent ;I% %? pcurve    exppc nubsD^Q-p8R?Zp8R?,T!?pp8R?Ʀ?,T!?ܪ3n0>d dV,fgW6,@?40ٕI?I[TRA?R&SdZ1?] gc3տt>uf\?eː? oūWt?;\0>7 S>̴׿SB2>>?ǿ(Sc=MbP? spline  ref tedge edge  t YQT!?  m tangent (҈l? pcurve    exppc nubsQT!???o bMbP? spline  ref  coedge  M l m n g  coedge  l M j o g  pcurve    exppc nubshhF?_ DT!  ~ coneT@@Kf@? ?@ -DT! }tvertex vertex  T p-> vertex  R qellipse curve  2T@wnM f@v,Jb=?.4۽T=?? tcoedge coedge  N  o ]  r] h tedge edge  a ] h? o s tangent ܼn(C? pcurve    exppc nubs] h?|;LԠ@-DT! ;LԠ@l} cone@ң"בLf@ޛVۼ<? ?@ -DT! }tcoedge coedge  p t N f ` u+0+L .  loop  v w  vertex  q xstraight curve  @ң"בLf@@ straight curve  @JbKf@  point  @IbKf@ point  @ѣ"בLf@ coedge   y w g z  edge %  k@ ;LԠ'@ w { tangent  coedge  | x y } j  coedge  x | z n j  loop  | ~  vertex  y ellipse curve  @N`f@x+R?lvlv\[1%~? 0Z 0Z? coedge  { z V n |  edge &  <;JV? }-DT!? i  tangent  face   |    point  |@N`f@ pcurve    exppc nubsQT!rL#1-DT! @E'1-DT!?MbP? torus@Mf@x+R?@?x+R< ellipse curve  |@Mf@UUUUUU? qq5 -DT!?ftreemeg attrib    torus surface  @Mf@x+R?@?x+R<  point  wA@HbKf@ftreemeg attrib  "  face  w     loop    plane surface  Dxgzǒ@Qڂf@ t ~:ƿt ~:ƿ ?  coedge     {   edge  $@ 6@ z  unknown  coedge      ~  coedge      ~  loop     vertex   ellipse curve   @E@`f@x+Rx+R? H H@?  coedge        edge   "@   tangent  face       point  @E@`f@ coedge        edge  -DT! -DT!?   unknown  vertex   straight curve  @E`f@? {cD ?@ftreemeg attrib  \ cone surface   @E`f@? H H? $@  coedge        coedge        loop     vertex  { ellipse curve  P@E@`f@x+Rx+R<? H@ H@?  coedge        edge  "    tangent  face       point  x@E@`f@ coedge        edge  -DT! -DT!?   unknown  vertex   straight curve  x@E`f@ ? {cD@ftreemeg attrib  [ cone surface  P@E`f@? H@ H? $@  loop    straight curve  @J@e@?  point  P@J@e@ point   @J@e@ftreemeg attrib  c  face       loop    plane surface  Ԓ@H@e@??  coedge        coedge        loop     vertex   straight curve  @rR`f@?H˪?  edge  8CNZi9 -DT!?   unknown  face       point  @,uӜR`f@ coedge        coedge        edge  -DT! -DT!?   unknown  coedge        coedge        loop     vertex   straight curve  @Ld@  coedge        coedge        edge   $@   unknown  coedge        coedge        vertex   straight curve  4@Ld@  coedge        edge  $    tangent  edge   $@   tangent  face       point  L@Ld@ point  4@Od@ coedge        coedge        loop     vertex   ellipse curve  @ieR@e@;H˪??6j Ce<@nĿ@>=?  coedge        coedge        edge  MF!CC=  %p<   unknown  face       point  aJT9_@ΏR@3Ce@ coedge        coedge        coedge        edge  zJ4p@ `~S@   unknown  vertex   ellipse curve  @>y\3mS@d@<\AW<!t @3fL@^+!@Ng #@(@N+@+L .@: f0@\J2@>oȆ4@<6@A ;7@|hj9@E.9@ d@If@F񐇒@P(!If@  @>If@a!p@` [3Jf@Y.@%r6Jf@REއ@h(*gKf@9@E\Kf@t.@#4Lf@53M@/!oLf@HpUa@ŧ,Lf@[)„@^p6!Lf@ @C\޽Mf@}d@8R*KLf@VBڥ@8:v} Lf@T@sSaLf@뫒@gzW)RLf@'@У"בLf@ ii@У"בLf@6dc>@fzW)RLf@4.1@sSaLf@O@8:v} Lf@4dKƾ@8R*KLf@N&Ê.’@C\޽Mf@!+rȒ@ Lf@˒@ثLf@TXΒ@AtSLf@ΓΒ@2҅iLf@LQ7ϒ@bLf@0zђ@/_Lf@b9Ӓ@6#Lsf@G Ւ@pGKsf@/%Ւ@F%XKf@|Ւ@">!߰Kf@2-b֒@RKf@@@ toruswA@Jf@?@? plane4T%@Qf@5^<?5^< nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?? ?? +L .@si0@< 1@J6]4@A ;7@A6;VNE7@νLӋ7@֨7@[Żq8@A8@e5]8@%?y9@|#)b9@?>lj.@Pl/@1<=20@: f0@BbV0@K++41@T:1@\J2@FR2@1Dj2@2@D3@m3@9%3@'T864@>oȆ4@H@4@"5@Zk5@@75@¯R6@vnO6@*cA6@<6@A ;7@F˦7@U=8@ӕ8@|hj9@ null_surface nubs+L .@+0@?+L .@?+0@ nullbs    coedge    !    pcurve    exppc nubsз(E@6(;c'fWR'n.:|&d%U%[}{@ߒE@laa@Or\@S@Z1s@+k@c@%@1&R@;vk@\@j@pSaH@ c|@ {@ >3K@`^L|@L@6ْ@@xm@'Ue@8(@|pu@3&r@|pu@ȸω@MbP? cone'0В@Qe@?@? @  coedge    Y    pcurve    exppc nubs)b;qHssY#I@ x(g.Pt@)DT!?u@2b?pJe@U7I?BW@T$%?ȣͣ@Fq?( [@&sR? \@x`G?QG@ *?HGf@l%绰?rPy@dvO?`V@:c?{Gc@1>r?`{@̫@MbP? cone'0В@Qe@?@? @ tcoedge coedge        0v&hwmFj intcurve curve   bldcurU%@$#'@ з(@롕? spline  ref null_surface nubsU%@з(@U%@ з(@ nullbs   intcurve curve   bldcur(g.P@6,@)b;@PTRE? spline  ref null_surface nubs(g.P@)b;@(g.P@)b;@ nullbs   tcoedge coedge  ! " # $  %h 0B"+h?  point  MȒ@"בL=e@ftreemeg attrib     loop  &  spline surface   exactsur nubs ??a?a@FrM@ R@49l_!@ zb$@#G&@ -v'@ Xt5@@Qjke@`D@ Z1Q6h^e@p@"Q+2e@K@^nQ7 -e@ @15 Q !e@ z@ Q+Af@eFRͲ@A&Q#C e@ @)yQ e@og1|@G Q6+re@a=@敻Pڿ-e@i@'@2Pe@wV(@ZPf@4α@  Qre@䟱0@DNtQ '8e@S綒@.LJiPIQe@bѺ@Pbe@2J@WXJPF|e@ѩCػ@]P2f@5 @}^P\ZNe@l`L@7s%P(YTe@xW@۟P-4e@R[T@$P2bVe@}pͻ@!P@je@գx@߱6?P4g f@ @PO e@sY?@o/5Psde@_ Q@i3,P?2:e@9B6@ߤ-/Pve@-&ͻ@Q鈻Pxe@? r@3P?XXF f@Bͱ@l HlPzS-e@dR/@G jxPie@X䶒@%IȃP[%+e@^,κ@PX_e@@j=GPLTe@j>Mٻ@}čP4Rf@a˳@i_ ?Pʚ.*e@%㵒@w;!MP~U,e@q2@\PaMe@"iT@I!3kDpP>9(e@-d@Z@ !tP-e@;u@ rP[||1e@'*d@r;Oe@De&@qeUs0PuZe@aRXUe@u쾯P}ze@٥%@%7P»R(e@ȝa@٦APae@t=@q"DPuf@Bⱽ@GO ƥe@sB`@jvO/zNe@3l@M}OU %e@5T @5qFZP:)e@^A@P+Pe@-t@ˑ1Pa"f@ܮT=Ē@FQOO5e@Ē@tO"Fe@qfĒ@*ñLHO@B-f@>@*HÒ@ ,Ofpf@PO’@RkP֢f@2<@2PdI$%f@at~ƒ@f7Osf@x?ƒ@kiO` "f@$3ƒ@T ꟈOl&f@1zlNĒ@ѥO*܅80f@KJD’@&PUP5f@CJm@ԀP M9f@q(ƒ@kGO/Aef@E[Sƒ@U3TO2&ff@wխgŒ@PJ_O)ܫff@7 MÒ@nRO=Bdf@\.{@jqKPhaf@X5@Bm0 Pv^f@axWĒ@PO+1f@VgGĒ@jvPO־=f@:K-۷Ò@|O҃f@B7@ Õ|kO{f@y@7!Pruf@8h@e"PhfWnf@m@Owdf@<)@Y5OO,KFf@sgY@CІO3u樥f@)@8;O#f@:L@`-*OLaG΍f@U@~HrPV;ւf@ jf@kOwJyf@6}u@%4PO,f@ǺD@TpOIL %f@^'!s@(qBOra?f@EԻ@gD^P:FEf@s@ U PK~1f@t@b[uO4IRf@AD@KTOђڽf@86Z@nQO]1f@j{@hEO£ܨf@*EI@FAe3PpV;f@@[# Pc\f@mH9ܷ@vR O(f@l% @G5NVOBLҿf@PR$.@dVEOH8;f@ BI@rOߦVf@7C@PSf@Q~)@et P'5jbf@5K@{f$Of@Iυ@@YOf@nռ@aOz5-f@@JONѫf@8[UA@ɅPܔgf@b)#S@x P~Nf@?a?a@FrM@ R@49l_!@ zb$@#G&@ ?  ?   point  '0В@F"בLe@ftreemeg attrib    loop  '  cone surface  ׼@%\(n5OVWf@t ~:?Gm]= t ~:ֿ? ?? -DT! } coedge   @     loop  @ D ellipse curve  Ͷʒ@Pe@?!Z |b?  edge  -DT! ,CJWƿ  ( unknown straight curve  wA@..!@`f@ l)6Q BH6AV@ vertex   )straight curve  Hf@..!@ޓf@? BH6AV l)6Q@tcoedge coedge  *  " +  ,`r7@% $@  edge    ->h?  . tangent tcoedge coedge   * / 0  10}@}3)% @  coedge  2 f   z  edge "   3D^ h?  4 tangent  face 5 6   7  point  wA@P`f@ point  Hf@Pޓf@tcoedge coedge  8   # x 9SF; ?[Ec&  coedge      x straight curve  nZÒ@أ"בL=[f@p ~:? tedge edge  -?[Ec&@ SF; @  : tangent 4{v9? pcurve    exppc nubs?[Ec&@SF; @?[Ec&@SF; @MbP? spline  ref*  point  Q7ǒ@p$בL4'W!f@ftreemeg attrib     loop  ;  spline surface   exactsur nubs ??oFPF>Gs="pH kMW |qwqmx$ܿ5\z ƿq@3@V`z&@}3)% @ưՒ@|D Pf@ Ӓ@e5Pf@ԗ̱dђ@jQo9KPՕf@OΒ@L 'dP7f@cʒΒ@igPY }f@gLϒ@_)`Pjf@wՒ@~Pf@-UӒ@:F0Pf@);ђ@oFPbꗵf@%PsΒ@4$`PhQf@@rΒ@c%dPQ}f@'ϒ@⤿\Px=Ijf@_:Ւ@APf@U!Ӓ@+Pf@Qђ@W=BP޿f@_Β@K5]]P͸]mf@dOΒ@D`P ~f@HTϒ@s'NYPjf@ Ԓ@ްk Pf@",AҒ@S9c"Pf@ 2В@'{:P,K/f@OĽ[Β@?~VPV䦔f@wΒ@f0ZP*CO\~f@a"Β@j RP,kf@o|Ԓ@cWMPf@RY~Ғ@|w*Pf@ߏ̾В@^F6Piof@z6Β@RnSPcĔf@<͒@WPDk~f@ GpΒ@ΔOPӼSYkf@v6Ԓ@ӓOf@- Ғ@2vPf@*8В@3.0PQƵf@Ck͒@+NPR.df@.%u͒@HRPx~f@SˤBΒ@?JPA[Wkf@^F9Ӓ@ EOf@_ђ@1yPf@В@ -PUǸ̵f@oz͒@pzLPo f@~F+͒@+QP ~f@a"'Β@aHPa>5kf@6fӒ@]W nOf@ђ@̾<Pf@Ezϒ@ a{)P2Jdֵf@ٴ͒@uIP>/f@Nc͒@m6/NPf@V7͒@hMEPkf@FQmӒ@Of@턦ђ@ۊ Pf@m'1Zϒ@Jqq(P#o.ڵf@֐͒@ hHPºP~/ʵf@>̒@a_CP If@ H͒@{ ;PPlf@[ʢђ@g*Of@6В@Of@sΒ@"P{ f@h=̒@//d6PX*f@Kz?y=̒@u')ʒ@d^,Pa_z/f@a,1B˒@Ļ#PB1Jof@_l ̒@c75Of@ټ7˒@c\k}Of@P2Qʒ@$wOf@J*ɒ@LjP4f@Ȓ@ϔPR,τf@o+ɒ@7P̺(rf@),qȒ@vOf@ǒ@F&MZOf@i_ yǒ@ !O3֗f@1 ձƒ@)P䐛f@rpƒ@ni% Pb1f@Ɓƒ@=c]Pquf@pA}\@~CNf@?g@@δL=Of@)q@ UьO\xf@ Ҟ|@LO}Xf@ }@NX5O1wf@w@a7(.OSSf@Ƚ@ Of@e+@AOf@v\6@Of@}D@`OJ#f@ڠ@ǥ;YOg~f@bv@ƉP.hK/f@c@×Of@Q\@iROf@Mpmà@O Lf@DuC @C¤O$CTsZf@nt4@xFPO*)f@nF@J&!GZP{f@L굒@GrG'Of@N&@Sh[Of@56a@5m.OǨûf@͆(¶@^oOb[f@&綒@DPK}9f@: @/^ P`b{f@*8W@Q2Of@ecu@mdOf@S\@nO,u8f@s yŲ@OdVf@pALز@cPECf@'䲒@^]=P7UIf@j@0\(n5Of@;i@w=fOf@իG@̏COY+Qf@q3-@$1>OŮf@]p67@ "Pjf@+=@ΨrPf@wA@0\(n5Of@wA@w=fOf@wA@̏COY+Qf@wA@$1>OŮf@wA@ "Pjf@wA@ΨrPf@? PF>Gs="pH kMW |qwqmx$ܿ5\z ƿq@3@V`z&@ ?  ?  tcoedge coedge    < =  >!@"xYMcv'@  pcurve    exppc nubsuV%:<?!@\>!@MbP? spline  ref<  pcurve    exppc nubs<V%?BK1 ?]J v'@r;?!*Xv'@MbP? spline  ref<  point  dN)#S@Mv(K'Of@tvertex vertex  = ?c?ellipse curve  i,@'KL> Kf@MzƿTbKuݎ9?p?z=}:?? ftreemeg attrib  &  face @ < A  B spline surface   ref*  coedge  C ( D E  coedge  F G ( 4   edge  HMK 7MK? ( I unknown  coedge   ) + 9   coedge  ) J F K   vertex  * Lstraight curve  D@@Q@e@H˪  edge  >JW? ,v,DT!? + M unknown  point  Ͷʒ@g'I=Q@e@ coedge  N O . < P  edge   QpUd@ 7 @ . R tangent tcoedge coedge  S T / > U V 0v&hmFj tedge edge   A 0v&h QmFj / W tangent z]?,B3? pcurve    exppc nubsmFj@ҸB@i@N6@@=@ 0v&h@Tr 0G׿Z$׿'|kBZؿ5n$8ؿTe,Xؿ2]E4uؿTm,F4;ٿ|KTٿvDŽI%ܸ5;ڿ,e0-+,ڿd#j-~ۿj<>D/ܿUyZbݿMbP? cone@Pe@lv@lv? @ tcoedge coedge   0 X Y  Z Uc (f tvertex vertex  1 [ʔ?ellipse curve  Ͷʒ@Pe@@?  -DT!?ftreemeg attrib  2  face \    ] cone surface  @Pe@lv@lv? @ tcoedge coedge  ^ 4 : N H _Y h tcoedge coedge  4 ^ N ` H a$|h?  loop  G b  pcurve    exppc nubsT{CPS!??H@@?MbP? spline  exactsur nubs ??6?nP$?iv@ @~ @EtjD@̎y @Pt!@Fqݒ@Ne@$7ߒ@Ne@|`~@NY+Qe@>X@NŎe@bYi/b@Nce@*w@Nye@Fqݒ@m$Ne@$7ߒ@XNe@|`~@7hNY+Qe@>X@kMNŎe@bYi/b@Nce@*w@eNye@5+ݒ@ mtNe@%ߒ@BNe@@\vNY+Qe@3+@_ #NŎe@oˆ1@2Nde@O`b@fNye@F!$ݒ@UzNe@(ޒ@)td5Ne@]Sߒ@N}NY+Qe@qI@P#OŎe@_QE:@<q2Ode@s7+@dZi;Oye@Z ܒ@nS.Ne@Hݒ@DP*o Oe@/ߒ@4V&OY+Qe@5O@Pk2vWOŎe@ayp)@$0kOce@ݘR@fvOye@3nے@JqOe@6 ے@mkoHOe@ ܒ@8KsOY+Qe@82ޒ@:#%OŎe@.ޒ@TOce@8Aߒ@ez-Oye@댪ْ@#@0Oe@Yڒ@?`Oe@6P&ڒ@?nNjOY+Qe@;+Ʊے@r2OŎe@F8%aܒ@Fd:Pce@;ܒ@ǡ e Pye@"bs֒@49Oe@֒@0,̱lOe@~-֒@ZNOY+Qe@+rՒ@"Ay 'OŎe@@elՒ@)y Pce@PvKՒ@fAPye@ͺՒ@na*$Oe@nu07Ԓ@HPOe@r0hӒ@!}OY+Qe@z Ғ@-}OŎe@M4Cђ@tS0Oce@>.ђ@sBxOye@x/YҒ@t.=Ne@'<В@^+Ne@}!Eϒ@ΎNY+Qe@Vɱ̒@ŰOŎe@è˒@_Fc Oce@ ˒@$Oye@"ђ@TvNe@6_=EВ@qstNe@M Β@\"AqNY+Qe@˒@:|omNŎe@ʒ@r)-lNce@]ʒ@l0kNye@ЩӒ@FMe@9$Ғ@-Mce@LZޒ@A.Lye@,۔ܒ@\z> Ne@K<ޒ@T&SMe@ߒ@) MY+Qe@XNV@J}eMŎe@z5@@EF\~Mde@k}=@UֆqMye@8Rݒ@wzFaNe@d *#ߒ@"XNe@Z9ܩ@‰PNY+Qe@O8@gBBNŎe@؞\?@%nX@GpRaNŎe@bYi/b@_{@d^Nce@*w@^a\Nye@Fqݒ@Ne@$7ߒ@Ne@|`~@NY+Qe@>X@NŎe@bYi/b@Nce@*w@Nye@?6?nP$?iv@ @~ @EtjD@̎y @ ?  ?  ellipse curve  ג@bNye@?h&>SU ?  point  ג@PrPye@ coedge  : 9 c d ;  pcurve    exppc nubs>h:89@*H9@GT!  coneFqݒ@ _e@?? ?@ -DT! }tedge edge   e VY h? : f tangent n(C? pcurve    exppc nubsY h?:@-DT! :@} coneFqݒ@ _e@?? ?@ -DT! } face g h ;  i tcoedge coedge  C c > R Z jR!l _c tedge edge   El _c: TR!? Q k tangent Ϲ? pcurve    exppc nubsl _c:p67R?p67R?R!?p67R? (Ŧ?R!?s 2>>R?R>9?޾e-??mA^0 ?܉c?9 ? x?C-(>O?(Z +?J(?Lx%q;?;_ē?}S4B?%a?Y]+0?@NI?ysDUL0Hù@ه.$?ԗ@MbP? spline  ref/  vertex  R lellipse curve  xFqݒ@M`e@!Qǎ=?t"=p2?? ftreemeg attrib  B  face m P n  o spline surface   ref/  coedge  p C   Z  loop  p q straight curve  @"בLe@@  point  ؒ@"בLe@ftreemeg attrib  H  loop  r H spline surface   exactsur nubs??n,O 7v Mv޴%,+X_y4&zΗJ| ӿ֎?zzX@lVG@ן@݆mW!@Cג@:KP 8e@ sג@s P^e@3\֒@P6Qe@sP1e֒@:ɨPke@6.d֒@@MkPׇ&6ęe@;L ֒@ĦV`Pܛ,e@8=)xג@J1P%}e@0ג@M"Pae@֒@_P ETǰe@`f֒@7PDe@Igwd֒@v&PgIdΙe@Ey֒@YPh4c7e@z^Nג@ړݮPoWe@7ג@CPOe@ա|֒@LeT\P[1e@ob֒@:FP+K&se@ra֒@JzLȴPe@t> ֒@b%P;je@(o ג@3Pus e@ < ג@XPLne@/4!w֒@:OS/PJ e@ S֒@|5wP`V֒@Pe@WԦU֒@UP3e@R]ג@#qP%e@x8֒@7bwPRB/e@/Je֒@lg:}P~Ge@-֒@P+"e@C`֒@X !PWpWP_e@#a֒@ˎn`P`e@Ւ@,oP5gؘe@ Ւ@\3ߕvP0e@ 6 ֒@PbZ|P/Ue@r֒@V|i2Pd쎵e@o ֒@7=Pe@NdÍՒ@@NHPF딦e@NWԞ-Ւ@؟iE\P)de@I`ۛJՒ@*dP'e@u q\Ւ@ kP"e@h֒@%t$P e@]Ւ@~1PiZTe@!JՒ@624x=PLդe@Ԓ@NdSPtydde@&Tx Ւ@T\P !Շe@C2@}Ւ@NElbP=+~e@dJ:֒@ރwgPt~e@=raՒ@PһΪe@4Ԓ@]5o,Pe@EaklԒ@.@5EP1fe@ĺ:Ԓ@BxOqOPjele@MXՒ@bO VPdxe@(/5֒@]pPce@5Ւ@&6whPf٩e@4Zg`Ԓ@S%&PK e@Ug9Ԓ@?6^@P,e@T@gԒ@FsJP|YXe@xvԒ@9CQP ve@Ւ@sO_De@ټ{fԒ@VR POj\e@gkLԒ@sleP e@`Ӓ@A8PdV;֊e@$Ԓ@UɌWCP9K Je@PuԒ@ IIPse@ `F۶Ւ@w]jO|6je@IhԒ@vfPɡͧe@^?+Ԓ@EVP 9})e@1Ӓ@Oc6e@[GӒ@cOSe@Ғ@3PE܃e@\U%Ғ@;M+Pve@\ lӒ@Yg;{0PH+he@+yҒ@?g;OrAԠe@ђ@\vOe@# ђ@0˱O e@ȸsВ@} =P[}e@2sВ@=sŽP yxtle@,-ђ@VOPKV@\e@\uoВ@U>& O$e@A߻PВ@ߝ] QO6Оe@˳ϒ@,jΙO"kje@ϒ@̒@4uIeO{[e@5YI̒@,r*EO` e@dbP̒@O;e@ ʒ@(R.OW e@Wܺɒ@q}OCse@XȒ@ QbPiwe@Tʒ@$~l O>ǰ^e@536~ʒ@ۉVO\)Ve@K1ʒ@/_OO8e@Q Ȓ@+[UO70We@vιǒ@ܗmPȡe@eƒ@ D P?Ie@9ɒ@+:"*OP׿e@}ɒ@`^O-;Me@?ɒ@r0ϑO}2e@)kYȒ@R nOnOe@W(ƒ@PzRe@ˆŒ@L@ޣ P^e@t.ɒ@]Fq3O^Ooe@O=6ɒ@)3OeOdƥe@Ȓ@VOmaBe@޷l4ǒ@Oƨ fe@(CŒ@"PqX ذe@bĒ@ΨrPV'Ƹe@MȒ@\(n5O=e@MȒ@w=fO=e@HإNsȒ@v̏COMSR?e@ݔlƒ@1>O)BP'e@ MSŒ@"Pq%/e@͍ ,-Ē@ΨrP3]7e@? 7v Mv޴%,+X_y4&zΗJ| ӿ֎?zzX@lVG@ן@ ?  ?  ftreemeg attrib  K  loop  s K spline surface   exactsur nubs ??Pt!(t.GQ %)= M{N$6ۿT@Nf@AVȌ@Nf@=@NY+Qf@w6@NŮf@Н@Njf@sՈ@Nf@T@IXNf@AVȌ@7NNf@=@ɝےCNY+Qf@w6@1NŮf@Н@*Njf@sՈ@pK&Nf@z>@Hj1Nf@0[O@j UNf@^%ዒ@a)NY+Qf@#>:{@0FMŮf@?@J\Mjf@nqj@.LMf@6T<@vةMf@n+6@4!Mf@0@(MY+Qf@kx@ɴ1eMŮf@&ȋ@ SLKMjf@v_@Z;Mf@5 M@r^Mf@J@,3ŮMf@<Տ@1"MY+Qf@l{@$i7MŮf@tw@ITMjf@JE3э@d,Mf@]Δ@%Mf@@,kMf@j?@=ޙDRMY+Qf@KX@dL)LŮf@t1Õ@W2Z_Ljf@Ƹٕ@F}hLf@8+Xw@X#Mf@uAi@<ټMf@Z@ĢfkMY+Qf@';@:MŮf@lf@FاHMjf@9r@L Mf@G@BRp[Nf@ P@&|yQNf@HG@2TGNY+Qf@Lv@ 376NŮf@/C@fj&0Njf@>Uơ@H),Nf@US9뙒@#Nf@z)P@1+yNf@@3$@1РNY+Qf@W1ן@mP:NŮf@r~@ޭ{9Njf@ٺ@;Nf@yփ|@_#Of@'@dp@)DOf@S7bc@sonOY+Qf@ E@rlOŮf@Y@MOjf@*@rUzOf@&@a?6Of@WU+@NПgOf@V@OY+Qf@/i@ OŮf@Z湗@fPjf@a闒@Լ Pf@Iu@[ 4Of@ @FxeOf@@H2Gu-OY+Qf@Tꐒ@cOŮf@Nf@g_@@P"NY+Qf@&$ӈ@`yNŮf@uO͇@;^Njf@P?41@ozUNf@T@k$Nf@AVȌ@XNf@=@gNY+Qf@w6@PkMNŮf@Н@mNjf@sՈ@ƏNf@T@Nf@AVȌ@Nf@=@NY+Qf@w6@NŮf@Н@Njf@sՈ@Nf@?Pt!(t.GQ %)= M{N$6ۿ ?  ?  tcoedge coedge  t u M d a v4P h tedge edge   w4P h? M x tangent W7ün(C? pcurve    exppc nubs4P h? } -DT!  coneT@@Kf@? ?@ -DT! }tedge edge  a+L .@ h+0@ _ y tangent Oo'? pcurve    exppc nubs+L .@+0@+L .@+0@MbP? spline  ref tvertex vertex  f z[f}?ellipse curve  aK@ ŁKLf@ ߴsAaK?_Hl=|=P??  coedge  { Q W o `  pcurve    exppc nurbs,T!*T!<hK@@x(@?v % @lR{(@$k?~MaP@*)(@?BG O@Y,'@Q*k?> O@%@?:0yE> plane4T%@Qf@5^<?5^< ellipse curve  +@^aMf@ȼ&_8L#FJ=,nŭT=? ellipse curve  @EMf@?@3>ϘT @?  edge  Y @  @ m | tangent  edge  w Z j } tangent  point  ;tՈ@Mf@ point  T@Mf@ pcurve    exppc nubs] h?+L .@VMu<+L .@MbP? spline  ref ellipse curve  wA@ף"בLf@0=@?  coedge  _ v ~  `  pcurve    exppc nubs+0si0+L .4T%Tњ(@A_JCq:(@;nQ^(@cky}(@628G9(@6ަpu(@CDcopu(@? plane4T%@Qf@5^<?5^< tcoedge coedge  t    ` }3)% h}  face   `    point  wA@ϣ"בLf@ coedge  f 2 h } z  loop  2 6 straight curve  @P`f@? @&23? xs:d.@tcoedge coedge  i h t  j ?T!  edge $  k  h? h  tangent  face  o j    point  @P`f@ vertex  n ellipse curve  |@Nf@?x+R@?  -DT!?ftreemeg attrib  o cone surface  |@@Kf@?lv@lv? @ ftreemeg attrib  w# cone surface  '0В@Qe@?@? ?@  coedge  !    x  coedge   z }    coedge  z      loop    straight curve  x@J@`f@  coedge  } |   ~  edge  "    tangent  point   @J@`f@ coedge        edge  $@ X@   unknown  vertex   straight curve  @E@`f@ ? {cD@ftreemeg attrib  ]  face      plane surface  @J@`f@? ellipse curve   @E@e@? H H?  point  @E@e@ coedge        edge   "@   tangent  point  P@J@`f@ coedge        edge  $@ X@   unknown  vertex   straight curve  x@E@`f@? {cD ?@ftreemeg attrib  `  face      plane surface  x@J`f@? ellipse curve  P@E@e@? H@ H?  point  x@E@e@ coedge       ftreemeg attrib  d  face      plane surface  D@H@@e@  coedge        coedge        coedge   5     face       point  wA@6sQ`f@ vertex   ellipse curve  @-uӜRf@H˪?6j CenĿ? ftreemeg attrib  C  face      cone surface  @rOf@?lvlv@? ?@  coedge        coedge        edge  @ @[@   unknown  coedge        coedge        loop     vertex   ellipse curve  x@Jd@lv@lv?  coedge        edge  $    tangent  point  x@Ld@ coedge        coedge        edge   pFGs&4@   unknown  coedge        coedge        loop     vertex   straight curve  4@Zd@OL2?>%  edge   *@   unknown  coedge        point  4@Zd@ coedge        edge  -DT! -DT!?   unknown  vertex   straight curve  4@O@e@? ;`< ;`2@ vertex   straight curve  L@L@e@ ;`2 ;`<@ftreemeg attrib  O  face      cone surface  L@O@e@?lvlv@? ?@  coedge        coedge        edge  3ˍ" 3*}a@   tangent  coedge        face       point  @rR@e@ coedge        edge  $    tangent  coedge        edge  MK 1?   unknown  vertex   intcurve curve   surfintcur nubsA-y?-y?D6/\?-y@_yms:@^yƌ @u t @@G7;@Nzнa@-@o@c2 6@~i@R7@^sЂq @I=!G!@5"@a #@}%@O̜W&@&2'@zK(@2 N(@:Lɘh)@e*@&[h+@P,@ߥ-@7.@"/@^sЂq0@0,0@1@TE2@"͆2@">3@r"3@"T 4@ңv4@0A<4@3DI5@۾:75@a0|$6@76@"*7@Xȱt?8@ 8D8@9@ vF9@Q@TU:@!}@ 0;@@6Q;@^, <@^Kt<@xxw<@G=@n7l=@473;>@7>@TcBM?@"?@wP-@@^sЂq@@@>y\3mS@-!rXe@@ u!yS@-!rXe@J2@진S@P=aWe@R@K=oS@,&F8Ve@Y܃@<@S@ŸTe@㠠 @ZeOS@;Qe@V@ppQS@k|Pe@w;@S@EʅLLe@tyy@!S@M!Je@õV]@8?`S@>d\Ge@Ss/臑@)&S@2QÈEe@-]n@D&i T@7Be@ @3,)T@]!Ae@,T@L 7Je@:M@d+T@mLe@ZH@7(T@Qe@>O|i@6[8&T@F~tZTe@uj@T@Gl]e@L @|?T@AZde@@<@|  T@Ϯ]se@ef,@csT@{c4{e@z9@){lT@g)e@̮˗@@ttS@ste@(I;@PqQ"S@|te@@89S@ue@@89S@e@z9@){lT@fPֶe@ef,@csT@脜:e@@<@|  T@1Qwe@L @|?T@Dme@uj@T@zTe@>O|i@6[8&T@Ye@ZH@7(T@l4 e@:M@d+T@zF=e@^rVj@>,T@Re@Qe@j,`-T@9&me@)$<܏@¨ .T@"e@NupD@z.0-T@ҟe@-@D+T@IPe@ @hr*(T@Kܘde@dNy@$%T@!f@W` c@8xXT@ۊ2e@`Hge@R@K=oS@be@J2@진S@ e@@ u!yS@_nލe@@r}ȖbS@_nލe@J2@oyWS@ e@R@{H@S@be@Y܃@@5S@>`Hge@㠠 @xH^iS@bgH&e@V@ cHS@e@w;@nMS@5ze@tyy@KR@HZNe@õV]@DR@›X=e@Ss/臑@^R@ή+R@Re@:M@Er2R@zF=e@ZH@qrR@l4 e@>O|i@].R@Ye@uj@GR@zTe@L @qyR@Dme@@<@RR@1Qwe@ef,@KUR@鄜:e@z9@=(R@fPֶe@̮˗@<*DR@#>e@(I;@,gD.R@ e@@vR@O|i@].R@F~tZTe@ZH@qrR@Qe@:M@Er2R@mLe@^rVj@>+R@L 7Je@Qe@@̭R@Fe@)$<܏@I᪭R@ak]De@NupD@b6R@T -`qBe@-@8fJۯR@|Ae@ @tFԍR@#g@@e@dNy@h~R@?e@W` c@Dzh_R@%u3@e@d\Ge@tyy@KR@M!Je@w;@nMS@EʅLLe@V@ cHS@k|Pe@㠠 @xH^iS@;Qe@Y܃@@5S@ŸTe@R@{H@S@,&F8Ve@J2@oyWS@P=aWe@@r}ȖbS@-!rXe@@>y\3mS@-!rXe@kOFRi@? cone@rwqSPe@lv@lv? @ cone@>y\3mS@@e@6y\3mS@@e@6y\3mS@d@ coedge       straight curve  @rOf@ :"1vb 6rÓ4@ftreemeg attrib  8  face       loop    plane surface  @TT@d@¸O?  coedge        coedge        coedge        edge     ]T)@   tangent  coedge        coedge        edge  7b* pWw@   tangent  vertex    vertex   ellipse curve  4@Ye@!#.<>%?  edge  A@#@ [|@   unknown  vertex  9 straight curve  }gxb@@ M@jw!lTe@ i ?- nl=ma@tcoedge coedge       ;@݆mW!@  edge    B?   tangent  coedge        face       point  }gxb@@Pjw!lTe@ coedge   C    coedge        edge  -DT! -DT!?   unknown  coedge        coedge        loop     vertex   straight curve  Ԓ@H@@e@  coedge     !   edge   "$@  # tangent  face $ %   &  point  Ԓ@F@@e@ edge  @ 6@  ' unknown  vertex   (straight curve  @H@@e@? nēL3 ۈ'"@ellipse curve  ,@K@d@?lv@lv?  point  ,@H@d@ftreemeg attrib  S  loop  )  cone surface  ,@v1Od@5j Ce;T̆b!r?h>͈R@:c? ^ @`r7@% $@ tcoedge coedge   <  +  ?% $`r7 tcoedge coedge     $  @"+hh 0B= tedge edge  -h 0B A"+h?  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MbP? torus@Nf@x+R?@?x+R< tvertex vertex   h->ellipse curve  @Pf@??  -DT!?ftreemeg attrib  ~ torus surface  @Nf@x+R?@?x+R<  point  sՈ@Nf@tcoedge coedge   8 ! = x % $`r7  coedge  # '     edge   2> Aɼ=   tangent  coedge        face       edge  -DT! -DT!?   unknown  vertex   straight curve   @J@`f@? {cD ?@straight curve  @J@@e@  point  @E@@e@ftreemeg attrib  ^ plane surface  4@L@e@??  coedge        edge  -DT! -DT!?   unknown  vertex   straight curve  P@J@`f@ ? {cD@straight curve  x@J@@e@  point  x@E@@e@ftreemeg attrib  a plane surface  x@J@@e@??  coedge       ftreemeg attrib  e  face       loop    plane surface  @k%Rd@?;v@Qii  coedge        coedge        coedge        edge   $@   tangent  coedge  h      edge  @ @   unknown ftreemeg attrib  N plane surface  D@@Q@e@H˪?6j Ce<|FSk  point  @rRf@ftreemeg attrib  D  face      plane surface  @rR`f@?  coedge        coedge        edge  -DT! -DT!?   unknown  coedge        coedge        loop     vertex   straight curve  @L@d@  coedge        edge   $@   tangent  point  @Jd@ coedge        edge  @ 1@   unknown  vertex   straight curve  x@L@e@? nēL3 ۈ'"@ coedge        coedge        edge   $@   unknown  coedge        coedge        loop     vertex   straight curve  g+߈@Tq\d@@%dOL2  coedge        edge   3@   unknown  coedge        face       point  g+8@:;]d@straight curve  4@Zd@?  edge  !#.@ F@   unknown ellipse curve  L@O@e@lvlv@?  point  4@O@e@ point  L@L@e@ftreemeg attrib  P  face       loop    cone surface  L@O@d@lvlv? ?@  coedge        edge  "|$a aDž5,+#@   tangent  edge  @N ˓V9   unknown  vertex   straight curve  @rwqSPe@? RUF [nxRb@ coedge        edge  + @ @   unknown ftreemeg attrib  B cone surface  @rwqSPe@lv@lv? @  coedge        vertex   straight curve  @>y\3mS@@e@? oēL3 و'(@ coedge       ellipse curve  @>y\3mS@@e@ü\AW¼?!dXZZe@@%?dOL2? &S5 i0@ edge  *@ 3@   unknown  point  4@Ze@ point  4@Y@e@straight curve  _u@ Q`f@`-9?j?z6  point  }gxb@@X&Qjw!lTe@tcoedge coedge  r G   ^ ݆mW!; tedge edge   ݆mW! ;   tangent 7Ϗ2!? pcurve    exppc nubs;@@7@Rq.`9@D0 @vO @݆mW!@ 2Kbݿ̞V/'s//ܿ;t'T~ۿ'wKأڿF(<#<ڿ@.G$DªٿV$[ i<ٿ/ fؿ0_@ؿ~7u56C4W8ؿ9s5Nؿ7pMq(׿MOefN$׿MbP? cone$)Ē@Pdf@Jr ~:ƿ&?E>vlv@!D׿? @ tvertex vertex   sɔoP?ellipse curve  Ͷʒ@Pe@Xr ~:?& `ĕޓ?  -DT!? coedge  ' #     edge   -W=? >@   tangent ftreemeg attrib   cone surface  $)Ē@Pdf@Jr ~:ƿ&?E>vlv@!D׿? @  edge  @ 6@   unknown  coedge        loop     vertex   ellipse curve  @F@e@?lvlv?  coedge        edge  !$   " tangent  face #    $  point  Ԓ@F@e@ edge  "-DT! -DT!?  % unknown  vertex   &straight curve  Ԓ@F@@e@ ۈ'" nēL3@ftreemeg attrib  H  face '    ( cone surface  @F@@e@lvlv@? @ straight curve  Ԓ@H@d@?  point  @H@d@ coedge  G F ) *   coedge  D + , -   coedge    . /   coedge     0   coedge   1  .   edge  2 3@  4 tangent tcoedge coedge  G r  0 ^ 5;@݆mW!@ tedge edge   6;@ 2݆mW!@  7 tangent >)? pcurve    exppc nubs݆mW!xO D0 Zq.`97Ƴ;T@ȸω@T@* &r@U5Y@8(@L]@gxm@8C1fg@L@xo@>3K@Y=o}@c|@G2@d@𝡲[@V;vk@N%)@h@%@/ X@J1s@)'=?<@Or\@I @nߒE@MbP? cone'0В@Qe@?@? @  vertex   8straight curve  MȒ@Q=e@? tvertex vertex   9I5D?straight curve  '0В@Qe@? tcoedge coedge  w t  7 n :ĸ Uc (f tedge edge   :ĸ Uc 6(f  ; tangent 0c? pcurve    exppc nubs(f@4?@@uè@M^@>YG>z@de0@ĸ Uc @@E@6S@a@L`@05)@-$@C)7@8-@FB@rq6@z˼A@j6@l5&@IPc6@=ܤ@?-@z0q@9~s$@l&zp@0@ƊV<_@N@a@@̫@MbP? cone'0В@Qe@?@? @  pcurve    exppc nubswmFj@ 0v&h@xmFj@ 0v&h@MbP? spline  refm tvertex vertex  7 < !??intcurve curve   bldcurxmFj@{m}n@ 0v&h@RRE? spline  refo null_surface nubswmFj@ 0v&h@xmFj@ 0v&h@ nullbs   tcoedge coedge  " ! & E  =V%! tedge edge  A`r7@ >% $@  ? tangent sN{v9? pcurve    exppc nubs`r7@% $@`r7@% $@MbP? spline  ref9  pcurve    exppc nubs% $`r7?% $@?`r7@MbP? spline  ref9  pcurve    exppc nubs"+hh 0B=׼=)OT! t=e cone׼@%\(n5OVWf@t ~:?Gm]= t ~:ֿ? ?? -DT! }tvertex vertex  = @yV%? & D tangent } e? pcurve    exppc nubs<V%?r;?=l!@FM1 ?!@MbP? spline  refR tcoedge coedge   / ' H ^ E` hVzA tedge edge   VzA= 2` h? ' F tangent @n(C? pcurve    exppc nubsVzA=` h?>~}>-DT!  cone׼@%\(n5OVWf@t ~:?Gm]= t ~:ֿ? ?? -DT! }tedge edge  Q -v' Lps! * G tangent Ya? pcurve    exppc nubsps!@nž"@JTE#@- $@$fb%@w&@ -v'@#@ĵ?@<9ֈ@? V.F@\U@n@,@"6Tn$@S-ڬ@#n$@q^~z[@6b@z B)@j7@KT@~Oil@MbP? toruswA@Pf@@ tvertex vertex  J HWsJO?intcurve curve   bldcur`r7@ @% $@b'? spline  rbblnsur blendsupsur planeDxgzǒ@Qڂf@ ?t ~:?t ~:ƿ ? null_curve nullbs@@Q@e@ blendsupsur toruswA@Pf@@ null_curve nullbs@@Q@e@ intcurve  offintcur nubs90?? ڳ @C[@% $@m%>@iW3X%@C)@ɇP’@·r3@O]aDe@ g@gkʼO,WU'e@͒@B0a Ojle@Z@ O+"e@c{wo@E-'O0e@Fſ@ 3O(#f@N t@|6O44f@a dѾ@[C3OKwOsf@0zђ@|\Of@LQ7ϒ@|JsOf@ΓΒ@-znOf@TXΒ@0jOf@˒@(T 4Of@!+rȒ@W%(Of@N&Ê.’@c!BNf@4dKƾ@ɭմ>Of@O@ʼnOf@4.1@S+!Of@6dc>@֭0Of@ ii@0\(n5Of@'@0\(n5Of@뫒@֭0Of@T@R+!Of@VBڥ@ʼnOf@}d@ȭմ>Of@ @c!BNf@[)„@Of@HpUa@:X3Of@53M@MOf@t.@]XdOf@9@-)Q'Pf@REއ@xLPf@Y.@FdPf@a!p@yfPf@  @)uQf@F񐇒@yk#Qf@ d@@Qf@@@ toruswA@Pf@@ plane4T%@Qf@5^<?5^< nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?? ?? oFPF>Gs="pH kMW |qwqmx$ܿ5\z ƿq@3@V`z&@}3)% @?)o_9)o)o߿fi?lEk2l?Yِ9?^?)-< ?Dm>Q?^?v:V2@@ m@x. @< ! @(j@ա8@l1C@z@[@,@?@~0@; %@`5#,@!QF@-V@ null_surface nubs0}@}3)% @?1}@?}3)% @ nullbs    coedge  `  2 T A  edge  H@ 3;LԠ@ 2 L tangent  point  wA@ΨrPf@ftreemeg attrib  6 cone surface  @Pf@x+Rx+Rlv@lv? @  coedge  <  8 Y ]  edge .  >x2\@ -fњ(@ 8 M tangent tcoedge coedge  D C ; [  Nii@πDzޝ1n@M[8tw@̽Ok@$o@@XJњ@`DT!MbP? conehK@Q@f@?@? ?@ intcurve curve   bldcur!@'#@ػ$@"xYMcv'@~f<ټ? spline  ref> null_surface nubs!@"xYMcv'@!@"xYMcv'@ nullbs   tcoedge coedge   S O I A P] h?  coedge  , Q C b   edge  -DT! d-DT!? 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Uc MbP? spline  refu intcurve curve   bldcur Uc N(fm ? spline  rbblnsur blendsupsur cone'0В@Qe@?@? @ null_curve nullbs@@Q@e@ blendsupsur sphereͶʒ@Pe@-Oae@'ʒ@c,6$O phe@?1ɒ@F?O^$oe@N ƒ@5ryO e@jĒ@@ OuEe@Z’@^G+Oeɫe@@;8O fׯe@F?m@MƑ^OMތ~ e@>,@wOM_e@Ë@!ROje@ή/[@e΢aOKmf@’@WP77Sf@tQÒ@Z:Px0i)f@teĒ@#[PY 1f@@@ sphereͶʒ@Pe@-ڰ>R?䦿 R>9?#>e-??h0 ?c? ] ?x?r`6(>O?ɥ +?#(?x%q;?eē? 4B?S%a?<+0?HNI?xCUL ù@6.$?vԗ@MbP? spline  refY  vertex  { bellipse curve  ג@{(n5O_e@?f3 dMbP? spline  ref^  pcurve    exppc nubs?T!??? bMbP? spline  ref^ tedge edge  f QF= waT!? { h tangent  P% %? pcurve    exppc nubs QF=6p8R?p8R?dT!?p8R?;'Ʀ?aT!?1ݫt0>| d/T,kffgy]6,@?49ٕI?0fy3fTRA?&S͂=eZ1?yU 4ݿt>|mnz^?beːT? oūKjXt?ݏ>(S>̴׿2>8?ǿa%zh=MbP? spline  ref^  point  T@Nf@ pcurve    exppc nurbsaT!wfT!FD O@"@?J O@l{e @rk?QaP@r-ج@?z % @ T@k?hK@T@?:0yE> plane4T%@Qf@5^<?5^< tcoedge coedge  X ~ C A ] i -v'os! tvertex vertex   j|g}?straight curve  hK@Qf@?  coedge   `   A  edge  ;LԠ f  k tangent  pcurve    exppc nubsh}@}3)% @h}@}3)% @MbP? spline  refT  vertex   lintcurve curve   bldcurh}@V`z&@}3)% @? spline  ref null_surface nubsh}@}3)% @h}@}3)% @ nullbs   ftreemeg attrib  % cone surface  hK@Q@f@?@? @ ellipse curve  @ Nf@?ܘT 3>?  point  @PrPf@ pcurve    exppc nubs% $ `r7[Wj@8"\@6t?PRa@d?,:@?,p?HFY@SlV?Xڽd@a"?0T@4T? 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H@ H@?  point  P@J@@e@ftreemeg attrib  f plane surface  @n%R@@e@?j#ʧ<<<  coedge    n o   coedge    Q p   coedge  q r     edge  s@ 9@  t unknown  coedge    r u   vertex  u vstraight curve  @H@e@ ۈ'" nēL3@straight curve  @rR@e@? ftreemeg attrib  E  face w    x cone surface  x@J@e@lv@lv? @  coedge     y   coedge   z     edge  {@ 1@  | unknown  coedge  }      coedge   }  ~   loop  }   vertex   ellipse curve  x@J@d@lv@lv@?  coedge        edge  $    tangent  point  @J@d@ coedge        edge  -DT! -DT!?   unknown  vertex   straight curve  @J@e@ ۈ'" nēL3@straight curve  4@L@e@?  point  x@L@e@ coedge   i     coedge        edge   x:@   unknown  coedge        coedge        loop     vertex   straight curve  @qW"Zd@OL2?>%  coedge        edge   3@   unknown  face       point  g+߈@Tq\d@ coedge        edge   $@   unknown  vertex   straight curve  g+8@:;]d@? ftreemeg attrib  >  face      plane surface  4@Z`f@>%2bOL22bOL2>%? straight curve  4@Z@e@? ftreemeg attrib  Q  loop    cone surface  ,@Kd@lv@lv@? ?@  coedge   -  y   vertex   straight curve  @rwqSP@e@ [nxRb RUF@ vertex  V ellipse curve  @ieRe@H˪?6j Ce<@n??  point  @rRe@ coedge  n      coedge    h V   loop   % intcurve curve   surfintcur nubsAy?y?'6/\?y@Tyms:@^yƌ @u t @@G7;@Jzнa@-@n@c2 6@wi@R7@^sЂq @I=!G!@5"@b #@}%@O̜W&@&2'@vK(@2 N(@8Lɘh)@e*@&[h+@P,@ߥ-@7.@"/@^sЂq0@/,0@1@QE2@"͆2@">3@p"3@ T 4@Уv4@0A<4@1DI5@۾:75@^0|$6@76@"*7@Tȱt?8@ 8D8@9@vF9@P@TU:@}!}@ 0;@@6Q;@^, <@ZKt<@ xxw<@G=@j7l=@273;>@7>@TcBM?@"?@wP-@@^sЂq@@@d\Ge@Ss/臑@^R2QÈEe@-]n@6#NR7Be@ @ھ9R]!Ae@+RL 7Je@:M@Er2RmLe@ZH@qrRQe@>O|i@].RF~tZTe@uj@GRGl]e@L @pyRAZde@@<@RRϮ]se@ef,@KUR{c4{e@z9@=(Rg)e@̮˗@9*DRste@(I;@*gD.R|te@@vRue@@vRe@z9@=(RfPֶe@ef,@KUR脜:e@@<@RR1Qwe@L @pyRDme@uj@GRzTe@>O|i@].RYe@ZH@qrRl4 e@:M@Er2RzF=e@^rVj@>+RRe@Qe@@̭R9&me@)$<܏@I᪭R"e@NupD@a6Rҟe@-@7fJۯRIPe@ @uFԍRKܘde@dNy@e~R!f@W` c@Bzh_Rۊ2e@`Hge@R@{H@Sbe@J2@oyWS e@@p}ȖbS_nލe@@u!yS_nލe@J2@진S e@R@K=oSbe@Y܃@<@S>`Hge@㠠 @ZeOSbgH&e@V@npQSe@w;@ S5ze@tyy@!SHZNe@õV]@5?`S›X=e@Ss/臑@)&SήO|i@6[8&TYe@uj@TzTe@L @{?TDme@@<@{  T1Qwe@ef,@csT脜:e@z9@){lTfPֶe@̮˗@@ttS#>e@(I;@OqQ"S e@@89SO|i@6[8&TF~tZTe@ZH@7(TQe@:M@d+TmLe@^rVj@;,TL 7Je@Qe@h,`-TFe@)$<܏@¨ .Tak]De@NupD@z.0-TT -`qBe@-@B+T|Ae@ @hr*(T#g@@e@dNy@$%T?e@W` c@8xXT%u3@e@d\Ge@tyy@!SM!Je@w;@ SEʅLLe@V@npQSk|Pe@㠠 @ZeOS;Qe@Y܃@<@SŸTe@R@K=oS,&F8Ve@J2@진SP=aWe@@u!yS-!rXe@@y\3mS@@e@ coedge       ftreemeg attrib  L plane surface  @L@e@?  coedge     ~   coedge  r      coedge    , 0   coedge        edge   $@   unknown  coedge        coedge        loop     vertex   straight curve  dތy|7@V@d@?¸O  coedge        edge   3@   unknown  coedge        point  dތy|@ AV@d@ vertex   straight curve  @TT@d@? ftreemeg attrib  :  face       loop    plane surface  4@T@d@¸O?¸O??  coedge        coedge        edge  к@ 2yf:@   tangent  coedge        coedge  .      edge  Zm]9 к   tangent  coedge  ,      vertex    vertex  / ellipse curve  4@R?DS@e@˿x@ ?  edge  1޿ MK?   unknown  vertex   straight curve  @k%R@e@  point  @HdaY@e@ coedge       ellipse curve  @HdaYe@?W;Vi!#.<>%?  coedge        coedge        edge   @   unknown  face       edge  @ 3@   unknown  point  @qW"Ze@ vertex   straight curve  4@Zd@?  pcurve    exppc nubs܆mW!;?݆mW!@?;@MbP? spline  ref]  vertex   intcurve curve   bldcur;@ן@݆mW!@롕? spline  rbblnsur blendsupsur cone'0В@Qe@?@? @ null_curve nullbs@@Q@e@ blendsupsur cone$)Ē@Pdf@Jr ~:ƿ&?E>vlv@!D׿? @ null_curve nullbs@@Q@e@ intcurve  offintcur nubsn,O He^ _ʫ}?h;2m@ V@lw @ 3$q@*>U@Ž@݆mW!@*>?$@|l'@" *@G,@?нK-Y-@3.@S/0@mW1@O?V3@_Aoޒ@:KPpIe@pޒ@c^O fpe@r‰Œ@&GOzKe@> Ē@ \OHe@P7’@-0O؄e@.\@\(n5Og*e@ T@\(n5O'e@lr@-0OAS e@[v@ \O8GB6f@>ѧH’@&GOf爠f@nĒ@(I">Ol 2f@?Œ@84N~1w=f@+Ȓ@֯O n`Lf@_7Oɒ@)|O]cvlv@!D׿? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?롕? ??n,O 7v Mv޴%,+X_y4&zΗJ| ӿ֎?zzX@lVG@ן@݆mW!@롕?){ m He^ (~ G9 !O_N y͖5:}߿ʫ}?ʫ}?Biq?ʫ}?u?n s?9V3C?h;2m@G/d@ V@TE@lw @pjh @i"ZY@̳%@ 3$q@i5E*w@8f@b;*@*>U@K#@}#@aH@Ž@aS@io5@$) @\Rx @ null_surface nubs;@܆mW!@?;@?݆mW!@ nullbs    point  *6ƒ@CV Pkve@straight curve  a@ΨrP\f@p ~:?=  vertex  b straight curve  Ԓ@H@e@?  face       point  @H@e@ edge  !@ "@W@   unknown  vertex   straight curve  Ԓ@F@e@? nēL3 ۈ'"@ftreemeg attrib  M plane surface  Ԓ@H@@e@? ellipse curve  @F@d@lvlv@?  point  Ԓ@F@d@ftreemeg attrib  %I cone surface  @os!@  -v'@   tangent m ݹ3w? pcurve    exppc nubsos!@ -v'@os!@ -v'@MbP? spline  refR  pcurve    exppc nubs -v'ps!? -v'@?ps!@MbP? spline  refR ellipse curve  i,@Y|f$O> Kf@vzƿ^TbK?3ݎ9?8t7e?a.r??  pcurve    exppc nubs` hVzASMu<݆mW!@?цmW!@MbP? spline  ref] ellipse curve  Kj@\(n5Oe@/n ~:ƿ$T?4= 6?1T1?? intcurve curve   bldcurps!@ zb$@#G&@ -v'@wM=ټ? spline  rbblnsur blendsupsur conehK@Q@f@?@? ?@ null_curve nullbs@@Q@e@ blendsupsur toruswA@Pf@@ null_curve nullbs@@Q@e@ intcurve  offintcur nubsȫ?>.ga6@1YS78@?Oc͇@.Q|@s"@ @qg`!@8V&"@Cn[$@km%@ -v'@2%0(@-/}Ql*@h,@n,"-@SOZ0@ub1@]!f2@FJk4@yZ@@@QYf@i̩@8p*Q°*f@t7@< Q޷G"&f@pXਲ਼@kPf@r@LRP#7zf@Fօ@lePW2`f@]^-@MlhPg-Ef@ܵ@!7)P7e@,Pɶ@UP(\PXe@n筸@ '9O,K|7f@z.@^Q؋ONf@8@On f@ldփ@4mrOXf@G4!@?TOI`DIf@J0@;cHOv;$f@$>1@>%5O%I3f@T@Nm.Ov ;f@m>@DϐG.$OqKJf@1M@Tcb OQxRf@^:9@!ť4O!f`f@==@ʦO\gf@ /@ˠOiVsf@U6I@"=OΌxf@jK__@O| @[~f@ξ6R@0BOf@hlzS@J:(Of@ X@,^f.Ok~f@Q3ʎ@G#=OSyf@!߸@GO+uf@!jL@`OKkf@L2@è( qOdf@mʮ@yz&;O =Wf@FX@EIO@1Pf@n9@1-IOZQ@f@\tM@ʛP J9f@ @`x0?P$`N,f@]뮒@4mx[PƜ&f@ҳmdQ@.Pcռ`| f@ͩ'k@qtL6DPa(Hf@]A@xPr\!f@#{ @}Q5%f@ENw@@Q X,f@@@ toruswA@Pf@@ conehK@Q@f@?@? ?@ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?wM=ټ? ?? a?a@FrM@ R@49l_!@ zb$@#G&@ -v'@wM=ټ?3ȫ?ȫ?zc?ȫ?H?E ?G.ga6@R@G@t&@P-h@(̩ @Yтj @-@1YS78@Vv@8TQ[@Q,3@?Oc͇@q@~A@r{@.Q|@  -v'@9? -v'@MbP? spline  refR ellipse curve  rK@:~f$Of@ ߴO@aKu _*zv?I.'O??  pcurve    exppc nubs] h?;LԠ^}|;LԠ-DT!  cone@.\(n5Of@?ޛVۼ? ?@ -DT! } coedge  a   p  ellipse curve  ,@K@e@lv@lv@?  point  D@K@e@ vertex   straight curve  D@v1Od@? ;`7 ;`7@ edge  W U"{@ h  tangent  vertex   straight curve  D@@Qd@H˪  point  =kWA-@';CSQd@ellipse curve  '0В@#(n5O`e@lqHq==T-?? ftreemeg attrib  q cone surface  @?\(n5O_e@?? ?@ -DT! } pcurve    exppc nubsm/=&R??hO %Mz>1O MbP? spline  refu ellipse curve  PͶʒ@X#OR&umke@C*OlJ^V?G ?Ƨ?jʝ:??  pcurve    exppc nubsRac(mf?hfMbP? spline  refu  pcurve    exppc nurbsRR! ?T@?:ZT@g?:"@?:0yE> planeUdڒ@Qe@? ellipse curve  ג@D`Ne@̤ŭ?x?1?  point  ג@v(n5Oe@straight curve  @?\(n5Oe@ ellipse curve  {Ò@V#Oke@sQ;⿀^V¿5? ?s???  pcurve    exppc nubs`hxDT! ~ cone@.\(n5Of@?ޛVۼ? ?@ -DT! } vertex   ellipse curve  t@(n5Of@H=Y۽T?? ellipse curve  @Nf@> nŭ?  pcurve    exppc nubs -v'w&$fb%- $JTE#nž"os!k#\?`DT!qU?r@@XQwl?ԿOkɌBĜ#?޷[,-?ЀDzZm6?hAE徙j6?zZ.F Ig6?|b1&Xe2-?Ȱ'bvR#?멡0lgh?)ڿe%  coedge        loop    straight curve  g+8@:;]`f@OL2>%?  point  g+8@:;]`f@ftreemeg attrib  ?  face      plane surface  @qW"Zd@>%?2bOL2?2bOL2?>%  coedge  Q , q    coedge  1  z    point  @^(@׸R@e@ point  aJT9_@ΏR3Ce@straight curve  @TT@@e@  edge  hGjP jGj7P   unknown  coedge  z      coedge        coedge        vertex   straight curve  4@T@d@¸O??  coedge        edge   3@   unknown  face       point  dތy|7@V@d@ coedge        coedge       edge    $@   unknown  vertex    straight curve  dތy|@ AV@d@?  coedge        point  @TT@@e@ftreemeg attrib  ;  loop   plane surface  4@T@`f@?¸O??  coedge        coedge       edge  *@  3@   unknown  edge    @   unknown  vertex    straight curve   ۨ@& 6S@e@¸O? SI Y 42A@ edge  ,DT! >-DT!?  unknown  vertex   straight curve   @?/S@@e@?¸O Y 42A SI @ edge  @ 3@   unknown  point  4@T@e@ point  4@R?DS@@e@ellipse curve  @%??  point  4@Z`f@ point  ΍ ,-Ē@ΨrP3]7e@ point  ,@H@e@ftreemeg attrib  G cone surface  @F@e@?lvlv? @ straight curve  Ԓ@Hd@?  point  Ԓ@Fd@ coedge  ) q +   ellipse curve  ,@v1Od@?!% straight curve  J8$Wl@I)@@e@¸O  coedge        edge  @  ,@   unknown  coedge        point  4@T@d@ coedge        edge   ~ʼ4@   unknown  vertex    straight curve  dތy|7@V@`f@ ftreemeg attrib  < plane surface  dތy|7@V@d@¸O??  coedge        vertex    straight curve  dތy|@ AV@`f@¸O  point  dތy|@ AV@`f@ edge     ~ʼ4@   unknown straight curve  @TT@d@?  vertex    straight curve  4@T@`f@  point  @TT@e@ellipse curve  VA@\PS@e@?΀¸O<j\sQ?LF@lv?  point  VA@\PS@@e@straight curve  4@Z`f@@%?dOL2?  point  @qW"Z`f@straight curve  D@@Qd@?  point  D@Kd@ vertex    ellipse curve  L@O@@e@lvlv? ellipse curve  ,@Kd@?lv@lv@? straight curve  L@L@d@? ;`7 ;`7@ellipse curve  x@J@@e@?lv@lv@?  point  x@L@@e@straight curve  @qW"Z`f@OL2?>% straight curve  @L@@e@  coedge       edge    $@   unknown straight curve  dތy|@ AV@`f@¸O?  point  dތy|7@V@`f@ point  @TT@`f@straight curve  @TT@`f@¸O?  point  4@T@`f@ point  L@L@@e@straight curve  4@T@`f@¸O??  End-of-ACIS-data<A  L9y? L9y?4ˏ@׵@?VACIS BinaryFileMegaCAD 2013 3D ACIS 22.0.1 NTFri Apr 06 16:20:35 2018?ư>|= body    string_attrib name_attribgen attrib  ATTRIB_XACIS_NAME R2 umlaufend lump    shell     face      ftreemeg attrib    face    loop   cone surface  ؒ@dXL@nhCe@lv@lv? ?@ ftreemeg attrib    face       loop    cone surface  ؒ@cXM@nhCe@?lv@lv@? ?@  coedge       ftreemeg attrib    face       loop   cone surface  @cXL@nhCf@?lvlv? ?@  coedge       coedge  ! "   coedge  # $   coedge  % &  '  edge  (-DT! )-DT!?  * unknown ftreemeg attrib    face + , -  .  loop  /  cone surface  @cXM@nhCf@?lvlv@? ?@  coedge  0 1 2 3   coedge  4  5 6  coedge   4 7 8  coedge  9 :   -  edge  ;-DT! <-DT!?  = unknown  coedge    > ?   coedge  @ A  " B  edge  (mm C06ц޿ ! D tangent  coedge  E F  $ G  edge  H06ц? )mm@ # I tangent  coedge  J  F K '  coedge   L @ M '  loop  N O  vertex   P vertex   Qellipse curve  ؒ@dXL@@e@lv@lv? ftreemeg attrib     face R S G  T  loop  >  plane surface  yؒ@cXSO@e@? L9y  coedge  U V W X   coedge  Y  Z [   coedge   Y \ ]   coedge  ^ _  3 `  edge  a-DT! b-DT!? 2 c unknown  coedge    L d  coedge  A @  6 B  edge  <06ц? emm@ 5 f tangent  coedge  g h  8 i  edge  jmm ;06ц޿ 7 k tangent  coedge  l  h m -  coedge   > A n -  vertex   o vertex  n pellipse curve  ؒ@cXM@e@lv@lv@?  coedge  : q ? -  edge  C-DT! H-DT!? > r unknown  coedge  5 ! & M B  coedge  ! 5 : n B  loop  ! S  vertex  ? sstraight curve  @dXL@nhCe@? `jDЍ+ `p1c'@ coedge  t # q u G  coedge  # v % K G  loop  # ,  vertex  ? wstraight curve  ؒ@dXSK@nhCe@ `p1c' `jDЍ+@ coedge  x % y z '  edge  )  {P % | unknown  coedge  & N 4 d '  edge  eacN ( ǜ & } unknown  coedge  L ~ g  '  face  '   point  @dXL@@e@ point  ؒ@dXSK@@e@ftreemeg attrib  ,  face  B  plane surface  <ܸ@cXSK@06ц.f@ L9y? L9y  coedge  /   coedge  /   coedge  _ / X `  edge  -DT! -DT!? W unknown  coedge  1 0   coedge  0 [  edge  bz$%/ nhC? Z tangent  coedge  1 ] G  edge  nhC az$%/@ \ tangent  coedge  2 `  coedge  2 W `  loop  2  vertex   vertex  [ ellipse curve  @cXL@f@lvlv?  edge  j-DT! e-DT!? L unknown  vertex  d straight curve  @dXM@nhCe@ `p1c' `jDЍ+@ coedge  7 N  i  coedge  7 9 m i  loop  7  vertex  d straight curve  ؒ@cXSO@nhCe@? `jDЍ+ `p1c'@ coedge  q 9 -  edge   ;A&@ 9 unknown  edge  <@ C@ A unknown  point  ؒ@cXSO@e@ point  @dXM@e@ coedge  > l E u - ellipse curve  ؒ@dXL@e@lv@lv?  point  @dXL@e@ coedge  E G  edge   HA&@ q unknown  coedge  F G  point  ؒ@dXSK@e@ coedge  J '  coedge  J z  edge  \ {ȚwH J tangent  vertex  straight curve  Ynƒ@dXSK@@e@ L9y straight curve  @2]~̩K@@e@ L9y<  coedge  N '  edge  P? j @ N unknown ftreemeg attrib  O0  face   plane surface  Ԓ@H@@e@?? ftreemeg attrib  S  face   plane surface  @dXSO@pe@? L9y<?  coedge  V U   coedge  U i  edge  z$%/ nhC? tangent  coedge  V  edge  nhC z$%/@ tangent  coedge  W `  vertex   vertex  ellipse curve  @cXM@f@lvlv@?  coedge  Y  edge  -DT! -DT!? unknown  coedge  Z _  coedge  Z  loop  Z  vertex  straight curve  @cXL@nhCf@ `p1c( `jDЍ*@ coedge  \ G  coedge  \ t ^ G  vertex  straight curve  @cXSK@nhCf@? `jDЍ* `p1c(@ coedge  ^ `  edge  a)  ^ unknown  edge  @ b@ _ unknown  face  `   point  @cXSK@f@ point  @cXL@f@ellipse curve  ؒ@cXM@@e@lv@lv@?  point  @dXM@@e@ coedge  g i  coedge  h i  face  O i   point  ؒ@cXSO@@e@ coedge  l  edge    @ l unknown  vertex  m straight curve  l͒@cXSO@e@? L9y< straight curve  @dXSO@e@ L9y<  coedge  t  edge  G"  unknown  vertex  straight curve  l͒@cXSK@e@? L9y<  coedge  v G  coedge  y v  edge  {DJW EJW? unknown  coedge  x '  coedge  x  edge  % Ͷ x tangent  coedge  y  loop   vertex  z straight curve  Ͷʒ@ M@@e@? nl=` 4s4@ point  Ͷʒ@cXSK@@e@ coedge  ~ '  coedge  ~   edge  po @ P c[a&@ ~ tangent  vertex  straight curve  Ynƒ@dXSO@@e@? L9y< ftreemeg attrib  /  face      cone surface  Ͷʒ@ M@e@?E!Z |b? @ ftreemeg attrib   plane surface  @cXSO@f@ L9y  coedge    edge  -DT! -DT!?  unknown  coedge  i  coedge     i  vertex  straight curve  @cXSO@nhCf@ `p1c( `jDЍ*@ vertex  straight curve  @cXM@nhCf@? `jDЍ* `p1c(@ edge   )@  unknown  point  @cXM@f@ point  @cXSO@f@ coedge   coedge    loop     ellipse curve  @cXL@`f@x+R<lvlv?  edge  2]~iJ@ 2]~iK@  unknown  point  @cXL@`f@ coedge    G  edge  Y& xg?  unknown  point  @cXSK@`f@ coedge   edge    @  unknown  vertex  straight curve  ?1ǒ@cXSK@f@? L9y< straight curve  @cXSO@f@ L9y< ftreemeg attrib    face    plane surface   @cXSO@f@? L9y  coedge     i  coedge     edge  EJW DJW?  unknown  coedge   edge   G"@  unknown ftreemeg attrib   plane surface  <ܸ@cXSO@06ц.f@ L9y? L9y  loop  straight curve  l͒@cXSO@e@ L9y<  point  l͒@cXSO@e@straight curve  l͒@cXSK@e@o ~:?k4Mic<<  point  l͒@cXSK@e@ coedge  ! "   edge  Wx #\Z^ $ unknown  coedge  " %  vertex  % &ellipse curve  Ͷʒ@cXSK@e@ L9y?E!Z |b?  coedge  ' ( ) '  coedge  * + ,  edge  --DT!  -DT!? . tangent  coedge  / 0 1  coedge  2 * 3  loop  2 4  vertex  5straight curve  @J@e@ ؈'+    coedge  6 0 7  edge  DJW 8DJW? 9 tangent  point  Ͷʒ@J@e@ coedge  : ; < '  coedge  = > ?  edge  mπ*@ @PY;@ A unknown  coedge   > B   loop  C  vertex  D point  Ͷʒ@cXSO@@e@ftreemeg attrib  .  face E F G  H  loop  plane surface  _u@ Q@`f@%?Mr ~:?Mr ~:?%  coedge  I  ellipse curve  @cXM@`f@x+R<lvlv@?  coedge  J K i  edge  xg LY&@  M unknown  point  @cXSO@`f@ point  @cXM@`f@ vertex  Nstraight curve  ?1ǒ@cXSO@f@ L9y  coedge  O P Q  loop  R   face S T  U straight curve  @acN@`f@ L9y?^DO  coedge  P V  G  edge  #EJW DJW?  W unknown  vertex  Q Xstraight curve  Yn@dXSK@`f@ L9yx+R straight curve  ?1ǒ@cXSO@f@ L9y<  point  ?1ǒ@cXSK@f@ftreemeg attrib   plane surface  o@ʒ@cXSO@Pf@??LN7C?  coedge  ` V a   coedge  ` %   vertex   bstraight curve  I+@cXSK@ Hf@Mr ~:ƿ[6Mic%?  edge  ȚwH@ 8\@ " c tangent  point  }gxb@@cXSK@lw!lTe@ coedge  d e f '  coedge  g h ) i  edge  jJ -I k tangent  coedge  l 3 ,  coedge  l g m ,  loop  l n  vertex  oellipse curve  ؒ@M@e@?lv@lv@? 0Z 0Z?tcoedge coedge  2 p q r(g.P@)b;@  coedge  s 1 7  edge _  t|eB? u tangent  coedge  / v w  edge ]  x] h? * y tangent  face z {  |  point  ؒ@J@e@ coedge  s } ~ 7  loop  s {  vertex  ellipse curve  Ͷʒ@Je@??!Z |b?  coedge     '  coedge    <   edge  @MK MK?  unknown  coedge     ?  coedge   B ?  loop     vertex  < straight curve  @!9kQ@@e@?H˪  edge  v,DT! &>JWƿ  unknown  face      point  Ͷʒ@h'I=Q@@e@ftreemeg attrib  -  face       loop    cone surface  wA@..!@f@?!Z?"|b@? ?@  coedge       coedge     K   edge  LDJW \EJW? J  unknown  vertex   straight curve  Yn@dXSO@`f@? L9y@/ܿd#j@"-~ۿ:e0@8+,ڿTuDŽI%@ܸ5;ڿyK@~Tٿk,@4;ٿa2]E@bOuؿf@X,Xؿ>5@x$8ؿ'|k@BZؿ@t"׿r 0@G׿MbP? cone@Je@?lvlv? @ tcoedge coedge  0 6   7 0⣔_QAk` tvertex vertex   {Þ?ellipse curve  Ͷʒ@Je@?  -DT!? coedge    2 w   edge / x Ud 2  tangent  vertex  w ellipse curve  ؒ@Je@<?  -DT!?ftreemeg attrib  4+  face   7   cone surface  @Je@?lvlv? @  coedge    6 ~   edge [ EC? 8-DT!? }  tangent  point  }gxb@@Jjw!lTe@ coedge  :    '  coedge    :    edge   zJ4p@ .@   unknown  coedge   ;     coedge  ;  =    loop  ;   vertex   ellipse curve  ,@v1O@@e@5j Ce<ǰQ2t<    ?  coedge      ?  face   ?    point  =kWA-@&;CSQ@@e@ vertex   ellipse curve  Ͷʒ@h'I=Q@e@8H˪??5j Ce<n?@>? ftreemeg attrib  C/  face      ftreemeg attrib  F  face       loop   F cone surface  @ң"בLf@ޛVۼ<? ?@ -DT! } coedge   I    coedge  J  I    edge  O LJ I  tangent  coedge   J Z    loop  J  ellipse curve  wA@cXSO@f@ L9y??!Z?"|b@?  point  wA@cXSO@`f@ coedge  O     coedge    O    edge  ;LԠ'  O  tangent  coedge  V P   G  vertex   straight curve  wA@..!@`f@ A=4Q &U@ coedge   R     coedge  R      coedge    R    edge  $@ 6@   unknown ftreemeg attrib  Th  loop   T plane surface  @L@d@  coedge  Z Y   [  edge  \J@ y_N@ Z  tangent  face  C [    point  Hf@cXSO@ޓf@ coedge   } `    edge  8#,{V# 8B `  tangent  vertex  a straight curve  Hf@..!@ޓf@? &U A=4Q@ coedge   d  ! '  coedge  " # d  $  edge  %Ͷ@ %@ d & tangent  coedge  ' e h    coedge  e ' " (   loop  '   vertex  f )ellipse curve  ؒ@N@e@?lv@lv? 0Z 0Z? coedge  h g * + i  edge ^ j ,] h?  - tangent  face . 4 i  /  point  @N@e@tcoedge coedge  0 1 l  2 3<S!? tedge edge 5 < xS!? l 4 tangent pZqd? pcurve    exppc nubsS!8+1-DT!?T^)1MbP? torusؒ@Me@?@? tvertex vertex  m 5KK?ellipse curve  @Me@?  -DT!?ftreemeg attrib  n(  face 6    7 torus surface  ؒ@Me@?@? tcoedge coedge  8 p 9 :  ;lRnC= tcoedge coedge  p 8  <  =zj h?  loop   >  pcurve    exppc nubs)b;(g.P?)b;@?(g.P@MbP? spline  exactsur nubs ??(g.P@6,@!:S@̭!@KT%@E%@&@WE&@c4X'@ @sQ2'@swy'@W'@ndb(@l͒@Lne@94͒@X3 \Ld5e@b̒@ҦqL$e@1l˒@ϿLS8e@[s'ʒ@ K<51e@Ͷʒ@$ SKfe@|͒@;VLH.e@Z͒@U5aL6}e@Y͒@n&@.oL+~Ae@ҦV̒@[QL2+e@lS˒@"|Kl7e@R˒@!Kdb~e@"Β@N#L}e@DRΒ@ɭL޵e@JΒ@lLQU'le@QaN1͒@LS+LLe@ݝӳ̒@QI"KV e@Qf6̒@?K |e@D@iϒ@Ph`Le@ϒ@LL69e@ϒ@$gLTT5e@o~ϒ@=Leּe@l5ƷSϒ@rKJ2фe@X(ϒ@qKԾ[zye@В@$9f#L.ee@7В@NoOLWe@В@&މfLq9ʛe@xeВ@?OkLwX9e@%ђ@Kq$K=\ge@XL1 ђ@pLK)Fye@Ϫ9OӒ@Loe@esHӒ@ޣyoמLI=we@EӒ@NkL+e@Ԓ@\LWmąe@FWlLՒ@/KI/e@-BՒ@!ŵ0MK&k<$|e@~xԒ@l LIe@>Ԓ@:TL>-?e@Ւ@n kuLMy@e@37j֒@kQL`'e@ג@"SKD.ˍe@1cRؒ@|tKiX e@^]ג@vf&LYv e@>'ג@ysL腷e@qג@%#LVĴe@5l:+ڒ@Jm Ɓ!L2Me@bے@Lw:e@>ݒ@%Kk@e@ -ג@w|٭Me@4ג@vAL!le@/iؒ@ u}LWre@9/Eے@"xLVe@)ݒ@pLzSe@:2Eߒ@LUe@ʸhؒ@EKLӫe@#^Oؒ@2ҐɨLH ..e@cVْ@]koL,~e@|9ے@n aLM2e@ݒ@⅝K Ke@I` @û(KIk4e@lؒ@nN\L qe@bSؒ@P3 L+oe@ْ@(]oL7e@= ے@w;Lph Oպe@oޒ@E0ƣK1)7e@ysB@5$K!e@Xwؒ@LXL{eT>e@u]ؒ@QeL.|fe@·%ْ@{R nLe@Hܒ@!LuJ檻e@ bޒ@}f?K()e@'@`IKfĘe@HF~ؒ@s>LUse@/Jcؒ@"!+Lpe@O,ْ@a1mLƶFe@ߘH ܒ@ҜmL p.e@ vޒ@Kbbe@x[4@uXAKԙ9e@Fؒ@ L)Ge@\Qrؒ@ YLCYe@z<ْ@HjL3ʕ3e@&@"ܒ@]Z L e@po9ޒ@x@K}e@ZJS@KP1"!e@ =ؒ@Lûze@Ky{ؒ@LL)]L)/8e@#Fْ@\iLe@vS/ܒ@ʛU L SXe@rHޒ@hpKFe@Jd@MKV,|e@ Pmؒ@R$WL_P 2e@z zؒ@iFyL=e@KkYْ@̼fL9se@6 Gܒ@`] Lũe@i&Icޒ@QyK߂7e@]@1KE-A@K^e@\jؒ@| L[ge@k@ؒ@ݨTCL1&we@otHqْ@,?`L[e@5dܒ@jMLm6je@#ޒ@"KŒV2e@F)0@"~n4K e@xhؒ@B#L#(e@ؒ@QmڟL}y\e@\Nyْ@v__L0*\e@(2nܒ@-aؤYLHe@ޒ@+%K7Ee@YbF@X0[{Ktve@;Oؒ@:-JLDBe@i;ؒ@MOL礤e@s~ ~ْ@uO]L1e@4'sܒ@ VhL@7ke@Аޒ@,T5Kqe@@)_K}Oe@wؒ@Ƀ FLp/Ce@3ؒ@'!LXHuYe@.ْ@Z\0hZL)>.e@>ܒ@L'9e@ޒ@gK Ĩe@ZV^@l:]K%Nle@ؒ@B L/4e@ oؒ@ MfeL䟕e@+ԟ’@p]MD;`^e@tÒ@LrKԧe@˩>|ƒ@Lc/L|e@Ϙ04Ȓ@L貦re@Hn˒@}8L<$2,Iee@[z͒@PH6L"#Eae@ Kyђ@ QL;Q6G_e@'Ӓ@MCLU%ae@$Z|ג@p鉠Lifje@ekgْ@F)RL§9re@O[ܒ@($L{ee@+9ݒ@ \'LODqe@M,Fߒ@[ouM!e@^]>ߒ@ALK e@@$xLj9ye@=gH@#1e#LL2+e@"@cLue@*@673QLņUle@^x@^L6e@@ q Lne@@@ cone@Je@?lvlv? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?PTRE? ?? (g.P@6,@!:S@̭!@KT%@E%@&@WE&@c4X'@ @sQ2'@swy'@W'@ndb(@PTRE?-@ /C@d}FM@Ğx@#j5@Jý@H?@gc^@nu@5A\@3@Q"@@phC(@B 2` @VaB,!@!@Ap}"@mWV&#@F-#@b1F$@ni[$@h߄4%@KT%@*}&@t^&@"DM&@'@, '@=(@ null_surface nubs(g.P@)b;@?(g.P@?)b;@ nullbs   tcoedge coedge  @ 9 s  A BQAk`@0⣔_@ tedge edge # tQAk`@ 0⣔_@ s C tangent Gnc-9? pcurve    exppc nubs0⣔_8 &$$=̑:iTRQAk`BF'KW?Hӡ.L ??XI?5!pop?~Jއh_%?.ݠRr'uL?vHɠE푌I|y"iԇZ(пXox׿~V|h@@և~9߿$g[hBJWMbP? sphereͶʒ@Je@-JW? t,DT!?  l unknown ftreemeg attrib  3  face m n o   plane surface  @n%R@@e@:H˪??6j Ce<|FSkҼ?  point  }gxb@@X&Q@jw!lTe@ftreemeg attrib  1  face p  q  r  loop  s  cone surface  wA@..!@f@?!Z?"|b@? ?@ ftreemeg attrib    face t u v  w  loop  x  spline surface   exactsur nubs ??Pt!'c.Gb[ %= 8M{N$(6ۿ@ѣ"בLf@@*jLf@@~3pgLY+Qf@@&LŮf@@Kjf@@JbKf@=8@ѣ"בLf@y@@*jLf@#i㕒@~3pgLY+Qf@/+r@&LŮf@m0@Kjf@\͖@JbKf@̕t@@Lf@OP @=fLf@І˗@Ë$|LY+Qf@阒@gBg/LŮf@ҵ]@gהLjf@ϙ@/NjLY+Qf@[iI@´5ULŮf@B @@m&F:Ljf@}aN@T*Lf@aqIs@RLf@@\+WmLf@ @`pTLY+Qf@֛玒@҃f}6LŮf@y.)o@QLjf@Ah(@~N~\Lf@liJݒ@r=QLf@bo* @f!Lf@{>@kLY+Qf@2O@wLŮf@"7 @XiKjf@,We@&>Kf@n@ѣ"בLf@:5"IG@*jLf@\@~3pgLY+Qf@4Rݒ@&LŮf@CB’@Kjf@H'@JbKf@@ѣ"בLf@@*jLf@@~3pgLY+Qf@@&LŮf@@Kjf@@JbKf@?Pt!'c.Gb[ %= 8M{N$(6ۿ ?  ?  tcoedge coedge  y z { |  }] h?  coedge  ~     edge  mπ*@ n?`Q@   unknown  vertex    coedge       coedge        edge U  -DT! -DT!?   tangent  coedge        coedge        loop     const_roundffblendblendsys attrib     null_surface@ vertex   straight curve  @J`f@ xs:d. @&23 coedge        edge  DJW DJW?   tangent  point  wA@J`f@ coedge        coedge        edge  -DT! -DT!?   unknown  coedge        coedge        edge  -DT! -DT!?   unknown  coedge        coedge        loop     vertex    vertex   straight curve  @J`f@?  coedge        vertex   ftreemeg attrib  .  coedge  J     straight curve  0@J|#f@ ~:ƿ? @f+ Ⱦ! point  Hf@Jޓf@ coedge      '  coedge     ! q  edge  {@` %_   tangent  coedge     ( $  coedge      $  loop     vertex   straight curve  @P@e@?   @ ؈'+@tcoedge coedge       PS!T{C=  edge G huJV? -DT!?   tangent  point  ؒ@P@e@ coedge     +   edge ; ,: 69   tangent  vertex  + ellipse curve  @Ne@??  -DT!?ftreemeg attrib  * cone surface  @ e@lvlv? @ tcoedge coedge     F 2 ] h tcoedge coedge      2 >h?  loop  1   pcurve    exppc nubs<S!??,H@M?MbP? spline  exactsur nubs ??j6?P$?v@ @A @{jD@̎y @Pt!@ؒ@"בLe@ؒ@jLe@ؒ@t3pgLY+Qe@ؒ@&LŎe@ؒ@Kce@ؒ@@bKye@}$ؒ@"בLe@ݶؒ@jLe@@ 6ؒ@t3pgLY+Qe@[˭l"ْ@&LŎe@$=ْ@Kce@tLْ@@bKye@hk$ْ@l\ZLe@b-P$tْ@kLe@2ْ@㜁 lLY+Qe@KpIڒ@9bLŎe@a͐~ڒ@Kce@+ڒ@3SKye@ڒ@!7{Le@#Aے@;?̡Le@uے@I݁LY+Qe@ ݒ@6LŎe@Џ˖ݒ@UWLce@H;ݒ@YLye@;rq]ے@T~Le@RyKHܒ@ćLe@.2ݒ@+HLY+Qe@^ޒ@mEVLŎe@%iYߒ@:Lce@xߒ@^l*Lye@gܒ@9Me@6X~Cޒ@+yMe@]ߒ@ILY+Qe@e )@b}LŎe@@Lce@ԋlI@XɷLye@!a"ݒ@bDMe@Zߒ@ 4Me@usRc@%5$MY+Qe@uܖ @/ MŎe@pDS @vXLce@!R@m`oLye@Lէݒ@ӼѿMe@aaeߒ@ol Me@r@no'PMY+Qe@K8@[MŎe@杒ױ@GWsMce@ovT@S8/Mye@ +W!ݒ@}@(Me@Bzdޒ@SMe@Wߒ@T NY+Qe@oC@0!h>NŎe@Q4@iONce@z@"8ZNye@v9?ڒ@4Ne@^9 ڒ@{ifNe@jv4xے@λKNY+Qe@~ܒ@'NŎe@2cܒ@ Oce@'ݒ@&DOye@NGtfג@J[BNe@Hݍג@ TXwNe@ ڏג@6;NY+Qe@s}nג@A'_OŎe@L)naג@ɩd(Oce@#fYג@p#C=Oye@%0 Ӓ@ Ne@#aҒ@;D=?  point  *w@6Mye@ftreemeg attrib  ) torus surface  ؒ@Ne@?@? tcoedge coedge       (g.P@)b;@ tcoedge coedge     : A nClR? tedge edge " "Y=< t(R? 9  tangent h(K? pcurve    exppc nubs(R"Y=~7?(g.P@*a$Ĩ=(g.P@MbP? spline  ref tedge edge ( z j h?   tangent T ]SG? pcurve    exppc nubszj h?f(?' ;@? ;@MbP? spline  ref  face       point  '0В@*K@ye@tcoedge coedge      A R{<  loop  9   pcurve    exppc nubsQAk`@0⣔_@?QAk`?0⣔_MbP? spline  exactsur nubs??0⣔_6~(5["R56ʒ@\{Lewe@sXXZʒ@4z3 \L߹e@ڿʒ@vqL`e@|(mȒ@¥ϿLe@{lǒ@U K:ake@6ƒ@SK+ze@]%1ʒ@׻KLjяe@n"ʒ@\nvLe@0)Uʒ@LauL.3e@xWkȒ@NLۚe@ǒ@BH K~ e@}K4ƒ@ܐp-K.F e@ʒ@P}Lr(e@o9K˒@,rLM{e@`fZʒ@!;MxLDƯe@Iɒ@*[I Lk}e@{ b@Ȓ@ZQnyKAe@[fǒ@cKBʑe@+ ̒@{ L+9te@3˒@j AڰLZsNe@ 7˒@yL'Be@wOʒ@8%!LoVe@!fɒ@arszLT.be@A2gȒ@KCe@!̒@Ң&Be@ô3ʒ@iwKsYe@[ɒ@}.%K e@#qsR ϒ@oƅLpmpe@Β@L)he@.oΒ@-!dL0I2e@}͒@C7LԡKe@0w̒@55KLQ3e@7F܎̒@wqKY !ze@n YВ@LZz$e@ ~ϒ@E~LUKge@V ]ϒ@&!wOLHJԛe@I,@A[C^Lde@+?m@W9nLx~ e@@dLfׯe@ ’@"ViLSjɫe@Ē@v_~LhEe@N ƒ@p!Le@Y?1ɒ@\7L$oe@'ʒ@p)L phe@@ƫ Β@=q LΌae@JBϒ@pQLղxz_e@pӒ@ T~L˒F`e@9Ւ@_Q-^L-vMde@ؒ@rULfB6 oe@Eshڒ@>K we@~k;ے@)BKM soe@@@ sphereͶʒ@Je@-أڿ-(p @\k'T~ۿV o @r//ܿn; @MbݿMbP? conenZÒ@J<[f@_r ~:?<&E>vlv1!D׿? @  face  n     point  *6ƒ@zeSKkve@ coedge      '  coedge     R   edge  V@ 9@ Q  unknown  coedge      U  coedge     Y U  loop     vertex  R ellipse curve  ,@K@@e@lv@lv?  coedge        edge  $    tangent  face       point  D@K@@e@ coedge     ]   edge  ^MK MK? \  unknown  vertex   straight curve  D@v1O@@e@ :`2 <`<@ftreemeg attrib  T  face      cone surface  ,@v1O@@e@9qFSkҼ?kWA-@&;CSQ@d@straight curve  @!9kQ@@e@`-9ƿj?z6?  coedge      ? ellipse curve  wA@8sQ@f@9H˪6j CeҼ@nĿ>=? ftreemeg attrib  4  face       loop    ftreemeg attrib  2  loop    cone surface  Ͷʒ@ M@e@?E!Z |b? @  coedge       ftreemeg attrib    face       loop    spline surface   exactsur nubs ??+L .@si0@< 1@J6]4@A ;7@A6;VNE7@νLӋ7@֨7@[Żq8@A8@e5]8@%?y9@|#)b9@wA@У"בLf@wA@)jLf@wA@~3pgLY+Qf@wA@&LŮf@wA@Kif@wA@JbKf@j@У"בLf@:i@)jLf@իG@~3pgLY+Qf@q3-@&LŮf@]p67@Kif@+=@JbKf@*8W@1Lf@ecu@a5[2Lf@S\@klKiL,u8f@s yŲ@^d LdVf@pALز@:KECf@'䲒@8BE5K7UIf@L굒@ppLf@N&@&4Lf@56a@ʒoLǨûf@͆(¶@dWLb[f@&綒@1|vKK}9f@: @ݡCnK`b{f@c@ +ʒ@6CKa_z/f@a,1B˒@w~KB1Jof@#Aϒ@ݥԄLf@S"DΒ@@**1CLf@S9̒@gw-MLWif@iMׇP˒@DyKF@f@=˒@C wʤK@of@,b˒@RK of@dHВ@ 2,-zLf@KΒ@/9Lf@=P͒@H͟KVf@3͓˒@κKf@cT˒@"=:Kk f@M˒@OKx孳nf@? gВ@0YsLf@iHΒ@Z3Lf@c-͒@4 K3Jf@\`˒@b+KTtЖf@"Ղ˒@KTif@u .˒@FZ雫KTsnf@ -ђ@R6`Lf@.ϒ@"Lf@%xΒ@ETK-f@igD̒@6V 4K gf@׵=˒@1AKIVԀf@h̒@틠KXmf@[ʢђ@vtTLf@4В@x_kLf@sΒ@K0K| f@h=̒@7KX*f@Iz?y=̒@mKgk~f@H*̒@UKoxtmf@h\zҒ@4;Lf@廻_В@Lf@E#ϒ@*K.:&f@͒@x6!K/ʵf@>̒@SN@qxK If@ H͒@] KPlf@JҒ@zBb-Lf@,Z1ђ@Kf@{Boϒ@:Kz;f@ U͒@ZzK9@~f@#0i͒@~7_dpK5f@t͒@|鲁K^jolf@ FQmӒ@ShLf@焦ђ@(!HKf@h'1Zϒ@!"K#o.ڵf@֐͒@..oKº/f@Jc͒@sǠcKf@V7͒@.etKkf@WF9Ӓ@6| Lf@_ђ@? Kf@В@6frKUǸ̵f@jz͒@2 àfKs f@zF+͒@]]K ~f@]"'Β@=(~nKe>5kf@v6Ԓ@-l.Lf@- Ғ@GKf@%8В@dI5KRƵf@Ck͒@D|bKU.df@.%u͒@Un#ZKx~f@SˤBΒ@Z@jKE[Wkf@o|Ԓ@9QeKf@NY~Ғ@mKf@ۏ̾В@sKiof@z6Β@Z"XKeĔf@<͒@:ÌPKGk~f@GpΒ@Qcָ`KӼSYkf@ Ԓ@( Kf@,AҒ@?8Kf@ 2В@DK,K/f@MĽ[Β@!QRKV䦔f@uΒ@R4cJK,CO\~f@_"Β@$,mZK,kf@_:Ւ@*};NKf@U!Ӓ@z,Kf@Qђ@TP zK޿f@_Β@5oEEK͸]mf@dOΒ@G;> >K ~f@ITϒ@#bMKjf@wՒ@+8Kf@-UӒ@2sKKf@+;ђ@,rKbꗵf@&PsΒ@㷉>KhQf@@rΒ@7KP}f@'ϒ@FKv=Ijf@ưՒ@3.wKf@ Ӓ@",8Kf@ԗ̱dђ@\ iKՕf@OΒ@C7K7f@cʒΒ@}F,1KX }f@gLϒ@Э?Kjf@? si0@< 1@J6]4@A ;7@A6;VNE7@νLӋ7@֨7@[Żq8@A8@e5]8@%?y9@ ?  ?  tcoedge coedge  ! " # $  %F?_ =hh?  coedge  &  ' (   coedge   &  )  tcoedge coedge  " !  |  *] h tedge edge  + ,] h?  - tangent rۼn(C? pcurve    exppc nubs] h?@j}@-DT!  cone@ң"בLf@ޛVۼ<? ?@ -DT! } coedge  .  / 0  coedge   1   2  edge  3Խ7K% P"Ha@  4 tangent  vertex   5straight curve  _u@ Q@`f@H˪?  point  wA@8sQ@`f@ coedge   6 7 8  coedge  9 :   ;  edge S @ <@  = tangent  coedge  >  : ?   coedge   >     loop  > @  vertex   Aellipse curve  @M`f@x+RW9?lvlv@][1%~? 0Z 0Z? coedge    z )   edge T +:JV? -DT!?  B tangent  coedge  C      edge V  D@^ h?  E tangent  face F G   H  point  @J`f@ coedge   I     loop  I J ellipse curve  wA@Jf@L!Z?|b@? zDJW ƻ3O|? coedge  K  L M   coedge  N O   P  edge  Q$@ X@  R unknown  coedge  S      coedge   S N T   loop  S U  vertex   Vellipse curve   @E`f@x+Rx+R<? H H?  coedge   K W X   coedge  Y Z   [  edge  $@ \X@  ] unknown  coedge  ^  Z _   coedge   ^     loop  ^ `  vertex   aellipse curve  P@E`f@x+Rx+R? H@ H?  coedge    b c   edge  d" <  e tangent  edge   f"@  g tangent  face h i   j  point   @J`f@ point  P@J`f@ coedge  k  l m   coedge   n o p   coedge  q r   s  edge  t-DT! u-DT!?  v unknown  point  Hf@Q@ޓf@ edge Z wj)JV? -DT!?  x tangent  coedge  y  z { '  coedge  | }   ~  edge  *zJ4p@ k2G>@   unknown  coedge      q  coedge    |  q  vertex   straight curve  Ͷʒ@ M@@e@? nl=ma i ?-@ coedge   "   $ tcoedge coedge  #    $ mFj@ 0v&h@  coedge    #    edge F sFC? %-DT!? #  tangent  face   $    point  Ͷʒ@P@e@tcoedge coedge    '   T{CPS!? tedge edge A T{C ,PS!? '  tangent Y~Zqd? pcurve    exppc nubsPS!T{C=Ɔ+1d^)1jDT!MbP? torusؒ@Ne@?@? tvertex vertex  ( ]KK?ellipse curve  ؒ@Pe@@?  -DT!?tcoedge coedge   * 1   >h: tcoedge coedge  *     Y h?  loop    straight curve  *w@ ye@@  point  *w@Nye@tcoedge coedge  1 0   2 l _c:R!?  pcurve    exppc nubs] h?MbP? spline  ref  tedge edge 4  >h? 1  tangent &Sh.S? pcurve    exppc nubs>h?&8/$?ԗ@?UD@MbP? spline  ref   face   2   tcoedge coedge    8   )b;(g.P tedge edge * (g.P@ )b;@   tangent ?? pcurve    exppc nubs(g.P@)b;@(g.P@)b;@MbP? spline  ref tcoedge coedge  9 @   A 0⣔_Ak`  pcurve    exppc nubs"Y=<(R?ٽz>1P.?C_IMbP? spline  ref tvertex vertex   ??ellipse curve  HͶʒ@9Lx&umke@8*Olh ^V¿r ?,x?n$ ?? tvertex vertex   5D?ellipse curve  '0В@2"בL`e@]=b @=P=D?? ftreemeg attrib  >  face  H    spline surface   ref tcoedge coedge  K  @   {R? tedge edge  Xؼ FR?   tangent ZOрK? pcurve    exppc nubsFRX<я?*__MbP? spline  ref  face   A    coedge    D    edge 0 Ud@ @   tangent  vertex   ellipse curve  ؒ@£"בL_e@=?? ftreemeg attrib  H  face      cone surface  @"בL_e@? ?@ -DT! } coedge    J    edge  =_{| w98B J  tangent tcoedge coedge   K    [ hRR:  loop     pcurve    exppc nubsз(U%?з(@?U%@MbP? spline  exactsur nubs??U%@$#'@N*@Db|.@ƫlR=2@O?V3@ǰ^e@536~ʒ@@l$vL\)Ve@K1ʒ@i~sLO8e@Q Ȓ@hԤL70We@wιǒ@G$ Kȡe@eƒ@MvK?Ie@ 7>̒@̊ L{[e@5YI̒@dӍ?պL` e@dbP̒@odjC}L;e@ ʒ@?N!LW e@Wܺɒ@N?LCse@XȒ@\;Kiwe@bu͒@uM|M~}e@7_Q͒@r4Ld܁e@x5\͒@jGu[L-?h1e@mK̒@FL߸le@ 4dlw˒@c=NLye@ʒ@(9})e@1Ӓ@>P Un2Lc6e@[GӒ@TPLSe@Ғ@G|KE܃e@]U%Ғ@6leKve@] lӒ@L1 K H+he@y14Ւ@ Ʀ>Lqe@?^k7Ԓ@;NL=Je@ ^Ӓ@JzzKsTeRe@,\xӒ@mV-K\e@TӒ@YUlK)2nye@:4NӒ@vKu<me@ `F۶Ւ@V7L}6je@IhԒ@Q2Kʡͧe@^?+Ԓ@uR{K+~e@r֒@N,Kd쎵e@o ֒@ލБKe@NdÍՒ@|E4bnKF딦e@NWԞ-Ւ@O,uGK)de@J`ۛJՒ@2fh6K(e@u q\Ւ@Ⱦ)K"e@fQג@4a}aK]ݶe@MJ-￑e@P ֒@b#Je@>V֒@Je@WԦU֒@TO J3e@4pג@+mKhe@=֒@w J$6ܵe@4 ֒@^oKKJީGe@fO$֒@!uCJ$! %me@Z\*֒@1J2(e@`c֒@kAJi-*e@!8|xג@0VwJ H޼e@S֒@l\Jͤ7e@ 1֒@,J]!Ve@R /֒@e7J e@aLG4֒@.*tJB-e@UBj֒@GJ]D\юe@ԡג@iJj㻨e@ ֒@:Jvlv1!D׿? @ null_curve nullbs@@Q@e@ intcurve  offintcur nubsXl.!?(`5 @8Z1@YaФ@2I17@/o@M@t,ukm"@U%@d<(@LTj+@!.@iE0@Ÿh0@OH1@:e.2@O?V3@eo T5@}S5@N󬦋6@|;7@Jْ@RK;JK[Jf@Xؒ@hۤKo3Of@(;ג@q~K\ Vf@BwԒ@@L'r\f@|\RӒ@};aL ^f@v,d6ђ@hLc4`f@В@C>ɩL *`f@,LΒ@-G L|#^f@^2͒@OL}]f@z'Ǜ̒@vgL+ bZf@A:=˒@>ZdHL dBXf@_7Oɒ@4րL]cѧH’@`Le爠f@[v@{L8GB6f@lr@ O}LAS e@ T@"בL'e@.\@"בLg*e@P7’@ O}L؄e@> Ē@{LGe@r‰Œ@dLzKe@^Ȓ@ٶ'Lfpe@fT]ʒ@yoMSie@R͒@-)PVAL׏*be@CΒ@4րLW`e@gt(В@=ZdHL|e_e@Qzђ@wgL_e@;Ӓ@OL97ae@;Ӓ@+G L?@be@$oՒ@zC>ɩL&ee@4eP/֒@hL(*rhe@#@ؒ@w};aLWoe@OGْ@@LPte@mڒ@By Lye@yے@<Ki̱e@zYܒ@YKy0be@ݒ@'=KPmܧe@² ݒ@0K •e@k̝ݒ@j`#KDĖe@oh#ޒ@DO Kre@5MLޒ@&JorW}e@:kޒ@UJe@pޒ@8CřJROhUe@_Aoޒ@ i{JpIe@@@ conenZÒ@J<[f@_r ~:?<&E>vlv1!D׿? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?롕? ??U%@$#'@N*@Db|.@ƫlR=2@O?V3@vlv1!D׿? @  coedge  P    '  coedge    P    edge  -DT! -DT!?   unknown  coedge   Q     coedge  Q  S    loop     vertex   straight curve  D@H@@e@  coedge  T S   U  edge  V $@   tangent  face   U    point  ,@H@@e@ coedge   \ X    edge  @ ^ǜ.@ X  unknown  vertex   straight curve  D@K@@e@? ;`< ;`2@ftreemeg attrib  ZX  face      plane surface  D@H@@e@? ellipse curve  ,@v1O@d@5j Ce¼ǰQ2t?%bOL2<iϣ構?"lv? @  coedge      o  coedge   s .    coedge  s      coedge    s    edge M DJW DJW? s  tangent ftreemeg attrib  u  face       loop   u cone surface  T@@Kf@? ?@ -DT! }tcoedge coedge      v Vy@<uV%? tcoedge coedge  { x    D^Q,T!? tcoedge coedge  x { >   QT!? tcoedge coedge    x $  hhF?_ tedge edge  F?_ = hh? x  tangent چbC? pcurve    exppc nubsF?_ =hh??bܪ3n0>d dMbP? spline  ref tcoedge coedge  z y  !  "] h?  coedge   # y ( $  edge  ,@ %;LԠ@ ' & tangent  edge  D;LԠ +  ' tangent  pcurve    exppc nubs] h?MbP? spline  ref  vertex   ( vertex  ( )ellipse curve  @ԣ"בLf@?@1T???  coedge  6 ~    coedge  * + ~ 0 ~  edge  3Q|n@ ,GwQ@ ~ - unknown  coedge    * . 2  loop   /  vertex  0 0straight curve  @rO`f@? 6rÓ4 :"1vb@ point  @.uӜR@`f@ coedge   . 1 2  coedge  3 4  8 5  edge Q <-DT! 6-DT!?  7 tangent  coedge  8  4 9 ;  coedge   8  ? ;  loop  8 :  vertex  8 ;straight curve  |@@K`f@ (&23? ܈'#@tcoedge coedge    "   <QT!  edge R qq5  h?  = tangent  face >    ?  point  |@M`f@ellipse curve  @Jf@?x+R<?  -DT!?tcoedge coedge  @   A  B+L .@+0@  vertex  ) Cellipse curve  wA@Jf@?  -DT!?ftreemeg attrib  !  face D E F  G cone surface  @Jf@?x+Rx+R<lvlv? @ tcoedge coedge   @ H I  J?[Ec&@SF; @  face K N   L  coedge    M N   coedge  O P  M   edge  Q-DT! Q-DT!? L R unknown  coedge  S   T P  coedge   S O T P  loop  O U  vertex   Vstraight curve  @J@`f@  coedge    W X   edge  Y"  N Z tangent  face [ U   \  point  @E`f@ coedge  ] ^  X _  edge  \-DT! `-DT!? W a unknown  coedge  b  ^ c [  coedge   b  _ [  loop  Y d  vertex   estraight curve  x@J`f@?  coedge    f g   edge   h"@ Z i tangent  face j U   k  point  x@E`f@ coedge  f W  c l  edge  f$@ d6@ b m unknown  vertex   nstraight curve  P@J`f@? {cD ?@ vertex  c ostraight curve   @J`f@ ? {cD@ftreemeg attrib  b  face p  q  r plane surface  @J`f@??  coedge  s  t u   coedge  v w  m x  edge  y@ t,@ l z unknown  coedge   { | }   coedge  ~   p   edge  u@ I@ o  unknown  coedge      s  coedge    v  s  loop     vertex    vertex  p ellipse curve  L@Od@?lvlv@? tvertex vertex   "D ѵ6?ellipse curve  LQ7ǒ@J,'W!f@^r ~:?&?  -DT!? coedge      '  coedge     {   edge  MK MK?   unknown  coedge      ~  coedge      ~  loop  +   vertex   straight curve  D@@Q@e@H˪  coedge      q  coedge        edge I DJW %DJW?   tangent  edge  >JW? v,DT!?   unknown  point  Ͷʒ@g'I=Q@e@ coedge        edge D pUd@  @   tangent tcoedge coedge        0v&hmFj tedge edge ?  0v&h mFj   tangent z]?,B3? pcurve    exppc nubsmFj@ҸB@i@N6@@=@ 0v&h@Tr 0G׿Z$׿'|kBZؿ5n$8ؿTe,Xؿ2]E4uؿTm,F4;ٿ|KTٿvDŽI%ܸ5;ڿ,e0-+,ڿd#j-~ۿj<>D/ܿUyZbݿMbP? cone@Pe@lv@lv? @ tcoedge coedge        Uc (f  loop    tvertex vertex   ʔ?ellipse curve  Ͷʒ@Pe@@?  -DT!?ftreemeg attrib    face      cone surface  @Pe@lv@lv? @ tcoedge coedge       Y h tcoedge coedge       $|h?  loop     pcurve    exppc nubsT{CPS!??H@@?MbP? spline  exactsur nubs ??6?nP$?iv@ @~ @EtjD@̎y @Pt!@Fqݒ@Ne@$7ߒ@Ne@|`~@NY+Qe@>X@NŎe@bYi/b@Nce@*w@Nye@Fqݒ@m$Ne@$7ߒ@XNe@|`~@7hNY+Qe@>X@kMNŎe@bYi/b@Nce@*w@eNye@5+ݒ@ mtNe@%ߒ@BNe@@\vNY+Qe@3+@_ #NŎe@oˆ1@2Nde@O`b@fNye@F!$ݒ@UzNe@(ޒ@)td5Ne@]Sߒ@N}NY+Qe@qI@P#OŎe@_QE:@<q2Ode@s7+@dZi;Oye@Z ܒ@nS.Ne@Hݒ@DP*o Oe@/ߒ@4V&OY+Qe@5O@Pk2vWOŎe@ayp)@$0kOce@ݘR@fvOye@3nے@JqOe@6 ے@mkoHOe@ ܒ@8KsOY+Qe@82ޒ@:#%OŎe@.ޒ@TOce@8Aߒ@ez-Oye@댪ْ@#@0Oe@Yڒ@?`Oe@6P&ڒ@?nNjOY+Qe@;+Ʊے@r2OŎe@F8%aܒ@Fd:Pce@;ܒ@ǡ e Pye@"bs֒@49Oe@֒@0,̱lOe@~-֒@ZNOY+Qe@+rՒ@"Ay 'OŎe@@elՒ@)y Pce@PvKՒ@fAPye@ͺՒ@na*$Oe@nu07Ԓ@HPOe@r0hӒ@!}OY+Qe@z Ғ@-}OŎe@M4Cђ@tS0Oce@>.ђ@sBxOye@x/YҒ@t.=Ne@'<В@^+Ne@}!Eϒ@ΎNY+Qe@Vɱ̒@ŰOŎe@è˒@_Fc Oce@ ˒@$Oye@"ђ@TvNe@6_=EВ@qstNe@M Β@\"AqNY+Qe@˒@:|omNŎe@ʒ@r)-lNce@]ʒ@l0kNye@ЩӒ@FMe@9$Ғ@-Mce@LZޒ@A.Lye@,۔ܒ@\z> Ne@K<ޒ@T&SMe@ߒ@) MY+Qe@XNV@J}eMŎe@z5@@EF\~Mde@k}=@UֆqMye@8Rݒ@wzFaNe@d *#ߒ@"XNe@Z9ܩ@‰PNY+Qe@O8@gBBNŎe@؞\?@%nX@GpRaNŎe@bYi/b@_{@d^Nce@*w@^a\Nye@Fqݒ@Ne@$7ߒ@Ne@|`~@NY+Qe@>X@NŎe@bYi/b@Nce@*w@Nye@?6?nP$?iv@ @~ @EtjD@̎y @ ?  ?  ellipse curve  ג@bNye@?h&>SU ?  point  ג@PrPye@ coedge        pcurve    exppc nubs>h:89@*H9@GT!  coneFqݒ@ _e@?? ?@ -DT! }tedge edge :  ,Y h?   tangent n(C? pcurve    exppc nubsY h?:@-DT! :@} coneFqݒ@ _e@?? ?@ -DT! } face      tcoedge coedge       R!l _c tedge edge 6 l _c: R!?   tangent Ϲ? pcurve    exppc nubsl _c:p67R?p67R?R!?p67R? (Ŧ?R!?s 2>>R?R>9?޾e-??mA^0 ?܉c?9 ? x?C-(>O?(Z +?J(?Lx%q;?;_ē?}S4B?%a?Y]+0?@NI?ysDUL0Hù@ه.$?ԗ@MbP? spline  ref   vertex   ellipse curve  xFqݒ@M`e@!Qǎ=?t"=p2?? ftreemeg attrib    face      spline surface   ref  tcoedge coedge       Ak`@0⣔_@  coedge        loop   E  pcurve    exppc nubs)b;qHssY#I@ x(g.Pt@)DT!?u@2b?pJe@U7I?BW@T$%?ȣͣ@Fq?( [@&sR? \@x`G?QG@ *?HGf@l%绰?rPy@dvO?`V@:c?{Gc@1>r?`{@̫@MbP? cone'0В@Qe@?@? @ intcurve curve   bldcur(g.P@6,@)b;@PTRE? spline  ref null_surface nubs(g.P@)b;@(g.P@)b;@ nullbs   tedge edge $ 0⣔_ Ak`   tangent 70c? pcurve    exppc nubs0⣔_Ak`0⣔_Ak`MbP? spline  ref  point  l͒@4LTse@ point  '0В@F"בLe@ftreemeg attrib    loop    cone surface  ׼@%\(n5OVWf@t ~:?Gm]= t ~:ֿ? ?? -DT! }tcoedge coedge       U%@з(@  pcurve    exppc nubsXؼFR?2:ʕ?H~(@H#?R(@MbP? spline  ref tvertex vertex   xC?ellipse curve  {Ò@ L~e@I;+^V?5?TXYF?vD?? ftreemeg attrib     face  >    spline surface   ref  coedge        loop    straight curve  @"בLe@@  point  ؒ@"בLe@ftreemeg attrib    loop    spline surface   exactsur nubs??n,O 7v Mv޴%,+X_y4&zΗJ| ӿ֎?zzX@lVG@ן@݆mW!@Cג@:KP 8e@ sג@s P^e@3\֒@P6Qe@sP1e֒@:ɨPke@6.d֒@@MkPׇ&6ęe@;L ֒@ĦV`Pܛ,e@8=)xג@J1P%}e@0ג@M"Pae@֒@_P ETǰe@`f֒@7PDe@Igwd֒@v&PgIdΙe@Ey֒@YPh4c7e@z^Nג@ړݮPoWe@7ג@CPOe@ա|֒@LeT\P[1e@ob֒@:FP+K&se@ra֒@JzLȴPe@t> ֒@b%P;je@(o ג@3Pus e@ < ג@XPLne@/4!w֒@:OS/PJ e@ S֒@|5wP`V֒@Pe@WԦU֒@UP3e@R]ג@#qP%e@x8֒@7bwPRB/e@/Je֒@lg:}P~Ge@-֒@P+"e@C`֒@X !PWpWP_e@#a֒@ˎn`P`e@Ւ@,oP5gؘe@ Ւ@\3ߕvP0e@ 6 ֒@PbZ|P/Ue@r֒@V|i2Pd쎵e@o ֒@7=Pe@NdÍՒ@@NHPF딦e@NWԞ-Ւ@؟iE\P)de@I`ۛJՒ@*dP'e@u q\Ւ@ kP"e@h֒@%t$P e@]Ւ@~1PiZTe@!JՒ@624x=PLդe@Ԓ@NdSPtydde@&Tx Ւ@T\P !Շe@C2@}Ւ@NElbP=+~e@dJ:֒@ރwgPt~e@=raՒ@PһΪe@4Ԓ@]5o,Pe@EaklԒ@.@5EP1fe@ĺ:Ԓ@BxOqOPjele@MXՒ@bO VPdxe@(/5֒@]pPce@5Ւ@&6whPf٩e@4Zg`Ԓ@S%&PK e@Ug9Ԓ@?6^@P,e@T@gԒ@FsJP|YXe@xvԒ@9CQP ve@Ւ@sO_De@ټ{fԒ@VR POj\e@gkLԒ@sleP e@`Ӓ@A8PdV;֊e@$Ԓ@UɌWCP9K Je@PuԒ@ IIPse@ `F۶Ւ@w]jO|6je@IhԒ@vfPɡͧe@^?+Ԓ@EVP 9})e@1Ӓ@Oc6e@[GӒ@cOSe@Ғ@3PE܃e@\U%Ғ@;M+Pve@\ lӒ@Yg;{0PH+he@+yҒ@?g;OrAԠe@ђ@\vOe@# ђ@0˱O e@ȸsВ@} =P[}e@2sВ@=sŽP yxtle@,-ђ@VOPKV@\e@\uoВ@U>& O$e@A߻PВ@ߝ] QO6Оe@˳ϒ@,jΙO"kje@ϒ@̒@4uIeO{[e@5YI̒@,r*EO` e@dbP̒@O;e@ ʒ@(R.OW e@Wܺɒ@q}OCse@XȒ@ QbPiwe@Tʒ@$~l O>ǰ^e@536~ʒ@ۉVO\)Ve@K1ʒ@/_OO8e@Q Ȓ@+[UO70We@vιǒ@ܗmPȡe@eƒ@ D P?Ie@9ɒ@+:"*OP׿e@}ɒ@`^O-;Me@?ɒ@r0ϑO}2e@)kYȒ@R nOnOe@W(ƒ@PzRe@ˆŒ@L@ޣ P^e@t.ɒ@]Fq3O^Ooe@O=6ɒ@)3OeOdƥe@Ȓ@VOmaBe@޷l4ǒ@Oƨ fe@(CŒ@"PqX ذe@bĒ@ΨrPV'Ƹe@MȒ@\(n5O=e@MȒ@w=fO=e@HإNsȒ@v̏COMSR?e@ݔlƒ@1>O)BP'e@ MSŒ@"Pq%/e@͍ ,-Ē@ΨrP3]7e@? 7v Mv޴%,+X_y4&zΗJ| ӿ֎?zzX@lVG@ן@ ?  ?  tcoedge coedge        ,hr; tcoedge coedge       RR[ h?  loop    straight curve  fYL@ObK3hS f@p ~:ֿ=? tedge edge  RR [ h?   tangent |>n(C? pcurve    exppc nubs[ hRR:?U%@TMu<U%@MbP? spline  ref  face       point  ΍ ,-Ē@VbK3]7e@ coedge      '  coedge        edge  @ @W@   unknown  coedge        coedge        loop     vertex   ellipse curve  @F@@e@?lvlv@?  coedge        edge  $    tangent  face       point  @H@@e@ coedge        edge  -DT! -DT!?   unknown  vertex   straight curve  ,@H@@e@ ;`2 ;`<@ftreemeg attrib  R  face      cone surface  ,@K@@e@?lv@lv? ?@ straight curve  D@H@d@?  point  D@K@d@ftreemeg attrib  Y  face  ` _    loop    cone surface   @E@`f@ H H@? $@ ftreemeg attrib  V  face  Z     loop    plane surface  4@L@d@?  coedge  o  q    coedge        edge  @ @   unknown  coedge        coedge        loop     vertex   ellipse curve  @ieR@e@;H˪??6j Ce<@nĿ@>=?  coedge        coedge        edge  MF!CC=  %p<   unknown  face       point  aJT9_@ΏR@3Ce@ coedge        coedge        edge  zJ4p@ `~S@   unknown  vertex   ellipse curve  @>y\3mS@d@<\AW<!? ftreemeg attrib  6  face       loop    plane surface  @L@e@??  coedge        coedge      o  coedge      o  coedge        edge K = @ ?Nv@  ! tangent  coedge    + "   edge  R@ ,LtS@ . # tangent  edge  $tvS R  % tangent  coedge  &   '   coedge   ( ) *   loop  & +  vertex   , vertex   -ellipse curve  wA@Pf@?H!Z?|b@? Ļ3O| ?ftreemeg attrib    face . / 0  1  loop  2  spline surface   exactsur nubs ??!@'#@ػ$@jzG'@e۰h+@/y/@fD- 2@XGN\3@IJk4@5K@zmKLf@Iυ@qA[]Lf@nռ@;qDqLz5-f@@[b6LNѫf@8[UA@nzKܔgf@b)#S@}(K~Nf@mH9ܷ@%L(f@l% @IʱLLBLҿf@QR$.@[sLH8;f@ BI@LvCLߦVf@7C@9~PKSf@Q~)@45K'5jbf@t@$#L4IRf@@D@RmLђڽf@86Z@1uuL]1f@~j{@vmL£ܨf@*EI@s}4KpV;f@@HKc\f@ jf@96'LuJyf@6}u@jGL,f@ǺD@ 8xLGL %f@^'!s@؎?K Lqa?f@EԻ@2wBK8FEf@s@US~KK~1f@m@\].Lwdf@=)@3GL)KFf@sgY@'/yL/u樥f@)@k-!L#f@:L@|WLJaG΍f@U@nKS;ւf@pxWĒ@TQL1f@dgGĒ@ Lt־=f@HK-۷Ò@[xLR҃f@B7@O’@(KԢf@'<@oh6KcI$%f@зⱽ@LZLHƥe@B`@1/L$/zNe@3l@g$LS %e@x5T @rKK_8)e@˯^A@ȁ^ K?e@-t@nKa"f@)d@eaL(e@+De&@p-UKZe@RXUe@ 'K{ye@%@5RKR(e@a@\L|Kae@ft=@@ uvKֻf@a˳@"AKH.*e@%㵒@~dKU,e@q2@XFKvaMe@iT@1)wK;9(e@d@Z@xKK-e@;u@ýKϜ||1e@iBͱ@]o'K T-e@cR/@P+KÖie@X䶒@RnmoJ`%+e@S,κ@oۣJ.X_e@@pJLTe@j>Mٻ@WvJ0Rf@ @9JO e@sY?@ԎJwde@_ Q@wYvJA2:e@9B6@bJve@.&ͻ@V-J؊xe@? r@؊J^XXF f@5 @bBYJq\ZNe@l`L@մ_JYTe@xW@ hHfJ-4e@S[T@RlJv2bVe@~pͻ@H,lJ@je@ڣx@ԖhJg f@.4α@XǾIkre@0@rcI&8e@S綒@dk ,JIQe@gѺ@/ڱ*Jbe@6J@L)(j-J |e@ѩCػ@4D?%J2f@eFRͲ@K:|IC e@ @=t6 I e@yg1|@pUI?+re@a=@T2ԈJڿ-e@m@'@ؙ Je@{V(@JJf@ Xt5@Ijke@`D@JI6h^e@p@,XVI+2e@K@^B#I7 -e@ @8I !e@ z@fffffI+Af@?'#@ػ$@jzG'@e۰h+@/y/@fD- 2@XGN\3@ ?  ?  tcoedge coedge    3 4  54P h? tcoedge coedge    C A v 6+0+L . tcoedge coedge    # 7 v 8+L .@+0@ tcoedge coedge  9 :    ;uV%Vy@ tedge edge  <: =uV%?  > tangent {[eJ? pcurve    exppc nubs:uV%?T0@?B[@.0@MbP? spline  ref tcoedge coedge  ? ' !  $ @,T!D^Q< tedge edge  D^Q ,,T!?  A tangent ;I% %? pcurve    exppc nubsD^Q-p8R?Zp8R?,T!?pp8R?Ʀ?,T!?ܪ3n0>d dV,fgW6,@?40ٕI?I[TRA?R&SdZ1?] gc3տt>uf\?eː? oūWt?;\0>7 S>̴׿SB2>>?ǿ(Sc=MbP? spline  ref tedge edge  + QT!? > B tangent (҈l? pcurve    exppc nubsQT!???o bMbP? spline  ref  coedge   # 8 C   coedge  #  ? D   pcurve    exppc nubshhF?_ DT!  ~ coneT@@Kf@? ?@ -DT! }tvertex vertex   E-> vertex   Fellipse curve  2T@wnM f@v,Jb=?.4۽T=?? tcoedge coedge    & ! v G] h tedge edge  % D] h? & H tangent ܼn(C? pcurve    exppc nubs] h?|;LԠ@-DT! ;LԠ@l} cone@ң"בLf@ޛVۼ<? ?@ -DT! }tcoedge coedge  ' I  7 $ J+0+L .  loop  K L  vertex  ( Mstraight curve  @ң"בLf@@ straight curve  @JbKf@  point  @IbKf@ point  @ѣ"בLf@ coedge  N / 1 . ~  coedge  /   " ~  vertex  " Ostraight curve  @rR`f@?H˪?  edge  P8CNZi9 3-DT!? * Q unknown  face R S 2  T  point  @,uӜR`f@ coedge  ) U 6 2 V  edge O 6@ ;LԠ'@ 6 W tangent  coedge  X 7 U Y 5  coedge  7 X 9 9 5  loop  X Z  vertex  8 [ellipse curve  @N`f@x+R?lvlv\[1%~? 0Z 0Z? coedge  : 9  C ;  edge P \<;JV? <-DT!? 4 ] tangent  face ^ @ ;  _  point  |@N`f@ pcurve    exppc nubsQT!rL#1-DT! @E'1-DT!?MbP? torus@Mf@x+R?@?x+R< ellipse curve  |@Mf@UUUUUU? qq5 -DT!?ftreemeg attrib  @  torus surface  @Mf@x+R?@?x+R< tcoedge coedge  I C : `  a!@!xYMcv'@ tedge edge  =+0 D+L . C b tangent TF60? pcurve    exppc nubs+L .@_v.@F ,/@d/@}4 &0@m0@+0@}}N'?Į~,?Qٺ?ܗS3?RlTl/*9?뽚ig渉?~>P9,?Rf."n1|?j ??j.*׍6ɋ?cCD '~?<ֽ? tcoedge coedge       |h$: tcoedge coedge       g h  loop    tvertex vertex    L'N?straight curve  @ΨrPye@@ tcoedge coedge       g h? tcoedge coedge       R+ =  loop     pcurve    exppc nubs 0v&hmFj? 0v&h@?mFj@MbP? spline  exactsur nubs ??&h!Fwb1%1j׌^%aޚܿʻ(K̿t9,,w:K@^unE@{m}n@ 0v&h@7 ؒ@^p7ODkBe@Mفؒ@ˣ#tO!te@*Mْ@{zOQ[g+e@%@ ܒ@MPe@9[ޒ@iPO%e@͐Uޒ@XﭞPe@@{^oPmJe@ؒ@M)O/4e@ oؒ@򲙚hO䟕.e@>ܒ@&#;O'9e@ޒ@*̑( P Ĩe@ZV^@JbQ P%Nle@;Oؒ@n ODBe@i;ؒ@n%aO礤e@s~ ~ْ@(A@~P^e@ y ؒ@M)O|B\e@z%0ؒ@ YOXe@jbْ@ 0Ob8e@J],Rܒ@`O'ee@a' oޒ@D50nPѨhKe@H@d)P0oe@ Pmؒ@V%ۨO`P 2e@z zؒ@VWO=e@KkYْ@4CO9se@6 Gܒ@H>Oũe@i&Icޒ@>WP߂7e@]@3$2PE-PFe@Jd@pPV,|e@Fؒ@Ss (O)Ge@\Qrؒ@ QOCYe@z<ْ@V}pO3ʕ3e@&@"ܒ@^sO e@po9ޒ@ P}e@ZJS@2 }?PP1"!e@HF~ؒ@ = OUse@/Jcؒ@;BOOpe@O,ْ@*ΒOƶFe@ߘH ܒ@.cEgO p.e@ vޒ@Pbbe@x[4@ES_Pԙ9e@Xwؒ@b/3 O{eT>e@u]ؒ@PNO.|fe@·%ْ@|tOe@Hܒ@FEOuJ檻e@ bޒ@BLP()e@'@е[PfĘe@lؒ@mO qe@bSؒ@]LO+oe@ْ@r O7e@= ے@aY1Oph Oպe@oޒ@.>P1)7e@ysB@emP!e@ʸhؒ@qOӫe@#^Oؒ@-o6WLOI ..e@cVْ@xT#O,~e@|9ے@oYOM2e@ݒ@=P Ke@I` @"kPIk4e@ -ג@&RNe@4ג@tc>O!le@/iؒ@,_OWre@:/Eے@",OVe@)ݒ@Y?OzSe@:2Eߒ@OUe@^]ג@#OYv e@>'ג@MAO腷e@qג@]OWĴe@5l:+ڒ@9~O2Me@bے@wi45Ox:e@>ݒ@ uPk@e@~xԒ@1ZOIe@>Ԓ@^ SO>-?e@Ւ@c;OMy@e@37j֒@YdO`'e@ג@o=)PD.ˍe@1cRؒ@4:PiX e@Ϫ9OӒ@ b&*.Ooe@dsHӒ@#\(aOI=we@EӒ@q!` O+e@Ԓ@X1OWmąe@FWlLՒ@hPH/e@-BՒ@pg P&k<$|e@В@ƙ6O.ee@7В@2hOWe@В@!vNOq9ʛe@xeВ@ !OxX9e@%ђ@ -ZmP=\ge@XL1 ђ@YuP)Fye@D@iϒ@Y5Oe@ϒ@HWgO69e@ϒ@ hSOTT5e@o~ϒ@ xI Oeּe@l5ƷSϒ@/F(PJ2фe@X(ϒ@GPԾ[zye@"Β@X@-O}e@DRΒ@*6R`O޵e@JΒ@?vOQU'le@QaN1͒@ߒ@"OK e@M,Fߒ@~nN!e@+9ݒ@OODqe@O[ܒ@mO{ee@ekgْ@<֭iO§9re@$Z|ג@Cv_$Oifje@'Ӓ@5#3OU%ae@ Kyђ@|6O;Q6G_e@[z͒@v73O"#Eae@Hn˒@Mv,O<$2,Iee@Ϙ04Ȓ@hf~O貦re@˩>|ƒ@i O|e@tÒ@m@_%OrKԧe@+ԟ’@ZcND;`^e@87k@FOӝ>e@\[@G Oɴۻe@s?@fòOURYe@ @VrO/PrRe@M@rKYO!<@e@@@ cone@Pe@lv@lv? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?RRE? ?? &h!Fwb1%1j׌^%aޚܿʻ(K̿t9,,w:K@^unE@{m}n@ 0v&h@RRE?@rH/?pbe74JM)74JMֿ74JMƿBeSZ]?BeSZ]?W?BeSZ]?h*?.$Gp?~3`ӵ?޶ͯ@d,(-@+i2^@nfs @6@ag@4@@Y<@eL@Li@!@r@&c@,@NiJ@ null_surface nubsmFj@ 0v&h@?mFj@? 0v&h@ nullbs   tcoedge coedge       (f@ Uc @ tedge edge 9 (f@  Uc @   tangent rʁ-9? pcurve    exppc nubs Uc Ie0*YG>z M^@uè4?(fhBJW?X g[?hO|h@@R9?Xo ӝ?Vԇ$Z(?<*i?wHɠXI?ݠ-e'uLJއy_%пP\!po׿?LSI߿Pӡ_-L ֺB($KWMbP? sphereͶʒ@Pe@- planeUdڒ@Qe@? ellipse curve  ג@qMe@r#ȎJ#_8L@1>֤ŭ?T?  point  tFqݒ@Me@ftreemeg attrib    loop    spline surface   exactsur nubs??B++_?]%) N(fS ֒@.ޅ)Pe@CEnՒ@wT,4P (,e@p-UԒ@nhn?P+1`e@ NQ^mԒ@NBKTPYUPe@\OԒ@iG]P& re@U_.^Ԓ@OθeP{@e@?Ւ@3h٥O`&ͨe@"P_Ԓ@ P.3{e@y{Ӓ@$WPXe@ڇ:Ӓ@4Puxe@oӒ@gr@PW\cSe@[I2Ӓ@~JPǣ3*e@aIӒ@~a}Oɛ[`e@MҒ@,!OBUe@(ABҒ@Fr&OO[e@z7Tђ@nPIir̎e@Z{[ђ@Z*P(5›"e@]kђ@55 j4P:7s|e@n YВ@{kT|ROYz$e@ ~ϒ@lmO9Kge@V ]ϒ@qވOHJԛe@IP !ze@!̒@^oO ݧe@{خ̒@=ORO廢e@A̒@O{0ke@х˒@$OF%Be@3ʒ@¾DP|sYe@/[ɒ@Fi:mPy e@e ̒@B[Oe*9te@3˒@8%OOZsNe@ 7˒@f,O Ae@wOʒ@+OOnVe@R!fɒ@,O,be@2gȒ@a{0Pe@Iʒ@nY|O(e@9K˒@&ӍOQOfL{e@fZʒ@YIJO͒Ưe@Iɒ@pդOj}e@ b@Ȓ@VHCPAe@[fǒ@; PBʑe@%1ʒ@a(DOqϏe@"ʒ@ҏ]TO=e@^)Uʒ@-`JO3e@WkȒ@%Oۚe@ǒ@P| e@K4ƒ@GP',F e@56ʒ@#Ocwe@XXZʒ@2XO߹e@-ڿʒ@ЇD"O^e@(mȒ@X0@}Oe@C{lǒ@P7ake@ݏ6ƒ@J V Pwe@?_?]%) N ?  ?  tcoedge coedge       з(U%  pcurve    exppc nubsAk`@ iTR@=̑@&$@8@@0⣔_@,?{@̫@ 0~@a@܏g~Ɨm@@zp@$o$+i@Lq@d@_ܤ@x5d@vИ5&@Fd@D˼A@ *i@GB@}m@lFC)7@YOv@{)@@V|@@{@@nE@MbP? cone'0В@Qe@?@? @ tcoedge coedge        0v&hwmFj  edge E ,T@ t(@   tangent intcurve curve   bldcur0⣔_6Ak`c? spline  ref null_surface nubs0⣔_Ak`0⣔_Ak` nullbs   tcoedge coedge       VzA=` h? tedge edge  U%@ з(@   tangent Ѳ)? pcurve    exppc nubsU%@з(@U%@ з(@MbP? spline  ref  point  56ʒ@; Lbwe@ftreemeg attrib     loop    spline surface   exactsur nubs??J 6@_1@ @% $@@j1ʒ@·r3@Ogäae@M"hL3ʒ@Xc9qBOqD e@Gaɒ@>OAe@D_fƒ@:5Oވ e@|·Ē@eA{O'e@ZڒW~’@[BP97'0e@wOɒ@fC&OQ媯e@&3ɒ@ ,AO]2e@[& ɒ@t~O$ Ƭe@J,uƒ@BWBaONڥe@ ڛĒ@%8pOϿɜe@'’@g8%Pԡʟe@>Aɒ@5_ OE.e@ =Mɒ@ HO-e@^խȒ@*OSٿe@v!aƒ@5KQRVOQBce@ƇĒ@O6:R7e@8H’@P8 e@VBWȒ@EK%OmV _e@(rdbȒ@^PcZOJ ,qe@>]Oǒ@VO5e@+0ƒ@1`2O*e@kJIJĒ@+Pe@ Q'Ò@,N.L Pwae@hǒ@1O/0f@kǒ@`UdOĔf@#zǒ@96O{_e@/ʹŒ@cʤOe@|gĒ@.hPPTe@" %Ò@n.PxXe@&ǒ@袹k6O qi$f@zë%ǒ@Ӆ4ugOүJ$f@CAƒ@|O,M$f@٠ Œ@բvO>[!f@YpÒ@.~\P# _G f@Cu’@9[P| ^f@qƒ@k4OQ9S1f@ƒ@eS9fO-2f@!g`ƒ@vTuOO2f@=xA@Ē@ ROW0f@)9qÒ@P㼡/f@D(’@39P/a$W-f@< gƒ@ʝo,O` K8Ff@|_ƒ@2#`OZGf@VŒ@ ROtjZHf@;Ò@`O#Hf@JI ’@5aPs5Gf@*@H7t PlhƞEf@g:ƒ@E(Oc~_{|@-DT! =_{|@} cone=1y@أ"בLMf@t ~:ƿB`\5< ?t ~:ֿ? ?? -DT! } face       vertex   ellipse curve  Jj@"בLe@Oq ~:ƿ=/? ?N=t ~:?? ftreemeg attrib     face      spline surface   ref  coedge      '  coedge        edge  -DT! -DT!?   unknown  coedge        coedge        loop     vertex   straight curve  Ԓ@H@@e@  coedge        edge   $@   tangent  face       point  Ԓ@F@@e@ coedge        edge  @ 6@   unknown  vertex   straight curve  @H@@e@? nēL3 ۈ'"@ftreemeg attrib  d  face      plane surface  D@H@@e@ ellipse curve  ,@K@d@?lv@lv?  point  ,@H@d@ftreemeg attrib  S cone surface  ,@v1Od@5j Ce;T̆b!3@r"3@"T 4@ңv4@0A<4@3DI5@۾:75@a0|$6@76@"*7@Xȱt?8@ 8D8@9@ vF9@Q@TU:@!}@ 0;@@6Q;@^, <@^Kt<@xxw<@G=@n7l=@473;>@7>@TcBM?@"?@wP-@@^sЂq@@@>y\3mS@-!rXe@@ u!yS@-!rXe@J2@진S@P=aWe@R@K=oS@,&F8Ve@Y܃@<@S@ŸTe@㠠 @ZeOS@;Qe@V@ppQS@k|Pe@w;@S@EʅLLe@tyy@!S@M!Je@õV]@8?`S@>d\Ge@Ss/臑@)&S@2QÈEe@-]n@D&i T@7Be@ @3,)T@]!Ae@,T@L 7Je@:M@d+T@mLe@ZH@7(T@Qe@>O|i@6[8&T@F~tZTe@uj@T@Gl]e@L @|?T@AZde@@<@|  T@Ϯ]se@ef,@csT@{c4{e@z9@){lT@g)e@̮˗@@ttS@ste@(I;@PqQ"S@|te@@89S@ue@@89S@e@z9@){lT@fPֶe@ef,@csT@脜:e@@<@|  T@1Qwe@L @|?T@Dme@uj@T@zTe@>O|i@6[8&T@Ye@ZH@7(T@l4 e@:M@d+T@zF=e@^rVj@>,T@Re@Qe@j,`-T@9&me@)$<܏@¨ .T@"e@NupD@z.0-T@ҟe@-@D+T@IPe@ @hr*(T@Kܘde@dNy@$%T@!f@W` c@8xXT@ۊ2e@`Hge@R@K=oS@be@J2@진S@ e@@ u!yS@_nލe@@r}ȖbS@_nލe@J2@oyWS@ e@R@{H@S@be@Y܃@@5S@>`Hge@㠠 @xH^iS@bgH&e@V@ cHS@e@w;@nMS@5ze@tyy@KR@HZNe@õV]@DR@›X=e@Ss/臑@^R@ή+R@Re@:M@Er2R@zF=e@ZH@qrR@l4 e@>O|i@].R@Ye@uj@GR@zTe@L @qyR@Dme@@<@RR@1Qwe@ef,@KUR@鄜:e@z9@=(R@fPֶe@̮˗@<*DR@#>e@(I;@,gD.R@ e@@vR@O|i@].R@F~tZTe@ZH@qrR@Qe@:M@Er2R@mLe@^rVj@>+R@L 7Je@Qe@@̭R@Fe@)$<܏@I᪭R@ak]De@NupD@b6R@T -`qBe@-@8fJۯR@|Ae@ @tFԍR@#g@@e@dNy@h~R@?e@W` c@Dzh_R@%u3@e@d\Ge@tyy@KR@M!Je@w;@nMS@EʅLLe@V@ cHS@k|Pe@㠠 @xH^iS@;Qe@Y܃@@5S@ŸTe@R@{H@S@,&F8Ve@J2@oyWS@P=aWe@@r}ȖbS@-!rXe@@>y\3mS@-!rXe@kOFRi@? cone@rwqSPe@lv@lv? @ cone@>y\3mS@@e@6y\3mS@@e@6y\3mS@d@ edge  3*Ma P3ˍ%@  7 tangent  point  @rR@f@ftreemeg attrib  7  face 8 9 :  ;  loop  <  cone surface   @?/S@e@?΀¸O<j\sQ?LF@lv? @  coedge  =   >   coedge  ?  @ A   coedge   ?  >   coedge   ~     edge  B< C-DT!?  D unknown  coedge      o  coedge  E      coedge   F  '   loop  E  straight curve  xGT縒@Py*f@ ~:? =m? )֤('@ edge  ,-DT! $,CJWƿ + G unknown straight curve  wA@..!@`f@ l)6Q BH6AV@ vertex   Hstraight curve  Hf@..!@ޓf@? BH6AV l)6Q@tcoedge coedge  I  J K  L`r7@% $@  edge J  M>h?  N tangent tcoedge coedge   I O P  Q0}@}3)% @  coedge  R 1  * V  edge L  SD^ h? ) T tangent  face U V   W  point  wA@P`f@ point  Hf@Pޓf@ftreemeg attrib    face X Y g  Z  loop  [  spline surface   exactsur nubs ??Pt!(t.GQ %)= M{N$6ۿT@Nf@AVȌ@Nf@=@NY+Qf@w6@NŮf@Н@Njf@sՈ@Nf@T@IXNf@AVȌ@7NNf@=@ɝےCNY+Qf@w6@1NŮf@Н@*Njf@sՈ@pK&Nf@z>@Hj1Nf@0[O@j UNf@^%ዒ@a)NY+Qf@#>:{@0FMŮf@?@J\Mjf@nqj@.LMf@6T<@vةMf@n+6@4!Mf@0@(MY+Qf@kx@ɴ1eMŮf@&ȋ@ SLKMjf@v_@Z;Mf@5 M@r^Mf@J@,3ŮMf@<Տ@1"MY+Qf@l{@$i7MŮf@tw@ITMjf@JE3э@d,Mf@]Δ@%Mf@@,kMf@j?@=ޙDRMY+Qf@KX@dL)LŮf@t1Õ@W2Z_Ljf@Ƹٕ@F}hLf@8+Xw@X#Mf@uAi@<ټMf@Z@ĢfkMY+Qf@';@:MŮf@lf@FاHMjf@9r@L Mf@G@BRp[Nf@ P@&|yQNf@HG@2TGNY+Qf@Lv@ 376NŮf@/C@fj&0Njf@>Uơ@H),Nf@US9뙒@#Nf@z)P@1+yNf@@3$@1РNY+Qf@W1ן@mP:NŮf@r~@ޭ{9Njf@ٺ@;Nf@yփ|@_#Of@'@dp@)DOf@S7bc@sonOY+Qf@ E@rlOŮf@Y@MOjf@*@rUzOf@&@a?6Of@WU+@NПgOf@V@OY+Qf@/i@ OŮf@Z湗@fPjf@a闒@Լ Pf@Iu@[ 4Of@ @FxeOf@@H2Gu-OY+Qf@Tꐒ@cOŮf@Nf@g_@@P"NY+Qf@&$ӈ@`yNŮf@uO͇@;^Njf@P?41@ozUNf@T@k$Nf@AVȌ@XNf@=@gNY+Qf@w6@PkMNŮf@Н@mNjf@sՈ@ƏNf@T@Nf@AVȌ@Nf@=@NY+Qf@w6@NŮf@Н@Njf@sՈ@Nf@?Pt!(t.GQ %)= M{N$6ۿ ?  ?  tcoedge coedge  : 9 f \  ]dV%? tcoedge coedge  ^ _  4 0 `4P h tedge edge  \ a4P h?  b tangent W7ün(C? pcurve    exppc nubs4P h? } -DT!  coneT@@Kf@? ?@ -DT! } pcurve    exppc nubs+0+L .?+0@?+L .@MbP? spline  ref tedge edge  %+L .@ <+0@ # c tangent Oo'? pcurve    exppc nubs+L .@+0@+L .@+0@MbP? spline  ref tcoedge coedge  2  d e  f!@"xYMcv'@ tcoedge coedge   2 @ `  g!xYMcv'!  pcurve    exppc nubsuV%:<?!@\>!@MbP? spline  ref0 tvertex vertex  7 h[f}?tvertex vertex  A iQN?ellipse curve  aK@ ŁKLf@ ߴsAaK?_Hl=|=P??  coedge  j   D $  pcurve    exppc nurbs,T!*T!<hK@@x(@?v % @lR{(@$k?~MaP@*)(@?BG O@Y,'@Q*k?> O@%@?:0yE> plane4T%@Qf@5^<?5^< ellipse curve  +@^aMf@ȼ&_8L#FJ=,nŭT=? ellipse curve  @EMf@?@3>ϘT @?  edge    @ \ @ 8 k tangent  edge  a  ? l tangent  point  ;tՈ@Mf@ point  T@Mf@ pcurve    exppc nubs] h?+L .@VMu<+L .@MbP? spline  ref ellipse curve  wA@ף"בLf@0=@?  coedge  # K m n $  pcurve    exppc nubs+0si0+L .4T%Tњ(@A_JCq:(@;nQ^(@cky}(@628G9(@6ަpu(@CDcopu(@? plane4T%@Qf@5^<?5^< tcoedge coedge  I o p q $ r}3)% h}  face s t $  u  point  wA@ϣ"בLf@ coedge   *  v ~  point  wA@6sQ`f@ vertex   wellipse curve  @-uӜRf@H˪?6j CenĿ? ftreemeg attrib  /C  face x y   z cone surface  @rOf@?lvlv@? ?@  coedge  1 R 3 Y V  loop  R V straight curve  @P`f@? @&23? xs:d.@tcoedge coedge  4 3 ^ { 5 |?T!  edge N 6 } h? 3 ~ tangent  face  : 5    point  @P`f@ vertex  9 ellipse curve  |@Nf@?x+R@?  -DT!?ftreemeg attrib  : cone surface  |@@Kf@?lv@lv? @ tedge edge   i!xYMcv' =! @  tangent Ya? pcurve    exppc nubs!@NW"@g.t#@Հ*)$@D%@%$&@!xYMcv'@,xWwl?7@?l z ^L`?#6bn@I}?q^~M?z#r֪?S-BX?"6fc5?nP(~9?ݗ0?? ?Z?ĵ?@*,d?@K?MbP? toruswA@Jf@?@? intcurve curve   bldcur+L .@si0@+0@? spline  rbblnsur blendsupsur plane4T%@Qf@5^<?5^< null_curve nullbs@@Q@e@ blendsupsur toruswA@Jf@?@? null_curve nullbs@@Q@e@ intcurve  offintcur nubs_yC3%E?|>t @3fL@^+!@Ng #@(@N+@+L .@: f0@\J2@>oȆ4@<6@A ;7@|hj9@E.9@ d@If@F񐇒@P(!If@  @>If@a!p@` [3Jf@Y.@%r6Jf@REއ@h(*gKf@9@E\Kf@t.@#4Lf@53M@/!oLf@HpUa@ŧ,Lf@[)„@^p6!Lf@ @C\޽Mf@}d@8R*KLf@VBڥ@8:v} Lf@T@sSaLf@뫒@gzW)RLf@'@У"בLf@ ii@У"בLf@6dc>@fzW)RLf@4.1@sSaLf@O@8:v} Lf@4dKƾ@8R*KLf@N&Ê.’@C\޽Mf@!+rȒ@ Lf@˒@ثLf@TXΒ@AtSLf@ΓΒ@2҅iLf@LQ7ϒ@bLf@0zђ@/_Lf@b9Ӓ@6#Lsf@G Ւ@pGKsf@/%Ւ@F%XKf@|Ւ@">!߰Kf@2-b֒@RKf@@@ toruswA@Jf@?@? plane4T%@Qf@5^<?5^< nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?? ?? +L .@si0@< 1@J6]4@A ;7@A6;VNE7@νLӋ7@֨7@[Żq8@A8@e5]8@%?y9@|#)b9@?>lj.@Pl/@1<=20@: f0@BbV0@K++41@T:1@\J2@FR2@1Dj2@2@D3@m3@9%3@'T864@>oȆ4@H@4@"5@Zk5@@75@¯R6@vnO6@*cA6@<6@A ;7@F˦7@U=8@ӕ8@|hj9@ null_surface nubs+L .@+0@?+L .@?+0@ nullbs   ftreemeg attrib  E# cone surface  '0В@Qe@?@? ?@  coedge      F tcoedge coedge   H 2 \ g dV%<  loop   /  pcurve    exppc nubsSF; ?[Ec&?SF; @??[Ec&@MbP? spline  exactsur nubs???[Ec&@sK!@ʳR␅!@O݉s%@C)@L ƒ@SKLv}:Vf@ބkƒ@L^A[]L Xf@oŒ@ϐqDqL̚k Yf@_[mÒ@Z6L_i.Yf@.*@zKǎLXf@ͱ+i@$(KK.qVf@g:ƒ@J9,Lc~LүJ$f@CAƒ@KQgL,M$f@٠ Œ@*]L>[!f@YpÒ@2FK# _G f@Cu’@7*IK| ^f@hǒ@TUfL.0f@kǒ@iRLĔf@#zǒ@gdiL{_e@/ʹŒ@5[Le@|gĒ@ *~/KPTe@" %Ò@#ͣ KxXe@VBWȒ@nULmV _e@(rdbȒ@])LI ,qe@>]Oǒ@v"qL5e@+0ƒ@eΟDL*e@kJIJĒ@9TKe@ Q'Ò@cfKwae@>Aɒ@x?-ʠLE.e@ =Mɒ@8iL-e@^խȒ@dRk|LSٿe@v!aƒ@˴!LQBce@ƇĒ@k?L6:R7e@8H’@K8 e@wOɒ@TLQ媯e@&3ɒ@zӾL]2e@[& ɒ@iZL$ Ƭe@J,uƒ@`"LNڥe@ ڛĒ@{ǏLϿɜe@'’@3׵Kԡʟe@@j1ʒ@2x̿Lgäae@M"hL3ʒ@AƎLqD e@Gaɒ@2&.{LAe@D_fƒ@2pALވ e@|·Ē@?L'e@ZڒW~’@HzK97'0e@?sK!@ʳR␅!@O݉s%@ ?  ?  tvertex vertex  ` \OJO?intcurve curve   bldcur?[Ec&@sK!@SF; @t'? spline  rbblnsur blendsupsur planeDxgzǒ@Qڂf@ ?t ~:?t ~:ƿ ? null_curve nullbs@@Q@e@ blendsupsur toruswA@Jf@?@? null_curve nullbs@@Q@e@ intcurve  offintcur nubs\ɲc@a2@?[Ec&@BicS @vI0M #@܈}&@C)@\@-[qL0sg@}v @kL_ g@-Gx@LL9f@R@Mxf@_X0O@,M z+f@rc@ V6Lcw1nf@V Qǽ@|L\f@p~@%!@ܳLޮ!@~\"@vI0M #@POY#@)meݑ$@qU%@܈}&@V-&@}$'@N0(@ null_surface nubs?[Ec&@SF; @??[Ec&@?SF; @ nullbs    coedge   M P o m  coedge  M  ] { m  loop  k  straight curve  x@J@`f@  edge  " Q k  tangent  point   @J@`f@ coedge  W  S r l  edge  s$@ YX@ q  unknown  vertex  r straight curve  @E@`f@ ? {cD@ftreemeg attrib  U]  face   x   plane surface  @J@`f@? ellipse curve   @E@e@? H H?  point  @E@e@ coedge  ^ ]   _  edge  ` "@ l  tangent  point  P@J@`f@ coedge   f b ~ l  edge  $@ hX@ b  unknown  vertex  ~ straight curve  x@E@`f@? {cD ?@ftreemeg attrib  d`  face   l   plane surface  x@J`f@? ellipse curve  P@E@e@? H@ H?  point  x@E@e@ coedge  q    l  coedge      q  coedge   s     coedge    s    edge  @ @[@   unknown  coedge   t w    coedge  t      loop   y  vertex   ellipse curve  x@Jd@lv@lv?  coedge  w v   x  edge  y$  w  tangent  point  x@Ld@ coedge  {      coedge    {    edge   pFGs&4@ {  unknown  coedge   |     coedge  |  ~    loop     vertex  } straight curve  4@Zd@OL2?>%  edge   B*@ ~  unknown  point  4@Zd@ coedge        edge  -DT! -DT!?   unknown  vertex   straight curve  4@O@e@? ;`< ;`2@ vertex   straight curve  L@L@e@ ;`2 ;`<@ftreemeg attrib  O  face      cone surface  L@O@e@?lvlv@? ?@  coedge        edge  -DT! -DT!?   unknown  coedge        coedge        vertex   straight curve  D@H@e@  coedge        edge   @   tangent  point  D@v1O@e@ edge  $A@#@ [|@   unknown  coedge      ~  coedge        edge  )zJ4p@ xn¢S[@   unknown  vertex   straight curve  =kWA-@';CSQd@ ;`7 ;`7@ftreemeg attrib  N plane surface  D@@Q@e@H˪?6j Ce<|FSk straight curve  }gxb@@ M@jw!lTe@ i ?- nl=ma@ edge H  B?   tangent  point  }gxb@@Pjw!lTe@ point  }gxb@@X&Qjw!lTe@ coedge        pcurve    exppc nubs|h$:G`GT!  cone@?\(n5O_e@?? ?@ -DT! }tedge edge =  g h?   tangent J?]SG? pcurve    exppc nubsg hUd@ET! Ud  cone@?\(n5O_e@?? ?@ -DT! } face       point  '0В@뽨rP@ye@tcoedge coedge       wmFj@ 0v&h@  pcurve    exppc nubsg h??2 P@5f(?kP@MbP? spline  ref: tcoedge coedge       + R? tedge edge 7 m/= &R?   tangent K? pcurve    exppc nubs&Rm/Ĩ= 0v&h@*5? 0v&h@MbP? spline  ref: tcoedge coedge       Rs$=  pcurve    exppc nubs(f@ Uc @?(f? Uc MbP? spline  refB tvertex vertex   sɔoP?intcurve curve   bldcur Uc N(fm ? spline  rbblnsur blendsupsur cone'0В@Qe@?@? @ null_curve nullbs@@Q@e@ blendsupsur sphereͶʒ@Pe@-Oae@'ʒ@c,6$O phe@?1ɒ@F?O^$oe@N ƒ@5ryO e@jĒ@@ OuEe@Z’@^G+Oeɫe@@;8O fׯe@F?m@MƑ^OMތ~ e@>,@wOM_e@Ë@!ROje@ή/[@e΢aOKmf@’@WP77Sf@tQÒ@Z:Px0i)f@teĒ@#[PY 1f@@@ sphereͶʒ@Pe@-vlv@!D׿? @ tcoedge coedge       RR! tedge edge B  RR!?   tangent 苓? pcurve    exppc nubs67R?67R?RR!?67R?o8Ŧ?RR!?9 2>ڰ>R?䦿 R>9?#>e-??h0 ?c? ] ?x?r`6(>O?ɥ +?#(?x%q;?eē? 4B?S%a?<+0?HNI?xCUL ù@6.$?vԗ@MbP? spline  ref&  vertex   ellipse curve  ג@{(n5O_e@?f33K@`^L|@L@6ْ@@xm@'Ue@8(@|pu@3&r@|pu@ȸω@MbP? cone'0В@Qe@?@? @ tcoedge coedge       (f@ĸ Uc @ tedge edge > wmFj@  0v&h@   tangent x?? pcurve    exppc nubs 0v&h=ܙN6iBwmFj@@̫@Eq8@f%>r?h>͈R@:c? ^ @~}>-DT!  cone׼@%\(n5OVWf@t ~:?Gm]= t ~:ֿ? ?? -DT! }intcurve curve   bldcurU%@$#'@ з(@롕? spline  ref  null_surface nubsU%@з(@U%@ з(@ nullbs   tcoedge coedge   J    h 0B"+h?  edge C  Ud   tangent ftreemeg attrib   plane surface  Udڒ@Qe@ tcoedge coedge       ;@݆mW!@ tcoedge coedge    E   ݆mW!; tedge edge 1 ac(= R?   tangent ӘK? pcurve    exppc nubsac(=R?D#?A7-@kʕ?=,@MbP? spline  ref.  coedge      F  edge  t%8B@ =_{|@   tangent tcoedge coedge   f   g ?[Ec&@SF; @  pcurve    exppc nubsr ,h?VO?!x @VN?Օ @MbP? spline  refW tvertex vertex   4M.?ellipse curve  @nW@U$בL.~:f@Dg ~:ƿZ+=??Kd ~:?? ftreemeg attrib    face      cone surface  =1y@أ"בLMf@t ~:ƿB`\5< ?t ~:ֿ? ?? -DT! } point  MȒ@"בL=e@ftreemeg attrib     loop    spline surface   exactsur nubs ??a?a@FrM@ R@49l_!@ zb$@#G&@ -v'@ Xt5@@Qjke@`D@ Z1Q6h^e@p@"Q+2e@K@^nQ7 -e@ @15 Q !e@ z@ Q+Af@eFRͲ@A&Q#C e@ @)yQ e@og1|@G Q6+re@a=@敻Pڿ-e@i@'@2Pe@wV(@ZPf@4α@  Qre@䟱0@DNtQ '8e@S綒@.LJiPIQe@bѺ@Pbe@2J@WXJPF|e@ѩCػ@]P2f@5 @}^P\ZNe@l`L@7s%P(YTe@xW@۟P-4e@R[T@$P2bVe@}pͻ@!P@je@գx@߱6?P4g f@ @PO e@sY?@o/5Psde@_ Q@i3,P?2:e@9B6@ߤ-/Pve@-&ͻ@Q鈻Pxe@? r@3P?XXF f@Bͱ@l HlPzS-e@dR/@G jxPie@X䶒@%IȃP[%+e@^,κ@PX_e@@j=GPLTe@j>Mٻ@}čP4Rf@a˳@i_ ?Pʚ.*e@%㵒@w;!MP~U,e@q2@\PaMe@"iT@I!3kDpP>9(e@-d@Z@ !tP-e@;u@ rP[||1e@'*d@r;Oe@De&@qeUs0PuZe@aRXUe@u쾯P}ze@٥%@%7P»R(e@ȝa@٦APae@t=@q"DPuf@Bⱽ@GO ƥe@sB`@jvO/zNe@3l@M}OU %e@5T @5qFZP:)e@^A@P+Pe@-t@ˑ1Pa"f@ܮT=Ē@FQOO5e@Ē@tO"Fe@qfĒ@*ñLHO@B-f@>@*HÒ@ ,Ofpf@PO’@RkP֢f@2<@2PdI$%f@at~ƒ@f7Osf@x?ƒ@kiO` "f@$3ƒ@T ꟈOl&f@1zlNĒ@ѥO*܅80f@KJD’@&PUP5f@CJm@ԀP M9f@q(ƒ@kGO/Aef@E[Sƒ@U3TO2&ff@wխgŒ@PJ_O)ܫff@7 MÒ@nRO=Bdf@\.{@jqKPhaf@X5@Bm0 Pv^f@axWĒ@PO+1f@VgGĒ@jvPO־=f@:K-۷Ò@|O҃f@B7@ Õ|kO{f@y@7!Pruf@8h@e"PhfWnf@m@Owdf@<)@Y5OO,KFf@sgY@CІO3u樥f@)@8;O#f@:L@`-*OLaG΍f@U@~HrPV;ւf@ jf@kOwJyf@6}u@%4PO,f@ǺD@TpOIL %f@^'!s@(qBOra?f@EԻ@gD^P:FEf@s@ U PK~1f@t@b[uO4IRf@AD@KTOђڽf@86Z@nQO]1f@j{@hEO£ܨf@*EI@FAe3PpV;f@@[# Pc\f@mH9ܷ@vR O(f@l% @G5NVOBLҿf@PR$.@dVEOH8;f@ BI@rOߦVf@7C@PSf@Q~)@et P'5jbf@5K@{f$Of@Iυ@@YOf@nռ@aOz5-f@@JONѫf@8[UA@ɅPܔgf@b)#S@x P~Nf@?a?a@FrM@ R@49l_!@ zb$@#G&@ ?  ?   coedge      q  edge  @ 6@   unknown  coedge        coedge        loop     vertex   ellipse curve  @F@e@?lvlv?  coedge        edge  $    tangent  face       point  Ԓ@F@e@ coedge        edge  -DT! -DT!?   unknown  vertex   straight curve  Ԓ@F@@e@ ۈ'" nēL3@ftreemeg attrib  H  face      cone surface  @F@@e@lvlv@? @ straight curve  Ԓ@H@d@?  point  @H@d@ftreemeg attrib  e  face       loop    plane surface  @k%Rd@?;v@Qii  edge  -DT! s-DT!?   unknown  coedge        coedge        coedge        edge   @   tangent  coedge        edge  C!#.@ F@   unknown  coedge    N v   coedge        edge  "|$a aDž5,+#@  ! tangent  coedge   N   ~  edge  "@N ˓V9  # unknown  vertex  v $straight curve  @rwqSPe@? RUF [nxRb@ coedge  %      edge  + @ "@  & unknown ftreemeg attrib  B cone surface  @rwqSPe@lv@lv? @  coedge    & '   vertex   (straight curve  @>y\3mS@@e@? oēL3 و'(@ coedge  )  # '  ellipse curve  @>y\3mS@@e@ü\AW¼?! ?  @   coedge    A B   edge  C  C ]T)@  D tangent  coedge    E F   coedge  G H  A I  edge  B7b* JpWw@ @ K tangent  vertex  L M vertex   Nellipse curve  4@Ye@!#.<>%? tcoedge coedge  F     O;@݆mW!@  coedge   E    ellipse curve  wA@6sQf@H˪?6j Ce@n?<?  point  Hf@Qޓf@tcoedge coedge  ( & P Q  Rps!@ -v'@ tcoedge coedge   S & K  T% $`r7 tedge edge ' U% $ M`r7 & V tangent p GA? pcurve    exppc nubs`r7@V@BGlGv@~|@$]@>v@% $@+]?F ,9h|?îrq ?vIddv?ؓ '?ēY*Ȝ۳?j%kixk]=?-bLPnPn,5@뽚if_y@mTGh@"@Q-K@6Į,v@}"@}-DT! @MbP? toruswA@Pf@@  coedge  U ) ] ^ V  vertex  ^ _ellipse curve  wA@Pf@??  -DT!?ftreemeg attrib  +  face ` Z V  a torus surface  wA@Pf@@ ftreemeg attrib  /  face b  c  d spline surface   refW tcoedge coedge  _ ^ e f 0 g`h? tedge edge   h< iV%? 2 i tangent a e? pcurve    exppc nubs<V%?BK1 ?]J v'@r;?!*Xv'@MbP? spline  ref0 tcoedge coedge  [ 3 X { 0 j?T!? tcoedge coedge  3 [ j k 0 l QF=aT!?  pcurve    exppc nubs4P h?MbP? spline  refJ  vertex  D mellipse curve   T@Nf@?8T͙?? intcurve curve   bldcur+L .@si0@+0@? spline  refT null_surface nubs+L .@+0@+L .@+0@ nullbs   tcoedge coedge  m n 9 e o p"xYMcv'! tedge edge   <!@ h"xYMcv'@ d q tangent Phݹ3w? pcurve    exppc nubs!@"xYMcv'@!@"xYMcv'@MbP? spline  ref0  pcurve    exppc nubs!xYMcv'!?!xYMcv'@?!@MbP? spline  ref0  point  hK@+ŁKLf@ point  dN)#S@Mv(K'Of@tcoedge coedge  o ? _ k $ raT! 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T@b'? planeDxgzǒ@Qڂf@ ?t ~:?t ~:ƿ ? tvertex vertex   3y ?   edge  $ @  A tangent  point  @J@d@ coedge   >     edge  -DT! -DT!?  B unknown  vertex  ? Cstraight curve  @J@e@ ۈ'" nēL3@straight curve  4@L@e@?  point  x@L@e@ coedge        edge   Dx:@  E unknown  coedge        coedge   F     loop     vertex   Gstraight curve  @qW"Zd@OL2?>%  coedge    H I   edge  J 3@  K unknown  face L    M  point  g+߈@Tq\d@ coedge  H N   O  edge   $@  P unknown  vertex   Qstraight curve  g+8@:;]d@? ftreemeg attrib  >  face R S   T plane surface  4@Z`f@>%2bOL22bOL2>%? ftreemeg attrib  Q cone surface  ,@Kd@lv@lv@? ?@  coedge    5 U   edge  6 @  V tangent  point  ,@H@e@ coedge   5     edge  ,zJ4p@ .@  W unknown  vertex   Xstraight curve  D@Kd@ ;`7 ;`7@ellipse curve  ,@v1Od@?!vlv@!D׿? @ null_curve nullbs@@Q@e@ intcurve  offintcur nubsn,O He^ _ʫ}?h;2m@ V@lw @ 3$q@*>U@Ž@݆mW!@*>?$@|l'@" *@G,@?нK-Y-@3.@S/0@mW1@O?V3@_Aoޒ@:KPpIe@pޒ@c^O fpe@r‰Œ@&GOzKe@> Ē@ \OHe@P7’@-0O؄e@.\@\(n5Og*e@ T@\(n5O'e@lr@-0OAS e@[v@ \O8GB6f@>ѧH’@&GOf爠f@nĒ@(I">Ol 2f@?Œ@84N~1w=f@+Ȓ@֯O n`Lf@_7Oɒ@)|O]cvlv@!D׿? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?롕? ??n,O 7v Mv޴%,+X_y4&zΗJ| ӿ֎?zzX@lVG@ן@݆mW!@롕?){ m He^ (~ G9 !O_N y͖5:}߿ʫ}?ʫ}?Biq?ʫ}?u?n s?9V3C?h;2m@G/d@ V@TE@lw @pjh @i"ZY@̳%@ 3$q@i5E*w@8f@b;*@*>U@K#@}#@aH@Ž@aS@io5@$) @\Rx @ null_surface nubs;@܆mW!@?;@?݆mW!@ nullbs    pcurve    exppc nubs݆mW!xO D0 Zq.`97Ƴ;T@ȸω@T@* &r@U5Y@8(@L]@gxm@8C1fg@L@xo@>3K@Y=o}@c|@G2@d@𝡲[@V;vk@N%)@h@%@/ X@J1s@)'=?<@Or\@I @nߒE@MbP? cone'0В@Qe@?@? @ straight curve  MȒ@Q=e@? intcurve curve   bldcurĸ Uc N(fm ? spline  refa null_surface nubsĸ Uc (fĸ Uc (f nullbs    pcurve    exppc nubs"+hh 0B=׼=)OT! t=e cone׼@%\(n5OVWf@t ~:?Gm]= t ~:ֿ? ?? -DT! }straight curve  a@ΨrP\f@p ~:?=  point  ΍ ,-Ē@ΨrP3]7e@ point  MȒ@\(n5O=e@ pcurve    exppc nubs`r7@% $@`r7@% $@MbP? spline  refF ellipse curve  7nW@(n5O.~:f@ ~:ƿ?G%?< 6? יTl0?? intcurve curve   bldcur;@ן@݆mW!@롕? spline  ref null_surface nubs;@܆mW!@;@݆mW!@ nullbs    point  56ʒ@V#Obwe@ pcurve    exppc nubsSF; sK!?[Ec&4T?Do(@b"?`#(@SlV?!(@?,p?\:\S(@d?@wb(@6t?VO(@[Wj@dњ(@t'? planeDxgzǒ@Qڂf@ ?t ~:?t ~:ƿ ? intcurve curve   bldcur?[Ec&@sK!@SF; @t'? spline  refY null_surface nubs?[Ec&@SF; @?[Ec&@SF; @ nullbs   tcoedge coedge    s *  Zos!@ -v'@ tedge edge  U< 1V%?  [ tangent } e? pcurve    exppc nubs<V%?r;?=l!@FM1 ?!@MbP? spline  refj  coedge        edge  -DT! -DT!?  \ unknown ftreemeg attrib  G cone surface  @F@e@?lvlv? @ straight curve  Ԓ@Hd@?  point  Ԓ@Fd@ coedge   %     edge   D@  ] tangent  coedge  ^      coedge   ) >    vertex   _straight curve  4@L@@e@?  coedge  ` -     edge  @ 3@  a unknown  vertex   bstraight curve  4@T@d@  coedge    9 c   edge  -DT! :-DT!?  d unknown  edge  e-DT! -DT!?  f unknown  point  4@O@@e@ point  4@O@d@ edge  1޿ MK? % g unknown  point  @^(@׸R@e@ point  aJT9_@ΏR3Ce@straight curve  @TT@@e@  edge  8hGjP hjGj7P ) i unknown  coedge  9 , ^ j +  edge  k $@ , l tangent  coedge  - m /    loop  ` ; straight curve  4@T@d@¸O??  coedge  0 / n o 1  edge  p 23@  q unknown  face r  1  s  point  dތy|7@V@d@ coedge   4  t 2  coedge  n u 4  v  edge   w$@ 4 x unknown  vertex  5 ystraight curve  dތy|@ AV@d@?  coedge  6   z 2  point  @TT@@e@ftreemeg attrib  ;:  face {  v  | plane surface  4@T@d@¸O?¸O??  coedge  } =  t :  coedge  = } ` ~ :  edge  к@ 2yf:@ =  tangent  coedge  ? >  z   edge  Zm]9 hк   tangent  vertex   ellipse curve  4@R?DS@e@˿x@ ?  vertex  B straight curve  @k%R@e@  point  @HdaY@e@ coedge   E    ellipse curve  @HdaYe@?W;Vi!#.<>%?  coedge  H G N  I  coedge  F  H    edge   J@ H  unknown  face   I    edge  J@ 3@   unknown  point  @qW"Ze@ vertex  L straight curve  4@Zd@? tcoedge coedge  P  X   .ga6@1YS78@?Oc͇@.Q|@s"@ @qg`!@8V&"@Cn[$@km%@ -v'@2%0(@-/}Ql*@h,@n,"-@SOZ0@ub1@]!f2@FJk4@yZ@@@QYf@i̩@8p*Q°*f@t7@< Q޷G"&f@pXਲ਼@kPf@r@LRP#7zf@Fօ@lePW2`f@]^-@MlhPg-Ef@ܵ@!7)P7e@,Pɶ@UP(\PXe@n筸@ '9O,K|7f@z.@^Q؋ONf@8@On f@ldփ@4mrOXf@G4!@?TOI`DIf@J0@;cHOv;$f@$>1@>%5O%I3f@T@Nm.Ov ;f@m>@DϐG.$OqKJf@1M@Tcb OQxRf@^:9@!ť4O!f`f@==@ʦO\gf@ /@ˠOiVsf@U6I@"=OΌxf@jK__@O| @[~f@ξ6R@0BOf@hlzS@J:(Of@ X@,^f.Ok~f@Q3ʎ@G#=OSyf@!߸@GO+uf@!jL@`OKkf@L2@è( qOdf@mʮ@yz&;O =Wf@FX@EIO@1Pf@n9@1-IOZQ@f@\tM@ʛP J9f@ @`x0?P$`N,f@]뮒@4mx[PƜ&f@ҳmdQ@.Pcռ`| f@ͩ'k@qtL6DPa(Hf@]A@xPr\!f@#{ @}Q5%f@ENw@@Q X,f@@@ toruswA@Pf@@ conehK@Q@f@?@? ?@ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?wM=ټ? ?? a?a@FrM@ R@49l_!@ zb$@#G&@ -v'@wM=ټ?3ȫ?ȫ?zc?ȫ?H?E ?G.ga6@R@G@t&@P-h@(̩ @Yтj @-@1YS78@Vv@8TQ[@Q,3@?Oc͇@q@~A@r{@.Q|@ nŭ?  edge X 1x2\@ hfњ(@   tangent tedge edge   1os!@ t -v'@ s  tangent m ݹ3w? pcurve    exppc nubs -v'w&$fb%- $JTE#nž"os!k#\?`DT!qU?r@@XQwl?ԿOkɌBĜ#?޷[,-?ЀDzZm6?hAE徙j6?zZ.F Ig6?|b1&Xe2-?Ȱ'bvR#?멡0lgh?)ڿe%  coedge      O  loop  N S straight curve  g+8@:;]`f@OL2>%?  point  g+8@:;]`f@ftreemeg attrib  ?  face   O   plane surface  @qW"Zd@>%?2bOL2?2bOL2?>%  edge  -DT! 6-DT!? 5  unknown straight curve  ,@Hd@? ;`7 ;`7@straight curve  D@@Qd@?  point  D@Kd@ellipse curve  @ Kf@vzƿ^TbK?3ݎ9?8t7e?a.r?? ellipse curve  @Fd@lvlv? straight curve  @-DT!?   unknown ftreemeg attrib  ; plane surface  4@T@`f@?¸O??  coedge    u  :  edge   @  a unknown  vertex  t straight curve   ۨ@& 6S@e@¸O? SI Y 42A@straight curve   @?/S@@e@?¸O Y 42A SI @ point  4@T@e@ point  @%??  point  4@Z`f@ pcurve    exppc nubsvuV%<|d)> -v'@9? -v'@MbP? spline  refj ellipse curve  rK@:~f$Of@ ߴO@aKu _*zv?I.'O??  pcurve    exppc nubs] h?;LԠ^}|;LԠ-DT!  cone@.\(n5Of@?ޛVۼ? ?@ -DT! }ellipse curve  wA@.\(n5Of@@1T??  point  @L(n5Of@straight curve  L ƒ@Qw ~:Vf@? intcurve curve   bldcuros!@ zb$@#G&@ -v'@wM=ټ? spline  ref null_surface nubsos!@ -v'@os!@ -v'@ nullbs    point  L ƒ@Y|f$Od}:Vf@ point  ,@Hd@ point  L@L@d@ coedge  > ^ <    edge  @-DT! k-DT!? <  unknown straight curve  @L@e@?  point  @J@@e@ point  @% ellipse curve  ,@Kd@?lv@lv@? straight curve  L@L@d@? ;`7 ;`7@ point  L@L@@e@ point  VA@\PS@@e@straight curve  @L@@e@  point  x@L@@e@ coedge  u n m  v  edge   p$@ m  unknown straight curve  dތy|@ AV@`f@¸O?  point  dތy|7@V@`f@straight curve  @TT@d@?  edge  w ~ʼ4@ }  unknown  point  @TT@`f@ellipse curve  VA@\PS@e@?΀¸O<j\sQ?LF@lv?  vertex    point  @TT@e@straight curve  4@Z`f@@%?dOL2?  point  @qW"Z`f@ellipse curve  x@J@@e@?lv@lv@? straight curve  @qW"Z`f@OL2?>% straight curve  4@T@`f@¸O?? straight curve  @TT@`f@¸O?  point  4@T@`f@ End-of-ACIS-dataA  L9y? 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ACIS BinaryFileMegaCAD 2013 3D ACIS 22.0.1 NTFri Apr 06 16:20:35 2018?ư>|= body    string_attrib name_attribgen attrib  ATTRIB_XACIS_NAME R2 umlaufend lump    shell     face      ftreemeg attrib    face    loop   cone surface  @ң"בLf@ޛVۼ<? ?@ -DT! }ftreemeg attrib    face       loop    spline surface   exactsur nubs ??Pt!'c.Gb[ %= 8M{N$(6ۿ@ѣ"בLf@@*jLf@@~3pgLY+Qf@@&LŮf@@Kjf@@JbKf@=8@ѣ"בLf@y@@*jLf@#i㕒@~3pgLY+Qf@/+r@&LŮf@m0@Kjf@\͖@JbKf@̕t@@Lf@OP @=fLf@І˗@Ë$|LY+Qf@阒@gBg/LŮf@ҵ]@gהLjf@ϙ@/NjLY+Qf@[iI@´5ULŮf@B @@m&F:Ljf@}aN@T*Lf@aqIs@RLf@@\+WmLf@ @`pTLY+Qf@֛玒@҃f}6LŮf@y.)o@QLjf@Ah(@~N~\Lf@liJݒ@r=QLf@bo* @f!Lf@{>@kLY+Qf@2O@wLŮf@"7 @XiKjf@,We@&>Kf@n@ѣ"בLf@:5"IG@*jLf@\@~3pgLY+Qf@4Rݒ@&LŮf@CB’@Kjf@H'@JbKf@@ѣ"בLf@@*jLf@@~3pgLY+Qf@@&LŮf@@Kjf@@JbKf@?Pt!'c.Gb[ %= 8M{N$(6ۿ ?  ?  tcoedge coedge       ] h? ftreemeg attrib    face       loop   spline surface   exactsur nubs ??+L .@si0@< 1@J6]4@A ;7@A6;VNE7@νLӋ7@֨7@[Żq8@A8@e5]8@%?y9@|#)b9@wA@У"בLf@wA@)jLf@wA@~3pgLY+Qf@wA@&LŮf@wA@Kif@wA@JbKf@j@У"בLf@:i@)jLf@իG@~3pgLY+Qf@q3-@&LŮf@]p67@Kif@+=@JbKf@*8W@1Lf@ecu@a5[2Lf@S\@klKiL,u8f@s yŲ@^d LdVf@pALز@:KECf@'䲒@8BE5K7UIf@L굒@ppLf@N&@&4Lf@56a@ʒoLǨûf@͆(¶@dWLb[f@&綒@1|vKK}9f@: @ݡCnK`b{f@c@ +ʒ@6CKa_z/f@a,1B˒@w~KB1Jof@#Aϒ@ݥԄLf@S"DΒ@@**1CLf@S9̒@gw-MLWif@iMׇP˒@DyKF@f@=˒@C wʤK@of@,b˒@RK of@dHВ@ 2,-zLf@KΒ@/9Lf@=P͒@H͟KVf@3͓˒@κKf@cT˒@"=:Kk f@M˒@OKx孳nf@? gВ@0YsLf@iHΒ@Z3Lf@c-͒@4 K3Jf@\`˒@b+KTtЖf@"Ղ˒@KTif@u .˒@FZ雫KTsnf@ -ђ@R6`Lf@.ϒ@"Lf@%xΒ@ETK-f@igD̒@6V 4K gf@׵=˒@1AKIVԀf@h̒@틠KXmf@[ʢђ@vtTLf@4В@x_kLf@sΒ@K0K| f@h=̒@7KX*f@Iz?y=̒@mKgk~f@H*̒@UKoxtmf@h\zҒ@4;Lf@廻_В@Lf@E#ϒ@*K.:&f@͒@x6!K/ʵf@>̒@SN@qxK If@ H͒@] KPlf@JҒ@zBb-Lf@,Z1ђ@Kf@{Boϒ@:Kz;f@ U͒@ZzK9@~f@#0i͒@~7_dpK5f@t͒@|鲁K^jolf@ FQmӒ@ShLf@焦ђ@(!HKf@h'1Zϒ@!"K#o.ڵf@֐͒@..oKº/f@Jc͒@sǠcKf@V7͒@.etKkf@WF9Ӓ@6| Lf@_ђ@? Kf@В@6frKUǸ̵f@jz͒@2 àfKs f@zF+͒@]]K ~f@]"'Β@=(~nKe>5kf@v6Ԓ@-l.Lf@- Ғ@GKf@%8В@dI5KRƵf@Ck͒@D|bKU.df@.%u͒@Un#ZKx~f@SˤBΒ@Z@jKE[Wkf@o|Ԓ@9QeKf@NY~Ғ@mKf@ۏ̾В@sKiof@z6Β@Z"XKeĔf@<͒@:ÌPKGk~f@GpΒ@Qcָ`KӼSYkf@ Ԓ@( Kf@,AҒ@?8Kf@ 2В@DK,K/f@MĽ[Β@!QRKV䦔f@uΒ@R4cJK,CO\~f@_"Β@$,mZK,kf@_:Ւ@*};NKf@U!Ӓ@z,Kf@Qђ@TP zK޿f@_Β@5oEEK͸]mf@dOΒ@G;> >K ~f@ITϒ@#bMKjf@wՒ@+8Kf@-UӒ@2sKKf@+;ђ@,rKbꗵf@&PsΒ@㷉>KhQf@@rΒ@7KP}f@'ϒ@FKv=Ijf@ưՒ@3.wKf@ Ӓ@",8Kf@ԗ̱dђ@\ iKՕf@OΒ@C7K7f@cʒΒ@}F,1KX }f@gLϒ@Э?Kjf@? si0@< 1@J6]4@A ;7@A6;VNE7@νLӋ7@֨7@[Żq8@A8@e5]8@%?y9@ ?  ?  tcoedge coedge     !F?_ =hh?  coedge  " # $   coedge  " % &  tcoedge coedge     '] h tedge edge  ( )] h? * tangent rۼn(C? pcurve    exppc nubs] h?@j}@-DT!  cone@ң"בLf@ޛVۼ<? ?@ -DT! }ftreemeg attrib    face + , -  .  loop  /  cone surface  T@@Kf@? ?@ -DT! }tcoedge coedge  0 1 2 3  4Vy@<uV%? tcoedge coedge    5 6 7D^Q,T!? tcoedge coedge    8 9 :QT!? tcoedge coedge  ; <   =hhF?_ tedge edge  >F?_ = ?hh?  @ tangent چbC? pcurve    exppc nubsF?_ =hh??bܪ3n0>d dMbP? spline  ref tcoedge coedge    A B  C] h?  coedge  5 D  $ E  edge  )@ F;LԠ@ # G tangent  coedge  H I  & J  edge  K;LԠ ( % L tangent  pcurve    exppc nubs] h?MbP? spline  ref  vertex  M N vertex  $ Oellipse curve  @ԣ"בLf@?@1T??? ftreemeg attrib    face P Q R  S  loop  T  spline surface   exactsur nubs ??!@'#@ػ$@jzG'@e۰h+@/y/@fD- 2@XGN\3@IJk4@5K@zmKLf@Iυ@qA[]Lf@nռ@;qDqLz5-f@@[b6LNѫf@8[UA@nzKܔgf@b)#S@}(K~Nf@mH9ܷ@%L(f@l% @IʱLLBLҿf@QR$.@[sLH8;f@ BI@LvCLߦVf@7C@9~PKSf@Q~)@45K'5jbf@t@$#L4IRf@@D@RmLђڽf@86Z@1uuL]1f@~j{@vmL£ܨf@*EI@s}4KpV;f@@HKc\f@ jf@96'LuJyf@6}u@jGL,f@ǺD@ 8xLGL %f@^'!s@؎?K Lqa?f@EԻ@2wBK8FEf@s@US~KK~1f@m@\].Lwdf@=)@3GL)KFf@sgY@'/yL/u樥f@)@k-!L#f@:L@|WLJaG΍f@U@nKS;ւf@pxWĒ@TQL1f@dgGĒ@ Lt־=f@HK-۷Ò@[xLR҃f@B7@O’@(KԢf@'<@oh6KcI$%f@зⱽ@LZLHƥe@B`@1/L$/zNe@3l@g$LS %e@x5T @rKK_8)e@˯^A@ȁ^ K?e@-t@nKa"f@)d@eaL(e@+De&@p-UKZe@RXUe@ 'K{ye@%@5RKR(e@a@\L|Kae@ft=@@ uvKֻf@a˳@"AKH.*e@%㵒@~dKU,e@q2@XFKvaMe@iT@1)wK;9(e@d@Z@xKK-e@;u@ýKϜ||1e@iBͱ@]o'K T-e@cR/@P+KÖie@X䶒@RnmoJ`%+e@S,κ@oۣJ.X_e@@pJLTe@j>Mٻ@WvJ0Rf@ @9JO e@sY?@ԎJwde@_ Q@wYvJA2:e@9B6@bJve@.&ͻ@V-J؊xe@? r@؊J^XXF f@5 @bBYJq\ZNe@l`L@մ_JYTe@xW@ hHfJ-4e@S[T@RlJv2bVe@~pͻ@H,lJ@je@ڣx@ԖhJg f@.4α@XǾIkre@0@rcI&8e@S綒@dk ,JIQe@gѺ@/ڱ*Jbe@6J@L)(j-J |e@ѩCػ@4D?%J2f@eFRͲ@K:|IC e@ @=t6 I e@yg1|@pUI?+re@a=@T2ԈJڿ-e@m@'@ؙ Je@{V(@JJf@ Xt5@Ijke@`D@JI6h^e@p@,XVI+2e@K@^B#I7 -e@ @8I !e@ z@fffffI+Af@?'#@ػ$@jzG'@e۰h+@/y/@fD- 2@XGN\3@ ?  ?  tcoedge coedge  < ; U V  W4P h? tcoedge coedge  A  X Y  Z+0+L . tcoedge coedge   A D [  \+L .@+0@ tcoedge coedge  ] ^  3 - _uV%Vy@ tedge edge  `: auV%?  b tangent {[eJ? pcurve    exppc nubs:uV%?T0@?B[@.0@MbP? spline  ref tcoedge coedge  c #  6 E d,T!D^Q< tedge edge  ?D^Q ),T!? 5 e tangent ;I% %? pcurve    exppc nubsD^Q-p8R?Zp8R?,T!?pp8R?Ʀ?,T!?ܪ3n0>d dV,fgW6,@?40ٕI?I[TRA?R&SdZ1?] gc3տt>uf\?eː? oūWt?;\0>7 S>̴׿SB2>>?ǿ(Sc=MbP? spline  ref tcoedge coedge  f g  9 h iQT! tedge edge  ( >QT!? 8 j tangent (҈l? pcurve    exppc nubsQT!???o bMbP? spline  ref  coedge  /  k l   coedge   / c m   pcurve    exppc nubshhF?_ DT!  ~ coneT@@Kf@? ?@ -DT! }tvertex vertex  9 n-> vertex  6 oellipse curve  2T@wnM f@v,Jb=?.4۽T=?? tcoedge coedge  1 0 " B  p] h tedge edge  F K] h? " q tangent ܼn(C? pcurve    exppc nubs] h?|;LԠ@-DT! ;LԠ@l} cone@ң"בLf@ޛVۼ<? ?@ -DT! }tcoedge coedge  # r 1 [ E s+0+L .  loop  t u  vertex  $ vstraight curve  @ң"בLf@@  coedge  w % x y J  coedge  % w f M J  loop  % z  vertex  & {straight curve  @JbKf@  edge X (:JV? |-DT!? f } tangent  point  @IbKf@ point  @ѣ"בLf@ftreemeg attrib  ,  face ~    loop  , spline surface   exactsur nubs ??Pt!(t.GQ %)= M{N$6ۿT@Nf@AVȌ@Nf@=@NY+Qf@w6@NŮf@Н@Njf@sՈ@Nf@T@IXNf@AVȌ@7NNf@=@ɝےCNY+Qf@w6@1NŮf@Н@*Njf@sՈ@pK&Nf@z>@Hj1Nf@0[O@j UNf@^%ዒ@a)NY+Qf@#>:{@0FMŮf@?@J\Mjf@nqj@.LMf@6T<@vةMf@n+6@4!Mf@0@(MY+Qf@kx@ɴ1eMŮf@&ȋ@ SLKMjf@v_@Z;Mf@5 M@r^Mf@J@,3ŮMf@<Տ@1"MY+Qf@l{@$i7MŮf@tw@ITMjf@JE3э@d,Mf@]Δ@%Mf@@,kMf@j?@=ޙDRMY+Qf@KX@dL)LŮf@t1Õ@W2Z_Ljf@Ƹٕ@F}hLf@8+Xw@X#Mf@uAi@<ټMf@Z@ĢfkMY+Qf@';@:MŮf@lf@FاHMjf@9r@L Mf@G@BRp[Nf@ P@&|yQNf@HG@2TGNY+Qf@Lv@ 376NŮf@/C@fj&0Njf@>Uơ@H),Nf@US9뙒@#Nf@z)P@1+yNf@@3$@1РNY+Qf@W1ן@mP:NŮf@r~@ޭ{9Njf@ٺ@;Nf@yփ|@_#Of@'@dp@)DOf@S7bc@sonOY+Qf@ E@rlOŮf@Y@MOjf@*@rUzOf@&@a?6Of@WU+@NПgOf@V@OY+Qf@/i@ OŮf@Z湗@fPjf@a闒@Լ Pf@Iu@[ 4Of@ @FxeOf@@H2Gu-OY+Qf@Tꐒ@cOŮf@Nf@g_@@P"NY+Qf@&$ӈ@`yNŮf@uO͇@;^Njf@P?41@ozUNf@T@k$Nf@AVȌ@XNf@=@gNY+Qf@w6@PkMNŮf@Н@mNjf@sՈ@ƏNf@T@Nf@AVȌ@Nf@=@NY+Qf@w6@NŮf@Н@Njf@sՈ@Nf@?Pt!(t.GQ %)= M{N$6ۿ ?  ?  tcoedge coedge  ^ ] - dV%? tcoedge coedge  / V R 4P h tedge edge    4P h? / tangent W7ün(C? pcurve    exppc nubs4P h? } -DT!  coneT@@Kf@? ?@ -DT! }tcoedge coedge  x 0 Y +L .@+0@ tedge edge  a+0 K+L . X tangent TF60? pcurve    exppc nubs+0+L .?+0@?+L .@MbP? spline  ref tedge edge   F+L .@ `+0@ D tangent Oo'? pcurve    exppc nubs+L .@+0@+L .@+0@MbP? spline  ref tcoedge coedge  T 2 - !@"xYMcv'@ tcoedge coedge  2 T - !xYMcv'!  pcurve    exppc nubsuV%:<?!@\>!@MbP? spline  ref tvertex vertex  [ [f}?tvertex vertex  Y QN?ellipse curve  aK@ ŁKLf@ ߴsAaK?_Hl=|=P??  coedge  5 < m E  pcurve    exppc nurbs,T!*T!<hK@@x(@?v % @lR{(@$k?~MaP@*)(@?BG O@Y,'@Q*k?> O@%@?:0yE> plane4T%@Qf@5^<?5^< ellipse curve  +@^aMf@ȼ&_8L#FJ=,nŭT=?  coedge  8 I M h  coedge  8 h  loop  8  pcurve    exppc nubsQT!rL#1-DT! @E'1-DT!?MbP? torus@Mf@x+R?@?x+R< ellipse curve  @EMf@?@3>ϘT @?  coedge  ; l  edge   > @  @ k tangent  edge    ? c tangent  point  ;tՈ@Mf@ point  T@Mf@ pcurve    exppc nubs] h?+L .@VMu<+L .@MbP? spline  ref ellipse curve  wA@ף"בLf@0=@?  coedge  D t E  pcurve    exppc nubs+0si0+L .4T%Tњ(@A_JCq:(@;nQ^(@cky}(@628G9(@6ަpu(@CDcopu(@? plane4T%@Qf@5^<?5^< tcoedge coedge  r E }3)% h}  face  E   point  wA@ϣ"בLf@ coedge  I H J  coedge  X H y  edge Z  K@^ h? x tangent  face  J   point  wA@HbKf@ vertex  ellipse curve  @Jf@?x+R<?  -DT!?ftreemeg attrib  Q  face    loop  Q spline surface   exactsur nubs???[Ec&@sK!@ʳR␅!@O݉s%@C)@L ƒ@SKLv}:Vf@ބkƒ@L^A[]L Xf@oŒ@ϐqDqL̚k Yf@_[mÒ@Z6L_i.Yf@.*@zKǎLXf@ͱ+i@$(KK.qVf@g:ƒ@J9,Lc~LүJ$f@CAƒ@KQgL,M$f@٠ Œ@*]L>[!f@YpÒ@2FK# _G f@Cu’@7*IK| ^f@hǒ@TUfL.0f@kǒ@iRLĔf@#zǒ@gdiL{_e@/ʹŒ@5[Le@|gĒ@ *~/KPTe@" %Ò@#ͣ KxXe@VBWȒ@nULmV _e@(rdbȒ@])LI ,qe@>]Oǒ@v"qL5e@+0ƒ@eΟDL*e@kJIJĒ@9TKe@ Q'Ò@cfKwae@>Aɒ@x?-ʠLE.e@ =Mɒ@8iL-e@^խȒ@dRk|LSٿe@v!aƒ@˴!LQBce@ƇĒ@k?L6:R7e@8H’@K8 e@wOɒ@TLQ媯e@&3ɒ@zӾL]2e@[& ɒ@iZL$ Ƭe@J,uƒ@`"LNڥe@ ڛĒ@{ǏLϿɜe@'’@3׵Kԡʟe@@j1ʒ@2x̿Lgäae@M"hL3ʒ@AƎLqD e@Gaɒ@2&.{LAe@D_fƒ@2pALވ e@|·Ē@?L'e@ZڒW~’@HzK97'0e@?sK!@ʳR␅!@O݉s%@ ?  ?  tcoedge coedge  R `h? tcoedge coedge  T dV%< tedge edge   < V%? T tangent a e? pcurve    exppc nubs<V%?BK1 ?]J v'@r;?!*Xv'@MbP? spline  ref tcoedge coedge  U R ?T!? tcoedge coedge  U R  QF=aT!?  pcurve    exppc nubs4P h?MbP? spline  ref   vertex   vertex  m ellipse curve   T@Nf@?8T͙?? tcoedge coedge  X ^ !@!xYMcv'@  loop   pcurve    exppc nubs+L .@_v.@F ,/@d/@}4 &0@m0@+0@}}N'?Į~,?Qٺ?ܗS3?RlTl/*9?뽚ig渉?~>P9,?Rf."n1|?j ??j.*׍6ɋ?cCD '~?<ֽt @3fL@^+!@Ng #@(@N+@+L .@: f0@\J2@>oȆ4@<6@A ;7@|hj9@E.9@ d@If@F񐇒@P(!If@  @>If@a!p@` [3Jf@Y.@%r6Jf@REއ@h(*gKf@9@E\Kf@t.@#4Lf@53M@/!oLf@HpUa@ŧ,Lf@[)„@^p6!Lf@ @C\޽Mf@}d@8R*KLf@VBڥ@8:v} Lf@T@sSaLf@뫒@gzW)RLf@'@У"בLf@ ii@У"בLf@6dc>@fzW)RLf@4.1@sSaLf@O@8:v} Lf@4dKƾ@8R*KLf@N&Ê.’@C\޽Mf@!+rȒ@ Lf@˒@ثLf@TXΒ@AtSLf@ΓΒ@2҅iLf@LQ7ϒ@bLf@0zђ@/_Lf@b9Ӓ@6#Lsf@G Ւ@pGKsf@/%Ւ@F%XKf@|Ւ@">!߰Kf@2-b֒@RKf@@@ toruswA@Jf@?@? plane4T%@Qf@5^<?5^< nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?? ?? +L .@si0@< 1@J6]4@A ;7@A6;VNE7@νLӋ7@֨7@[Żq8@A8@e5]8@%?y9@|#)b9@?>lj.@Pl/@1<=20@: f0@BbV0@K++41@T:1@\J2@FR2@1Dj2@2@D3@m3@9%3@'T864@>oȆ4@H@4@"5@Zk5@@75@¯R6@vnO6@*cA6@<6@A ;7@F˦7@U=8@ӕ8@|hj9@ null_surface nubs+L .@+0@?+L .@?+0@ nullbs   intcurve curve   bldcur+L .@si0@+0@? spline  ref null_surface nubs+L .@+0@+L .@+0@ nullbs   tcoedge coedge  ] "xYMcv'! tedge edge  `!@ "xYMcv'@ tangent Phݹ3w? pcurve    exppc nubs!@"xYMcv'@!@"xYMcv'@MbP? spline  ref tedge edge  !xYMcv' a! tangent Ya? pcurve    exppc nubs!xYMcv'!?!xYMcv'@?!@MbP? spline  ref  point  hK@+ŁKLf@ point  dN)#S@Mv(K'Of@tcoedge coedge  c E aT! QF  coedge  g f h  coedge  k g  edge V qq5 > h? g tangent  face  z h   coedge  k  loop  k straight curve  sՈ@@Kf@ straight curve  T@@Kf@@  coedge  r  edge ] U)\@ `Tњ(@ tangent  coedge  t E tcoedge coedge  t h}@}3)% @ tedge edge  h}@ }3)% @ t tangent o'? pcurve    exppc nubs}3)% V`z&h}CDcoT@6ަT@62pi@c(e @ƾ;nX\B@A_Jx۾@4T%`)\@? plane4T%@Qf@5^<?5^< ftreemeg attrib  u$  face   plane surface  4T%@Qf@5^5^<  coedge  w  edge  ;LԠ' | tangent  coedge  x  vertex  ellipse curve  wA@Jf@?  -DT!?ftreemeg attrib  z!  face   cone surface  @Jf@?x+Rx+R<lvlv? @  edge Y | -DT! -DT!? tangent  point  @J`f@ftreemeg attrib    face    loop   cone surface  @.\(n5Of@?ޛVۼ? ?@ -DT! }tcoedge coedge  r ,h? tcoedge coedge  `h tedge edge   `h?  tangent )bC? pcurve    exppc nubs`h??4btt0> dMbP? spline  ref  tcoedge coedge    ?[Ec&@SF; @ tcoedge coedge   SF; ?[Ec&  pcurve    exppc nubsV%ؼ??[Ec&@^ɳK=?[Ec&@MbP? spline  ref tvertex vertex  c?tvertex vertex  \OJO?ellipse curve  i,@'KL> Kf@MzƿTbKuݎ9?p?z=}:?? tcoedge coedge    ?T! tedge edge   ?T!?  tangent l҈l? pcurve    exppc nubs?T!??? bMbP? spline  ref  tedge edge   QF= aT!?  tangent  P% %? pcurve    exppc nubs QF=6p8R?p8R?dT!?p8R?;'Ʀ?aT!?1ݫt0>| d/T,kffgy]6,@?49ٕI?0fy3fTRA?&S͂=eZ1?yU 4ݿt>|mnz^?beːT? oūKjXt?ݏ>(S>̴׿2>8?ǿa%zh=MbP? spline  ref   edge T <;JV? -DT!?  tangent  point  sՈ@Nf@ point  T@Nf@tcoedge coedge   ?[Ec&@SF; @  pcurve    exppc nubs!@NW"@g.t#@Հ*)$@D%@%$&@!xYMcv'@,xWwl?7@?l z ^L`?#6bn@I}?q^~M?z#r֪?S-BX?"6fc5?nP(~9?ݗ0?? ?Z?ĵ?@*,d?@K?MbP? toruswA@Jf@?@?  face      coedge     loop   pcurve    exppc nubs"xYMcv'%$&E%ր*)$g.t#NW"!fњ@OJWƿa@-%bPҿlIw@ )ڿtV/n@R~멡HSfi@Ȱ'bvo[d@{b1& d@zZ. d@@OE>ii@πDzޝ1n@M[8tw@̽Ok@$o@@XJњ@`DT!MbP? conehK@Q@f@?@? ?@ intcurve curve   bldcur!@'#@ػ$@"xYMcv'@~f<ټ? spline  rbblnsur blendsupsur conehK@Q@f@?@? ?@ null_curve nullbs@@Q@e@ blendsupsur toruswA@Jf@?@? null_curve nullbs@@Q@e@ intcurve  offintcur nubsMG?G"kHP @ڏQ@.ЈC{ @vWs@enq @Un @!@@Ls#@PxZ%@O>&@"Zo'@?t)@E*@tf|,@b.@s ]0@dfd2@3@IJk4@ENw@I X,f@#{ @ I5%f@]A@>}z Jr\!f@ͩ'k@gwJa(Hf@ҳmdQ@FJcռ`| f@]뮒@%=HKƜ&f@ @>QK$`N,f@\tM@j .K J9f@n9@oҶc LZQ@f@FX@TML@1Pf@mʮ@\fL=Wf@L2@=W:Ldf@!jL@orF LKkf@!߸@D_ML+uf@Q3ʎ@}K>LSyf@ X@Lk~f@hlzS@_]Lf@ξ6R@%Lf@jK__@>$L| @[~f@U6I@ LΌxf@ /@4_8LiVsf@==@5YT;L\gf@^:9@:Z1L!f`f@1M@:LQxRf@m>@0oLrKJf@T@w%Lw ;f@$>1@L%I3f@J0@$ Lw;$f@G4!@Z3LI`DIf@ldփ@WLXf@8@~zLo f@z.@'tKLOf@n筸@:-L,K|7f@,Pɶ@X_GKXe@ܵ@¿o֭K7e@]^-@fU&/Kg-Ef@Fօ@&5JW2`f@r@gZ_J#7zf@pXਲ਼@M(R2Jf@t7@zsIݷG"&f@i̩@l9 I°*f@yZ@@IYf@@@ toruswA@Jf@?@? conehK@Q@f@?@? ?@ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?~f<ټ? ?? !@'#@ػ$@jzG'@e۰h+@/y/@fD- 2@XGN\3@IJk4@~f<ټ?3nG#xFI"@S-蝬"@86X#@@Ls#@ u#@h\/:$@\5$@PxZ%@9 a%@ɴ%@s"&@O>&@h7bK&@0?'@)'@"Zo'@=Z(@XXcͭ(@(s)@?t)@d)@6*@\?o*@E*@a+@/5(a+@vy4,@tf|,@P 'n-@,Uu-@|S.@b.@kPFB/@h=/@edK0@s ]0@ E0@-.1@2.naW1@Fl91@Z1@n 2@&0J2@dfd2@?Q2@(? 3@,P3@3@6/,:^3@nZ !4@zg4@ null_surface nubs!@"xYMcv'@!@"xYMcv'@ nullbs   intcurve curve   bldcur!@'#@ػ$@!xYMcv'@~f<ټ? spline  ref& null_surface nubs!@!xYMcv'@?!@?!xYMcv'@ nullbs    pcurve    exppc nurbsaT!wfT!FD O@"@?J O@l{e @rk?QaP@r-ج@?z % @ T@k?hK@T@?:0yE> plane4T%@Qf@5^<?5^<  coedge    coedge     vertex  ellipse curve  |@Mf@UUUUUU? qq5 -DT!?ftreemeg attrib    torus surface  @Mf@x+R?@?x+R<  coedge     face    tcoedge coedge     -v'os! tvertex vertex  |g}?straight curve  hK@Qf@?  coedge   edge  ;LԠ   tangent tcoedge coedge  ! " #] h tcoedge coedge  ! $ % & Gs="pH kMW |qwqmx$ܿ5\z ƿq@3@V`z&@}3)% @ưՒ@|D Pf@ Ӓ@e5Pf@ԗ̱dђ@jQo9KPՕf@OΒ@L 'dP7f@cʒΒ@igPY }f@gLϒ@_)`Pjf@wՒ@~Pf@-UӒ@:F0Pf@);ђ@oFPbꗵf@%PsΒ@4$`PhQf@@rΒ@c%dPQ}f@'ϒ@⤿\Px=Ijf@_:Ւ@APf@U!Ӓ@+Pf@Qђ@W=BP޿f@_Β@K5]]P͸]mf@dOΒ@D`P ~f@HTϒ@s'NYPjf@ Ԓ@ްk Pf@",AҒ@S9c"Pf@ 2В@'{:P,K/f@OĽ[Β@?~VPV䦔f@wΒ@f0ZP*CO\~f@a"Β@j RP,kf@o|Ԓ@cWMPf@RY~Ғ@|w*Pf@ߏ̾В@^F6Piof@z6Β@RnSPcĔf@<͒@WPDk~f@ GpΒ@ΔOPӼSYkf@v6Ԓ@ӓOf@- Ғ@2vPf@*8В@3.0PQƵf@Ck͒@+NPR.df@.%u͒@HRPx~f@SˤBΒ@?JPA[Wkf@^F9Ӓ@ EOf@_ђ@1yPf@В@ -PUǸ̵f@oz͒@pzLPo f@~F+͒@+QP ~f@a"'Β@aHPa>5kf@6fӒ@]W nOf@ђ@̾<Pf@Ezϒ@ a{)P2Jdֵf@ٴ͒@uIP>/f@Nc͒@m6/NPf@V7͒@hMEPkf@FQmӒ@Of@턦ђ@ۊ Pf@m'1Zϒ@Jqq(P#o.ڵf@֐͒@ hHPºP~/ʵf@>̒@a_CP If@ H͒@{ ;PPlf@[ʢђ@g*Of@6В@Of@sΒ@"P{ f@h=̒@//d6PX*f@Kz?y=̒@u')ʒ@d^,Pa_z/f@a,1B˒@Ļ#PB1Jof@_l ̒@c75Of@ټ7˒@c\k}Of@P2Qʒ@$wOf@J*ɒ@LjP4f@Ȓ@ϔPR,τf@o+ɒ@7P̺(rf@),qȒ@vOf@ǒ@F&MZOf@i_ yǒ@ !O3֗f@1 ձƒ@)P䐛f@rpƒ@ni% Pb1f@Ɓƒ@=c]Pquf@pA}\@~CNf@?g@@δL=Of@)q@ UьO\xf@ Ҟ|@LO}Xf@ }@NX5O1wf@w@a7(.OSSf@Ƚ@ Of@e+@AOf@v\6@Of@}D@`OJ#f@ڠ@ǥ;YOg~f@bv@ƉP.hK/f@c@×Of@Q\@iROf@Mpmà@O Lf@DuC @C¤O$CTsZf@nt4@xFPO*)f@nF@J&!GZP{f@L굒@GrG'Of@N&@Sh[Of@56a@5m.OǨûf@͆(¶@^oOb[f@&綒@DPK}9f@: @/^ P`b{f@*8W@Q2Of@ecu@mdOf@S\@nO,u8f@s yŲ@OdVf@pALز@cPECf@'䲒@^]=P7UIf@j@0\(n5Of@;i@w=fOf@իG@̏COY+Qf@q3-@$1>OŮf@]p67@ "Pjf@+=@ΨrPf@wA@0\(n5Of@wA@w=fOf@wA@̏COY+Qf@wA@$1>OŮf@wA@ "Pjf@wA@ΨrPf@? PF>Gs="pH kMW |qwqmx$ܿ5\z ƿq@3@V`z&@ ?  ?   vertex  'intcurve curve   bldcurh}@V`z&@}3)% @? spline  rbblnsur blendsupsur plane4T%@Qf@5^<?5^< null_curve nullbs@@Q@e@ blendsupsur toruswA@Pf@@ null_curve nullbs@@Q@e@ intcurve  offintcur nubspY )ofi?@[@; %@}3)% @7'T"@rq&@14{m%+@ቊ/@'=1@qhnl3@ ܷ5@A ;7@2-b֒@ֆ3Pf@|Ւ@`o'Pf@/%Ւ@\mSPf@kH Ւ@P?ܥPf@b9Ӓ@>KwOsf@0zђ@|\Of@LQ7ϒ@|JsOf@ΓΒ@-znOf@TXΒ@0jOf@˒@(T 4Of@!+rȒ@W%(Of@N&Ê.’@c!BNf@4dKƾ@ɭմ>Of@O@ʼnOf@4.1@S+!Of@6dc>@֭0Of@ ii@0\(n5Of@'@0\(n5Of@뫒@֭0Of@T@R+!Of@VBڥ@ʼnOf@}d@ȭմ>Of@ @c!BNf@[)„@Of@HpUa@:X3Of@53M@MOf@t.@]XdOf@9@-)Q'Pf@REއ@xLPf@Y.@FdPf@a!p@yfPf@  @)uQf@F񐇒@yk#Qf@ d@@Qf@@@ toruswA@Pf@@ plane4T%@Qf@5^<?5^< nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?? ?? oFPF>Gs="pH kMW |qwqmx$ܿ5\z ƿq@3@V`z&@}3)% @?)o_9)o)o߿fi?lEk2l?Yِ9?^?)-< ?Dm>Q?^?v:V2@@ m@x. @< ! @(j@ա8@l1C@z@[@,@?@~0@; %@`5#,@!QF@-V@ null_surface nubsh}@}3)% @h}@}3)% @ nullbs   ftreemeg attrib  % cone surface  hK@Q@f@?@? @  coedge  ( ) *  loop  + ,  const_roundffblendblendsys attrib     null_surface@straight curve  @J`f@ xs:d. @&23 coedge  - .  coedge  / ) 0  edge _ 1DJW DJW? 2 tangent  point  wA@J`f@ftreemeg attrib  "  face 3 u 4  5  loop  6 plane surface  Dxgzǒ@Qڂf@ t ~:ƿt ~:ƿ ? ellipse curve  @M`f@x+RW9?lvlv@][1%~? 0Z 0Z?ftreemeg attrib    face 7 8  9  loop  : cone surface  =1y@أ"בLMf@t ~:ƿB`\5< ?t ~:ֿ? ?? -DT! }tcoedge coedge  " ;] h? tcoedge coedge  < = > ,hr; tedge edge  ?r @ ,h? 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VzA= ` h?   tangent @n(C? pcurve    exppc nubsVzA=` h?>~}>-DT!  cone׼@%\(n5OVWf@t ~:?Gm]= t ~:ֿ? ?? -DT! } face       point  MȒ@\(n5O=e@ point  Q7ǒ@(n5O4'W!f@ftreemeg attrib     face       loop    spline surface   exactsur nubs??0⣔_6~(5["R56ʒ@\{Lewe@sXXZʒ@4z3 \L߹e@ڿʒ@vqL`e@|(mȒ@¥ϿLe@{lǒ@U K:ake@6ƒ@SK+ze@]%1ʒ@׻KLjяe@n"ʒ@\nvLe@0)Uʒ@LauL.3e@xWkȒ@NLۚe@ǒ@BH K~ e@}K4ƒ@ܐp-K.F e@ʒ@P}Lr(e@o9K˒@,rLM{e@`fZʒ@!;MxLDƯe@Iɒ@*[I Lk}e@{ b@Ȓ@ZQnyKAe@[fǒ@cKBʑe@+ ̒@{ L+9te@3˒@j AڰLZsNe@ 7˒@yL'Be@wOʒ@8%!LoVe@!fɒ@arszLT.be@A2gȒ@KCe@!̒@Ң&Be@ô3ʒ@iwKsYe@[ɒ@}.%K e@#qsR ϒ@oƅLpmpe@Β@L)he@.oΒ@-!dL0I2e@}͒@C7LԡKe@0w̒@55KLQ3e@7F܎̒@wqKY !ze@n YВ@LZz$e@ ~ϒ@E~LUKge@V ]ϒ@&!wOLHJԛe@Ivlv1!D׿? @ null_curve nullbs@@Q@e@ intcurve  offintcur nubsXl.!?(`5 @8Z1@YaФ@2I17@/o@M@t,ukm"@U%@d<(@LTj+@!.@iE0@Ÿh0@OH1@:e.2@O?V3@eo T5@}S5@N󬦋6@|;7@Jْ@RK;JK[Jf@Xؒ@hۤKo3Of@(;ג@q~K\ Vf@BwԒ@@L'r\f@|\RӒ@};aL ^f@v,d6ђ@hLc4`f@В@C>ɩL *`f@,LΒ@-G L|#^f@^2͒@OL}]f@z'Ǜ̒@vgL+ bZf@A:=˒@>ZdHL dBXf@_7Oɒ@4րL]cѧH’@`Le爠f@[v@{L8GB6f@lr@ O}LAS e@ T@"בL'e@.\@"בLg*e@P7’@ O}L؄e@> Ē@{LGe@r‰Œ@dLzKe@^Ȓ@ٶ'Lfpe@fT]ʒ@yoMSie@R͒@-)PVAL׏*be@CΒ@4րLW`e@gt(В@=ZdHL|e_e@Qzђ@wgL_e@;Ӓ@OL97ae@;Ӓ@+G L?@be@$oՒ@zC>ɩL&ee@4eP/֒@hL(*rhe@#@ؒ@w};aLWoe@OGْ@@LPte@mڒ@By Lye@yے@<Ki̱e@zYܒ@YKy0be@ݒ@'=KPmܧe@² ݒ@0K •e@k̝ݒ@j`#KDĖe@oh#ޒ@DO Kre@5MLޒ@&JorW}e@:kޒ@UJe@pޒ@8CřJROhUe@_Aoޒ@ i{JpIe@@@ conenZÒ@J<[f@_r ~:?<&E>vlv1!D׿? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?롕? ??U%@$#'@N*@Db|.@ƫlR=2@O?V3@v@% $@+]?F ,9h|?îrq ?vIddv?ؓ '?ēY*Ȝ۳?j%kixk]=?-bLPn? ftreemeg attrib  3  face      plane surface  @n%R@@e@:H˪??6j Ce<|FSkҼ?  coedge      +  coedge     k   edge  $@ oX@ j  unknown  coedge     { n  coedge      n  loop     vertex   ellipse curve   @E`f@x+Rx+R<? H H?  coedge      +  coedge     s   edge  w$@ X@ r  unknown  coedge      v  coedge     z v  loop     vertex  s ellipse curve  P@E`f@x+Rx+R? H@ H?  coedge        edge  " <   tangent  edge   "@   tangent  face       point   @J`f@ point  P@J`f@ coedge        coedge   ! " #   coedge  $ %   &  edge  '-DT! (-DT!?  ) unknown tcoedge coedge  *   +  ,0⣔_QAk`  coedge   * -    loop    ellipse curve  Ͷʒ@Je@Nr ~:?&?  -DT!? coedge  -      edge  P-& \@  . tangent  edge j /DJW DJW? - 0 tangent  point  }gxb@@Jjw!lTe@ vertex   1straight curve  @!9kQ@@e@`-9ƿj?z6? ftreemeg attrib  /  face 2 3 4  5  loop  -  cone surface  Ͷʒ@ M@e@?E!Z |b? @ tcoedge coedge  #   6 4 7Ak`@0⣔_@ tcoedge coedge  8 9   : ;(g.P@)b;@ tedge edge - <(g.P@ )b;@  = tangent ?? pcurve    exppc nubs)b;qHssY#I@ x(g.Pt@)DT!?u@2b?pJe@U7I?BW@T$%?ȣͣ@Fq?( [@&sR? \@x`G?QG@ *?HGf@l%绰?rPy@dvO?`V@:c?{Gc@1>r?`{@̫@MbP? cone'0В@Qe@?@? @  coedge  >  ? @   coedge   A B C   loop   D tvertex vertex   E5D?straight curve  '0В@Qe@? tcoedge coedge  ( F    G;@݆mW!@ tedge edge 5 ;@ ݆mW!@  H tangent >)? pcurve    exppc nubs݆mW!xO D0 Zq.`97Ƴ;T@ȸω@T@* &r@U5Y@8(@L]@gxm@8C1fg@L@xo@>3K@Y=o}@c|@G2@d@𝡲[@V;vk@N%)@h@%@/ X@J1s@)'=?<@Or\@I @nߒE@MbP? cone'0В@Qe@?@? @ tcoedge coedge  I  F J  KRs$= tcoedge coedge   I    L+ R?  loop   M  pcurve    exppc nubsĸ Uc (fĸ Uc (fMbP? spline  exactsur nubs??B++_?]%) N(fS ֒@.ޅ)Pe@CEnՒ@wT,4P (,e@p-UԒ@nhn?P+1`e@ NQ^mԒ@NBKTPYUPe@\OԒ@iG]P& re@U_.^Ԓ@OθeP{@e@?Ւ@3h٥O`&ͨe@"P_Ԓ@ P.3{e@y{Ӓ@$WPXe@ڇ:Ӓ@4Puxe@oӒ@gr@PW\cSe@[I2Ӓ@~JPǣ3*e@aIӒ@~a}Oɛ[`e@MҒ@,!OBUe@(ABҒ@Fr&OO[e@z7Tђ@nPIir̎e@Z{[ђ@Z*P(5›"e@]kђ@55 j4P:7s|e@n YВ@{kT|ROYz$e@ ~ϒ@lmO9Kge@V ]ϒ@qވOHJԛe@IP !ze@!̒@^oO ݧe@{خ̒@=ORO廢e@A̒@O{0ke@х˒@$OF%Be@3ʒ@¾DP|sYe@/[ɒ@Fi:mPy e@e ̒@B[Oe*9te@3˒@8%OOZsNe@ 7˒@f,O Ae@wOʒ@+OOnVe@R!fɒ@,O,be@2gȒ@a{0Pe@Iʒ@nY|O(e@9K˒@&ӍOQOfL{e@fZʒ@YIJO͒Ưe@Iɒ@pդOj}e@ b@Ȓ@VHCPAe@[fǒ@; PBʑe@%1ʒ@a(DOqϏe@"ʒ@ҏ]TO=e@^)Uʒ@-`JO3e@WkȒ@%Oۚe@ǒ@P| e@K4ƒ@GP',F e@56ʒ@#Ocwe@XXZʒ@2XO߹e@-ڿʒ@ЇD"O^e@(mȒ@X0@}Oe@C{lǒ@P7ake@ݏ6ƒ@J V Pwe@?_?]%) N ?  ?  tvertex vertex   NJxC?intcurve curve   bldcurĸ Uc N(fm ? spline  rbblnsur blendsupsur cone'0В@Qe@?@? @ null_curve nullbs@@Q@e@ blendsupsur sphereͶʒ@Pe@-Oae@'ʒ@c,6$O phe@?1ɒ@F?O^$oe@N ƒ@5ryO e@jĒ@@ OuEe@Z’@^G+Oeɫe@@;8O fׯe@F?m@MƑ^OMތ~ e@>,@wOM_e@Ë@!ROje@ή/[@e΢aOKmf@’@WP77Sf@tQÒ@Z:Px0i)f@teĒ@#[PY 1f@@@ sphereͶʒ@Pe@-3K@`^L|@L@6ْ@@xm@'Ue@8(@|pu@3&r@|pu@ȸω@MbP? cone'0В@Qe@?@? @  coedge   \ %  ]  edge 0 W=? >@  ^ tangent tvertex vertex  N _5D ѵ6?ellipse curve  7nW@(n5O.~:f@ ~:ƿ?G%?< 6? יTl0?? tcoedge coedge  F ( \ `  a݆mW!;  loop  F b  pcurve    exppc nubs` hVzASMu<݆mW!@?цmW!@MbP? spline  exactsur nubs??n,O 7v Mv޴%,+X_y4&zΗJ| ӿ֎?zzX@lVG@ן@݆mW!@Cג@:KP 8e@ sג@s P^e@3\֒@P6Qe@sP1e֒@:ɨPke@6.d֒@@MkPׇ&6ęe@;L ֒@ĦV`Pܛ,e@8=)xג@J1P%}e@0ג@M"Pae@֒@_P ETǰe@`f֒@7PDe@Igwd֒@v&PgIdΙe@Ey֒@YPh4c7e@z^Nג@ړݮPoWe@7ג@CPOe@ա|֒@LeT\P[1e@ob֒@:FP+K&se@ra֒@JzLȴPe@t> ֒@b%P;je@(o ג@3Pus e@ < ג@XPLne@/4!w֒@:OS/PJ e@ S֒@|5wP`V֒@Pe@WԦU֒@UP3e@R]ג@#qP%e@x8֒@7bwPRB/e@/Je֒@lg:}P~Ge@-֒@P+"e@C`֒@X !PWpWP_e@#a֒@ˎn`P`e@Ւ@,oP5gؘe@ Ւ@\3ߕvP0e@ 6 ֒@PbZ|P/Ue@r֒@V|i2Pd쎵e@o ֒@7=Pe@NdÍՒ@@NHPF딦e@NWԞ-Ւ@؟iE\P)de@I`ۛJՒ@*dP'e@u q\Ւ@ kP"e@h֒@%t$P e@]Ւ@~1PiZTe@!JՒ@624x=PLդe@Ԓ@NdSPtydde@&Tx Ւ@T\P !Շe@C2@}Ւ@NElbP=+~e@dJ:֒@ރwgPt~e@=raՒ@PһΪe@4Ԓ@]5o,Pe@EaklԒ@.@5EP1fe@ĺ:Ԓ@BxOqOPjele@MXՒ@bO VPdxe@(/5֒@]pPce@5Ւ@&6whPf٩e@4Zg`Ԓ@S%&PK e@Ug9Ԓ@?6^@P,e@T@gԒ@FsJP|YXe@xvԒ@9CQP ve@Ւ@sO_De@ټ{fԒ@VR POj\e@gkLԒ@sleP e@`Ӓ@A8PdV;֊e@$Ԓ@UɌWCP9K Je@PuԒ@ IIPse@ `F۶Ւ@w]jO|6je@IhԒ@vfPɡͧe@^?+Ԓ@EVP 9})e@1Ӓ@Oc6e@[GӒ@cOSe@Ғ@3PE܃e@\U%Ғ@;M+Pve@\ lӒ@Yg;{0PH+he@+yҒ@?g;OrAԠe@ђ@\vOe@# ђ@0˱O e@ȸsВ@} =P[}e@2sВ@=sŽP yxtle@,-ђ@VOPKV@\e@\uoВ@U>& O$e@A߻PВ@ߝ] QO6Оe@˳ϒ@,jΙO"kje@ϒ@̒@4uIeO{[e@5YI̒@,r*EO` e@dbP̒@O;e@ ʒ@(R.OW e@Wܺɒ@q}OCse@XȒ@ QbPiwe@Tʒ@$~l O>ǰ^e@536~ʒ@ۉVO\)Ve@K1ʒ@/_OO8e@Q Ȓ@+[UO70We@vιǒ@ܗmPȡe@eƒ@ D P?Ie@9ɒ@+:"*OP׿e@}ɒ@`^O-;Me@?ɒ@r0ϑO}2e@)kYȒ@R nOnOe@W(ƒ@PzRe@ˆŒ@L@ޣ P^e@t.ɒ@]Fq3O^Ooe@O=6ɒ@)3OeOdƥe@Ȓ@VOmaBe@޷l4ǒ@Oƨ fe@(CŒ@"PqX ذe@bĒ@ΨrPV'Ƹe@MȒ@\(n5O=e@MȒ@w=fO=e@HإNsȒ@v̏COMSR?e@ݔlƒ@1>O)BP'e@ MSŒ@"Pq%/e@͍ ,-Ē@ΨrP3]7e@? 7v Mv޴%,+X_y4&zΗJ| ӿ֎?zzX@lVG@ן@ ?  ?   vertex   cellipse curve  Kj@\(n5Oe@/n ~:ƿ$T?4= 6?1T1?? ftreemeg attrib  +  face d b e  f cone surface  ׼@%\(n5OVWf@t ~:?Gm]= t ~:ֿ? ?? -DT! }ftreemeg attrib  /   face g + :  h spline surface   refQ tcoedge coedge    9 i 0 jnClR? tcoedge coedge   2  6 0 k0⣔_Ak` tcoedge coedge  2   + 0 lQAk`@0⣔_@  pcurve    exppc nubsFRX<я?*__MbP? spline  ref` tvertex vertex  5 mxC?ellipse curve  {Ò@ L~e@I;+^V?5?TXYF?vD?? intcurve curve   bldcurU%@$#'@ з(@롕? spline  reff null_surface nubsU%@з(@U%@ з(@ nullbs    point  wA@P`f@ftreemeg attrib  @+  face n t   o  loop  p @ cone surface  @Je@?lvlv? @  coedge  q  r s A  coedge  t C u v   coedge  C t q w  tcoedge coedge  x y C  z {T{CPS!? tedge edge D |T{C }PS!? C ~ tangent Y~Zqd? pcurve    exppc nubsPS!T{C=Ɔ+1d^)1jDT!MbP? torusؒ@Ne@?@?  coedge  E D     coedge    D  A  edge b "uJV? -DT!? D  tangent  coedge   p E    edge d  ] h? E  tangent tcoedge coedge   F    ] h tcoedge coedge  F     >h?  loop     pcurve    exppc nubs<S!??,H@M?MbP? spline  exactsur nubs ??j6?P$?v@ @A @{jD@̎y @Pt!@ؒ@"בLe@ؒ@jLe@ؒ@t3pgLY+Qe@ؒ@&LŎe@ؒ@Kce@ؒ@@bKye@}$ؒ@"בLe@ݶؒ@jLe@@ 6ؒ@t3pgLY+Qe@[˭l"ْ@&LŎe@$=ْ@Kce@tLْ@@bKye@hk$ْ@l\ZLe@b-P$tْ@kLe@2ْ@㜁 lLY+Qe@KpIڒ@9bLŎe@a͐~ڒ@Kce@+ڒ@3SKye@ڒ@!7{Le@#Aے@;?̡Le@uے@I݁LY+Qe@ ݒ@6LŎe@Џ˖ݒ@UWLce@H;ݒ@YLye@;rq]ے@T~Le@RyKHܒ@ćLe@.2ݒ@+HLY+Qe@^ޒ@mEVLŎe@%iYߒ@:Lce@xߒ@^l*Lye@gܒ@9Me@6X~Cޒ@+yMe@]ߒ@ILY+Qe@e )@b}LŎe@@Lce@ԋlI@XɷLye@!a"ݒ@bDMe@Zߒ@ 4Me@usRc@%5$MY+Qe@uܖ @/ MŎe@pDS @vXLce@!R@m`oLye@Lէݒ@ӼѿMe@aaeߒ@ol Me@r@no'PMY+Qe@K8@[MŎe@杒ױ@GWsMce@ovT@S8/Mye@ +W!ݒ@}@(Me@Bzdޒ@SMe@Wߒ@T NY+Qe@oC@0!h>NŎe@Q4@iONce@z@"8ZNye@v9?ڒ@4Ne@^9 ڒ@{ifNe@jv4xے@λKNY+Qe@~ܒ@'NŎe@2cܒ@ Oce@'ݒ@&DOye@NGtfג@J[BNe@Hݍג@ TXwNe@ ڏג@6;NY+Qe@s}nג@A'_OŎe@L)naג@ɩd(Oce@#fYג@p#C=Oye@%0 Ӓ@ Ne@#aҒ@;D=?  point  *6ƒ@zeSKkve@ coedge   L X    loop  R 3 straight curve  wA@..!@`f@ l)6Q BH6AV@intcurve curve   bldcur`r7@ @% $@b'? spline  refS null_surface nubs`r7@% $@?`r7@?% $@ nullbs    coedge    Q  ]  edge N  >h? Q  tangent  coedge  R      vertex   ellipse curve  wA@Pf@?H!Z?|b@? 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(g.P@6,@!:S@̭!@KT%@E%@&@WE&@c4X'@ @sQ2'@swy'@W'@ndb(@PTRE?-@ /C@d}FM@Ğx@#j5@Jý@H?@gc^@nu@5A\@3@Q"@@phC(@B 2` @VaB,!@!@Ap}"@mWV&#@F-#@b1F$@ni[$@h߄4%@KT%@*}&@t^&@"DM&@'@, '@=(@ null_surface nubs(g.P@)b;@(g.P@)b;@ nullbs   tcoedge coedge       RR!  coedge     @ U  edge F  Ud   tangent tcoedge coedge       R!l _c  coedge     C e  edge 3 Ud@ @   tangent  face       point  '0В@F"בLe@tcoedge coedge     J  s$R?  pcurve    exppc nubs;@܆mW!@;@݆mW!@MbP? spline  refv intcurve curve   bldcur;@ן@݆mW!@롕? spline  rbblnsur blendsupsur cone'0В@Qe@?@? @ null_curve nullbs@@Q@e@ blendsupsur cone$)Ē@Pdf@Jr ~:ƿ&?E>vlv@!D׿? @ null_curve nullbs@@Q@e@ intcurve  offintcur nubsn,O He^ _ʫ}?h;2m@ V@lw @ 3$q@*>U@Ž@݆mW!@*>?$@|l'@" *@G,@?нK-Y-@3.@S/0@mW1@O?V3@_Aoޒ@:KPpIe@pޒ@c^O fpe@r‰Œ@&GOzKe@> Ē@ \OHe@P7’@-0O؄e@.\@\(n5Og*e@ T@\(n5O'e@lr@-0OAS e@[v@ \O8GB6f@>ѧH’@&GOf爠f@nĒ@(I">Ol 2f@?Œ@84N~1w=f@+Ȓ@֯O n`Lf@_7Oɒ@)|O]cvlv@!D׿? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?롕? ??n,O 7v Mv޴%,+X_y4&zΗJ| ӿ֎?zzX@lVG@ן@݆mW!@롕?){ m He^ (~ G9 !O_N y͖5:}߿ʫ}?ʫ}?Biq?ʫ}?u?n s?9V3C?h;2m@G/d@ V@TE@lw @pjh @i"ZY@̳%@ 3$q@i5E*w@8f@b;*@*>U@K#@}#@aH@Ž@aS@io5@$) @\Rx @ null_surface nubs;@܆mW!@;@݆mW!@ nullbs   tcoedge coedge       (f@ Uc @ tedge edge 4 ac(= R? F  tangent ӘK? pcurve    exppc nubsRac(mf?hfMbP? spline  refn  pcurve    exppc nubsm/=&R??hO %Mz>1O MbP? spline  refn  face     !  point  56ʒ@V#Obwe@tcoedge coedge  " #  P $ %mFj@ 0v&h@ tedge edge B R 0v&h WmFj O & tangent z]?,B3? pcurve    exppc nubs 0v&hmFj? 0v&h@?mFj@MbP? spline  refZ tvertex vertex  ' (ʔ?ellipse curve  PͶʒ@X#OR&umke@C*OlJ^V?G ?Ƨ?jʝ:??  coedge    # ) U  loop   *  pcurve    exppc nubsg hUd@ET! Ud  cone@?\(n5O_e@?? ?@ -DT! }tvertex vertex  P + L'N?ellipse curve  '0В@#(n5O`e@lqHq==T-?? ftreemeg attrib    face , * z  - spline surface   refZ tcoedge coedge   .  ` ] /;@݆mW!@  loop  \ 0 straight curve  a@ΨrP\f@p ~:?=  point  So}’@^erP^f@tedge edge 6 ݆mW! ; \ 1 tangent 7Ϗ2!? pcurve    exppc nubs܆mW!;?݆mW!@?;@MbP? spline  refv  face 2    3  point  ΍ ,-Ē@ΨrP3]7e@ftreemeg attrib    loop    cone surface  @"בL_e@? ?@ -DT! }ftreemeg attrib   spline surface   ref tedge edge % <"Y=< (R?  4 tangent h(K? pcurve    exppc nubs"Y=<(R?ٽz>1P.?C_IMbP? spline  ref`  pcurve    exppc nubs0⣔_Ak`0⣔_Ak`MbP? spline  ref`  pcurve    exppc nubsQAk`@0⣔_@?QAk`?0⣔_MbP? spline  ref`  point  56ʒ@; Lbwe@ftreemeg attrib  , sphere surface  Ͷʒ@Je@- }: 69  9 tangent  coedge    : ;   coedge  # <  v $  edge K |huJV? =-DT!?  > tangent  edge f ? }] h?  @ tangent tcoedge coedge    7 A z BY h tcoedge coedge     C z D$|h?  loop  y Z  pcurve    exppc nubsT{CPS!??H@@?MbP? spline  exactsur nubs ??6?nP$?iv@ @~ @EtjD@̎y @Pt!@Fqݒ@Ne@$7ߒ@Ne@|`~@NY+Qe@>X@NŎe@bYi/b@Nce@*w@Nye@Fqݒ@m$Ne@$7ߒ@XNe@|`~@7hNY+Qe@>X@kMNŎe@bYi/b@Nce@*w@eNye@5+ݒ@ mtNe@%ߒ@BNe@@\vNY+Qe@3+@_ #NŎe@oˆ1@2Nde@O`b@fNye@F!$ݒ@UzNe@(ޒ@)td5Ne@]Sߒ@N}NY+Qe@qI@P#OŎe@_QE:@<q2Ode@s7+@dZi;Oye@Z ܒ@nS.Ne@Hݒ@DP*o Oe@/ߒ@4V&OY+Qe@5O@Pk2vWOŎe@ayp)@$0kOce@ݘR@fvOye@3nے@JqOe@6 ے@mkoHOe@ ܒ@8KsOY+Qe@82ޒ@:#%OŎe@.ޒ@TOce@8Aߒ@ez-Oye@댪ْ@#@0Oe@Yڒ@?`Oe@6P&ڒ@?nNjOY+Qe@;+Ʊے@r2OŎe@F8%aܒ@Fd:Pce@;ܒ@ǡ e Pye@"bs֒@49Oe@֒@0,̱lOe@~-֒@ZNOY+Qe@+rՒ@"Ay 'OŎe@@elՒ@)y Pce@PvKՒ@fAPye@ͺՒ@na*$Oe@nu07Ԓ@HPOe@r0hӒ@!}OY+Qe@z Ғ@-}OŎe@M4Cђ@tS0Oce@>.ђ@sBxOye@x/YҒ@t.=Ne@'<В@^+Ne@}!Eϒ@ΎNY+Qe@Vɱ̒@ŰOŎe@è˒@_Fc Oce@ ˒@$Oye@"ђ@TvNe@6_=EВ@qstNe@M Β@\"AqNY+Qe@˒@:|omNŎe@ʒ@r)-lNce@]ʒ@l0kNye@ЩӒ@FMe@9$Ғ@-Mce@LZޒ@A.Lye@,۔ܒ@\z> Ne@K<ޒ@T&SMe@ߒ@) MY+Qe@XNV@J}eMŎe@z5@@EF\~Mde@k}=@UֆqMye@8Rݒ@wzFaNe@d *#ߒ@"XNe@Z9ܩ@‰PNY+Qe@O8@gBBNŎe@؞\?@%nX@GpRaNŎe@bYi/b@_{@d^Nce@*w@^a\Nye@Fqݒ@Ne@$7ߒ@Ne@|`~@NY+Qe@>X@NŎe@bYi/b@Nce@*w@Nye@?6?nP$?iv@ @~ @EtjD@̎y @ ?  ?  tvertex vertex  v E]KK? vertex  s Fellipse curve  ג@bNye@?h&>SU ?  coedge  G    4  edge c -DT!  -DT!?  H tangent  coedge   q G I A  vertex   Jellipse curve  @Me@?  -DT!? coedge     K   vertex   Lellipse curve  ؒ@Je@<?  -DT!?tcoedge coedge    A   Ml _c:R!? tcoedge coedge  6 B   e N] h? tedge edge 1  ] h?  O tangent Ln(C? pcurve    exppc nubs] h?MbP? spline  ref{ tcoedge coedge  P r   8 Q>h: tedge edge 7 R >h?  S tangent &Sh.S? pcurve    exppc nubs>h?&8/$?ԗ@?UD@MbP? spline  ref{  face T M   U  point  *w@6Mye@ edge 2  VUd p W tangent  point  ؒ@AbKye@ coedge  .    ] ellipse curve  LQ7ǒ@P,'W!f@r ~:?$`Еޓ?  -DT!? coedge        edge  tvS R  X tangent  edge O = @ Y?Nv@  Z tangent  point  Hf@Pޓf@ coedge  [  \ ] Y  coedge        edge  ^@ @  _ unknown  coedge   ` a b Y  coedge  c      edge  A@#@ d[|@  e unknown  vertex   fellipse curve  wA@6sQf@H˪?6j Ce@n?<? ftreemeg attrib  N  face g h &  i plane surface  D@@Q@e@H˪?6j Ce<|FSk straight curve  @rOf@ :"1vb 6rÓ4@ point  @rRf@ftreemeg attrib  D  face j k l  m plane surface  @rR`f@?  coedge    n o   coedge  p q   4  edge  mπ*@ rPY;@  s unknown  coedge   - p    vertex   tellipse curve  Ͷʒ@h'I=Q@e@8H˪??5j Ce<n?@>?  coedge    u v   coedge  w x   y  edge  z$ hȟ?  { tangent  coedge  |  x }   coedge   \     loop  ~   vertex   ellipse curve  @ieR@e@;H˪??6j Ce<@nĿ@>=?  edge  ^3ˍ" 3*}a@   tangent  point  @rR@e@ftreemeg attrib  5  face       loop    cone surface  }RHf@ǖǛYe@>%bOL2<iϣ構?"lv? @  coedge   c     coedge        edge  $@ 6@   unknown  coedge        coedge        loop     vertex   ellipse curve   @E@`f@x+Rx+R? H H@?  coedge        edge   "@   tangent  face       point  @E@`f@ coedge        edge  -DT! -DT!?   unknown  vertex   straight curve  @E`f@? {cD ?@ftreemeg attrib  \ cone surface   @E`f@? H H? $@  coedge        coedge        loop     vertex   ellipse curve  P@E@`f@x+Rx+R<? H@ H@?  coedge        edge  "    tangent  face       point  x@E@`f@ coedge        edge  -DT! -DT!?   unknown  vertex   straight curve  x@E`f@ ? {cD@ftreemeg attrib  [ cone surface  P@E`f@? H@ H? $@  loop    straight curve  @J@e@?  point  P@J@e@ point   @J@e@ftreemeg attrib  c  face       loop    plane surface  Ԓ@H@e@??  coedge        coedge      l  edge  -DT! -DT!?   unknown  coedge    %    coedge        loop     vertex   straight curve  @Ld@  coedge  !      coedge    !    edge   $@   unknown  coedge   "     coedge  "  $    loop     vertex  # straight curve  4@Ld@  coedge  % $   &  edge  ($    tangent  edge   '$@   tangent  point  L@Ld@ point  4@Od@ coedge  5  *    edge i / |eB?   tangent tvertex vertex  + {Þ?intcurve curve   bldcur0⣔_6QAk`c? spline  rbblnsur blendsupsur cone'0В@Qe@?@? @ null_curve nullbs@@Q@e@ blendsupsur sphereͶʒ@Je@-,@A[C^Lde@+?m@W9nLx~ e@@dLfׯe@ ’@"ViLSjɫe@Ē@v_~LhEe@N ƒ@p!Le@Y?1ɒ@\7L$oe@'ʒ@p)L phe@@ƫ Β@=q LΌae@JBϒ@pQLղxz_e@pӒ@ T~L˒F`e@9Ւ@_Q-^L-vMde@ؒ@rULfB6 oe@Eshڒ@>K we@~k;ے@)BKM soe@@@ sphereͶʒ@Je@- P   tcoedge coedge  y x >  z RR!? tedge edge E  RR!? >  tangent 苓? pcurve    exppc nurbsRR! ?T@?:ZT@g?:"@?:0yE> planeUdڒ@Qe@? tcoedge coedge  ? T y C U |h$:  vertex   straight curve  @?\(n5Oe@ tedge edge 9 l _c: RR!? A  tangent Ϲ? pcurve    exppc nurbsR!@:(%@?P:R(@#g?` ?pu(@?:0yE> planeUdڒ@Qe@?  vertex  C straight curve  @"בLe@@ ftreemeg attrib  D  face   $   plane surface  Udڒ@Qe@  pcurve    exppc nubsac(=R?D#?A7-@kʕ?=,@MbP? spline  refv tcoedge coedge    I    Uc (f tedge edge < (f@ R Uc @   tangent rʁ-9? pcurve    exppc nubs(f@ Uc @?(f? Uc MbP? spline  refn tvertex vertex  ` sɔoP?ellipse curve  {Ò@V#Oke@sQ;⿀^V¿5? ?s??? ftreemeg attrib  M  face   8   spline surface   refn  coedge  < O  ' $  coedge  O u T ) $  loop  #   pcurve    exppc nubsmFj@ҸB@i@N6@@=@ 0v&h@Tr 0G׿Z$׿'|kBZؿ5n$8ؿTe,Xؿ2]E4uؿTm,F4;ٿ|KTٿvDŽI%ܸ5;ڿ,e0-+,ڿd#j-~ۿj<>D/ܿUyZbݿMbP? cone@Pe@lv@lv? @ intcurve curve   bldcurmFj@{m}n@ 0v&h@RRE? spline  ref\ null_surface nubsmFj@ 0v&h@?mFj@? 0v&h@ nullbs    edge I RsFC? -DT!? "  tangent  point  Ͷʒ@dV Pe@ edge G WpUd@ | @ #  tangent  face  D U    point  '0В@뽨rP@ye@ftreemeg attrib  Z spline surface   ref  coedge  \    ]  pcurve    exppc nubs;@@7@Rq.`9@D0 @vO @݆mW!@ 2Kbݿ̞V/'s//ܿ;t'T~ۿ'wKأڿF(<#<ڿ@.G$DªٿV$[ i<ٿ/ fؿ0_@ؿ~7u56C4W8ؿ9s5Nؿ7pMq(׿MOefN$׿MbP? cone$)Ē@Pdf@Jr ~:ƿ&?E>vlv@!D׿? @  face   ]   intcurve curve   bldcur;@ן@݆mW!@롕? spline  ref null_surface nubs;@܆mW!@?;@?݆mW!@ nullbs   ftreemeg attrib  b spline surface   refv ellipse curve  HͶʒ@9Lx&umke@8*Olh ^V¿r ?,x?n$ ?? tcoedge coedge  p     (g.P@)b;@  coedge    p  e tcoedge coedge  r P x A 8 Y h?  loop  7  straight curve  *w@ ye@@  coedge   G t ; 4  edge e =-DT! ?-DT!? :  tangent  coedge  u "   $  vertex  ; ellipse curve  ؒ@Pe@@?  -DT!? vertex  ; ellipse curve  @Ne@??  -DT!?tedge edge =  }Y h? 7  tangent n(C? pcurve    exppc nubsY h?MbP? spline  ref tedge edge C $ ||h? y  tangent oh.S? pcurve    exppc nubs$|h?R\/$?ԗ@?E@MbP? spline  ref  point  ג@PrPye@ point  *w@Nye@ coedge  :   I 4 ellipse curve  ؒ@M@e@?lv@lv@? 0Z 0Z? edge g ?J I G  tangent  point  @M@e@ edge h % /Ͷ   tangent  point  ؒ@J@e@ pcurve    exppc nubsl _c:p67R?p67R?R!?p67R? (Ŧ?R!?s 2>>R?R>9?޾e-??mA^0 ?܉c?9 ? x?C-(>O?(Z +?J(?Lx%q;?;_ē?}S4B?%a?Y]+0?@NI?ysDUL0Hù@ه.$?ԗ@MbP? spline  ref{  pcurve    exppc nubs] h?@-DT! @} cone@"בL_e@? ?@ -DT! }ellipse curve  ؒ@£"בL_e@=??  coedge  7    8  pcurve    exppc nubs>h:89@*H9@GT!  coneFqݒ@ _e@?? ?@ -DT! } vertex   ellipse curve  xFqݒ@M`e@!Qǎ=?t"=p2?? ftreemeg attrib   spline surface   ref{ tvertex vertex   pL'N?straight curve  @@bKye@ straight curve  Hf@..!@ޓf@? BH6AV l)6Q@ vertex   straight curve  xGT縒@Py*f@ ~:? =m? )֤('@ coedge      Y  coedge   ~  ]   edge  @N ^˓V9 \  unknown  vertex   straight curve  @rR@e@?  coedge      Y  coedge     b   edge  d>JW? v,DT!? a  unknown  coedge        vertex  b straight curve  _u@ Q`f@`-9?j?z6  point  Hf@Qޓf@ftreemeg attrib  O  face      cone surface  L@O@e@?lvlv@? ?@ ftreemeg attrib  E  face       loop    cone surface  x@J@e@lv@lv? @  coedge     o   edge  $ r8u   tangent  coedge      4  coedge      4  vertex   straight curve  @!9kQ@@e@?H˪  point  Ͷʒ@h'I=Q@@e@ coedge     v   edge  z1zJ4p@ a@oZ@ u  unknown  coedge      y  coedge     } y  loop   !  vertex  v "straight curve  aJT9_@ΏR@@e@  coedge  ~  # $   edge  %MF!CC=  %p<  & unknown  coedge  \ | ' (   face ) ^   *  point  aJT9_@ΏR@3Ce@straight curve  @rwqSPe@? RUF [nxRb@ftreemeg attrib  6  face + , -  .  loop  /  plane surface  @L@e@??  coedge  0 1  2   coedge  3      coedge   3     loop   4 straight curve  x@J@`f@  coedge     5   edge  6"   7 tangent  face 8    9  point   @J@`f@ coedge        edge  $@ X@  : unknown  vertex   ;straight curve  @E@`f@ ? {cD@ftreemeg attrib  ]  face < 4   = plane surface  @J@`f@? ellipse curve   @E@e@? H H?  point  @E@e@ coedge    > ?   edge   @"@  A tangent  face B    C  point  P@J@`f@ coedge  >      edge  $@ X@  D unknown  vertex   Estraight curve  x@E@`f@? {cD ?@ftreemeg attrib  `  face F |   G plane surface  x@J`f@? ellipse curve  P@E@e@? H@ H?  point  x@E@e@ coedge   H  5  ftreemeg attrib  d  face I J K  L  loop  M  plane surface  D@H@@e@  coedge  N O P Q   coedge  R  S T   coedge  U V   W  edge  X@ @[@  Y unknown  coedge      l  coedge    U Z l  vertex   [ellipse curve  x@Jd@lv@lv?  coedge    \ ]   edge  $ ^  _ tangent  point  x@Ld@ coedge   ` a b   coedge  c d   e  edge  f pFGs&4@  g unknown  coedge  h  d i   coedge   j     loop   k  vertex   lstraight curve  4@Zd@OL2?>%  coedge     2   edge   m*@  n unknown  coedge    o p   face q r   s  point  4@Zd@ coedge  o \     edge  -DT! -DT!?  t unknown  vertex   ustraight curve  4@O@e@? ;`< ;`2@ vertex  ] vstraight curve  L@L@e@ ;`2 ;`<@ellipse curve  Ͷʒ@Je@?  -DT!? point  Ͷʒ@9SKe@straight curve  Ͷʒ@ M@@e@? nl=` 4s4@ftreemeg attrib  2  loop  w  cone surface  Ͷʒ@ M@e@?E!Z |b? @ tedge edge , V)b; (g.P 5 x tangent jc]?,B3? pcurve    exppc nubs)b;(g.P?)b;@?(g.P@MbP? spline  ref  pcurve    exppc nubsj hz:Ud@ Ud@@ET!  cone@"בL_e@? ?@ -DT! }ellipse curve  '0В@2"בL`e@]=b @=P=D??  edge ? R9@ :@  y tangent  pcurve    exppc nubs67R?67R?RR!?67R?o8Ŧ?RR!?9 2>ڰ>R?䦿 R>9?#>e-??h0 ?c? ] ?x?r`6(>O?ɥ +?#(?x%q;?eē? 4B?S%a?<+0?HNI?xCUL ù@6.$?vԗ@MbP? spline  ref  vertex   zellipse curve  ג@D`Ne@̤ŭ?x?1?  pcurve    exppc nubs|h$:G`GT!  cone@?\(n5O_e@?? ?@ -DT! } point  ג@v(n5Oe@ellipse curve  ג@qMe@r#ȎJ#_8L@1>֤ŭ?T?  point  ؒ@"בLe@ftreemeg attrib    face { 0   | cone surface  @Pe@lv@lv? @  coedge  }  .    coedge   } " '   loop     pcurve    exppc nubs Uc Ie0*YG>z M^@uè4?(fhBJW?X g[?hO|h@@R9?Xo ӝ?Vԇ$Z(?<*i?wHɠXI?ݠ-e'uLJއy_%пP\!po׿?LSI߿Pӡ_-L ֺB($KWMbP? sphereͶʒ@Pe@-vlv@!D׿? @  pcurve    exppc nubs(g.P@H x@j#I@Hss@@@)b;@Uy@Zbݿ8B>@/ܿd#j@"-~ۿ:e0@8+,ڿTuDŽI%@ܸ5;ڿyK@~Tٿk,@4;ٿa2]E@bOuؿf@X,Xؿ>5@x$8ؿ'|k@BZؿ@t"׿r 0@G׿MbP? cone@Je@?lvlv? @  pcurve    exppc nubsY h?:@-DT! :@} coneFqݒ@ _e@?? ?@ -DT! } coedge   : <  4 ellipse curve  ؒ@N@e@?lv@lv? 0Z 0Z? edge J Ͷ@ =%@   tangent  point  ؒ@P@e@ point  @N@e@ellipse curve  Fqݒ@N_e@?P=@? ellipse curve  ג@{(n5O_e@?f3@ `  unknown  coedge  w a     coedge  a w c    vertex  b ellipse curve  Ͷʒ@f'I=Qe@H˪?5j Ce<nĿ@>?  point  }gxb@@X&Qjw!lTe@ftreemeg attrib  hP  face       loop   h cone surface  L@O@d@lvlv? ?@ ftreemeg attrib  kF  face       loop   k cone surface  x@J@@e@lv@lv@? @  coedge      l  coedge   n q    coedge  n      loop     vertex   straight curve  =kWA-@(;CSQ@@e@? <`< :`2@ coedge  q    4  edge  rMK MK? q  unknown  point  =kWA-@&;CSQ@@e@ coedge   u     coedge  u  w   straight curve  @n%R@d@?H˪  coedge   w   y  edge  zMK MK? w  unknown  coedge  x    y  face   y    point  aJT9_@ΏR@d@ coedge    | $   edge  %"|$a aDž5,+#@ #  tangent  vertex   intcurve curve   surfintcur nubsA-y?-y?D6/\?-y@_yms:@^yƌ @u t @@G7;@Nzнa@-@o@c2 6@~i@R7@^sЂq @I=!G!@5"@a #@}%@O̜W&@&2'@zK(@2 N(@:Lɘh)@e*@&[h+@P,@ߥ-@7.@"/@^sЂq0@0,0@1@TE2@"͆2@">3@r"3@"T 4@ңv4@0A<4@3DI5@۾:75@a0|$6@76@"*7@Xȱt?8@ 8D8@9@ vF9@Q@TU:@!}@ 0;@@6Q;@^, <@^Kt<@xxw<@G=@n7l=@473;>@7>@TcBM?@"?@wP-@@^sЂq@@@>y\3mS@-!rXe@@ u!yS@-!rXe@J2@진S@P=aWe@R@K=oS@,&F8Ve@Y܃@<@S@ŸTe@㠠 @ZeOS@;Qe@V@ppQS@k|Pe@w;@S@EʅLLe@tyy@!S@M!Je@õV]@8?`S@>d\Ge@Ss/臑@)&S@2QÈEe@-]n@D&i T@7Be@ @3,)T@]!Ae@,T@L 7Je@:M@d+T@mLe@ZH@7(T@Qe@>O|i@6[8&T@F~tZTe@uj@T@Gl]e@L @|?T@AZde@@<@|  T@Ϯ]se@ef,@csT@{c4{e@z9@){lT@g)e@̮˗@@ttS@ste@(I;@PqQ"S@|te@@89S@ue@@89S@e@z9@){lT@fPֶe@ef,@csT@脜:e@@<@|  T@1Qwe@L @|?T@Dme@uj@T@zTe@>O|i@6[8&T@Ye@ZH@7(T@l4 e@:M@d+T@zF=e@^rVj@>,T@Re@Qe@j,`-T@9&me@)$<܏@¨ .T@"e@NupD@z.0-T@ҟe@-@D+T@IPe@ @hr*(T@Kܘde@dNy@$%T@!f@W` c@8xXT@ۊ2e@`Hge@R@K=oS@be@J2@진S@ e@@ u!yS@_nލe@@r}ȖbS@_nލe@J2@oyWS@ e@R@{H@S@be@Y܃@@5S@>`Hge@㠠 @xH^iS@bgH&e@V@ cHS@e@w;@nMS@5ze@tyy@KR@HZNe@õV]@DR@›X=e@Ss/臑@^R@ή+R@Re@:M@Er2R@zF=e@ZH@qrR@l4 e@>O|i@].R@Ye@uj@GR@zTe@L @qyR@Dme@@<@RR@1Qwe@ef,@KUR@鄜:e@z9@=(R@fPֶe@̮˗@<*DR@#>e@(I;@,gD.R@ e@@vR@O|i@].R@F~tZTe@ZH@qrR@Qe@:M@Er2R@mLe@^rVj@>+R@L 7Je@Qe@@̭R@Fe@)$<܏@I᪭R@ak]De@NupD@b6R@T -`qBe@-@8fJۯR@|Ae@ @tFԍR@#g@@e@dNy@h~R@?e@W` c@Dzh_R@%u3@e@d\Ge@tyy@KR@M!Je@w;@nMS@EʅLLe@V@ cHS@k|Pe@㠠 @xH^iS@;Qe@Y܃@@5S@ŸTe@R@{H@S@,&F8Ve@J2@oyWS@P=aWe@@r}ȖbS@-!rXe@@>y\3mS@-!rXe@kOFRi@? cone@rwqSPe@lv@lv? @ cone@>y\3mS@@e@6  unknown  vertex   straight curve  P@J@`f@ ? {cD@ftreemeg attrib  Z cone surface  P@E@`f@? H@ H@? $@ straight curve  x@J@@e@  point  x@E@@e@ftreemeg attrib  a plane surface  x@J@@e@??  coedge   > 3   ftreemeg attrib  e  face  ,     loop    plane surface  @k%Rd@?;v@Qii  coedge        coedge        coedge        coedge     Q   edge   $@   tangent  coedge        coedge     T   edge  -DT! X-DT!? S  unknown  coedge     Z W  coedge      W  loop  U   vertex   straight curve  @L@d@  edge   $@ U  tangent  point  @Jd@ coedge     ]   edge  @ ^1@   unknown  vertex   straight curve  x@L@e@? nēL3 ۈ'"@ coedge        coedge     b   edge   f$@   unknown  coedge      e  coedge     i e  loop  c   vertex  b straight curve  g+߈@Tq\d@@%dOL2  coedge  j      edge   3@   unknown  coedge   h     face       point  g+8@:;]d@ vertex   straight curve  4@Zd@?  coedge  /   p   edge  !#.@ F@   unknown ftreemeg attrib  U  face      plane surface  4@L@e@? ellipse curve  L@O@e@lvlv@?  point  4@O@e@ point  L@L@e@ coedge    }   intcurve curve   bldcur(g.P@6,@)b;@PTRE? spline  ref null_surface nubs(g.P@)b;@?(g.P@?)b;@ nullbs   straight curve  Fqݒ@ e@  point  Fqݒ@Ne@ftreemeg attrib   sphere surface  Ͷʒ@Pe@-kWA-@&;CSQ@d@ coedge   + , - 4  coedge  . %   /  edge   zJ4p@ 0.@  1 unknown  vertex   2ellipse curve  ,@v1O@@e@5j Ce<ǰQ2t<y\3mS@d@<\AW<! unknown ftreemeg attrib  !J  face ?  @  A cone surface  @>y\3mS@@e@63@p"3@ T 4@Уv4@0A<4@1DI5@۾:75@^0|$6@76@"*7@Tȱt?8@ 8D8@9@vF9@P@TU:@}!}@ 0;@@6Q;@^, <@ZKt<@ xxw<@G=@j7l=@273;>@7>@TcBM?@"?@wP-@@^sЂq@@@d\Ge@Ss/臑@^R2QÈEe@-]n@6#NR7Be@ @ھ9R]!Ae@+RL 7Je@:M@Er2RmLe@ZH@qrRQe@>O|i@].RF~tZTe@uj@GRGl]e@L @pyRAZde@@<@RRϮ]se@ef,@KUR{c4{e@z9@=(Rg)e@̮˗@9*DRste@(I;@*gD.R|te@@vRue@@vRe@z9@=(RfPֶe@ef,@KUR脜:e@@<@RR1Qwe@L @pyRDme@uj@GRzTe@>O|i@].RYe@ZH@qrRl4 e@:M@Er2RzF=e@^rVj@>+RRe@Qe@@̭R9&me@)$<܏@I᪭R"e@NupD@a6Rҟe@-@7fJۯRIPe@ @uFԍRKܘde@dNy@e~R!f@W` c@Bzh_Rۊ2e@`Hge@R@{H@Sbe@J2@oyWS e@@p}ȖbS_nލe@@u!yS_nލe@J2@진S e@R@K=oSbe@Y܃@<@S>`Hge@㠠 @ZeOSbgH&e@V@npQSe@w;@ S5ze@tyy@!SHZNe@õV]@5?`S›X=e@Ss/臑@)&SήO|i@6[8&TYe@uj@TzTe@L @{?TDme@@<@{  T1Qwe@ef,@csT脜:e@z9@){lTfPֶe@̮˗@@ttS#>e@(I;@OqQ"S e@@89SO|i@6[8&TF~tZTe@ZH@7(TQe@:M@d+TmLe@^rVj@;,TL 7Je@Qe@h,`-TFe@)$<܏@¨ .Tak]De@NupD@z.0-TT -`qBe@-@B+T|Ae@ @hr*(T#g@@e@dNy@$%T?e@W` c@8xXT%u3@e@d\Ge@tyy@!SM!Je@w;@ SEʅLLe@V@npQSk|Pe@㠠 @ZeOS;Qe@Y܃@<@SŸTe@R@K=oS,&F8Ve@J2@진SP=aWe@@u!yS-!rXe@@%?  edge  6$@ @6@ 3 X unknown ftreemeg attrib  4_ plane surface  x@J@`f@ ellipse curve   @E@@e@? H H@?  point   @J@@e@ellipse curve  P@E@@e@? H@ H@?  point  P@J@@e@ftreemeg attrib  Jf  loop   J plane surface  @n%R@@e@?j#ʧ<<<  coedge  M   Y K  coedge  Z M [ \   coedge  M Z + ]   coedge  ^ _ M    edge  `$ a M b tangent  coedge  O N c d   coedge  e f N  4  edge  @ g6@ N h unknown  coedge  i j O    edge  k@ 9@ O l unknown  coedge  m P j n   coedge  P m e o   vertex   p vertex  n qstraight curve  @H@e@ ۈ'" nēL3@ coedge  r R     coedge  s t R  @  edge  u@ 1@  v unknown  coedge   S V    coedge  S  s w   vertex   xellipse curve  x@J@d@lv@lv@?  coedge  V U # y W  edge  X$ z V { tangent  face | } W  ~  point  @J@d@ vertex  y straight curve  @J@e@ ۈ'" nēL3@straight curve  4@L@e@?  point  x@L@e@ coedge  `      coedge    `  K  edge   x:@   unknown  coedge   a     coedge  a  c    loop     vertex   straight curve  @qW"Zd@OL2?>%  coedge  d c   e  edge   f3@   unknown  face   e    point  g+߈@Tq\d@ coedge    h    edge   $@ h  unknown  vertex  i straight curve  g+8@:;]d@?  coedge    j  T  edge  m*@ 3@   unknown ftreemeg attrib  k>  face      plane surface  4@Z`f@>%2bOL22bOL2>%?  point  4@Ze@straight curve  4@Z@e@? ftreemeg attrib  rV  face       loop   r plane surface  4@L@d@?  edge M YDJW DJW? w  tangent  coedge        vertex   straight curve  D@@Qd@H˪  coedge     Y   edge  MK MK?   unknown  face  !     point  aJT9_@ΏRd@ coedge        coedge        loop    straight curve  =kWA-@';CSQd@ ;`7 ;`7@ coedge  f    4  edge  MK MK?   unknown  point  =kWA-@';CSQ@e@straight curve  Ͷʒ@ M@@e@? nl=ma i ?-@ftreemeg attrib  R  face       loop  ,  cone surface  ,@K@@e@?lv@lv? ?@  coedge  c  i    coedge    t    coedge        edge  -DT! u-DT!?   unknown ftreemeg attrib  H  loop  ^  cone surface  @F@@e@lvlv@? @  coedge  #   "   edge  z-DT! -DT!?   unknown  coedge   !  y  ellipse curve  x@J@e@?lv@lv?  coedge   4  & /  edge   wr<< '$@ %  tangent  vertex  & ellipse curve  ,@v1O@d@5j Ce¼ǰQ2t?y\3mS@@e@? oēL3 و'(@ point  @>y\3mS@d@ coedge    9   ellipse curve  @>y\3mS@@e@ü\AW¼?!dXZZe@@%?dOL2? &S5 i0@ point  4@Y@e@straight curve  @J@@e@?  edge   @   tangent  coedge        coedge   3  \   edge  `@ 6@   unknown  edge  @ a9@   unknown  coedge        coedge        vertex  \  vertex   straight curve  @H@@e@? nēL3 ۈ'"@ coedge     d   edge  k g@   tangent  coedge     o 4  coedge      4  vertex   straight curve  Ԓ@H@e@?  coedge        coedge     n   vertex   straight curve  D@Hd@  coedge        edge  -DT! -DT!?   unknown  edge  -DT! -DT!?   unknown  point  @H@e@ point  @Hd@ coedge        coedge     w @  coedge      @  vertex   straight curve  4@L@d@?  edge   $@ s  tangent  point  x@L@d@ edge  @ z@[@   unknown  vertex  " straight curve  @J@@e@? nēL3 ۈ'"@ftreemeg attrib  L  face      plane surface  @L@e@?  point  @J@e@ coedge   Q   K  vertex   straight curve  @rW"Zd@?  coedge    S    edge  U@ 3@   unknown  coedge        point  @rW"Zd@ coedge        edge   pFGs&4@   unknown  vertex   straight curve  g+߈@Tq\`f@ ftreemeg attrib  A plane surface  g+߈@Tq\d@2bOL2?>%  coedge        loop     vertex   straight curve  g+8@:;]`f@OL2>%?  point  g+8@:;]`f@ coedge  S    T straight curve  4@Zd@? ftreemeg attrib  ?  face      plane surface  @qW"Zd@>%?2bOL2?2bOL2?>% ftreemeg attrib  W  face   /    loop    plane surface  D@Hd@?  coedge       ellipse curve  Ͷʒ@Pe@?!Z |b?  coedge   i     edge  MK MK?   unknown  point  =kWA-@';CSQd@ellipse curve  @y\3mS@@e@ coedge   = 4 5   vertex  N 6ellipse curve  @   coedge  H < ; ?   edge  @к@ 2yf:@ H A tangent  coedge  J I B C -  coedge  D  I    edge  Zm]9 Eк  F tangent  coedge   K G H   coedge  K  D I   vertex  H J vertex  I Kellipse curve  4@R?DS@e@˿x@ ? straight curve  @k%R@e@  point  @HdaY@e@ellipse curve  @HdaYe@?W;Vi!#.<>%?  edge  L U@ S  unknown  face M k T  N  point  @qW"Ze@straight curve  @% ftreemeg attrib  X plane surface  D@H@@e@?  coedge        coedge        edge  ,zJ4p@ .@  e unknown  vertex   fellipse curve  ,@v1Od@?! F  edge  @*@ 3@   unknown  edge   @   unknown  vertex  > straight curve   ۨ@& 6S@e@¸O? SI Y 42A@ coedge  4 =  C F  edge  E,DT! @>-DT!?   unknown  coedge     I   vertex  5 straight curve   @?/S@@e@?¸O Y 42A SI @ coedge  ; _  H   edge  @ a3@ G  unknown  edge  "@ H6@   unknown  point  4@T@e@ point  4@R?DS@@e@ vertex   ftreemeg attrib  = plane surface  4@Zd@2bOL2>%?? straight curve  ,@H@@e@ ;`2 ;`<@ point  ,@H@d@ coedge  W Z  R   edge  S U$@ Q  tangent  vertex  X ellipse curve  @F@@e@?lvlv@?  vertex  [ ellipse curve  @F@d@lvlv@?  coedge   Q  X   edge  S@ @W@ W  unknown ellipse curve  ,@K@e@lv@lv@?  coedge  Q   [   edge  @ U@W@ Z  unknown straight curve  Ԓ@F@e@? nēL3 ۈ'"@ point  Ԓ@Fd@ point  Ԓ@F@e@ coedge  G   `   edge  a r$@   unknown  vertex  H straight curve  4@T@d@ straight curve  @qW"Z`f@OL2?>% straight curve  4@Z`f@@%?dOL2? straight curve  D@@Qd@?  point  D@v1Od@straight curve  D@v1Od@? ;`7 ;`7@ point  D@K@e@straight curve  D@Kd@ ;`7 ;`7@ point  D@Kd@ellipse curve  L@O@@e@lvlv?  point  L@L@@e@ point  4@O@@e@straight curve  @L@@e@  coedge   +   q  coedge  +  - u q  loop  o 8  vertex  ` straight curve  dތy|7@V@d@?¸O  coedge  = -   F  edge  . 3@ -  unknown  point  dތy|@ AV@d@straight curve  @TT@d@?  point  @TT@@e@straight curve  J8$Wl@I)@@e@¸O ftreemeg attrib  8< plane surface  dތy|7@V@d@¸O??  coedge    < ~ 9  coedge   ;     edge   ~ʼ4@ <  unknown  vertex  > straight curve  @TT@d@?  vertex  ~ straight curve  4@T@`f@  point  @TT@e@ellipse curve  VA@\PS@e@?΀¸O<j\sQ?LF@lv?  point  VA@\PS@@e@straight curve  4@L@@e@?  point  @qW"Z`f@straight curve  Ԓ@F@@e@ ۈ'" nēL3@ point  Ԓ@F@@e@ point  Ԓ@F@d@straight curve  Ԓ@H@@e@ straight curve  Ԓ@Hd@?  coedge  _ } o   straight curve  4@T@d@¸O??  point  4@T@d@ coedge  p o   q  edge   r3@   unknown  point  dތy|7@V@d@ coedge   | t  9  edge   $@ t  unknown  vertex  u straight curve  dތy|@ AV@d@?  coedge  |  }  9  edge   $@ }  unknown straight curve  @TT@`f@¸O?  point  @TT@`f@ point  4@T@`f@ coedge      9  edge   ~ʼ4@   unknown  vertex   straight curve  dތy|7@V@`f@ straight curve  dތy|@ AV@`f@¸O  point  dތy|@ AV@`f@straight curve  4@T@`f@¸O?? straight curve  dތy|@ AV@`f@¸O?  point  dތy|7@V@`f@ End-of-ACIS-data< ???r,@?JOACIS BinaryFileMegaCAD 2013 3D ACIS 22.0.1 NTFri Apr 06 16:20:35 2018?ư>|= body    lump    shell     face      ftreemeg attrib    face    loop   cone surface   zAQB`nhCe@lvlv? ?@ ftreemeg attrib    face       loop    cone surface   zAQB`nhCe@?lvlv@? ?@  coedge       ftreemeg attrib    face       loop   cone surface  @􂢄D]nhCf@?lv@lv? ?@  coedge       coedge   !   coedge   " #   coedge  $ %  &  edge  '-DT! (-DT!?  ) unknown ftreemeg attrib    face * + ,  -  loop  .  cone surface  @􂢄D]nhCf@?lv@lv@? ?@  coedge  / 0 1 2   coedge  3  4 5  coedge   3 6 7  coedge  8 9   ,  edge  :-DT! ;-DT!?  < unknown  coedge    = >   coedge  ? @  ! A  edge  (mm B06ц޿ C tangent  coedge  D E  # F  edge  G06ц? 'mm@ " H tangent  coedge  I  E J &  coedge   K ? L &  loop   M  vertex  J N vertex  ! Oellipse curve   zAQB`@e@?lvlv? ftreemeg attrib     face P Q F  R  loop  =  plane surface  1 `e@??  coedge  S T U V   coedge  W  X Y   coedge   W Z [   coedge  \ ]  2 ^  edge  _-DT! `-DT!? 1 a unknown  coedge    K b  coedge  @ ?  5 A  edge  ;06ц? cmm@ 4 d tangent  coedge  e f  7 g  edge  hmm :06ц޿ 6 i tangent  coedge  j  f k ,  coedge   = @ l ,  vertex   m vertex  l nellipse curve   zAQB`e@lvlv@?  coedge  9 o  > ,  edge  B-DT! G-DT!? = p unknown  coedge  4 % L A  coedge  4 9 l A  loop  q  vertex  > rstraight curve   zAQB"anhCe@? `jDЍ+ `p1c'@ coedge  s " o t F  coedge  " u $ J F  loop  " +  vertex  > vstraight curve   zAQB`nhCe@  `p1c' `jDЍ+@ coedge  w $ x y &  edge  '0e z $ { unknown  coedge  % w 3 b &  edge  c@ (@ % | unknown  face } ~ &    point   zAQB`@e@  point   zAQB"a@e@ftreemeg attrib  +  face  q  plane surface  8"O_06ц.f@ ??  coedge  .   coedge  .   coedge  ] . V ^  edge  -DT! -DT!? U unknown  coedge  0 /   coedge  / Y  edge  `z$%/ nhC? X tangent  coedge  0 [ F  edge  nhC _z$%/@ Z tangent  coedge  1 ^  coedge  1 U ^  loop  1  vertex   vertex  Y ellipse curve  @􂢄D]f@lv@lv?  edge  c-DT! h-DT!? K unknown  vertex  L straight curve   zAQB"anhCe@ `p1c' `jDЍ+@ coedge  6 w g  coedge  6 8 k g  loop  6  vertex  7 straight curve   zAQB`nhCe@? `jDЍ+ `p1c'@ coedge  o 8 ,  edge   :A&@ 8 unknown  edge  ;@ B@ @ unknown  point   zAQB`e@ point   zAQB"ae@ coedge  = j D t , ellipse curve   zAQB`e@lvlv?  face  M A   point   zAQB"ae@ coedge  D F  edge   GA&@ o unknown  coedge  E F  point   zAQB`e@  coedge  K I e &  coedge  I y  edge   z @ x tangent  vertex  y straight curve  ]9R`@e@ ? straight curve   zAQB"a@e@ ftreemeg attrib  M   face   plane surface  u,`@e@ ftreemeg attrib  Q  loop  Q plane surface  ǯ.]`f@  coedge  T S   coedge  S g  edge  z$%/ nhC? tangent  coedge  T  edge  nhC z$%/@ tangent  coedge  U ^  vertex   vertex  ellipse curve  @􂢄D]f@lv@lv@?  coedge  W  edge  -DT! -DT!? unknown  coedge  X ]  coedge  X  loop  X  vertex  straight curve  @􂢄\nhCf@ `p1c( `jDЍ*@ coedge  Z F  coedge  Z s \ F  vertex  straight curve  @􂢄D]nhCf@ ? `jDЍ* `p1c(@ coedge  \ ^  edge  _)  \ unknown  edge  @ `@ ] unknown  face  ^   point  @􂢄D]f@  point  @􂢄\f@ellipse curve   zAQB`@e@?lvlv@?  point   zAQB"a@e@ coedge  e g  edge   h0e @ w unknown  coedge  f g  face  g   point   zAQB`@e@ coedge  j  edge    @ j unknown  vertex  k straight curve  y"m`e@ straight curve   zAQB"ae@ ftreemeg attrib  q plane surface   zAQB"ape@?  coedge  s  edge  G"  unknown  vertex  straight curve  y"m`e@   coedge  u F  coedge  x u  edge  z-DT! @JWƿ unknown  coedge  x  loop  ~  vertex  straight curve  ]9R`@e@  point  ]9R`@e@ ftreemeg attrib  ~   face   cone surface  ]9R`e@@? ?@  coedge   edge  -DT! -DT!? unknown  coedge  g  coedge  g  vertex  straight curve  @􂢄D]nhCf@ `p1c( `jDЍ*@ vertex  straight curve  @􂢄\nhCf@? `jDЍ* `p1c(@ edge   )@ unknown  point  @􂢄\f@ point  @􂢄D]f@ coedge   coedge  ellipse curve  @􂢄D]`f@?lv@lv?  edge  @ @ unknown  face    point  @􂢄\`f@ coedge  F  edge   pwA@ unknown  point  @􂢄D]`f@  coedge   edge    @ unknown  vertex  straight curve  ϲ:`f@  straight curve  @􂢄\f@ ftreemeg attrib    face   plane surface  :v$}^f@??  coedge    g  edge  -DT! @JWƿ  unknown straight curve  ]9R`@e@  coedge   edge   G"@  unknown ftreemeg attrib   plane surface  8"O_06ц.f@??  loop  straight curve  y"m`e@  point  y"m`e@straight curve  y"m`e@ o ~:ƿ>  point  y"m`e@  coedge     edge   8gWj@  unknown  coedge     vertex   ellipse curve  ]9R`e@ ?@?  point  ]9R`@e@ftreemeg attrib    face      loop  plane surface  8w0f_e@??p ~:ƿp ~:ƿ?  coedge  ellipse curve  @􂢄D]`f@?lv@lv@?  coedge    g  edge   pwA@  unknown  point  @􂢄D]`f@ point  @􂢄\`f@ vertex  straight curve  ϲ:`f@?  coedge    straight curve  @􂢄\`f@ ftreemeg attrib   plane surface  @􂢄\f@?  coedge      edge  ω -DT!  unknown  vertex   straight curve  { ^`f@ ? straight curve  ϲ:`f@  point  ϲ:`f@ ftreemeg attrib   plane surface  :ET`Pf@?o ~:?o ~:???  coedge      edge   8gWj@   unknown  vertex   ellipse curve  ]9R`e@?@? straight curve  y"m`e@o ~:???  coedge      coedge     vertex   straight curve  l ʊ_lw!lTe@ p ~:???  edge    @   tangent  point  l ʊ_lw!lTe@ ftreemeg attrib    loop  cone surface  { ^f@@? @  coedge       edge  -DT!? ω@   unknown  vertex  straight curve  { ^`f@?  point  ϲ:`f@ coedge      edge    @  tangent  coedge      ellipse curve  { ^f@ @?  point  { ^`f@  vertex   !straight curve  l ʊ_lw!lTe@p ~:???  point  l ʊ_lw!lTe@ edge    @  " tangent  point  `W_ޓf@ straight curve  l ʊ_lw!lTe@ ellipse curve  { ^f@?@?  point  { ^`f@straight curve  { ^`f@  point  `W_ޓf@straight curve  `W_ޓf@  End-of-ACIS-data< ???r,@?>ACIS BinaryFileMegaCAD 2013 3D ACIS 22.0.1 NTFri Apr 06 16:20:35 2018?ư>|= body    lump    shell     face      ftreemeg attrib     face    loop   plane surface  1 `e@?? ftreemeg attrib    face       loop    plane surface   zAQB"ape@?  coedge       ftreemeg attrib     face       loop   plane surface  u,`@e@  coedge       coedge      coedge   ! "   coedge  #   $  edge  % & C @ ' unknown ftreemeg attrib     face ( ) *  +  loop  ,  cone surface  ]9R`e@@? ?@  coedge  - . / 0   coedge  1  . 2  coedge   1   coedge   /   $  edge  & 3@  4 unknown  coedge 5   6 7   edge  8 & @  9 unknown  coedge  : ;  " <  edge  = % @  > unknown  coedge  ?  ; @ $  loop   A  vertex  " B vertex  Cstraight curve  y"m`e@  ftreemeg attrib    face D E F  G  loop  H  plane surface  8w0f_e@??p ~:ƿp ~:ƿ?  coedge  I J K L   coedge  M  J N   coedge   M  2   coedge   K  0 $  edge  3`2I O  P unknown  coedge Q   R S  edge  T 3 @ . U unknown  vertex  2 Vstraight curve   zAQB"ae@  tagsys attrib    coedge  R W  7 X  edge Y = 8 C @  Z unknown  vertex [ S \straight curve   zAQB"ae@  coedge ] ^ ! W _ <  coedge  ! ^ # @ <  loop  ; `  vertex a 7 bstraight curve  y"m`e@  coedge  c # d e $  edge  fG" % ; g unknown  face h i $  j  point  y"m`e@  point   zAQB"ae@ ftreemeg attrib  )  face k l m  n  loop  o ) cone surface  { ^f@@? @  coedge  p q r s *  coedge  t , q u   coedge  , t - N   coedge  / r , L $  edge  O-DT! v@JWƿ , w unknown  coedge x . - y z   edge  { O @ J | tangent  vertex  N }straight curve  ]9R`@e@ ? tagsys attrib  1 1 coedge  y 6 1 S X  edge ~ T 8@ 1  unknown  vertex  z straight curve   zAQB"a@e@  point   zAQB"a@e@  coedge  6 : _ X  loop  W i tagsys attrib  7 7straight curve  y"m`e@ tagsys attrib  8 8 point   zAQB"ae@tagsys attrib  : : coedge  ; : <  edge  = G"@ : unknown  face  A <  tagsys attrib  = = point  y"m`e@ coedge  ? $  coedge  ? e  edge  / f d unknown  vertex  straight curve  y"m`e@ o ~:ƿ> ftreemeg attrib  A  face  X  plane surface  8"O_06ц.f@ ?? ftreemeg attrib  E  face    loop  E plane surface  ǯ.]`f@  coedge  F  coedge  H *  coedge  H I u *  coedge  K H s $  edge  v 8gWj@ H unknown  coedge  J I   edge   v @ q tangent  vertex  u ellipse curve  ]9R`e@ ?@? tagsys attrib  M M coedge  R M z X  edge  { T`2I@ M unknown  vertex  straight curve  ]9R`@e@  point  ]9R`@e@ tagsys attrib  S Sstraight curve   zAQB"a@e@? tagsys attrib  T T point   zAQB"a@e@ coedge  W X  coedge  d ^  edge   f @ ^ unknown tagsys attrib  _ _ vertex  _ straight curve  y"m`e@o ~:??? ftreemeg attrib  ` plane surface  :ET`Pf@?o ~:?o ~:???  coedge  c $  coedge  c  edge   @ unknown  coedge  d  loop  d  vertex  straight curve  ϲ:`f@   point  ϲ:`f@ tagsys attrib  h A Aftreemeg attrib  i plane surface  8"O_06ц.f@?? ftreemeg attrib  l  face  `   loop  l plane surface  @􂢄\f@?  coedge  m  coedge  o F  coedge  o p F  coedge  r o $  edge  ω -DT! o unknown  coedge  q p *  edge    @ tangent  vertex  straight curve  l ʊ_lw!lTe@ p ~:??? tagsys attrib  t t coedge  y t X  edge  {-DT! @JWƿ t unknown  vertex  straight curve  l ʊ_lw!lTe@  point  l ʊ_lw!lTe@ tagsys attrib  z zstraight curve  ]9R`@e@ tagsys attrib  { { point  ]9R`@e@ coedge  X  coedge   edge   /@ unknown straight curve  ϲ:`f@ tagsys attrib    point  ϲ:`f@ edge   ;LԠ#@ unknown  coedge   coedge   vertex  straight curve  @􂢄\`f@ ?  edge    @ unknown  point  @􂢄\f@ ftreemeg attrib   plane surface  :v$}^f@??  coedge  m  coedge  m  coedge  F  edge    @ tangent  vertex  ellipse curve  { ^f@ @? tagsys attrib    coedge  X  edge   8gWj@ unknown  vertex  straight curve  `W_ޓf@  point  `W_ޓf@ tagsys attrib   ellipse curve  ]9R`e@?@? tagsys attrib    point  l ʊ_lw!lTe@ coedge  X  coedge   edge   ? unknown tagsys attrib   tagsys attrib    vertex  straight curve  ϲ:`f@? straight curve  { ^`f@ ?  edge    @ unknown  point  @􂢄\`f@ straight curve  @􂢄\f@  coedge  m tagsys attrib    coedge  X  edge  -DT!? ω@ unknown  vertex  straight curve  { ^`f@  point  { ^`f@ tagsys attrib   straight curve  l ʊ_lw!lTe@p ~:??? tagsys attrib    point  `W_ޓf@ edge   ;LԠ#@ unknown tagsys attrib   tagsys attrib    vertex  straight curve  @􂢄\f@? tagsys attrib    point  @􂢄\f@straight curve  @􂢄\`f@ tagsys attrib   tagsys attrib   ellipse curve  { ^f@?@? tagsys attrib    point  { ^`f@tagsys attrib   straight curve  { ^`f@? tagsys attrib    point  @􂢄\`f@ End-of-ACIS-data ?U ??;J7@ y"m`e@ ϲ:`f@y"m`e@ϲ:`f@ @􂢄\f@ϲ:`f@@􂢄\f@ @􂢄\f@@􂢄\f@@􂢄\f@@􂢄\`f@@􂢄\`f@@􂢄\f@{ ^`f@{ ^`f@@􂢄\`f@`W_ޓf@{ ^f@@-DT!?ω@l ʊ_lw!lTe@l ʊ_lw!lTe@`W_ޓf@]9R`@e@ ]9R`e@@-DT!@JWƿ zAQB"a@e@ ]9R`@e@ zAQB"a@e@ zAQB"ae@ zAQB"a@e@ zAQB"ae@  zAQB"ae@ zAQB"ae@ zAQB"ae@ y"m`e@ y"m`e@ zAQB"ae@ zAQB"a@e@ zAQB"ae@    @$@ zAQB"ae@ zAQB"a@e@     @$@@􂢄\f@ @􂢄\`f@     @$@@􂢄\`f@@􂢄\f@    @$@ ؒ@cXSO@@e@@dXM@@e@0  0  @$@Ͷʒ@cXSO@@e@ؒ@cXSO@@e@0  0  @$@Ͷʒ@cXSO@@e@}gxb@@cXSO@lw!lTe@/  /  @$@}gxb@@cXSO@lw!lTe@Hf@cXSO@ޓf@.  .  @$@Hf@cXSO@ޓf@wA@cXSO@`f@-  -  @$@wA@cXSO@`f@@cXSO@`f@g  g  @$@@cXSO@`f@@cXM@`f@g  g  @$@@cXM@`f@@cXL@`f@g  g  @$@@cXL@`f@@cXSK@`f@g  g  @$@@cXSK@`f@wA@cXSK@`f@g  g  @$@wA@cXSK@`f@Hf@cXSK@ޓf@-  -  @$@Hf@cXSK@ޓf@}gxb@@cXSK@lw!lTe@.  .  @$@}gxb@@cXSK@lw!lTe@Ͷʒ@cXSK@@e@/  /  @$@Ͷʒ@cXSK@@e@ؒ@dXSK@@e@0  0  @$@@dXL@@e@ؒ@dXSK@@e@0  0  @$@@dXL@@e@@dXM@@e@0  0  @$@ G ???;J7@?-ACIS BinaryFileMegaCAD 2013 3D ACIS 22.0.1 NTFri Apr 06 16:20:35 2018?ư>|= body    lump    shell     face      ftreemeg attrib     face    loop   cone surface  ݸփ`e@@? ?@ ftreemeg attrib    face       loop    plane surface  8<>`܂f@??p ~:ƿp ~:ƿ?  coedge       ftreemeg attrib    face       loop   cone surface  zZ@i_@f@@? @  coedge       coedge      coedge   ! "   coedge  #   $  edge  %-DT! &@JWƿ ' unknown ftreemeg attrib    face ( ) *  +  loop  ,  plane surface  |7~]f@  coedge  - . / 0   coedge  1  . 2  coedge   1   coedge   /   $  edge  & 38gWj@  4 unknown  coedge    5 6   edge  7 &B~2@  8 tangent  coedge  9 :  " ;  edge  < %B~2@  = tangent  coedge  >  : ? $  loop   @  vertex  " A vertex  Bellipse curve  ݸփ`e@B~2?@? ftreemeg attrib    face C D E  F  loop  G  plane surface  FC Zu!fLg@?  coedge  H I J K   coedge  L  I M   coedge   L  2   coedge   J  0 $  edge  3ω N-DT!  O unknown  coedge    P Q  edge  R 3B~2@ . S tangent  vertex  2 Tstraight curve  |I`He@B~2p ~:???  coedge  P U  6 V  edge  <-DT! 7@JWƿ  W unknown  vertex  Q Xstraight curve  |I`He@  coedge  Y ! U Z ;  coedge  ! Y # ? ;  loop  : [  vertex  6 \straight curve  ݸփ`e@  coedge  ] # ^ _ $  edge  `fա % : a unknown  face b c $  d  point  ݸփ`e@B~2 point  |I`He@B~2ftreemeg attrib  )  face e [ f  g  loop  h ) plane surface  @􂢄d_F9Cg@??  coedge  i j k l *  coedge  m , j n   coedge  , m - M   coedge  / k , K $  edge  N o\H!5@ , p unknown  coedge  . - q r   edge  s NB~2@ I t tangent  vertex  M uellipse curve  zZ@i_@f@B~2@?  coedge  q 5 1 Q V  edge  7 R8gWj@ 1 v unknown  vertex  r wstraight curve  [2`p ~:Vf@  point  [2`p ~:Vf@B~2 coedge  5 x 9 Z V  loop  U c ellipse curve  ݸփ`e@?@?  point  |I`He@ coedge  : 9 y z ;  edge  < {fա@ 9 | unknown  face } @ ;  ~  point  ݸփ`e@ coedge  k > h  $  coedge  y > _ f  edge  P7b1 ` ^ unknown  vertex  z straight curve  ݸփ`e@B~2? ftreemeg attrib  @  face  V  plane surface  Q_>|CWf@B~2?? ftreemeg attrib  D  loop  ^ D plane surface  d{kmau!ff@?  coedge  ]  E  coedge  G *  coedge  G H n *  coedge  J ] G l $  edge  o n3Č!@ G unknown  coedge  I H   edge   oB~2@ j unknown  vertex  n straight curve  zZ@i_f@B~2?  coedge  P L r V  edge  s-DT!? Rω@ L unknown  vertex  straight curve  zZ@i_f@  point  zZ@i_f@B~2straight curve  |I`He@p ~:???  point  [2`p ~:Vf@ coedge  U V  coedge  ^ Y z f  edge  { `B~2@ Y unknown  vertex  Z straight curve  ݸփ`e@ ftreemeg attrib  [ plane surface  ~c`e@  edge  Z,G@ |J@ h unknown  coedge  ^ f  vertex  straight curve  d{kmae@B~2  point  d{kmae@B~2ftreemeg attrib  c plane surface  Q_>|CWf@??  coedge  h E  coedge  h i E  coedge  j i *  edge   B~2@ unknown  vertex  straight curve  FC Zf@B~2?  coedge  q m V  edge  s \H!5@ m unknown  vertex  straight curve  FC Zf@  point  FC Zf@B~2ellipse curve  zZ@i_@f@?@?  point  zZ@i_f@ coedge  x V  coedge  y x f  edge  { P7b1@ unknown straight curve  d{kmae@  point  d{kmae@straight curve   zAQB"aF9Cg@B~2  edge   B~2@ unknown  point  d{kmaF9Cg@B~2 coedge  E  coedge  V  edge   n3Č!@ unknown  vertex  straight curve  FC ZF9Cg@  point  FC ZF9Cg@B~2straight curve  zZ@i_f@?  point  FC Zf@ edge  |J Z,G@@ unknown  vertex  straight curve  d{kmae@? straight curve  d{kmaF9Cg@ straight curve  FC Zf@?  point  FC ZF9Cg@straight curve   zAQB"aF9Cg@?  point  d{kmaF9Cg@ End-of-ACIS-dataGG ???;J7@? -ACIS BinaryFileMegaCAD 2013 3D ACIS 22.0.1 NTFri Apr 06 16:20:35 2018?ư>|= body    lump    shell     face      ftreemeg attrib     face    loop   cone surface  ݸփ`e@@? ?@ ftreemeg attrib    face       loop    plane surface  8<>`܂f@??p ~:ƿp ~:ƿ?  coedge       ftreemeg attrib    face       loop   cone surface  zZ@i_@f@@? @  coedge       coedge      coedge   ! "   coedge  #   $  edge  %-DT! &@JWƿ ' unknown ftreemeg attrib    face ( ) *  +  loop  ,  plane surface  |7~]f@  coedge  - . / 0   coedge  1  . 2  coedge   1   coedge   /   $  edge  & 38gWj@  4 unknown  coedge    5 6   edge  7 &B~2@  8 tangent  coedge  9 :  " ;  edge  < %B~2@  = tangent  coedge  >  : ? $  loop   @  vertex  " A vertex  Bellipse curve  ݸփ`e@B~2?@? ftreemeg attrib    face C D E  F  loop  G  plane surface  @􂢄\u!fLg@?  coedge  H I J K   coedge  L  I M   coedge   L  2   coedge   J  0 $  edge  3ω N-DT!  O unknown  coedge    P Q  edge  R 3B~2@ . S tangent  vertex  2 Tstraight curve  |I`He@B~2p ~:???  coedge  P U  6 V  edge  <-DT! 7@JWƿ  W unknown  vertex  Q Xstraight curve  |I`He@  coedge  Y ! U Z ;  coedge  ! Y # ? ;  loop  : [  vertex  6 \straight curve  ݸփ`e@  coedge  ] # ^ _ $  edge  `fա % : a unknown  face b c $  d  point  ݸփ`e@B~2 point  |I`He@B~2ftreemeg attrib  )  face e [ f  g  loop  h ) plane surface  @􂢄d_F9Cg@??  coedge  i j k l *  coedge  m , j n   coedge  , m - M   coedge  / k , K $  edge  N o3T%'@ , p unknown  coedge  . - q r   edge  s NB~2@ I t tangent  vertex  M uellipse curve  zZ@i_@f@B~2@?  coedge  q 5 1 Q V  edge  7 R8gWj@ 1 v unknown  vertex  r wstraight curve  [2`p ~:Vf@  point  [2`p ~:Vf@B~2 coedge  5 x 9 Z V  loop  U c ellipse curve  ݸփ`e@?@?  point  |I`He@ coedge  : 9 y z ;  edge  < {fա@ 9 | unknown  face } @ ;  ~  point  ݸփ`e@ coedge  k > h  $  coedge  y > _ f  edge  P7b1 ` ^ unknown  vertex  z straight curve  ݸփ`e@B~2? ftreemeg attrib  @  face  V  plane surface  Q_>|CWf@B~2?? ftreemeg attrib  D  loop  ^ D plane surface  d{kmau!ff@?  coedge  ]  E  coedge  G *  coedge  G H n *  coedge  J ] G l $  edge  o n3Č!@ G unknown  coedge  I H   edge   oB~2@ j unknown  vertex  n straight curve  zZ@i_f@B~2?  coedge  P L r V  edge  s-DT!? Rω@ L unknown  vertex  straight curve  zZ@i_f@  point  zZ@i_f@B~2straight curve  |I`He@p ~:???  point  [2`p ~:Vf@ coedge  U V  coedge  ^ Y z f  edge  { `B~2@ Y unknown  vertex  Z straight curve  ݸփ`e@ ftreemeg attrib  [ plane surface  ~c`e@  edge  7 |J@ h unknown  coedge  ^ f  vertex  straight curve  d{kmae@B~2  point  d{kmae@B~2ftreemeg attrib  c plane surface  Q_>|CWf@??  coedge  h E  coedge  h i E  coedge  j i *  edge   B~2@ unknown  vertex  straight curve  @􂢄\f@B~2?  coedge  q m V  edge  s 3T%'@ m unknown  vertex  straight curve  @􂢄\f@  point  @􂢄\f@B~2ellipse curve  zZ@i_@f@?@?  point  zZ@i_f@ coedge  x V  coedge  y x f  edge  { P7b1@ unknown straight curve  d{kmae@  point  d{kmae@straight curve   zAQB"aF9Cg@B~2  edge   B~2@ unknown  point  d{kmaF9Cg@B~2 coedge  E  coedge  V  edge   n3Č!@ unknown  vertex  straight curve  @􂢄\F9Cg@  point  @􂢄\F9Cg@B~2straight curve  zZ@i_f@?  point  @􂢄\f@ edge  |J 7@ unknown  vertex  straight curve  d{kmae@? straight curve  d{kmaF9Cg@ straight curve  @􂢄\f@?  point  @􂢄\F9Cg@straight curve   zAQB"aF9Cg@?  point  d{kmaF9Cg@ End-of-ACIS-dataG ???;J7@? 93ACIS BinaryFileMegaCAD 2013 3D ACIS 22.0.1 NTFri Apr 06 16:20:35 2018?ư>|= body    lump    shell     face      ftreemeg attrib     face    loop   cone surface  ݸփ`e@@? ?@ ftreemeg attrib    face       loop    plane surface  8<>`܂f@??p ~:ƿp ~:ƿ?  coedge       ftreemeg attrib    face       loop   cone surface  zZ@i_@f@@? @  coedge       coedge      coedge   ! "   coedge  #   $  edge  %-DT! &@JWƿ ' unknown ftreemeg attrib    face ( ) *  +  loop  ,  plane surface  |7~]f@  coedge  - . / 0   coedge  1  . 2  coedge   1   coedge   /   $  edge  & 38gWj@  4 unknown  coedge 5   6 7   edge  8 &B~2@  9 tangent  coedge  : ;  " <  edge  = %B~2@  > tangent  coedge  ?  ; @ $  loop   A  vertex  " B vertex  Cellipse curve  ݸփ`e@B~2?@? ftreemeg attrib    face D E F  G  loop  H  plane surface  @􂢄\u!fLg@?  coedge  I J K L   coedge  M  J N   coedge   M  2   coedge   K  0 $  edge  3ω O-DT!  P unknown  coedge Q   R S  edge  T 3B~2@ . U tangent  vertex  2 Vstraight curve  |I`He@B~2p ~:??? tagsys attrib    coedge  R W  7 X  edge Y =-DT! 8@JWƿ  Z unknown  vertex [ S \straight curve  |I`He@  coedge ] ^ ! W _ <  coedge  ! ^ # @ <  loop  ; `  vertex a 7 bstraight curve  ݸփ`e@  coedge  c # d e $  edge  f`(T7 % ; g unknown  face h i $  j  point  ݸփ`e@B~2 point  |I`He@B~2ftreemeg attrib  )  face k ` l  m  loop  n ) plane surface  @􂢄d_F9Cg@??  coedge  o p q r *  coedge  s , p t   coedge  , s - N   coedge  / q , L $  edge  O u3T%'@ , v unknown  coedge w . - x y   edge  z OB~2@ J { tangent  vertex  N |ellipse curve  zZ@i_@f@B~2@? tagsys attrib  1 1 coedge  x 6 1 S X  edge } 8 T8gWj@ 1 ~ unknown  vertex  y straight curve  [2`p ~:Vf@  point  [2`p ~:Vf@B~2 coedge  6 : _ X  loop  W i tagsys attrib  7 7ellipse curve  ݸփ`e@?@? tagsys attrib  8 8 point  |I`He@tagsys attrib  : : coedge  ; : <  edge  = `(T7@ : unknown  face  A <  tagsys attrib  = = point  ݸփ`e@ coedge  q ? n $  coedge  ? e l  edge  P7b1 f d unknown  vertex  straight curve  ݸփ`e@B~2? ftreemeg attrib  A  face  X  plane surface  Q_>|CWf@B~2?? ftreemeg attrib  E  loop  d E plane surface   zAQB"au!ff@?  coedge  c F  coedge  H *  coedge  H I t *  coedge  K c H r $  edge  u n3Č!@ H unknown  coedge  J I   edge   uB~2@ p unknown  vertex  t straight curve  zZ@i_f@B~2? tagsys attrib  M M coedge  R M y X  edge  z-DT!? Tω@ M unknown  vertex  straight curve  zZ@i_f@  point  zZ@i_f@B~2tagsys attrib  S Sstraight curve  |I`He@p ~:??? tagsys attrib  T T point  [2`p ~:Vf@ coedge  W X  coedge  d ^ l  edge   fB~2@ ^ unknown tagsys attrib  _ _ vertex  _ straight curve  ݸփ`e@ ftreemeg attrib  ` plane surface  ~c`e@  edge  7  n unknown  coedge  d l  vertex  straight curve   zAQB"ae@B~2  point   zAQB"ae@B~2tagsys attrib  h A Aftreemeg attrib  i plane surface  Q_>|CWf@??  coedge  n F  coedge  n o F  coedge  p o *  edge   B~2@ unknown  vertex  straight curve  @􂢄\f@B~2? tagsys attrib  s s coedge  x s X  edge  z 3T%'@ s unknown  vertex  straight curve  @􂢄\f@  point  @􂢄\f@B~2tagsys attrib  y yellipse curve  zZ@i_@f@?@? tagsys attrib  z z point  zZ@i_f@ coedge  X  coedge  l  edge   P7b1@ unknown straight curve   zAQB"ae@ tagsys attrib    point   zAQB"ae@straight curve   zAQB"aF9Cg@B~2  edge   B~2@ unknown  point   zAQB"aF9Cg@B~2 coedge  F tagsys attrib    coedge  X  edge   n3Č!@ unknown  vertex  straight curve  @􂢄\F9Cg@  point  @􂢄\F9Cg@B~2tagsys attrib   straight curve  zZ@i_f@? tagsys attrib    point  @􂢄\f@ edge   7@ unknown tagsys attrib   tagsys attrib    vertex  straight curve   zAQB"ae@? straight curve   zAQB"aF9Cg@ tagsys attrib   tagsys attrib   straight curve  @􂢄\f@? tagsys attrib    point  @􂢄\F9Cg@tagsys attrib   straight curve   zAQB"aF9Cg@? tagsys attrib    point   zAQB"aF9Cg@ End-of-ACIS-data B~2?U ??;J7@ݸփ`e@ zAQB"ae@ݸփ`e@ zAQB"ae@  zAQB"aF9Cg@ zAQB"ae@ zAQB"aF9Cg@ @􂢄\F9Cg@ zAQB"aF9Cg@@􂢄\F9Cg@ @􂢄\f@@􂢄\f@@􂢄\F9Cg@zZ@i_f@zZ@i_f@@􂢄\f@[2`p ~:Vf@zZ@i_@f@@-DT!?ω@|I`He@|I`He@[2`p ~:Vf@ݸփ`e@ ݸփ`e@@-DT!@JWƿ|J@ d{kmaF9Cg@B~2@jm#@? FC Zf@B~2YX@cXM@e@ؒ@tccO@e@      @$@'0В@vccO@e@ؒ@tccO@e@    @$@'0В@vccO@e@u̒@W=U\O@,7te@      @$@u̒@W=U\O@,7te@_ʒ@V=U\O@v e@      @$@MȒ@{ccO@He@_ʒ@V=U\O@v e@      @$@MȒ@{ccO@He@MQ7ǒ@uccO@+'W!f@    @$@L ƒ@A*]O@p ~:Vf@MQ7ǒ@uccO@+'W!f@      @$@L ƒ@A*]O@p ~:Vf@gK@A*]O@f@      @$@gK@A*]O@f@xA@vccO@f@      @$@xA@vccO@f@@uccO@f@      @$@@uccO@f@X}@dXM@f@    @$@X}@dXM@f@X}@dXL@f@    @$@X}@dXL@f@@QMVCK@f@    @$@@QMVCK@f@wA@RMVCK@f@    @$@gK@4SJK@f@wA@RMVCK@f@    @$@gK@4SJK@f@L ƒ@ 4SJK@p ~:Vf@    @$@MQ7ǒ@RMVCK@+'W!f@L ƒ@ 4SJK@p ~:Vf@    @$@MQ7ǒ@RMVCK@+'W!f@MȒ@LMVCK@He@    @$@_ʒ@ss=JK@y e@MȒ@LMVCK@He@      @$@_ʒ@ss=JK@y e@u̒@ps=JK@.7te@      @$@u̒@ps=JK@.7te@'0В@QMVCK@e@        @$@'0В@QMVCK@e@ؒ@RMVCK@e@      @$@ؒ@RMVCK@e@YX@dXL@e@      @$@YX@cXM@e@YX@dXL@e@    @$@ ??9Dcݕ@`Jc.3^f@  5p |012{zz{yzx }x }  !!"#$$%&''()**+,--./0||{~zyyx}~xy{|~}~83?3445566779:;;<=>?E@38@A43AB54BC65CD76DF97LGQRSTHGIHJIKJMNOKOFDDCCBBAA@@EPQZUhiVUWVXWYX[\Y\]^__``aabbccdefghdcbaa`_^jklplmnorpqtuvrsxMKvwJKIJHIGHLyz{G{|}~`_cbUZVUWVXWYX[Y      ' !!"##$%%&(4)C)*++,--.//0112335667 78 9:     :; <(&$  &%"  $#   "!    = '>  =?  >@  ?A @B  AC B                                                      89        ;<               ODE*)4FG,+*EI.-,GH0KLM21IJK0/.MNP532PN$ ^NML# $ LKJ" # JIH! 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MLTUV" KJWX " VYZ  X[\  Z]^  \_`  ^ab `I:;< b<=>?  ?@AB  BCDE  EFGH                                             PO  Q                    LTS yPESRQ    }|{zy ~} fZihgfedZ(<;:98765P^]\[ZYX# ( # - ( 2 - 7 2 < 7 A < ucA A cdeB = B C > > 9 8 = ? > C D D E @ ? iD C ghkE D ijmnE klo@ E np; @ oq6 ; pr1 6 qs, 1 rt' , suvw' twxy& ' yz{% & {|}$ % }~# $ $ # ( ) ) * % $ . ) ( - 3 2 7 8 4 9 : 5 5 0 / 4 6 5 : ; 1 0 5 6 , + 0 1 ' & + , & % * + + * / 0 * ) . / / . 3 4 . - 2 3 fgC B e4 3 8 9 8 7 < = = < A B : 9 > ? ; : ? @ ubdcfedhgfjihlmkjl=K J <;:P K =9P :Q P R Q S R T S T T O N O F G G H M N V G F U U Z [ V U F Z U _ Z d _ d e d f e g f h g bah a`_c h _^ c  Y ^ J Y Y J I X X ] ^ Y W X I H V W H G [ \ W V ` [ Z _ e ` _ d f a ` e g b a f h c b g c ^ ] b b ] \ a ] X W \ F O H I L M I J K L L K P Q M R S N L Q R M O N S T \ [ ` a FONM9Mxwl wvutsk l srqpoj k onmlki j kj^i i m n m q r r s o n v r q u u y z v u q y u   ~ } } | { ~ } | x x w { | t x p l k o p l j n o k i m n j q m ~  ~ { z  { w v z w s r v x t s w t p o s p t  y y  z | }                          RSPQRNOPLMNJTKLJ~~}|{z|xzyvuxwv"     &%$#"! '(/.-,+*)0187654329"9<;87>=<9@654A>76@?432BA21DCB0/FED1:GF/..IH:IbaKJH`_MLKa]ONM_^Q[ZYSR]\[QPOYXWUTSVUWVUWIWUTcXYqrst[opqYZl]^_jko[\]lmn_`aghijdefgabu uvw wxy yz{ {|} }~        b da` b_^ `]\ ^[Z \YX Zc X                   tsr sqp ron pm nlk mji kh igf he fvuxwvzyx|~}|{z~                          -                                 $  * $ * + * , + - , . - / . /  !) / !"## ) #$% # %&'  '()  )*+  +,-                                   % $ * + & , - ' ' ! & ( ' - . ) ( . / # " ( )   " #                   ! "   !     % &   $ %         " ! ' ( & % + , 9.?0./201456234786<=>8:;N@ABCDAFGDE IJKL  HI  GLMO  [P/.9QR10/PT321RSW543TUVY765WX:87YZ\s]8 xyz{`7 8 ]^_6 bcde5 5 EDC6 5 4 FEefg4 5 ghij3 4 jkl2 3 lmno1 2 opqr0 1 rtuv0 0 vOMK1 0 ML2 JIH3 KJ2 1 GF4 3 HA@8 7 BNwx8 @CB7 6 6 7 `ab|}~> = > ~< = ; < : ; 9 : 9 ? 9 \Z? ZYX@ ? 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"# #$% %& &      '() *+,-  )*   :/0 120423678 45689;   G<=!>?=A?@CABEFH" DEC[I hIJKL LMNO OPQR RSTU UVWX XYZ\]^_ _`ab bcd 987 3 541 32/ 10e /:f egh f ;9 d65 7 ti ijk klm mno opq qrs suv vwx | z{~ |} ~  F HED FCB DA@ B?> @=< >G <       yz x           \ZY YXWV VUTS PONM MLKJ JI[    SRQP jitlkjnmlprqponusr                                                                                    $   # # ) * $ #  ) # / ) 5 / ; 5 ; < ; = < > = ? > @ ? @  : @   4 :   . 4 ( . " (  "        ! "             !   &  % % + , & $ %   * + % $ 0 * ) / 6 5 ; < 7 = > 8 8 2 1 7 9 8 > ? : 9 ? @ 4 3 9 : . - 3 4 ( ' - . " ! ' ( ! & ' ' & , - - , 2 3 , + 1 2 + * 0 1 1 0 6 7 0 / 5 6           3 2 8 9 7 6 < =      tG!""%$#('&%+.-,+*)( !10/.1!A R A G R S G ^ S _ ^ j _ [=j j =<;i ` i h a a \ ] ` b a h g g f c b 7g h 985f g 763e f 54>?e 32@Ad e ?BCY d ADEX Y CFGL X EHIM L GJKF M I! 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X?"z?^?yEW? .4e?x[m4?P_a?F1y?i?rV@@8xF@a@ۮEd@@]0@yEW@oޛJ@JO@g/f@ﵷַ@ZIk#O@e&UuŹ@c{{O@M=Eպf@ G@Vgs."O@t:f@O@t@ye}O@{i.f@j.@#2+}O@΅,}@f@0^Ľ@~'}O@m3f@%F۽@\p}O@uf@8@3 ~O@QoC f@C@S~O@-3ʀf@; @ A~O@IA f@Y(@F!~O@F3Lf@I]C@i~3~O@}&~f@/U@>A~O@fFK~f@WȨ@'g~O@.'|f@l@}~O@I}_b{f@'JȾ@˶~O@8Q~zf@K侒@u~O@%|yf@ Jx@BK O@)Օuxf@)7_@ۥO@Xxf@`!@i7O@nwf@ц3@vcO@yvf@]tXH@O@A孯uf@̚s@nƼO@Ǿsf@H@UO@krf@27#}@SYO@ 6%qf@۹ȿ@{%рO@U0,pf@7@8/WO@Y6nf@?@4O@L8mf@|@q:+=O@߶.r9lf@4k-@8O@hjJ4kf@H]_@@lHeO@k-jf@Ԝ@@MpO@fj)jf@7 PS@Í|O@P%if@țe@36O@hf@qv@^'O@.gf@PH@ JO@k+ ef@`]@4neO@̞lbf@6@uXlO@daf@ށN@+^w[O@E_f@kMk@-FGO@]f@g@WUUO@Ee\f@)Q_@8?O@O>[f@r(@JO@+zZf@ null_surface null_surface nullbs nullbs K?K? ??8Cp?K?i?1ݢ? X?"z?^?yEW? .4e?x[m4?P_a?F1y?i?rV@@8xF@a@ۮEd@@]0@ ?  intcurve  ref intcurve  offintcur nubsK? .4e?@8xF@yEW@fK@¹VN@f@IM@wX+N@f@ҴV@oܘN@f1j~f@^7@r=ВN@Zxf@:Q%@r3N@i3Hsf@0+;p@1N@bӎif@0tF@h0N@df@ns@\qN@`$#Xf@:@=aAN@EѤQf@i,@¹VN@? Kf@@@ toruswA@2]~̩P@f@ L9y?@? conegK@X&Q@@f@ L9y< L9yʼ? ?@ nullbs nullbs     ? ?Nz? ??  ??i?"z?yEW?x[m4?i?ۮEd@yEW@Nz? ftreemeg attrib    face       loop    spline surface   rbblnsur blendsupsur planeCxgzǒ@X&Q@܂f@??LN7C<p ~:?p ~:?4Mic intcurve  exactcur nubs (n/=Go?Mo?R?{ScJA?fs?Po?i,@¹VN@? Kf@ٗ[;@|U K^N@(WHf@ J@a VN@B}-Ef@X@1g:N@VУBCf@Z9v@$|լN@>f@$Z@~ju N@K8f@JB@cyN@Φ>6f@_ ᦹ@[.ҒN@OpX2f@fо@9RN@zĜ$.f@׾@~\޵N@.,f@澒@ɕN@-)*f@:@b,GŷN@\%9'f@\@+N@XJ6.&f@?x# @x2eN@#f@*@4pwN@F=m f@}"@rN@a6f@Ă1@?N@W8Pf@_ @@u]N@qBo7f@iH@^5rN@f@O@$v}N@f@nW@$v}N@q ~:f@ null_surface null_surface nullbs nullbs Go?Mo?R?{ScJA?fs? ?  intcurve  exactcur nubs  (n/=Ѻ?Go?џ%?Mo?R?f*4?{ScJA?fs?Po?L ƒ@¹VN@n ~:Vf@Cƒ@>`N@,Tf@aƒ@T PgN@I+݋Sf@">4$ƒ@. iN@.4Rf@2ƒ@qUN@tLOf@R Aƒ@vHd,N@U[Lf@1Iƒ@{ N@7bKKf@@\6Uƒ@|N@乄If@haƒ@ZۭN@![[Gf@W]fƒ@"fN@kzFf@?uƒ@dN@=Cf@ ^'ƒ@<{N@42Af@bƒ@`kN@o?f@ᅟƒ@n\8N@;Y{ƒ@!N@(W2f@^ƒ@7XN@>u1f@eGƒ@7]oaN@%\l0f@ټBƒ@ N@Ւ?.f@ ƒ@4pwN@B#{+f@Ɲldǒ@rN@u#*f@`eǒ@?N@>]'f@-g!ǒ@u]N@) |T%f@5y(ǒ@^5rN@F> $f@ni0ǒ@$v}N@ꖫ"f@MQ7ǒ@$v}N@('W!f@ null_surface null_surface nullbs nullbs Ѻ?Go?џ%?Mo?R?f*4?{ScJA?fs? ?  intcurve  exactcur nubs  (n/=Ѻ?Go?џ%?Mo?R?f*4?{ScJA?fs?Po?r(@JO@+zZf@l̥9@sO@Yf@u&'J@_ԙ"O@ԣCWf@ Z@5\ΊO@#|Vf@.Ez@rO@ 'Sf@t@MPO@h2Pf@K©@8TO@Ր޿Nf@ոS@@ێO@!)KLf@D%~@cq;ŏO@HIf@ȅ@߫,"O@Hf@K’@2O@3}Ef@U{s"’@@|N0O@'\Bf@5’@'^2ВO@1ʓ@f@ 8W’@E|$דO@>Ò@5N1O@ө,rf@*ixGÒ@5N1O@Mf@ null_surface null_surface nullbs nullbs Ѻ?Go?џ%?Mo?R?f*4?{ScJA?fs? ?  intcurve  ref intcurve  offintcur nubsPo?i,@¹VN@? Kf@9@sN@T9f@@4v}N@\4:'f@nW@4v}N@q ~:f@@@ toruswA@2]~̩P@f@ L9y?@? planeCxgzǒ@X&Q@܂f@??LN7C<p ~:?p ~:?4MicNf@Mr ~:?[6Mic<%J??/??? ?@  coedge     ! coedge  " # $  % coedge  " & '  ( coedge     ) edge  * +|jc? , tangent  pcurve    exppc nubs|jc?yEW@?yEW@ spline  ref ftreemeg attrib    face - . /  0  loop  1  spline surface   rbblnsur blendsupsur cone'0В@X&Q@e@ L9y< L9y? @ null_curve nullbs blendsupsur cone("ɒ@2]~̩P@m^f@Mr ~:?[6Mic<%^ȨH;f"do߿? @ null_curve nullbs+:0yE> intcurve  exactcur nubspr?pr?(@,?pr?Jj@'v}N@e@K9@'v}N@k#e@~@FKRfN@^)Ge@b+@O17N@le@LI@тN@.??e@ @k@+XXŸN@{e@K~@Ԫ;N@h;\'e@炢 @\N@Re@cE@ dN@R+e@s@<>N@Kve@zyO’@6Z4N@c;e@ zpO’@ZkN@_(|Ye@Lk’@bgAN@M7e@qXM’@P{N@Y7ʥe@Q’@LAN@SPC e@ null_surface null_surface nullbs nullbs pr?pr?(@,? ?  intcurve  exactcur nubs+Hވ?pr?yr?pr?Ԃ\}?(@,?pr?MȒ@'v}N@He@(Ȓ@'v}N@Bae@o|,Ȓ@k`wN@tI7e@4 [Ȓ@oS/kN@}7_e@`CȒ@f|GN@Gce@5|Ȓ@+ N@ۮdhe@Ȩɒ@B_N@ e@rIɒ@2N@0!e@ɒ@)AUN@e@$ɒ@bgAN@ 릛e@%@ɒ@P{N@,e@^Kɒ@LAN@((̡e@ null_surface null_surface nullbs nullbs +Hވ?pr?yr?pr?Ԃ\}?(@,? ?  intcurve  exactcur nubs+Hވ?pr?yr?pr?Ԃ\}?(@,?pr?mwVĒ@5N1O@mw!lTe@S+Ē@5N1O@rQe@I~Œ@oz?-O@D(&Ne@Œ@+v%O@ -Le@)Œ@RQ O@b?Te@9M"Œ@%s O@;4P]e@;(Œ@~>ϗO@mhe@|4Œ@c]`O@(e@KƐ@Œ@h9EkO@1:2e@XEŒ@@4SO@ye@Z TŒ@vO@+e@DNdŒ@kժO@҇}3e@oŒ@fO@>^e@opŒ@nEԕO@gcxֻe@ x>Œ@)O@x0JTe@ FŒ@ϔO@e@A{`Œ@s+:O@n` 5e@p 4Œ@=RO@4tTe@EOŒ@^O@RE몳e@)cŒ@#0xO@R$e@5#ƒ@,zO@KBޥe@P&ƒ@jO@fo#Ӭe@9=ƒ@6O@ Ue@:UtTƒ@ΥO@=e@ null_surface null_surface nullbs nullbs +Hވ?pr?yr?pr?Ԃ\}?(@,? ?  intcurve  ref  intcurve  offintcur nubspr?Jj@3v}N@e@ P@4v}N@Vנe@@ZhcRN@(;ﮯe@Q’@LAN@SPC e@@@ cone("ɒ@2]~̩P@m^f@Mr ~:?[6Mic<%^ȨH;f"do߿? @ cone'0В@X&Q@e@ L9y< L9y? @ nullbs nullbs     ? ? d? ??+Hވ?yr?Ԃ\}?pr? d?  coedge  2 3 4 5   coedge    6 7 8 coedge    9 : ; coedge  3 2    edge  < = tangent  pcurve    exppc nubs intcurve  exactcur nubsr?r?r@,?r?'˒@LAN@M7fe@xQ̒@P{N@^3؛ee@߼T̒@bgAN@~ee@vS̒@ZkN@ ~de@c ͒@1Z4N@(}ce@#2͒@<>N@]be@A͒@ dN@=be@~GΒ@\N@ϋae@Q,Β@֪;N@?`e@ 4ϒ@0XXŸN@?t`e@]Dϒ@тN@9ܖZ`e@В@T17N@0!`e@TlGВ@SKRfN@s `e@{;В@4v}N@`e@'0В@4v}N@`e@ null_surface null_surface nullbs nullbs r?r?r@,? ?  intcurve  exactcur nubs e?r?wr?7 $Vt?r? *?wr?r@,?,?r?NNQΒ@LAN@&Ope@= fΒ@}~YN@=e@.zΒ@qƒtN@6`e@/t&Β@ÏEN@me@/BȭΒ@pnN@/o>e@Β@FN@Ũe@- Β@fB߱N@>e@dΒ@V̒@N}O@= LZe@\`̒@|O@ve@vZ̒@P~y7O@\6e@d̒@rO@Qe@N ͒@O@*~Xe@16͒@-~WO@%e@K͒@|=PO@; e@fz͒@O@1ցe@Tը͒@p&yO@IZXe@+͒@ z hO@%`e@m+c͒@iwO@tV^e@Β@J/kkO@[37e@cs<'Β@mO@G(e@`_GΒ@8(̕O@5 e@ehΒ@ϮO@i e@'soxΒ@%&O@n4e@A0Β@}poO@9|UĀe@#Β@^ZO@N;呂e@t=Β@ٜ ٖO@"e@bϒ@$4O@\Aye@[!?2Gϒ@D4SO@QB`e@\ϒ@h9EkO@9Ue@̪ϒ@1VO@hBe@B˰ϒ@#O@$u2e@Tϒ@͗O@N=-+e@В@TO@C.e@EВ@]O@'2 e@gqВ@S<*O@~ѳe@̎(ҜВ@5N1O@e@'0В@5N1O@e@ null_surface null_surface nullbs nullbs  e?r?wr?7 $Vt?r? *?wr?r@,?,? ?  intcurve  ref intcurve  offintcur nubsr?'˒@LAN@M7fe@#6>l͒@lhcRN@]J)be@ϒ@3v}N@`e@'0В@3v}N@`e@@@ coneYnƒ@2]~̩P@e@? L9y<;f;f? @ cone'0В@X&Q@e@ L9y< L9y? @ nullbs nullbs     ? ?\`$d? ?? e?wr?7 $Vt?r? *?wr?,?r?\`$d?  coedge  U V W X  Y coedge    Z [   coedge    \ ]   coedge  V U  5  ^ edge  _9 `hu-8R?  a tangent  coedge  b #  7 C  edge  =Po + (n/ 6 c tangent  pcurve   d coedge  e \  : f  edge  * (n/= <Po? 9 g tangent  pcurve   h vertex  : i vertex  7 jellipse curve  nW@$v}N@q ~:f@;n ~:ƿ R??n ~:??  Xv&t?ʒ*:%?q쌈"Ǒy?]{?Yzخ7E?: \X%G?$1< >?V1Q$T? ?ah >X+:0yE> intcurve  exactcur nubs փ3=0RZ?0RZ?ed?0RZ?~R?f S(?^ ɩ@4*{@̸@ldi@Q’@LAN@QPC e@ue@&BȒ@>|N@Ӌte@նEOȒ@xN@TЊese@břȒ@j cN@qe@#IȒ@^hǟN@YLqe@i? Ȓ@12N@pe@+*Pɒ@'CvN@ne@ɒ@BV`N@ Ame@!'pɒ@9@dN@N@(LOhe@ٯF˒@8:ͦN@sge@˒@Ωz&N@bfe@'˒@LAN@R7fe@ null_surface null_surface nullbs nullbs  0RZ?0RZ?ed?0RZ?~R?f S(?^ ɩ@4*{@̸@ ?  intcurve  exactcur nubsփ3=0RZ?lJ?0RZ?Hwp?ed?0RZ?~R?f S(?&*P@^ ɩ@4*{@̸@ldi@^Kɒ@LAN@((̡e@ zɒ@TpN@-~g$e@^S2˒@KfN@~(e@2oM˒@֜N@|Xe@i˒@3 pN@i\͎e@*˒@cN@dkWe@z<˒@)N@K[e@;B ˒@\⊜N@zwe@ qO ˒@A5;N@L`e@[˒@ ۜN@`[QȬe@qQ ̒@xN@`e@dN+̒@LN@ qe@~J̒@пhN@1e@iX̒@5ޝN@g! qN@#CIJe@Ε̒@- .ᆞN@}e@%>̒@rN@0Jqe@hH̒@j cN@@e@v̒@^hǟN@e@̒@,2N@EvOe@)7 ͒@'CvN@Owce@bR/͒@=V`N@Ѧe@}sR͒@9@dN@T%Fe@[E͒@W )N@J1x'>e@<͒@ >N@&'Re@-Β@@:ͦN@9`e@9X,Β@֩z&N@f{e@MNQΒ@LAN@(Ope@ null_surface null_surface nullbs nullbs  0RZ?lJ?0RZ?Hwp?ed?0RZ?~R?f S(?&*P@^ ɩ@4*{@̸@ ?  intcurve  exactcur nubsփ3=0RZ?lJ?0RZ?Hwp?ed?0RZ?~R?f S(?&*P@^ ɩ@4*{@̸@ldi@:UtTƒ@̥O@=e@\Ngƒ@7O@|e@|ƒ@MΩ?tO@F'e@&(ƒ@+PȻO@:A{e@:ƒ@IO@wX'e@Jƒ@^2.(SO@5B٢e@~Cƒ@{YEO@f#[e@;ƒ@֧O@8e@fm:ƒ@RO@}mx]e@mǒ@>ǙO@&kKe@z<ǒ@'T\ÈO@NbNe@CLmǒ@$2rO@V=ae@|WՄǒ@俌LJO@T~e@n`ǒ@vO@mke@/ѻǒ@\4b1O@_e@C+Zǒ@0(%O@=^.e@nǒ@}WنO@%%3Be@Ȓ@fO@߸ Õe@زqg0Ȓ@Dd;{O@Դ/Ȕe@27tQȒ@?)cO@unԓe@2~k҆Ȓ@=>RO@W/^e@r?Ȓ@ΘPO@p^֑e@?Ȓ@$RO@7Qe@Ȓ@_O@E2 Ke@3V8ɒ@0~O@koNe@Mɒ@ɡO@PɠҎe@;ɒ@"PǗO@ti(e@:aɒ@NO@87e@-!qɒ@# O@dEe@ 1ɒ@=zv.O@are@]wuɒ@+UXO@tYe@ɒ@LcO@Kl$e@uBɒ@dO@[Ze@~ɒ@{ڇO@Հӊe@^ɒ@kO@}fle@cy ʒ@o֖IO@ e@Kʒ@l3pO@]w:e@N3mvʒ@$WnuO@Le@lʒ@ [w9O@e@23ʒ@O4O@e@F膪R˒@Xv&t?ʒ*:%?q쌈"Ǒy?]{?Yzخ7E?: \X%G?$1< >?V1Q$T? ?ah >X nullbs     ? ?`}/s? ??փ3=lJ?Hwp?&*P@ldi@`}/s?  coedge  /  coedge  4 1   coedge  1 4   coedge  1 X R  edge   p hWq? 1 tangent  pcurve    exppc nubs phWq?pr??pr? spline  ref   coedge  2 [  edge  `G =[^ Z tangent  coedge  9 3 ] f  edge  <[^? _ G@ \ tangent  pcurve    exppc nubshu-8R? spline  ref   vertex   vertex  [ ellipse curve  Jj@"v}N@e@Mr ~:ƿ[6Mic%??n ~:?? 9 hu-8R? coedge  6 C intcurve curve   bldcur (n/=Ѻ?џ%?f*4?Po?})g? spline  ref null_surface nubs (n/=Po?? (n/=?Po? nullbs   intcurve curve   ref"  coedge  9 H M f  loop  \ intcurve curve   bldcur (n/=Ѻ?џ%?f*4?Po?})g? spline  ref null_surface nubs (n/=Po? (n/=Po? nullbs   intcurve curve   ref#  point  MQ7ǒ@$v}N@('W!f@ point  *ixGÒ@5N1O@Nf@ coedge  ? B q m  coedge  ? m  loop  ?  pcurve    exppc nubs`jco??o? spline  rbblnsur blendsupsur plane4T%@X&Q@f@?? L9y< null_curve nullbs blendsupsur toruswA@2]~̩P@f@ L9y?@? null_curve nullbs+:0yE> intcurve  exactcur nubso?o?EScJA?o?EScJA?o?wA@4v}N@f@w@4v}N@f@X믒@m5rN@f@ݜo@u]N@f@35Pm@?N@f@ٶ|ð@uN@f@"u@KpwN@f@LNE@2eN@f@3Q@+N@f@ vƱ@b,GŷN@f@@ɕN@f@`Ks@~\޵N@f@P4T`@9RN@f@@1@u.ҒN@f@X{@|yN@f@X@~ju N@f@`@$|լN@f@kL@?g:N@f@}ʡ@a VN@f@@U K^N@f@fK@¹VN@f@ null_surface null_surface nullbs nullbs o?o?EScJA?o?EScJA? ?  intcurve  exactcur nubs o?o?dH?EScJA?o?wΟ%?EScJA?\X?o?wA@4v}N@f@w@4v}N@f@V믒@n5rN@f@ݜo@u]N@f@35Pm@?N@f@ٶ|ð@uN@f@"u@KpwN@f@F8@ N@f@x4h@N]oaN@f@m>@7XN@f@H̱@!N@f@?@ՉCN@f@@ϐ!N@f@Җ;@ẊN@f@`Ks@~\޵N@f@R4T`@9RN@f@U@\8N@f@L.g@akN@f@d:v@8{N@f@dL@cN@f@5mK@~"fN@f@O+eh@ZۭN@f@{jɮ@|N@f@a@{ N@f@ݐ@Hd,N@f@~*s@qUN@f@ɵ@. iN@f@@` PgN@f@4 @K`N@f@fK@¹VN@f@ null_surface null_surface nullbs nullbs o?o?dH?EScJA?o?wΟ%?EScJA?\X? ?  intcurve  exactcur nubs o?o?dH?EScJA?o?wΟ%?EScJA?\X?o?wA@5N1O@f@VE˯@5N1O@f@M I@jI*O@BWf@ZH7@7j?O@Kf@= 5@G0O@cDf@ٜ@;LeO@w ͟f@%]D@UO@GKֽf@BW@jw/O@qf@@'IɖO@oVwf@r!@ ΋O@dff@?{V@TPVO@6Lf@ދ@{j" O@T/f@olc@2 O@ <'f@X߲@\?O@$PPf@qq/$@5O@wVϣ՞f@*X@O@`Tf@$ӳ@'E|$דO@zZf@sHL@3^2ВO@if@dր@K|N0O@\_f@ɚ@2O@Q[f@9 ]@&߫,"O@i_If@YnQ~@iq;ŏO@U+QҜf@r_ѵ@DێO@ًkzf@Ŗ|9#@>TO@m8f@US@MPO@xt f@4#@rO@oof@3@@\ΊO@3f@NII@gԙ"O@Qf@%]z@sO@Gx^rf@oޛJ@JO@g/f@ null_surface null_surface nullbs nullbs o?o?dH?EScJA?o?wΟ%?EScJA?\X? ?  intcurve  ref& intcurve  offintcur nubso?wA@4v}N@f@qL^fձ@4v}N@f@X@sN@f@fK@¹VN@f@@@ toruswA@2]~̩P@f@ L9y?@? plane4T%@X&Q@f@?? L9y< nullbs nullbs     ? ?T&})g? ??dH?wΟ%?\X?o?T&})g? ellipse curve  fK@¹VN@f@tm?luȿ`S?t?g/??  `jc? coedge  B C  edge  Do  B tangent  face  C   point  oޛJ@JO@g/f@ coedge  H G I  coedge  G v  edge  J"@ ,@Cq-@ u tangent  face  I   point  fK@¹VN@f@ vertex  straight curve  L ƒ@X&Q@p ~:Vf@ L9y< ftreemeg attrib  Q  face    loop  Q cone surface  Ynƒ@4v}N@`e@? L9y<?LXz?? ?@  coedge  R  coedge  T /  coedge  T /  coedge  T }  edge   bs-8R? T tangent  pcurve    exppc nubsbs-8R?r??r? spline  ref  coedge  Z U  edge  pr ` tangent  pcurve    coedge  V  edge  _ pr? tangent  pcurve    coedge   W R  coedge  W  R  pcurve    exppc nubshWq?փ3=փ3= spline  ref  vertex   vertex  ellipse curve  Q’@LAN@SPC e@Eˏݿu & e{nR@ edge  _.@"@ yd-@ tangent  point  MȒ@"v}N@He@ point  mwVĒ@5N1O@mw!lTe@ coedge  p b C  edge  ( =Vs-8R? tangent  coedge  e f  face  w f   coedge  l k m  pcurve    coedge  u l  edge   Jo? tangent  pcurve    face  m   coedge  p  edge   fs-8R? p tangent  vertex  intcurve curve   bldcurdH?wΟ%?\X?o?T&})g? spline  ref% null_surface nubso???o? nullbs   ftreemeg attrib  r   face   torus surface  wA@2]~̩P@f@ L9y?@?  coedge  t  edge  y yEW@ t tangent  coedge  u  loop   vertex  straight curve  gK@X&Q@f@ L9y< ftreemeg attrib  w  face      cone surface  gK@X&Q@@f@ L9y< L9yʼ? @  point  L ƒ@L@m ~:Vf@ftreemeg attrib  |  face       loop  | spline surface   rbblnsur blendsupsur conegK@X&Q@@f@ L9y< L9yʼ? ?@ null_curve nullbs blendsupsur toruswA@cXSI@f@ L9y<@ null_curve nullbs+:0yE> intcurve  exactcur nubsD?D?3Cp?D?~,ݢ? X?^?.4e?P_a?0y?V@7xF@a@8@0@yEW@i,@L@? Kf@\%@n3L@'7lMLf@VniG@%ǬL@1B}Mf@9m @l\L@"|zNf@5$@,L@߮X Qf@8Y콒@Eή L@BN.dSf@@߽@rf L@58Tf@H qŽ@k L@[Vf@Y)@q L@%NB(Yf@i@g> L@ XHZf@$@ )uL@l_f@OC*@O2L@ u`f@0@ PkNL@W޸bf@K 뼒@mL@>cf@ռ@IL@0KP3df@O%@C.L@פff@%,w@hB L@vhf@!U^@BL@:ʳif@X;*@sʮL@$zxkf@9y@G L@FImf@2׻@L@#nf@Z@;;L@DFof@^@L@NJyf@Xa@qٺL@fLzf@,G]@%G(L@VX.{f@ F!@]~L@*j>{f@M{@-fq$L@u 6|f@(丒@8L@˾|f@wC!@L@I+}f@yч@L@wv}f@ h@R L@J>}f@n"*@5 L@?~f@귒@+2 L@oB~f@E5˷@ Y L@sV~f@э@ L@ %<f@o&HK@T_^ L@.yf@NƔ+@OUL@[f@A붒@@DuL@rf@v@s.L@=ҥf@z@\T\L@J f@AΏk@ L@f@fK@L@f@ null_surface null_surface nullbs nullbs D?D?3Cp?D?~,ݢ? X?^?.4e?P_a?0y?V@7xF@a@8@0@ ?  intcurve  exactcur nubsD?D?0??3Cp?D?i?~,ݢ? X?#z?^?yEW?.4e?ty[m4?P_a?0y?i?V@7xF@a@Ed@8@0@yEW@L ƒ@L@l ~:Vf@Rxƒ@n3L@NnؚXf@F4LŒ@%ǬL@cF_Zf@ 2Œ@l\L@EZ]f@:þŒ@,L@;]bf@+aŒ@Eή L@\ff@sŒ@rf L@ip*if@^MŒ@a15g L@Flf@77#Œ@T L@{of@G$WŒ@ L@pf@fOĒ@#8 L@"+sf@߃dĒ@A'2 L@6ujuf@qĒ@4L@rÒ@TL@Af@1,EÒ@A_'L@}瑯f@~Ò@{nL@VZf@bsÒ@eDxL@"(f@L’@6L@B^f@}g’@hB L@Qgf@g#Ip’@BL@u gf@^n] )’@L@tf@@]@ L@&,\f@R(@L@af@>i@ѾL@\Ěf@Lp\@A2L@^8yf@8@FL@H8셝f@jz@e L@&-f@ B9@wqL@ћKf@t @L@& ,f@\|@DL@S~ f@sB@@B&L@w+9f@Q@A L@4x^>f@e쿒@a+L@fv =f@䧱@NXL@Vf@B۠@L@9f@@BL@1Yf@YZ@քjL@n팶f@a$@3 :L@vWf@g@ęL@lf@c.@HcL@ E Df@u!aD@ L@ff@|~k @\EL@f@'ʽ@,L@UMf@Q@z=nL@c$f@A/"@4dQfL@Af@DG@U*L@,f@N @{"L@L}f@]oؼ@$L@y̴f@h@\L@jIsTf@ @]~L@V|lf@3o۹@+fq$L@mf@ۼ|@6L@}of@޻@L@Wf@Bmú@L@f@Y@S L@#|zf@)sEF@9 L@if@Ԉ@+ L@4jIyf@:@U5* L@zf@ƹ@^] L@Tf@l@q, L@,ґaf@$H@O L@Žf@z߃ʸ@pqr L@i0>yf@w yK@T_^ L@]ff@n @OUL@Af@pE@@DuL@1>f@$1 @s.L@}K5f@zc:˶@\T\L@p@f@Fd@ L@f@eK@L@f@ null_surface null_surface nullbs nullbs D?D?0??3Cp?D?i?~,ݢ? X?#z?^?yEW?.4e?ty[m4?P_a?0y?i?V@7xF@a@Ed@8@0@ ?  intcurve  exactcur nubsD?D?0??3Cp?D?i?~,ݢ? X?#z?^?yEW?.4e?ty[m4?P_a?0y?i?V@7xF@a@Ed@8@0@yEW@r(@fJpK@+zZf@q4@qg )K@g[f@GD @9.K@r=fL]f@)W#@eY8 K@]LZ]^f@4)@(P!K@p4`f@YCR"@2R"K@ecf@^W@ac"K@A0df@+D@] w#K@!8ff@@_@]M$K@Dshf@џZU@ӡG$K@Bif@v>@d5H$K@ 2Djf@H'@pI%K@N<kf@@R멼B%K@[(lf@깚 @ZGl%K@?nf@eϿ@ɲN&K@of@ə@$&K@qf@$"@&K@=t:rf@!i@"^'K@!H8Ztf@ TQ@ 'K@GQuf@9@w'K@!Gvf@t@}'K@-yawf@@o '(K@hJxxf@@7a5.(K@kNxf@hپ@;شb(K@yf@WmV@Sc}+(K@m{f@T@Qɴ(K@M!|f@~ =m@(K@'}f@4_@@dᄿ(K@5~f@tK4@.v)K@mV[Sf@@Sh-)K@n#Sf@1`GU@!Io+)K@;S) Nf@/c;ݽ@_3)K@GS]5f@.\@r ;)K@o^ Ђf@fM@9?)K@ɖӳf@|dP*@-"@)K@)@f@JQn@MKGB)K@f@J@C>)K@ Ӆf@:X2@HO8:)K@emf@ o@i k3)K@|f@T=0@}y&)K@_=Շf@\w@q")K@QҢf@,h伒@j)K@XȒIf@墎ż@ 0Q)K@Rf@{-ߦ@Fz(K@4f@@Ԡ(K@_~?'f@9cl\@!n(K@+d1If@ c&@.(K@Lvnz`f@1A@v-{(K@9f@5i;*Ồ@C;dS(K@ qf@f@n+('(K@p`f@F@ ?"(K@sf@ᖻ@W'K@1[x f@Qou@15'K@gf@H-sX@`'K@iff@@BwL@{`nf@&RX@EǃL@GHwf@wr@^CL@} $zf@n|X@SA L@ߥ+M~f@c@9L@f@fK@L@f@@@ toruswA@cXSI@f@ L9y<@ conegK@X&Q@@f@ L9y< L9yʼ? ?@ nullbs nullbs     ? ?xA`z? ?? 0??i?#z?yEW?ty[m4?i?Ed@yEW@xA`z?  coedge    }  coedge   /  edge   Wq?  tangent  pcurve    exppc nubsWqldi@?ldi@ spline  ref  coedge      edge  r   tangent  pcurve    coedge    edge   r?  tangent  pcurve    coedge    }  coedge    }  vertex    vertex  ellipse curve  '0В@4v}N@`e@@?  bs-8R? coedge    intcurve curve   bldcur+Hވ?yr?Ԃ\}?pr? d? spline  ref  null_surface nubspr???pr? nullbs   intcurve curve   ref3  coedge    coedge   loop   intcurve curve   bldcur+Hވ?yr?Ԃ\}?pr? d? spline  ref  null_surface nubspr?pr? nullbs   intcurve curve   ref4  edge  փ3= ldi@  tangent  pcurve    coedge  !  " # edge  ldi փ3 $ tangent  pcurve   % point  ^Kɒ@LAN@((̡e@ point  :UtTƒ@ΥO@=e@ coedge  & '  coedge  ( ) f  vertex  ) *straight curve  MȒ@X&Q@He@ L9y<  coedge  + , -  edge  EJW DJW? . tangent  vertex  / 0ellipse curve  p[(˒@2]~̩P@\&f@Mr ~:ƿ[6Mic%?r ~:? ( -DT!? coedge  1 2  3 edge  4 yo? 5 tangent ftreemeg attrib   plane surface  Cxgzǒ@X&Q@܂f@?LN7Cp ~:ƿp ~:?4Mic 8  ? spline surface   ref%  coedge  @ A B  coedge  @ 6  loop  C  vertex  Dellipse curve  wA@2]~̩P@f@qm۶m۶<?  -DT!? edge  Y& Exg? F tangent  point  wA@5N1O@f@ftreemeg attrib    face G H "  I cone surface  ("ɒ@2]~̩P@m^f@Mr ~:?[6Mic<%^ȨH;f"do߿? @  coedge  J K L M coedge  J 1 N O pcurve   Pintcurve curve   bldcur 0??i?#z?yEW?ty[m4?i?Ed@yEW@xA`z? spline  ref- null_surface nubsyEW@yEW@ nullbs    coedge  Q R S  coedge  T K U V edge   Wzp? X tangent  face Y  Z  point  fK@L@f@ftreemeg attrib    face [ \ ]  ^  loop  cone surface  Ynƒ@2]~̩P@e@? L9y<;f;f? @ ftreemeg attrib    face _ ` a  b  loop  1 spline surface   rbblnsur blendsupsur planeCxgzǒ@X&Q@܂f@??LN7C<p ~:?p ~:?4Mic intcurve  exactcur nubso?o?ScJA?o?ScJA?o?nW@K@q ~:f@O@K@f@iH@i{ K@f@_ @@K@rBo7f@Ă1@qv.K@X8Pf@}"@V{K@b6f@*@/WK@H=m f@?x# @O~;LK@#f@\@שK@XJ6.&f@:@eIlK@\%9'f@澒@cMK@-)*f@׾@ISK@.,f@fо@wxK@zĜ$.f@_ ᦹ@mH'K@OpX2f@JB@d7XK@Φ>6f@$Z@2 (K@K8f@Z9v@׋|\K@>f@X@,K@VУBCf@ J@K@ B}-Ef@ٗ[;@K[VL@&WHf@i,@L@? Kf@ null_surface null_surface nullbs nullbs o?o?ScJA?o?ScJA? ?  intcurve  exactcur nubs o?o?H?ScJA?o?П%?ScJA?^X?o?MQ7ǒ@K@('W!f@ni0ǒ@K@ꖫ"f@5y(ǒ@h{ K@F> $f@-g!ǒ@K@* |T%f@`eǒ@qv.K@>]'f@Ɲldǒ@U{K@u#*f@ ƒ@/WK@B#{+f@ټBƒ@6K@Ւ?.f@eGƒ@K@%\l0f@^ƒ@x&K@>u1f@>{ƒ@70U|K@)W2f@[ƒ@NoK@4f@;cƒ@hK@'E4f@ƒ@n,K@_76f@ˁsƒ@HSK@ <7f@EIƒ@wxK@2A9f@ᅟƒ@Y;K@;Y4$ƒ@)fL@.4Rf@aƒ@smL@G+݋Sf@Cƒ@Á$L@,Tf@L ƒ@L@n ~:Vf@ null_surface null_surface nullbs nullbs o?o?H?ScJA?o?П%?ScJA?^X? ?  intcurve  exactcur nubs o?o?H?ScJA?o?П%?ScJA?^X?o?*ixGÒ@C@K@Mf@>>Ò@C@K@ө,rf@)+b4Ò@rK@ Df@pZ*Ò@FK@< f@nÒ@Hi?K@Jg F$f@l^’@u*K@e,_'f@/{i’@}xZK@xs)f@T’@f9|IK@+f@~’@'OhK@,ؐ.f@X O’@mK@J:/f@ն’@A!K@D_1f@邵’@OFTI'K@G&2f@,GW’@~X=K@u3f@-"’@l7rK@roJ05f@’@@gK@$?7f@jw’@*ŽrK@m 69f@ 8W’@kZK@DK@ 'Sf@ Z@ɂcK@%|Vf@u&'J@goK@ӣCWf@l̥9@ lK@Yf@r(@fJpK@+zZf@ null_surface null_surface nullbs nullbs o?o?H?ScJA?o?П%?ScJA?^X? ?  intcurve  ref9 intcurve  offintcur nubso?nW@K@q ~:f@@K@]4:'f@9@+ǻOK@T9f@i,@L@? Kf@@@ toruswA@cXSI@f@ L9y<@ planeCxgzǒ@X&Q@܂f@??LN7C<p ~:?p ~:?4Mic  coedge  n o  intcurve curve   bldcur e?wr?7 $Vt?r? *?wr?,?r?\`$d? spline  ref null_surface nubsr?r? nullbs   intcurve curve   ref?  coedge  o p  q  edge  t[l@ f @  r tangent  edge  g  t[l  s tangent  edge  .@"@ tDyd-@  u tangent  point  '0В@4v}N@e@ point  '0В@5N1O@e@ coedge  v  " w edge  x i >X?  y unknown  coedge  z { |  face } ~   intcurve curve   bldcurփ3=lJ?Hwp?&*P@ldi@`}/s? spline  ref null_surface nubsփ3=ldi@փ3=ldi@ nullbs   intcurve curve   ref@  coedge  v  i "  loop   pcurve    exppc nubs0RZ?4*{@lodi@h >Xv&t?ʒ*:%?q쌈"Ǒy?]{?Yzخ7E?: \X%G?$1< >?V1Q$T? ?ah >X spline  ref  ? 5, intcurve curve   bldcurփ3=lJ?Hwp?&*P@ldi@`}/s? spline  ref spline  ref  ? 5,  nubsփ3=ldi@?փ3=?ldi@ nubs0RZ?4*{@lodi@h >Xv&t?ʒ*:%?q쌈"Ǒy?]{?Yzخ7E?: \X%G?$1< >?V1Q$T? ?ah >X   intcurve curve   refB  coedge    '   edge  xlWx Y^ &  tangent  coedge    ) a  edge   G 4[^  tangent  point  MȒ@K@He@ coedge    / -  coedge     -  loop   ellipse curve  wA@2]~̩P@f@ L9y< Z?d|b@? mX9 T ? edge  L@ y_N@   tangent  point  Hf@2]~̩P@ޓf@ coedge   N   coedge       pcurve    vertex  intcurve curve   bldcurH?П%?^X?o?tͯ})g? spline  ref8 null_surface nubso?o? nullbs    coedge   8  coedge   ; 8  loop   ellipse curve  wA@4v}N@f@?LXz???  bs-8R? coedge      edge  xg Y&@  tangent  point  wA@4v}N@f@ftreemeg attrib    face      cone surface  Yn@4v}N@f@? L9y intcurve  exactcur nubszp?zp?LC?\<39?kqf?zp?fK@L@f@@.[L@f@k@gHK@f@L@1CjK@f@\13@^K@f@@-Ed*K@f@@<`K@f@7@,ҠK@f@@K@f@s@ӷTK@f@Ęa@T8NK@f@& DZ@GmK@f@ڛ@&rK@f@R#tE@,QLK@f@Aﰒ@jūK@f@}ð@C*{K@f@#JVm@9ȶ1K@f@Sah@K@f@//믒@vGK@f@u@K@f@yA@K@f@ null_surface null_surface nullbs nullbs zp?zp?LC?\<39?kqf? ?  intcurve  exactcur nubs iЧ?zp?R?zp?LC?^z?\<39?kqf?zp?fK@L@f@}CF @6x5L@f@@@rL@f@x\1ɵ@VkL@f@}"t@U8K@f@1I@K3K@f@>N@'K@f@*5@~LK@f@OyUh@tb7XK@f@*[tL@jK@f@z|@d4K@f@QJ@OK@f@8g@ذ K@f@ziF@T=K@f@@K@f@s@ӷTK@f@;@&iK@f@j^"@/W+K@f@%@j$(K@f@*oY̱@ Ř}K@f@*@vK@f@@b&~K@f@8@07K@f@Aﰒ@jūK@f@}ð@C*{K@f@#JVm@9ȶ1K@f@Sah@K@f@//믒@wGK@f@u@K@f@yA@K@f@ null_surface null_surface nullbs nullbs iЧ?zp?R?zp?LC?^z?\<39?kqf? ?  intcurve  exactcur nubs iЧ?zp?R?zp?LC?^z?\<39?kqf?zp?oޛJ@fJpK@g/f@9pz@AbK@ЌCrf@F)?I@)9K@Ă糚f@(@YNXdK@̠^f@3!5v@4VWK@[eof@4lS@O cK@hgf@Z;#@MK@Mf@Mѵ@۵WK@Eyf@+E@m7nK@ќf@ ]@+FK@_f@Q*@.sKK@g^Z[f@D9f@RK@ݺf@L@>cK@X)f@"h5ӳ@w[K@xqncZf@Rm$FY@&sK@f@ o$@8 $K@ndx\՞f@)Qಒ@:ЄK@~f@7@> #q>K@,&f@ 4@5'K@Bp/f@4 W@{lK@yZLf@#]!@pK@TEff@T@^hK@zwf@-i@BtK@`f@ D@lqK@ռͽf@C@O[K@Xa͟f@{<@M?K@|f@7\G7@K@Ē f@ՐE@pK@TfWf@flA˯@.@K@f@wA@.@K@f@ null_surface null_surface nullbs nullbs iЧ?zp?R?zp?LC?^z?\<39?kqf? ?  intcurve  refH intcurve  offintcur nubsi̺x@(P&@V/M@P&qB#@6q'@fK@L@f@GQ@14OCK@f@fΰ@*y)?K@f@r9L@dnK@f@DRV@*L@'f@R@̬,L@'f@>@T@L@f@ޏ@ZL@f@GX5@@UL@f@ @"IL@f@@zrDK@f@$ꔇ@tK@f@@@ toruswA@cXSI@f@ L9y<@ plane4T%@X&Q@f@?? L9y< nullbs nullbs     ? ?()g? ??iЧ?R?^z?zp?()g? null_surface nubszp?zp? nullbs   ftreemeg attrib   plane surface  4T%@X&Q@f@? L9y< ftreemeg attrib     face       loop    torus surface  ؒ@cXM@e@@ ftreemeg attrib     face       loop    cone surface  q2@K@>Nf@Mr ~:ƿ[6Mic%?J?/??? ?@  coedge    p  e  coedge      e  loop     vertex    vertex   ellipse curve  ؒ@4v}N@`e@ L9y@?  bs-8R? edge  (h >X  !  unknown  point  '˒@ۥO@i@%e@ point  NNQΒ@LAN@&Ope@ coedge  m      coedge   l     coedge   z    coedge      q  coedge    c  q  loop   ~ straight curve  Ynƒ@4v}N@e@? L9y< Pd? s^@straight curve  Ynƒ@5N1O@e@ L9y s^ Pdؿ vertex   straight curve  '0В@X&Q@e@ L9y<  coedge   !   "  pcurve    exppc nubs:.DT!-DT! spline  ref  vertex   ellipse curve  l͒@2]~̩P@e@׿==^?p"YJDU~Q?  -DT!? coedge  n     coedge     |   edge   ~r?   tangent ftreemeg attrib     face   q   cone surface  '0В@X&Q@e@ L9y< L9y? ?@  pcurve    exppc nubsj-DT!?-DT!? spline  ref  coedge   &     coedge  &  + /   loop  &  straight curve  I+@2]~̩P@ Hf@Mr ~:ƿ[6Mic%? MV 3 J#!@ coedge   ( 2  a  coedge  (    a straight curve  Œ@K@K8Yf@p ~:ƿ4Mic>? e{nR &? coedge  , +   -  coedge   A ,    edge  O L   tangent  face   -    vertex  / straight curve  Hf@..!@ޓf@? &U A=4Q@ coedge  2 1     pcurve    exppc nubsjco??o? spline  ref8  edge  v< 4Tr-8R? 2  tangent  pcurve    exppc nubsv<Tr-8R?? spline  ref8 intcurve curve   refC  point  MQ7ǒ@K@('W!f@ coedge  7 6   8  coedge  Q :    coedge    :    edge  N,DT! -DT!? :  tangent  vertex  ; straight curve  Yn@4v}N@f@? L9y<  Nv ô@ftreemeg attrib  >  face       loop   > torus surface  @cXM@f@F?@  coedge    @    edge  EZs-8R? -DT!?   tangent  coedge  A      loop   A   vertex   straight curve  Yn@2]~̩P@`f@ L9yx+R )@`$ @ftreemeg attrib  C  cone surface  Yn@2]~̩P@f@? L9y intcurve  exactcur nubs~r?~r?@,?~r?Q’@DdtK@UPC e@qXM’@`%+K@Y7ʥe@Lk’@ֽK@M7e@ zpO’@)1IK@d(|Ye@zyO’@VrŔK@f;e@s@ :K@Lve@aE@ K@R+e@炢 @7K@Re@M~@K@h;\'e@ @k@ lK@{e@LI@vK@.??e@b+@zEK@le@|@+K@^)Ge@J9@K@k#e@Jj@K@e@ null_surface null_surface nullbs nullbs ~r?~r?@,? ?  intcurve  exactcur nubs~r?f?~r?xr?@,? $Vt?~r?^Kɒ@DdtK@)(̡e@%@ɒ@`%+K@,e@$ɒ@ֽK@ 릛e@бЋɒ@)1IK@3>e@'2yɒ@4.JK@M*e@x9hɒ@Y&5K@l %e@5&wzdɒ@])K@ wye@P#SXɒ@0K@"fe@l䒻Lɒ@ PK@aVe@o%{Eɒ@Y!@K@Le@g=7ɒ@i@K@H{/e@z5*ɒ@"/)dK@xpe@聏#ɒ@;%8K@ :e@Hɒ@U)tK@|" e@i*ɒ@sK@se@ɒ@K@Œ@ɩK@x0JTe@ppŒ@Bڳ]K@gcxֻe@oŒ@>.^K@@^e@CNdŒ@5EW$K@Շ}3e@Z TŒ@H(+K@+e@XEŒ@{|K@ye@KƐ@Œ@_w1$K@1:2e@|4Œ@dSIK@'e@;(Œ@IںbK@mhe@9M"Œ@=KK@;4P]e@)Œ@^$K@b?Te@Œ@ K@ -Le@I~Œ@XK@D(&Ne@S+Ē@0@K@rQe@mwVĒ@0@K@mw!lTe@ null_surface null_surface nullbs nullbs ~r?f?~r?xr?@,? $Vt? ?  intcurve  refS intcurve  offintcur nubs~r?Q’@DdtK@UPC e@@mHK@);ﮯe@ P@K@Vנe@Jj@K@e@@@ cone("ɒ@cXSI@m^f@Mr ~:ƿ[6Mic%?^ȨH;f@"do߿? @ cone'0В@X&Q@e@ L9y< L9y? @ nullbs nullbs     ? ?z d? ??f?xr? $Vt?~r?z d?  coedge  d c 4 5 e  edge  f-DT! 6+DT!? p 7 tangent  edge  8+DT! g-DT!?  9 tangent  face : e  ;  point  ؒ@4v}N@e@ point  ؒ@5N1O@e@ vertex  < =ellipse curve  l͒@2]~̩P@e@o~Q?lb&(݊yGʿ?xo~Q? -DT!  coedge   > l  ]  edge  ? gfs-8R?  @ tangent  coedge  A B m  C  edge  ?  P  D tangent  coedge  E F n  G H edge  t Ir? n J tangent  coedge  K o L M q  coedge  p K N O q  point  '0В@K@e@ coedge  P  v  Q  edge   xDJW?  R tangent  pcurve    exppc nubsDJW?? spline  ref  point  }gxb@@2]~̩P@hw!lTe@ coedge  S T z  2 U edge  I nodi@ z V tangent  coedge  W {    X coedge  { W S Y  Z pcurve   [ vertex  | \intcurve curve   bldcurf?xr? $Vt?~r?z d? spline  refR null_surface nubs~r?~r? nullbs   ftreemeg attrib  ~  face ] C   ^ plane surface  Udڒ@X&Q@e@? L9y<  coedge    _ `   coedge   a   Q  edge  bP-& x@e  c tangent  face d e   f  coedge    g h a  edge  i,< t-8R?  j tangent  coedge  _ k   l  edge  $>JW? t,DT!?  m unknown  coedge  n  k o   vertex  o pstraight curve  wA@..!@`f@ A=4Q &U@ftreemeg attrib  - cone surface  wA@..!@f@?!Z?"|b@? ?@  point  Hf@Q@ޓf@ coedge   q     edge  o   r tangent  pcurve   s vertex   tellipse curve  nW@K@q ~:f@    ] ftreemeg attrib     face   G    loop  S  spline surface   rbblnsur blendsupsur cone'0В@X&Q@e@ L9y< L9y? @ null_curve nullbs blendsupsur spline  rbblnsur blendsupsur coneYnƒ@cXSI@e@ L9y;f@;f? @ null_curve nullbs blendsupsur cone("ɒ@cXSI@m^f@Mr ~:ƿ[6Mic%?^ȨH;f@"do߿? @ null_curve nullbs* ellipsel͒@cXSI@e@OϢoXp4X)? b- ?2QMq?%1t?; \j?zخF%7?C]bm}?쌈"wɢJ?rʒ?h >X+:0yE> intcurve  exactcur nubs B%?B%?IS[&?()?J=?.8?adA?E@Z~&i@nodi@'˒@.dtK@L7fe@˒@~ K@bfe@ٯF˒@sv+K@sge@eQʒ@K@0LOhe@bkʒ@ϑL@bN|je@!'pɒ@6L@'jL@nLqe@břȒ@hL@qe@նEOȒ@!̀L@TЊese@)BȒ@| L@te@+|ǒ@^4)a L@>ue@ovPǒ@HS L@(we@+8rRǒ@b22 L@;nxe@Z/ǒ@ lbV L@ȶye@Dƒ@t@ L@|9{e@\ƒ@0 L@R|e@e@}sR͒@6L@V%Fe@dR/͒@$ 0L@Ѧe@)7 ͒@ԉZL@Nwce@̒@NL@EvOe@v̒@;'jL@e@iH̒@hL@@e@%>̒@;BL@0Jqe@ϕ̒@HL@|e@a|̒@u8L@BIJe@Nj̒@7K L@A_e@iX̒@S L@i!WpL@lȼe@qnlʒ@QWL@c'ݼe@@ʒ@jmy=L@qe@77ɒ@K@c!Fe@Oɒ@YaK@he@ zɒ@`!K@jje@^Kɒ@4dtK@,(̡e@ null_surface null_surface nullbs nullbs  B%?B%?IS[&? {~6?()?J=?.8?adA?JJwp@E@PUa@Z~&i@ ?  intcurve  exactcur nubsB%?B%?IS[&? {~6?()?J=?.8?adA?JJwp@E@PUa@Z~&i@nodi@'˒@ y+K@i@%e@GV˒@* K@-Ze@jO˒@ 1K@AGKe@G膪R˒@Y2K@bwe@23ʒ@ L@,щe@^Ò@bztwL@5}we@Q’@>dtK@TPC e@@@ spline  ref[  ? 5, ¼ cone'0В@X&Q@e@ L9y< L9y? @ nubsB%?.8?odi@h >Xp4X)? b- ?2QMq?%1t?; \j?zخF%7?C]bm}?쌈"wɢJ?rʒ?h >X nullbs     ? ?s/s? ?? {~6?JJwp@PUa@nodi@s/s?  coedge  N   5   edge  8 6:t-8R? 4  tangent  vertex  O ellipse curve  ؒ@cXM@e@J*h?6*h?? -DT! +DT!? vertex   ellipse curve  ؒ@cXM@e@?U@ІU@? +DT! -DT!?ftreemeg attrib   torus surface  ؒ@cXM@`e@F?@  edge  @e@ P c[a&@ B  tangent  point  Ͷʒ@2]~̩P@@e@ coedge   / A  ]  vertex   ellipse curve  ؒ@1]~̩P@e@$I$I<?  -DT!? coedge    >  C  coedge    P < C  loop    straight curve  Ynƒ@2]~̩P@@e@ L9y `kgA k1@ coedge    T  G  coedge      G  loop  E 1  pcurve    vertex   intcurve curve   bldcurd?vr?$Vt?r?P*~X d? spline  rbblnsur blendsupsur cone'0В@X&Q@e@ L9y< L9y? @ null_curve nullbs blendsupsur coneYnƒ@cXSI@e@ L9y;f@;f? @ null_curve nullbs+:0yE> intcurve  exactcur nubsr?r?p@,?r?'0В@K@`e@{;В@K@`e@SlGВ@t+K@s `e@В@vEK@0!`e@]Dϒ@vK@9ܖZ`e@ 4ϒ@ lK@?t`e@Q,Β@K@@`e@~GΒ@7K@ϋae@A͒@ K@=be@"2͒@ :K@]be@d ͒@VrŔK@(}ce@vS̒@%1IK@ ~de@߼T̒@ýK@~ee@xQ̒@`%+K@^3؛ee@'˒@1dtK@N7fe@ null_surface null_surface nullbs nullbs r?r?p@,? ?  intcurve  exactcur nubsr?d?r?vr?p@,?$Vt?r?'0В@K@e@)k'В@K@e@В@t+K@ɹe@*gВ@vEK@ve@xoz<В@oXK@?#e@7В@K@"?Ae@{В@ϯZK@?Ie@ͯϒ@:|K@B,ce@ƥзϒ@,K@hκe@ϒ@Q kK@Ζe@s Jϒ@]dcGK@,Ƞe@Sh]ϒ@HK@DQe@YHϒ@eK@ e@jjs*)ϒ@{VK@mjޓRe@- ϒ@wK@{,re@講wΒ@dK@]MkDe@Β@.K@3ˡe@zΒ@619K@e@wfpΒ@$vw3K@}:he@[WΒ@4TK@ ;q`e@a%-Β@vK@ we@<pΒ@1&K@D͢e@naΒ@5KK@10e@MNQΒ@2dtK@(Ope@ null_surface null_surface nullbs nullbs r?d?r?vr?p@,?$Vt? ?  intcurve  exactcur nubsr?d?r?vr?p@,?$Vt?r?'0В@.@K@e@{;В@.@K@e@SlGВ@9K@H Me@В@p/K@G\e@ 3İϒ@zmK@?V^/e@UYϒ@K@Ve@L@Cϒ@K@2be@1.ϒ@we{0K@;e@#>Β@7soK@e@Β@ TK@sʀe@gcFΒ@bK@p e@N~%4͒@&<K@Z,We@6͒@/u,kK@ظe@;$͒@EK@8oÁe@}K͒@U8K@; e@16͒@ K@%e@2$͒@@ fK@;G2ee@̒@zK@~e@q"̒@8mUK@M҂e@݆,u̒@IK@A+e@)8̒@otK@cQe@f̒@֓LK@e@T˒@ͺK@B@e@'˒@ y+K@i@%e@ null_surface null_surface nullbs nullbs r?d?r?vr?p@,?$Vt? ?  intcurve  refb intcurve  offintcur nubsr?'0В@K@`e@ϒ@K@`e@#6>l͒@YHK@]J)be@'˒@2dtK@N7fe@@@ coneYnƒ@cXSI@e@ L9y;f@;f? @ cone'0В@X&Q@e@ L9y< L9y? @ nullbs nullbs     ? ?P*~X d? ??d?vr?$Vt?r?P*~X d? null_surface nubsr?r? nullbs    coedge      q  coedge     M   edge    tt[l   tangent  coedge   4  O   edge  6acN  ǜ   tangent  coedge  a  B < Q  loop   e ellipse curve  Ͷʒ@2]~̩P@e@??  DJW? coedge     Y 2  coedge    E  2  pcurve   intcurve curve   bldcur {~6?JJwp@PUa@nodi@s/s? spline  refZ null_surface nubsnodi@nodi@ nullbs    coedge        pcurve    exppc nubst-8R~r??~r? spline  refR  edge  _< ƑWq?   tangent  pcurve    exppc nubs_<ƑWq?? spline  refR intcurve curve   refX  point  ^Kɒ@DdtK@)(̡e@ftreemeg attrib   torus surface  @cXM@f@x+R<@x+R  coedge     ` l  edge  bA@#@ [|@   unknown  coedge   P   Q  vertex  ` straight curve  }gxb@@ M@jw!lTe@ 4s4 nl=`@ftreemeg attrib  .  face   Q   plane surface  _u@ Q@`f@%?Mr ~:?Mr ~:?%  coedge     h   edge  [^? iG@ g  tangent  vertex  h ellipse curve  Jj@K@e@Mr ~:ƿ[6Mic%??MXzp ~:?? ,< t-8R? coedge     o l  loop    ellipse curve  wA@8sQ@f@9H˪6j CeҼ@nĿ>=?  coedge        edge  mπ*@ n?`Q@   unknown  point  wA@8sQ@`f@ coedge       intcurve curve   bldcurH?П%?^X?o?tͯ})g? spline  ref8 null_surface nubso???o? nullbs   intcurve curve   refi  point  *ixGÒ@C@K@Nf@ coedge       ellipse curve  @4v}N@f@? L9yJWƿ a 8 unknown  point  }gxb@@X&Q@jw!lTe@ftreemeg attrib  e/ cone surface  Ͷʒ@ M@e@?E!Z |b? @  coedge  9 g q    loop    straight curve  , ’@6@K@IũSf@Mr ~:?[6Mic<% & e{nR@ point  mwVĒ@6@K@mw!lTe@ coedge  k : ; < l  face = > l  ?  coedge  @ n A B   coedge  ; C n  D  edge  EԽ7K% P"Ha@ n F tangent  vertex  < Gstraight curve  _u@ Q@`f@H˪?  coedge  q  H I   edge  J( Vs-8R? q K tangent  coedge  x w  L   vertex  L Mellipse curve  :B.Ȍ@cXM@f@<?PXz??  :t-8R? coedge    ~    edge   :s-8R? ~ N tangent ellipse curve  @cXM@f@?UU@?  coedge   O P Q   coedge        edge  -DT! RF,DT!?  S tangent  coedge        vertex   Tstraight curve  x@acN@`f@ L9y<^DO9 7[M /B6H point  x@cXM@`f@ coedge  U  V W   coedge   X Y Z   coedge  [ \   ]  edge  ^$@ _6@  ` unknown ftreemeg attrib  h  loop  a  plane surface  @L@d@  coedge     L   coedge  P      coedge   P     edge  s-8R? -DT!?  b tangent  edge  R fs-8R?  c tangent  vertex   dellipse curve  @cXL@f@?UІU?  edge  e &bs-8R?  f tangent ftreemeg attrib   torus surface  wA@cXSI@f@ L9y<@ ellipse curve  :B.Ȍ@cXL@f@ L9y?^DOPXz??  :t-8R?straight curve  Yn@/@K@f@? L9yX ¼   unknown  point  :UtTƒ@ y+K@=e@ellipse curve  Ͷʒ@h'I=Q@e@8H˪??5j Ce<n?@>?  coedge  3      coedge      l  coedge     < D  edge  -DT! *$   unknown ftreemeg attrib  3  face     f plane surface  @n%R@@e@:H˪??6j Ce<|FSkҼ?  coedge        coedge     B   edge  EQ|n@ GwQ@   unknown  coedge      D  loop  ;   vertex  B straight curve  @rO`f@? 6rÓ4 :"1vb@ point  @.uӜR@`f@ coedge     I   edge  eDJW JEJW? H  tangent  vertex   ellipse curve  p[(˒@cXSI@\&f@q ~:?/c(m<*r ~:? ( -DT!? edge  2]~iK 2]~iJ   tangent  point  &,t=ۅ@cXM@f@ellipse curve  x@cXM@f@$I$Ix+R?  -DT!? coedge        coedge     Q   edge  Rxg eY&@   tangent  vertex   ellipse curve  @cXL@`f@x+R?STu씹跼? )K (K? point  x@cXL@`f@ coedge        coedge     W   edge  -DT! ^-DT!? V  unknown  coedge        coedge     Z   edge  _-DT! -DT!? Y  unknown  coedge      ]  coedge      ]  loop  [   vertex    vertex   straight curve  @J`f@?  coedge       ellipse curve  x@cXL@f@$I$I?x+R@?  -DT!?ellipse curve  @cXSI@f@?$I$IXp4X)? b- ?2QMq?%1t?; \j?zخF%7?C]bm}?쌈"wɢJ?rʒ?h >X spline  ref[  ? 5, ¼intcurve curve   bldcur {~6?JJwp@PUa@nodi@s/s? spline  refZ spline  ref[  ? 5, ¼ nubsnodi@??nodi@ nubsB%?.8?odi@h >Xp4X)? b- ?2QMq?%1t?; \j?zخF%7?C]bm}?쌈"wɢJ?rʒ?h >X   intcurve curve   refr  vertex   ellipse curve  l͒@cXSI@e@׿j?n^?p"YKDU~Q? $DT! ¼ coedge    9    edge  JY^? -Wx@   tangent  coedge  :    l  coedge    :    edge  @ @   unknown  coedge  C ;   D  vertex   ellipse curve  @.uӜR@f@;H˪6j CeҼn?@>? ftreemeg attrib  >4  face       loop   >  coedge   @     coedge    @    edge  R@ LtS@ @  tangent  coedge   A C    coedge  A      loop     vertex   straight curve  @rR`f@?H˪?  edge  8CNZi9 E-DT!?   unknown  face   D    point  @,uӜR`f@ coedge   H O    coedge  H      loop  H  ellipse curve  wA@cXSI@f@ L9y? Z?T-DT!? a ? unknown  point  wA@dXSI@`f@ coedge  i  y   straight curve  Ynƒ@.@K@e@? L9y< Pd? s^@ vertex  z @ellipse curve  ؒ@dXSI@e@$I$I@?  -DT!? point  ؒ@/@K@e@ point  @dXL@@e@ point  =kWA-@&;CSQ@@e@ coedge  A y B C C  edge  DP?  @ y E tangent ellipse curve  ؒ@dXL@@e@?S@T? (K )K? coedge  | F G H C  coedge  I J |  K  edge   zJ4p@ L.@  M unknown  coedge  N } J O   coedge  } N     loop  } P  vertex   Qellipse curve  ,@v1O@@e@5j Ce<ǰQ2t<X?  Z unknown  coedge     Y  [ pcurve    exppc nubs$DT!<?$DT!?¼ spline  ref[  pcurve    exppc nubs$DT!$DT!¼ spline  ref[  edge  d;!@ \\@  c tangent  point  }gxb@@cXSI@jw!lTe@ coedge  ]      coedge   ] X   straight curve  I+@cXSI@ Hf@Mr ~:?[6Mic<% J#! MV 3@ coedge    ^ _ l  coedge  ` a   b  edge  cbAN *$  d unknown  coedge  e  a f   coedge   e     loop     vertex   gstraight curve  @rR@`f@  edge  3*Ma 3ˍ%@  h tangent  point  @rR@f@ftreemeg attrib  5  face i j k  l  loop  m  cone surface  }RHf@ǖǛYe@>%bOL2<iϣ構?"lv? @  coedge  n o p q   coedge  r  s t   coedge  u v   w  edge   x@ ;LԠ'@  y tangent  coedge  z      coedge   z { |   loop   }  vertex   ~straight curve  wA@..!@`f@ l)6Q BH6AV@ coedge    e    coedge        edge  -DT! ,CJWƿ   unknown  face       point  wA@6sQ`f@ vertex   ellipse curve  @-uӜRf@H˪?6j CenĿ? ftreemeg attrib  C  face      cone surface  @rOf@?lvlv@? ?@  coedge        edge   N JD@   tangent  coedge   r     coedge        edge  ;LԠ'    tangent  vertex    coedge        coedge        edge  -DT! -DT!?   unknown  coedge        coedge        loop     vertex   straight curve  @J@`f@  coedge        edge  "    tangent  face       point  @E`f@ coedge     !   edge  %-DT! -DT!?   unknown  coedge      $  coedge     ( $  loop  "   vertex   straight curve  x@J`f@?  coedge        edge   "@ #  tangent  face       point  x@E`f@ coedge     ,   edge  /$@ -6@ +  unknown  vertex   straight curve  P@J`f@? {cD ?@ vertex  , straight curve   @J`f@ ? {cD@ftreemeg attrib  b  face      plane surface  @J`f@??  coedge        coedge     6   edge  @ =,@ 5  unknown  coedge        coedge     9   edge  >@ I@ 8  unknown  coedge      <  coedge      <  loop     vertex    vertex  9 ellipse curve  L@Od@?lvlv@?  point  ؒ@dXSI@@e@ coedge      C  coedge     C   edge  \ Dd;!   tangent  vertex   straight curve  Ynƒ@cXSI@@e@? L9y< k1 `kgA@ coedge      C  coedge     H   edge  L-DT! -DT!?   unknown  coedge      K  coedge     O K  loop  I   vertex   straight curve  D@@Q@@e@  coedge        edge   wr<< $@ J  tangent  face       point  D@v1O@@e@ coedge     S   edge  1zJ4p@ Ta@oZ@ R  unknown  vertex   straight curve  =kWA-@(;CSQ@@e@? <`< :`2@ftreemeg attrib  -  face       coedge        edge   DDJW?   tangent ellipse curve  l͒@cXSI@e@o~Q?݊yGʿ?xo~Q? < $DT!? pcurve    exppc nubsDJW??¼¼ spline  ref[  vertex    coedge        coedge     _   edge  $ chȟ?   tangent  coedge      b  coedge     f b  loop     vertex  _ ellipse curve  @ieR@e@;H˪??6j Ce<@nĿ@>=?  coedge        edge  3ˍ" 3*}a@   tangent  point  @rR@e@straight curve  @rOf@ :"1vb 6rÓ4@ftreemeg attrib  6  face       loop    plane surface  @L@e@??  coedge        coedge    z    coedge        coedge     q   edge   = @ ?Nv@   tangent  coedge        coedge     t   edge   -DT! x-DT!?   tangent  coedge  !  " # w  coedge   !  $ w  loop  ! %  vertex  t &straight curve  @P`f@? @&23? xs:d.@ coedge    n    coedge  ' "  | (  edge   DJW DJW?  ) tangent  face * +   ,  point  wA@P`f@ coedge  -   .   edge  @ @ e / unknown  coedge   0 1 2   coedge  o n     edge  A@#@ 3[|@  4 unknown  vertex   5ellipse curve  wA@6sQf@H˪?6j Ce@n?<? ftreemeg attrib  N  face 6 7 <  8 plane surface  D@@Q@e@H˪?6j Ce<|FSk  point  @rRf@ftreemeg attrib  D  face 9 : ;  < plane surface  @rR`f@?  coedge  = >   ?  edge   DJW DJW?  @ tangent  vertex   A coedge  B C   D  edge    -DT! E-DT!?  F tangent  coedge  G  C H   coedge   G = I   loop  G J  const_roundffblendblendsys attrib     null_surface@ vertex   Kstraight curve  @J`f@ xs:d. @&23 point  wA@J`f@ coedge  L M   N  edge  $@ 6@  O unknown  coedge  P      coedge   P L Q   loop  P R  vertex   Sellipse curve   @E@`f@x+Rx+R? H H@?  coedge    T U   edge   V"@  W tangent  face X Y   Z  point  @E@`f@ coedge  + T     edge  -DT! /-DT!?  [ unknown  vertex   \straight curve  @E`f@? {cD ?@ftreemeg attrib  \ cone surface   @E`f@? H H? $@  coedge  ]  M ^   coedge   ] "    loop  ] _  vertex   `ellipse curve  P@E@`f@x+Rx+R<? H@ H@?  coedge  # " a b $  edge  c" % " d tangent  face e f $  g  point  x@E@`f@ coedge  a + '    edge  --DT! -DT!?  h unknown  vertex  ( istraight curve  x@E`f@ ? {cD@ftreemeg attrib  )[ cone surface  P@E`f@? H@ H? $@  loop  j f straight curve  @J@e@?  point  P@J@e@ point   @J@e@ftreemeg attrib  2c  face k l m  n  loop  o 2 plane surface  Ԓ@H@e@??  coedge  p 4 q r   coedge  s t 4  ;  edge  u-DT! -DT!?  v unknown  coedge  w 5 ;    coedge  5 w s x   loop   Y  vertex  6 ystraight curve  @Ld@  coedge  7 z { |   coedge  } ~ 7    edge   $@   unknown  coedge   8 ~    coedge  8  :    loop     vertex  9 straight curve  4@Ld@  coedge  ; :   <  edge  >$    tangent  edge   =$@   tangent  point  L@Ld@ point  4@Od@ coedge   A   C  coedge    A    edge   % Ͷ A  tangent  coedge  B X     vertex  C  point  Ͷʒ@cXSI@@e@ coedge  F    C  coedge    F  m  edge  @ 9@   unknown  coedge   G     coedge  G  I    loop  G   vertex   ellipse curve  ,@K@@e@lv@lv?  coedge  J I   K  edge  $ L I  tangent  face  R K    point  D@K@@e@ coedge   R N    edge  MK TMK?   unknown  vertex  O straight curve  D@v1O@@e@ :`2 <`<@ftreemeg attrib  PT  face      cone surface  ,@v1O@@e@9qFSkҼ?kWA-@&;CSQ@d@ftreemeg attrib  W  face       loop   W cone surface  @ң"בLf@ޛVۼ<? ?@ -DT! }ellipse curve  Ͷʒ@cXSI@e@`ޓ?  DJW? edge   DJW \DJW?   tangent  point  }gxb@@Jjw!lTe@ coedge    ]    edge   \#,{V# 8B ]  tangent  coedge   ^     coedge  ^  `    loop    straight curve  aJT9_@ΏR@@e@  coedge   `   b  edge  MF!CC= c %p< `  unknown  coedge  a   . b  coedge      b  face   b    point  aJT9_@ΏR@3Ce@ vertex   straight curve  @rwqSPe@? RUF [nxRb@ftreemeg attrib  j7  face       loop   j cone surface   @?/S@e@?΀¸O<j\sQ?LF@lv? @  coedge      k  coedge   m     coedge  m      coedge    m    edge  < -DT!? m  unknown  edge  tvS R n  tangent  coedge  1  o    edge  _@ 3bE`@ o  tangent  coedge   p     coedge  p  '    loop     vertex  q  vertex   straight curve  xGT縒@Py*f@ ~:? =m? )֤('@ coedge    r    edge   E@ @ r  tangent  coedge   s v $   coedge  s      loop     vertex  t ellipse curve  @N`f@x+R?lvlv\[1%~? 0Z 0Z? coedge  v u   w  coedge  {  u # (  edge    D^ h? u  tangent  edge   x  h?   tangent  face   w    point  @P`f@ coedge   {   (  loop    ellipse curve  wA@Pf@?H!Z?|b@? Ļ3O| ?ftreemeg attrib  }1  face      cone surface  wA@..!@f@?!Z?"|b@? ?@  coedge        edge  @N ˓V9   unknown straight curve  @rR@e@?  coedge        coedge     2   edge  3>JW? v,DT!? 1  unknown  vertex  2 straight curve  _u@ Q`f@`-9?j?z6  point  Hf@Qޓf@ftreemeg attrib  O  face      cone surface  L@O@e@?lvlv@? ?@ ftreemeg attrib  E  face       loop    cone surface  x@J@e@lv@lv? @  coedge     I ?  coedge      ?  loop    ellipse curve  wA@Jf@L!Z?|b@? zDJW ƻ3O|? point  Hf@Jޓf@ coedge      D  coedge     H D  loop     vertex   ellipse curve  @M`f@x+RW9?lvlv@][1%~? 0Z 0Z? coedge        edge   :JV? -DT!? C  tangent  edge    @^ h? =  tangent  face       point  @J`f@ coedge     Q N  coedge     ^ N  loop  L  straight curve  x@J@`f@  coedge    j    edge  "  L  tangent  face  _     point   @J@`f@ coedge   j  U   edge  V$@ X@ T  unknown  vertex  U !straight curve  @E@`f@ ? {cD@ftreemeg attrib  ]  face "    # plane surface  @J@`f@? ellipse curve   @E@e@? H H?  point  @E@e@ coedge    $ %   edge   &"@ M ' tangent  face ( )   )  point  P@J@`f@ coedge  $   b   edge  c$@ X@  * unknown  vertex  b +straight curve  x@E@`f@? {cD ?@ftreemeg attrib  `  face ,    - plane surface  x@J`f@? ellipse curve  P@E@e@? H@ H?  point  x@E@e@ coedge  T . P   ftreemeg attrib  d  face / 0 1  2  loop    plane surface  D@H@@e@  coedge  3 4 5 6   coedge  7  8 9   coedge  : ;  r <  edge  =@ u@[@ q > unknown  coedge     x ;  coedge    : ? ;  vertex  r @ellipse curve  x@Jd@lv@lv?  coedge    A B   edge  $ C  D tangent  point  x@Ld@ coedge   E F G   coedge  H I  | J  edge  K pFGs&4@  L unknown  coedge  M  I N   coedge   O     loop  ~ P  vertex   Qstraight curve  4@Zd@OL2?>%  edge   *@  R unknown  coedge     S   point  4@Zd@ coedge   A   k  edge  -DT! -DT!?  T unknown  vertex   Ustraight curve  4@O@e@? ;`< ;`2@ vertex  B Vstraight curve  L@L@e@ ;`2 ;`<@ coedge  W  X Y C  coedge  Z [   \  edge   ]-DT!  -DT!?  ^ tangent  coedge  _  ` a   coedge   b Z c   loop  b d  vertex   estraight curve  @J@e@ ؈'+    coedge  f `   g  point  Ͷʒ@J@e@ coedge   h i j C  coedge  k l   m  edge  -DT! n-DT!?  o unknown  coedge  p  l q m  coedge   p   m  vertex   rstraight curve  D@H@@e@  coedge    s t   edge   u$@  v tangent  face w x   y  point  ,@H@@e@ coedge  s      edge  @ ǜ.@  z unknown  vertex   {straight curve  D@K@@e@? ;`< ;`2@ftreemeg attrib  X plane surface  D@H@@e@? ellipse curve  ,@v1O@d@5j Ce¼ǰQ2t?jLY+Qf@[iI@´5ULŮf@B @@m&F:Ljf@}aN@T*Lf@aqIs@RLf@@\+WmLf@ @`pTLY+Qf@֛玒@҃f}6LŮf@y.)o@QLjf@Ah(@~N~\Lf@liJݒ@r=QLf@bo* @f!Lf@{>@kLY+Qf@2O@wLŮf@"7 @XiKjf@,We@&>Kf@n@ѣ"בLf@:5"IG@*jLf@\@~3pgLY+Qf@4Rݒ@&LŮf@CB’@Kjf@H'@JbKf@@ѣ"בLf@@*jLf@@~3pgLY+Qf@@&LŮf@@Kjf@@JbKf@?Pt!'c.Gb[ %= 8M{N$(6ۿ ?  ?  tcoedge coedge       ] h? ellipse curve  Ͷʒ@Je@??!Z |b?  coedge    >    coedge    f    loop    straight curve  0@J|#f@ ~:ƿ? @f+ Ⱦ! coedge        coedge        face       coedge      k  edge  "|$a aDž5,+#@   tangent  vertex   intcurve curve   surfintcur nubsA-y?-y?D6/\?-y@_yms:@^yƌ @u t @@G7;@Nzнa@-@o@c2 6@~i@R7@^sЂq @I=!G!@5"@a #@}%@O̜W&@&2'@zK(@2 N(@:Lɘh)@e*@&[h+@P,@ߥ-@7.@"/@^sЂq0@0,0@1@TE2@"͆2@">3@r"3@"T 4@ңv4@0A<4@3DI5@۾:75@a0|$6@76@"*7@Xȱt?8@ 8D8@9@ vF9@Q@TU:@!}@ 0;@@6Q;@^, <@^Kt<@xxw<@G=@n7l=@473;>@7>@TcBM?@"?@wP-@@^sЂq@@@>y\3mS@-!rXe@@ u!yS@-!rXe@J2@진S@P=aWe@R@K=oS@,&F8Ve@Y܃@<@S@ŸTe@㠠 @ZeOS@;Qe@V@ppQS@k|Pe@w;@S@EʅLLe@tyy@!S@M!Je@õV]@8?`S@>d\Ge@Ss/臑@)&S@2QÈEe@-]n@D&i T@7Be@ @3,)T@]!Ae@,T@L 7Je@:M@d+T@mLe@ZH@7(T@Qe@>O|i@6[8&T@F~tZTe@uj@T@Gl]e@L @|?T@AZde@@<@|  T@Ϯ]se@ef,@csT@{c4{e@z9@){lT@g)e@̮˗@@ttS@ste@(I;@PqQ"S@|te@@89S@ue@@89S@e@z9@){lT@fPֶe@ef,@csT@脜:e@@<@|  T@1Qwe@L @|?T@Dme@uj@T@zTe@>O|i@6[8&T@Ye@ZH@7(T@l4 e@:M@d+T@zF=e@^rVj@>,T@Re@Qe@j,`-T@9&me@)$<܏@¨ .T@"e@NupD@z.0-T@ҟe@-@D+T@IPe@ @hr*(T@Kܘde@dNy@$%T@!f@W` c@8xXT@ۊ2e@`Hge@R@K=oS@be@J2@진S@ e@@ u!yS@_nލe@@r}ȖbS@_nލe@J2@oyWS@ e@R@{H@S@be@Y܃@@5S@>`Hge@㠠 @xH^iS@bgH&e@V@ cHS@e@w;@nMS@5ze@tyy@KR@HZNe@õV]@DR@›X=e@Ss/臑@^R@ή+R@Re@:M@Er2R@zF=e@ZH@qrR@l4 e@>O|i@].R@Ye@uj@GR@zTe@L @qyR@Dme@@<@RR@1Qwe@ef,@KUR@鄜:e@z9@=(R@fPֶe@̮˗@<*DR@#>e@(I;@,gD.R@ e@@vR@O|i@].R@F~tZTe@ZH@qrR@Qe@:M@Er2R@mLe@^rVj@>+R@L 7Je@Qe@@̭R@Fe@)$<܏@I᪭R@ak]De@NupD@b6R@T -`qBe@-@8fJۯR@|Ae@ @tFԍR@#g@@e@dNy@h~R@?e@W` c@Dzh_R@%u3@e@d\Ge@tyy@KR@M!Je@w;@nMS@EʅLLe@V@ cHS@k|Pe@㠠 @xH^iS@;Qe@Y܃@@5S@ŸTe@R@{H@S@,&F8Ve@J2@oyWS@P=aWe@@r}ȖbS@-!rXe@@>y\3mS@-!rXe@kOFRi@? cone@rwqSPe@lv@lv? @ cone@>y\3mS@@e@6%? straight curve  Hf@..!@ޓf@? BH6AV l)6Q@ coedge        loop   + straight curve  }gxb@@ M@jw!lTe@ i ?- nl=ma@tcoedge coedge       ;@݆mW!@  coedge        edge    B?   tangent  coedge        edge    >h? '  tangent  face       point  Hf@Pޓf@ point  }gxb@@Pjw!lTe@ coedge        coedge    B    loop    straight curve  |@@K`f@ (&23? ܈'#@tcoedge coedge       ?T!  edge   <;JV? -DT!?   tangent  face       point  |@N`f@ coedge    !    edge   H@ ;LԠ@ !  tangent tcoedge coedge  "    ( 0}@}3)% @  vertex   ellipse curve  wA@Pf@??  -DT!?tvertex vertex   h->ellipse curve  @Pf@??  -DT!?ftreemeg attrib  % cone surface  @Pf@x+Rx+Rlv@lv? @ tcoedge coedge   '   ( `r7@% $@  face  % (   ftreemeg attrib  +2 cone surface  Ͷʒ@ M@e@?E!Z |b? @  coedge   -     coedge    -    edge   U"{@ -  tangent  vertex   ellipse curve  @ieRe@H˪?6j Ce<@n??  coedge  0      coedge    0  C  edge  *zJ4p@ k2G>@ 0  unknown  coedge   1     vertex  2 ellipse curve  Ͷʒ@f'I=Qe@H˪?5j Ce<nĿ@>?  point  }gxb@@X&Qjw!lTe@ftreemeg attrib  7P  face       loop   7 cone surface  L@O@d@lvlv? ?@ ftreemeg attrib  :F  face       loop   : cone surface  x@J@@e@lv@lv@? @  coedge  t s   ; tcoedge coedge   =   ? +L .@+0@ tcoedge coedge  >    ? ?[Ec&@SF; @  edge   j)JV? -DT!? >  tangent  face   ?   tcoedge coedge  C B   D QT!  edge   Eqq5  h? 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M#1-DT!E'1-DT! MbP? torus@Nf@x+R?@?x+R<  vertex   ellipse curve  |@Nf@?x+R@?  -DT!?ftreemeg attrib   torus surface  @Nf@x+R?@?x+R< tcoedge coedge       ] h? tcoedge coedge       `h  loop    straight curve  @ΨrPf@@ tcoedge coedge      ( ps!@ -v'@ tcoedge coedge       }3)% 0} tedge edge   }3)% 0}   tangent 4E60? pcurve    exppc nubs0}@WX@m˽@~Q"@x4 @]@*@}3)% @;\il@aCDG1@k..rr-p@ lE@0Rf.Xh_@>Pn,5@뽚if_y@mTGh@"@Q-K@6Į,v@}"@}-DT! @MbP? toruswA@Pf@@  point  wA@ΨrPf@ point  @PrPf@tcoedge coedge       % $`r7 tedge edge   % $ `r7   tangent p GA? pcurve    exppc nubs`r7@V@BGlGv@~|@$]@>v@% $@+]?F ,9h|?îrq ?vIddv?ؓ '?ēY*Ȝ۳?j%kixk]=?-bLPnP9,?Rf."n1|?j ??j.*׍6ɋ?cCD '~?<ֽellipse curve  |@Mf@UUUUUU? qq5 -DT!?ftreemeg attrib    torus surface  @Mf@x+R?@?x+R< tcoedge coedge       ] h? straight curve  @JbKf@  point  @IbKf@ point  wA@HbKf@ftreemeg attrib  "  face       loop    plane surface  Dxgzǒ@Qڂf@ t ~:ƿt ~:ƿ ?  edge  $@ &6@   unknown ftreemeg attrib  _ plane surface  x@J@`f@ ellipse curve   @E@@e@? H H@?  point   @J@@e@ellipse curve  P@E@@e@? H@ H@?  point  P@J@@e@ftreemeg attrib  0f  loop   0 plane surface  @n%R@@e@?j#ʧ<<<  coedge   6   1  coedge  4 3 ! "   coedge  h # 3  C  edge  #@ $6@ 3 % unknown  coedge  & ' 4    edge  (@ $9@ 4 ) unknown  coedge  * 5 ' +   coedge  5 * h b   vertex   , vertex  + -straight curve  @H@e@ ۈ'" nēL3@ coedge  . 7     coedge  / 0 7 (   edge  1@ +1@ ' 2 unknown  coedge   8 ; .   coedge  8  / 3   vertex  ( 4ellipse curve  x@J@d@lv@lv@?  coedge  ; :  5 <  edge  =$ 6 ; 7 tangent  face 8 9 <  :  point  @J@d@ vertex  5 ;straight curve  @J@e@ ۈ'" nēL3@straight curve  4@L@e@?  point  x@L@e@ coedge  E      coedge    E 7 1  edge  ; <x:@ 6 = unknown  coedge   F   :  coedge  F > H > :  loop   F  vertex   ?straight curve  @qW"Zd@OL2?>%  coedge  I H @ A J  edge  B K3@ 9 C unknown  face D  J  E  point  g+߈@Tq\d@ coedge  @ F M B G  edge  C $@ M H unknown  vertex  N Istraight curve  g+8@:;]d@? ftreemeg attrib  P>  face J K :  L plane surface  4@Z`f@>%2bOL22bOL2>%? straight curve  4@Z@e@?  coedge   W M N C  coedge  O P W K Q  edge   R-DT! O-DT!? W S tangent  coedge  T X [ R N  coedge  X T O U N  loop  T V  vertex  K Wstraight curve  @ @e@? 7nf&L 6Gtcoedge coedge  [ Z X Y \ ZS!  edge   ["uJV? ]-DT!? [ \ tangent  face ] ^ \  _  point  @M@e@tcoedge coedge  ` a _ V b c)b;(g.P tedge edge   d)b; Y(g.P _ e tangent jc]?,B3? pcurve    exppc nubs(g.P@H x@j#I@Hss@@@)b;@Uy@Zbݿ8B>@/ܿd#j@"-~ۿ:e0@8+,ڿTuDŽI%@ܸ5;ڿyK@~Tٿk,@4;ٿa2]E@bOuؿf@X,Xؿ>5@x$8ؿ'|k@BZؿ@t"׿r 0@G׿MbP? cone@Je@?lvlv? @ tcoedge coedge  ` f f g g h0⣔_QAk` tvertex vertex  g i{Þ?ellipse curve  Ͷʒ@Je@?  -DT!? coedge  j k b \ l  edge   ] dUd b m tangent  vertex  \ nellipse curve  ؒ@Je@<?  -DT!?ftreemeg attrib  d+  face o } g  p cone surface  @Je@?lvlv? @  edge  f-DT! #-DT!? " q unknown  coedge  r i * s e  coedge  i r k i e  loop  c 9  vertex  j tstraight curve  Ԓ@H@@e@  coedge  l k u v m  edge  n w$@ d x tangent  point  Ԓ@F@@e@ coedge  u s p l   edge  m@ u6@ p y unknown  vertex  l zstraight curve  @H@@e@? nēL3 ۈ'"@ellipse curve  ,@K@d@?lv@lv?  point  ,@H@d@ftreemeg attrib  xS  loop   x cone surface  ,@v1Od@5j Ce;T̆b!y\3mS@d@ftreemeg attrib    face       loop    cone surface  T@@Kf@? ?@ -DT! }tcoedge coedge       Vy@<uV%? tcoedge coedge       D^Q,T!? tcoedge coedge       hhF?_ tedge edge   F?_ = hh?   tangent چbC? pcurve    exppc nubsF?_ =hh??bܪ3n0>d dMbP? spline  refv  coedge        edge   @ ;LԠ@   tangent  pcurve    exppc nubs] h?MbP? spline  refv  vertex   ellipse curve  @ԣ"בLf@?@1T???  coedge        edge   =_{| 98B   tangent tcoedge coedge       з(U% tedge edge   з( U%   tangent ;?2!? pcurve    exppc nubsU%@d%@l.:|&@fWR'@7c'@E@6(@з(@ӔN@ ׿Z@%׿w$@ ؿ;Mv@z4W8ؿ3r@(@ؿx:@5fؿ/ll@i<ٿ{AVp@,Dªٿ[9Z@#<ڿh91n@>أڿ-(p @\k'T~ۿV o @r//ܿn; @MbݿMbP? conenZÒ@J<[f@_r ~:?<&E>vlv1!D׿? 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7v Mv޴%,+X_y4&zΗJ| ӿ֎?zzX@lVG@ן@ ?  ?   vertex   intcurve curve   bldcur;@ן@݆mW!@롕? spline  rbblnsur blendsupsur cone'0В@Qe@?@? @ null_curve nullbs@@Q@e@ blendsupsur cone$)Ē@Pdf@Jr ~:ƿ&?E>vlv@!D׿? @ null_curve nullbs@@Q@e@ intcurve  offintcur nubsn,O He^ _ʫ}?h;2m@ V@lw @ 3$q@*>U@Ž@݆mW!@*>?$@|l'@" *@G,@?нK-Y-@3.@S/0@mW1@O?V3@_Aoޒ@:KPpIe@pޒ@c^O fpe@r‰Œ@&GOzKe@> Ē@ \OHe@P7’@-0O؄e@.\@\(n5Og*e@ T@\(n5O'e@lr@-0OAS e@[v@ \O8GB6f@>ѧH’@&GOf爠f@nĒ@(I">Ol 2f@?Œ@84N~1w=f@+Ȓ@֯O n`Lf@_7Oɒ@)|O]cvlv@!D׿? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?롕? ??n,O 7v Mv޴%,+X_y4&zΗJ| ӿ֎?zzX@lVG@ן@݆mW!@롕?){ m He^ (~ G9 !O_N y͖5:}߿ʫ}?ʫ}?Biq?ʫ}?u?n s?9V3C?h;2m@G/d@ V@TE@lw @pjh @i"ZY@̳%@ 3$q@i5E*w@8f@b;*@*>U@K#@}#@aH@Ž@aS@io5@$) @\Rx @ null_surface nubs;@܆mW!@?;@?݆mW!@ nullbs   tcoedge coedge       (f@ Uc @ tedge edge   (f@  Uc @   tangent rʁ-9? pcurve    exppc nubs Uc Ie0*YG>z M^@uè4?(fhBJW?X g[?hO|h@@R9?Xo ӝ?Vԇ$Z(?<*i?wHɠXI?ݠ-e'uLJއy_%пP\!po׿?LSI߿Pӡ_-L ֺB($KWMbP? sphereͶʒ@Pe@-@Hj1Nf@0[O@j UNf@^%ዒ@a)NY+Qf@#>:{@0FMŮf@?@J\Mjf@nqj@.LMf@6T<@vةMf@n+6@4!Mf@0@(MY+Qf@kx@ɴ1eMŮf@&ȋ@ SLKMjf@v_@Z;Mf@5 M@r^Mf@J@,3ŮMf@<Տ@1"MY+Qf@l{@$i7MŮf@tw@ITMjf@JE3э@d,Mf@]Δ@%Mf@@,kMf@j?@=ޙDRMY+Qf@KX@dL)LŮf@t1Õ@W2Z_Ljf@Ƹٕ@F}hLf@8+Xw@X#Mf@uAi@<ټMf@Z@ĢfkMY+Qf@';@:MŮf@lf@FاHMjf@9r@L Mf@G@BRp[Nf@ P@&|yQNf@HG@2TGNY+Qf@Lv@ 376NŮf@/C@fj&0Njf@>Uơ@H),Nf@US9뙒@#Nf@z)P@1+yNf@@3$@1РNY+Qf@W1ן@mP:NŮf@r~@ޭ{9Njf@ٺ@;Nf@yփ|@_#Of@'@dp@)DOf@S7bc@sonOY+Qf@ E@rlOŮf@Y@MOjf@*@rUzOf@&@a?6Of@WU+@NПgOf@V@OY+Qf@/i@ OŮf@Z湗@fPjf@a闒@Լ Pf@Iu@[ 4Of@ @FxeOf@@H2Gu-OY+Qf@Tꐒ@cOŮf@Nf@g_@@P"NY+Qf@&$ӈ@`yNŮf@uO͇@;^Njf@P?41@ozUNf@T@k$Nf@AVȌ@XNf@=@gNY+Qf@w6@PkMNŮf@Н@mNjf@sՈ@ƏNf@T@Nf@AVȌ@Nf@=@NY+Qf@w6@NŮf@Н@Njf@sՈ@Nf@?Pt!(t.GQ %)= M{N$6ۿ ? 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(g.P@6,@!:S@̭!@KT%@E%@&@WE&@c4X'@ @sQ2'@swy'@W'@ndb(@PTRE?-@ /C@d}FM@Ğx@#j5@Jý@H?@gc^@nu@5A\@3@Q"@@phC(@B 2` @VaB,!@!@Ap}"@mWV&#@F-#@b1F$@ni[$@h߄4%@KT%@*}&@t^&@"DM&@'@, '@=(@ null_surface nubs(g.P@)b;@?(g.P@?)b;@ nullbs   tcoedge coedge  Y R X g Z [ QAk`@0⣔_@ tedge edge   YQAk`@ 0⣔_@ X \ tangent Gnc-9? pcurve    exppc nubs0⣔_8 &$$=̑:iTRQAk`BF'KW?Hӡ.L ??XI?5!pop?~Jއh_%?.ݠRr'uL?vHɠE푌I|y"iԇZ(пXox׿~V|h@@և~9߿$g[hBJWMbP? sphereͶʒ@Je@-O’@(KԢf@'<@oh6KcI$%f@зⱽ@LZLHƥe@B`@1/L$/zNe@3l@g$LS %e@x5T @rKK_8)e@˯^A@ȁ^ K?e@-t@nKa"f@)d@eaL(e@+De&@p-UKZe@RXUe@ 'K{ye@%@5RKR(e@a@\L|Kae@ft=@@ uvKֻf@a˳@"AKH.*e@%㵒@~dKU,e@q2@XFKvaMe@iT@1)wK;9(e@d@Z@xKK-e@;u@ýKϜ||1e@iBͱ@]o'K T-e@cR/@P+KÖie@X䶒@RnmoJ`%+e@S,κ@oۣJ.X_e@@pJLTe@j>Mٻ@WvJ0Rf@ @9JO e@sY?@ԎJwde@_ Q@wYvJA2:e@9B6@bJve@.&ͻ@V-J؊xe@? r@؊J^XXF f@5 @bBYJq\ZNe@l`L@մ_JYTe@xW@ hHfJ-4e@S[T@RlJv2bVe@~pͻ@H,lJ@je@ڣx@ԖhJg f@.4α@XǾIkre@0@rcI&8e@S綒@dk ,JIQe@gѺ@/ڱ*Jbe@6J@L)(j-J |e@ѩCػ@4D?%J2f@eFRͲ@K:|IC e@ @=t6 I e@yg1|@pUI?+re@a=@T2ԈJڿ-e@m@'@ؙ Je@{V(@JJf@ Xt5@Ijke@`D@JI6h^e@p@,XVI+2e@K@^B#I7 -e@ @8I !e@ z@fffffI+Af@?'#@ػ$@jzG'@e۰h+@/y/@fD- 2@XGN\3@ ?  ?  tcoedge coedge       x 4P h? tcoedge coedge     y  z +L .@+0@ tcoedge coedge  {     | uV%Vy@ tedge edge   } : uV%?  ~ tangent {[eJ? pcurve    exppc nubs:uV%?T0@?B[@.0@MbP? spline  refx tcoedge coedge       ,T!D^Q< tedge edge   D^Q ,T!?  tangent ;I% %? pcurve    exppc nubsD^Q-p8R?Zp8R?,T!?pp8R?Ʀ?,T!?ܪ3n0>d dV,fgW6,@?40ٕI?I[TRA?R&SdZ1?] gc3տt>uf\?eː? oūWt?;\0>7 S>̴׿SB2>>?ǿ(Sc=MbP? spline  refv  coedge       pcurve    exppc nubshhF?_ DT!  ~ coneT@@Kf@? ?@ -DT! } vertex   ellipse curve  2T@wnM f@v,Jb=?.4۽T=?? tcoedge coedge    y  +0+L .  loop    vertex   straight curve  @ң"בLf@@  point  @ѣ"בLf@tcoedge coedge       ,hr; tcoedge coedge     RR[ h?  loop     vertex   straight curve  fYL@ObK3hS f@p ~:ֿ=? tcoedge coedge     [ hRR: tcoedge coedge   Y  {R?  loop    pcurve    exppc nubsз(U%?з(@?U%@MbP? spline  exactsur nubs??U%@$#'@N*@Db|.@ƫlR=2@O?V3@ǰ^e@536~ʒ@@l$vL\)Ve@K1ʒ@i~sLO8e@Q Ȓ@hԤL70We@wιǒ@G$ Kȡe@eƒ@MvK?Ie@ 7>̒@̊ L{[e@5YI̒@dӍ?պL` e@dbP̒@odjC}L;e@ ʒ@?N!LW e@Wܺɒ@N?LCse@XȒ@\;Kiwe@bu͒@uM|M~}e@7_Q͒@r4Ld܁e@x5\͒@jGu[L-?h1e@mK̒@FL߸le@ 4dlw˒@c=NLye@ʒ@(9})e@1Ӓ@>P Un2Lc6e@[GӒ@TPLSe@Ғ@G|KE܃e@]U%Ғ@6leKve@] lӒ@L1 K H+he@y14Ւ@ Ʀ>Lqe@?^k7Ԓ@;NL=Je@ ^Ӓ@JzzKsTeRe@,\xӒ@mV-K\e@TӒ@YUlK)2nye@:4NӒ@vKu<me@ `F۶Ւ@V7L}6je@IhԒ@Q2Kʡͧe@^?+Ԓ@uR{K+~e@r֒@N,Kd쎵e@o ֒@ލБKe@NdÍՒ@|E4bnKF딦e@NWԞ-Ւ@O,uGK)de@J`ۛJՒ@2fh6K(e@u q\Ւ@Ⱦ)K"e@fQג@4a}aK]ݶe@MJ-￑e@P ֒@b#Je@>V֒@Je@WԦU֒@TO J3e@4pג@+mKhe@=֒@w J$6ܵe@4 ֒@^oKKJީGe@fO$֒@!uCJ$! %me@Z\*֒@1J2(e@`c֒@kAJi-*e@!8|xג@0VwJ H޼e@S֒@l\Jͤ7e@ 1֒@,J]!Ve@R /֒@e7J e@aLG4֒@.*tJB-e@UBj֒@GJ]D\юe@ԡג@iJj㻨e@ ֒@:Jvlv1!D׿? @ null_curve nullbs@@Q@e@ intcurve  offintcur nubsXl.!?(`5 @8Z1@YaФ@2I17@/o@M@t,ukm"@U%@d<(@LTj+@!.@iE0@Ÿh0@OH1@:e.2@O?V3@eo T5@}S5@N󬦋6@|;7@Jْ@RK;JK[Jf@Xؒ@hۤKo3Of@(;ג@q~K\ Vf@BwԒ@@L'r\f@|\RӒ@};aL ^f@v,d6ђ@hLc4`f@В@C>ɩL *`f@,LΒ@-G L|#^f@^2͒@OL}]f@z'Ǜ̒@vgL+ bZf@A:=˒@>ZdHL dBXf@_7Oɒ@4րL]cѧH’@`Le爠f@[v@{L8GB6f@lr@ O}LAS e@ T@"בL'e@.\@"בLg*e@P7’@ O}L؄e@> Ē@{LGe@r‰Œ@dLzKe@^Ȓ@ٶ'Lfpe@fT]ʒ@yoMSie@R͒@-)PVAL׏*be@CΒ@4րLW`e@gt(В@=ZdHL|e_e@Qzђ@wgL_e@;Ӓ@OL97ae@;Ӓ@+G L?@be@$oՒ@zC>ɩL&ee@4eP/֒@hL(*rhe@#@ؒ@w};aLWoe@OGْ@@LPte@mڒ@By Lye@yے@<Ki̱e@zYܒ@YKy0be@ݒ@'=KPmܧe@² ݒ@0K •e@k̝ݒ@j`#KDĖe@oh#ޒ@DO Kre@5MLޒ@&JorW}e@:kޒ@UJe@pޒ@8CřJROhUe@_Aoޒ@ i{JpIe@@@ conenZÒ@J<[f@_r ~:?<&E>vlv1!D׿? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?롕? ??U%@$#'@N*@Db|.@ƫlR=2@O?V3@y\3mS@@e@ coedge     k ellipse curve  @-DT!?  unknown  coedge     k  vertex  straight curve   @?/S@@e@?¸O Y 42A SI @ coedge   j     edge  @ 3@  unknown  edge  h @ H6@  unknown  point  4@T@e@ point  4@R?DS@@e@ point  @%??  point  4@Z`f@ coedge  M   >  edge   sFC? -DT!?  tangent  point  Ͷʒ@P@e@tcoedge coedge     ;@݆mW!@ tcoedge coedge      Rs$= tedge edge   ac(= R?  tangent ӘK? pcurve    exppc nubsac(=R?D#?A7-@kʕ?=,@MbP? spline  ref tedge edge   VzA= ` h?  tangent @n(C? pcurve    exppc nubs` hVzASMu<݆mW!@?цmW!@MbP? spline  ref  face     point  ΍ ,-Ē@ΨrP3]7e@tcoedge coedge    + R?  loop    pcurve    exppc nubs(f@ Uc @?(f? Uc MbP? spline  exactsur nubs??B++_?]%) N(fS ֒@.ޅ)Pe@CEnՒ@wT,4P (,e@p-UԒ@nhn?P+1`e@ NQ^mԒ@NBKTPYUPe@\OԒ@iG]P& re@U_.^Ԓ@OθeP{@e@?Ւ@3h٥O`&ͨe@"P_Ԓ@ P.3{e@y{Ӓ@$WPXe@ڇ:Ӓ@4Puxe@oӒ@gr@PW\cSe@[I2Ӓ@~JPǣ3*e@aIӒ@~a}Oɛ[`e@MҒ@,!OBUe@(ABҒ@Fr&OO[e@z7Tђ@nPIir̎e@Z{[ђ@Z*P(5›"e@]kђ@55 j4P:7s|e@n YВ@{kT|ROYz$e@ ~ϒ@lmO9Kge@V ]ϒ@qވOHJԛe@IP !ze@!̒@^oO ݧe@{خ̒@=ORO廢e@A̒@O{0ke@х˒@$OF%Be@3ʒ@¾DP|sYe@/[ɒ@Fi:mPy e@e ̒@B[Oe*9te@3˒@8%OOZsNe@ 7˒@f,O Ae@wOʒ@+OOnVe@R!fɒ@,O,be@2gȒ@a{0Pe@Iʒ@nY|O(e@9K˒@&ӍOQOfL{e@fZʒ@YIJO͒Ưe@Iɒ@pդOj}e@ b@Ȓ@VHCPAe@[fǒ@; PBʑe@%1ʒ@a(DOqϏe@"ʒ@ҏ]TO=e@^)Uʒ@-`JO3e@WkȒ@%Oۚe@ǒ@P| e@K4ƒ@GP',F e@56ʒ@#Ocwe@XXZʒ@2XO߹e@-ڿʒ@ЇD"O^e@(mȒ@X0@}Oe@C{lǒ@P7ake@ݏ6ƒ@J V Pwe@?_?]%) N ?  ?  tvertex vertex   ʔ?intcurve curve   bldcur Uc N(fm ? spline  rbblnsur blendsupsur cone'0В@Qe@?@? @ null_curve nullbs@@Q@e@ blendsupsur sphereͶʒ@Pe@-Oae@'ʒ@c,6$O phe@?1ɒ@F?O^$oe@N ƒ@5ryO e@jĒ@@ OuEe@Z’@^G+Oeɫe@@;8O fׯe@F?m@MƑ^OMތ~ e@>,@wOM_e@Ë@!ROje@ή/[@e΢aOKmf@’@WP77Sf@tQÒ@Z:Px0i)f@teĒ@#[PY 1f@@@ sphereͶʒ@Pe@-~}>-DT!  cone׼@%\(n5OVWf@t ~:?Gm]= t ~:ֿ? ?? -DT! }tedge edge   h 0B "+h?  tangent ]I? pcurve    exppc nubs"+hh 0B=׼=)OT! t=e cone׼@%\(n5OVWf@t ~:?Gm]= t ~:ֿ? ?? -DT! } face  a   straight curve  sՈ@@Kf@ tcoedge coedge      QF=aT!?  pcurve    exppc nubs`h??4btt0> dMbP? spline  ref tedge edge    4P h?  tangent W7ün(C? pcurve    exppc nubs4P h?MbP? spline  ref  coedge      edge   ;LԠ   tangent tcoedge coedge     h}@}3)% @  pcurve    exppc nubs] hxUMu<}3)% @?}3)% @MbP? spline  ref  vertex   ellipse curve  wA@.\(n5Of@@1T??  vertex  ellipse curve  t@(n5Of@H=Y۽T?? ftreemeg attrib    face     cone surface  @.\(n5Of@?ޛVۼ? ?@ -DT! }tcoedge coedge      !<V%? tcoedge coedge      Mٻ@}čP4Rf@a˳@i_ ?Pʚ.*e@%㵒@w;!MP~U,e@q2@\PaMe@"iT@I!3kDpP>9(e@-d@Z@ !tP-e@;u@ rP[||1e@'*d@r;Oe@De&@qeUs0PuZe@aRXUe@u쾯P}ze@٥%@%7P»R(e@ȝa@٦APae@t=@q"DPuf@Bⱽ@GO ƥe@sB`@jvO/zNe@3l@M}OU %e@5T @5qFZP:)e@^A@P+Pe@-t@ˑ1Pa"f@ܮT=Ē@FQOO5e@Ē@tO"Fe@qfĒ@*ñLHO@B-f@>@*HÒ@ ,Ofpf@PO’@RkP֢f@2<@2PdI$%f@at~ƒ@f7Osf@x?ƒ@kiO` "f@$3ƒ@T ꟈOl&f@1zlNĒ@ѥO*܅80f@KJD’@&PUP5f@CJm@ԀP M9f@q(ƒ@kGO/Aef@E[Sƒ@U3TO2&ff@wխgŒ@PJ_O)ܫff@7 MÒ@nRO=Bdf@\.{@jqKPhaf@X5@Bm0 Pv^f@axWĒ@PO+1f@VgGĒ@jvPO־=f@:K-۷Ò@|O҃f@B7@ Õ|kO{f@y@7!Pruf@8h@e"PhfWnf@m@Owdf@<)@Y5OO,KFf@sgY@CІO3u樥f@)@8;O#f@:L@`-*OLaG΍f@U@~HrPV;ւf@ jf@kOwJyf@6}u@%4PO,f@ǺD@TpOIL %f@^'!s@(qBOra?f@EԻ@gD^P:FEf@s@ U PK~1f@t@b[uO4IRf@AD@KTOђڽf@86Z@nQO]1f@j{@hEO£ܨf@*EI@FAe3PpV;f@@[# Pc\f@mH9ܷ@vR O(f@l% @G5NVOBLҿf@PR$.@dVEOH8;f@ BI@rOߦVf@7C@PSf@Q~)@et P'5jbf@5K@{f$Of@Iυ@@YOf@nռ@aOz5-f@@JONѫf@8[UA@ɅPܔgf@b)#S@x P~Nf@?a?a@FrM@ R@49l_!@ zb$@#G&@ ?  ?  intcurve curve   bldcurps!@ zb$@#G&@ -v'@wM=ټ? spline  rbblnsur blendsupsur conehK@Q@f@?@? ?@ null_curve nullbs@@Q@e@ blendsupsur toruswA@Pf@@ null_curve nullbs@@Q@e@ intcurve  offintcur nubsȫ?>.ga6@1YS78@?Oc͇@.Q|@s"@ @qg`!@8V&"@Cn[$@km%@ -v'@2%0(@-/}Ql*@h,@n,"-@SOZ0@ub1@]!f2@FJk4@yZ@@@QYf@i̩@8p*Q°*f@t7@< Q޷G"&f@pXਲ਼@kPf@r@LRP#7zf@Fօ@lePW2`f@]^-@MlhPg-Ef@ܵ@!7)P7e@,Pɶ@UP(\PXe@n筸@ '9O,K|7f@z.@^Q؋ONf@8@On f@ldփ@4mrOXf@G4!@?TOI`DIf@J0@;cHOv;$f@$>1@>%5O%I3f@T@Nm.Ov ;f@m>@DϐG.$OqKJf@1M@Tcb OQxRf@^:9@!ť4O!f`f@==@ʦO\gf@ /@ˠOiVsf@U6I@"=OΌxf@jK__@O| @[~f@ξ6R@0BOf@hlzS@J:(Of@ X@,^f.Ok~f@Q3ʎ@G#=OSyf@!߸@GO+uf@!jL@`OKkf@L2@è( qOdf@mʮ@yz&;O =Wf@FX@EIO@1Pf@n9@1-IOZQ@f@\tM@ʛP J9f@ @`x0?P$`N,f@]뮒@4mx[PƜ&f@ҳmdQ@.Pcռ`| f@ͩ'k@qtL6DPa(Hf@]A@xPr\!f@#{ @}Q5%f@ENw@@Q X,f@@@ toruswA@Pf@@ conehK@Q@f@?@? ?@ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?wM=ټ? ?? a?a@FrM@ R@49l_!@ zb$@#G&@ -v'@wM=ټ?3ȫ?ȫ?zc?ȫ?H?E ?G.ga6@R@G@t&@P-h@(̩ @Yтj @-@1YS78@Vv@8TQ[@Q,3@?Oc͇@q@~A@r{@.Q|@ &@"Zo'@?t)@E*@tf|,@b.@s ]0@dfd2@3@IJk4@ENw@I X,f@#{ @ I5%f@]A@>}z Jr\!f@ͩ'k@gwJa(Hf@ҳmdQ@FJcռ`| f@]뮒@%=HKƜ&f@ @>QK$`N,f@\tM@j .K J9f@n9@oҶc LZQ@f@FX@TML@1Pf@mʮ@\fL=Wf@L2@=W:Ldf@!jL@orF LKkf@!߸@D_ML+uf@Q3ʎ@}K>LSyf@ X@Lk~f@hlzS@_]Lf@ξ6R@%Lf@jK__@>$L| @[~f@U6I@ LΌxf@ /@4_8LiVsf@==@5YT;L\gf@^:9@:Z1L!f`f@1M@:LQxRf@m>@0oLrKJf@T@w%Lw ;f@$>1@L%I3f@J0@$ Lw;$f@G4!@Z3LI`DIf@ldփ@WLXf@8@~zLo f@z.@'tKLOf@n筸@:-L,K|7f@,Pɶ@X_GKXe@ܵ@¿o֭K7e@]^-@fU&/Kg-Ef@Fօ@&5JW2`f@r@gZ_J#7zf@pXਲ਼@M(R2Jf@t7@zsIݷG"&f@i̩@l9 I°*f@yZ@@IYf@@@ toruswA@Jf@?@? conehK@Q@f@?@? ?@ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?~f<ټ? ?? !@'#@ػ$@jzG'@e۰h+@/y/@fD- 2@XGN\3@IJk4@~f<ټ?3nG#xFI"@S-蝬"@86X#@@Ls#@ u#@h\/:$@\5$@PxZ%@9 a%@ɴ%@s"&@O>&@h7bK&@0?'@)'@"Zo'@=Z(@XXcͭ(@(s)@?t)@d)@6*@\?o*@E*@a+@/5(a+@vy4,@tf|,@P 'n-@,Uu-@|S.@b.@kPFB/@h=/@edK0@s ]0@ E0@-.1@2.naW1@Fl91@Z1@n 2@&0J2@dfd2@?Q2@(? 3@,P3@3@6/,:^3@nZ !4@zg4@ null_surface nubs!@!xYMcv'@?!@?!xYMcv'@ nullbs    pcurve    exppc nubs] h?+L .@VMu<+L .@MbP? spline  refx  point  dN)#S@Mv(K'Of@tcoedge coedge     ?[Ec&@SF; @ tedge edge   < V%?  tangent a e? pcurve    exppc nubsV%ؼ??[Ec&@^ɳK=?[Ec&@MbP? spline  ref tedge edge   r  ,h?  tangent 9CI? pcurve    exppc nubsr ,h?VO?!x @VN?Օ @MbP? spline  ref  face      point  D+i@(K%qVf@ellipse curve  wA@ף"בLf@0=@? ftreemeg attrib  $  face    plane surface  4T%@Qf@5^5^< tcoedge coedge    0v&hwmFj  coedge    tcoedge coedge     % $`r7  edge   > ɼ=  tangent straight curve  @ 8 G  edge   B$@ >  unknown straight curve  g+8@:;]`f@@%?dOL2?  point  g+߈@Tq\`f@ftreemeg attrib  K@ plane surface  @qW"Z`f@?2bOL2?>%  coedge   M P A >  loop    straight curve  @P@e@?   @ ؈'+@tcoedge coedge  P O   Q  PS!T{C=  edge    huJV? R-DT!? P  tangent  point  ؒ@P@e@ coedge  T D  edge   E : [69 T tangent  vertex  D ellipse curve  @Ne@??  -DT!?ftreemeg attrib  V* cone surface  @ e@lvlv? @ tcoedge coedge   X k _ K  ] h tcoedge coedge  X   K  >h?  loop  J  pcurve    exppc nubs<S!??,H@M?MbP? spline  exactsur nubs ??j6?P$?v@ @A @{jD@̎y @Pt!@ؒ@"בLe@ؒ@jLe@ؒ@t3pgLY+Qe@ؒ@&LŎe@ؒ@Kce@ؒ@@bKye@}$ؒ@"בLe@ݶؒ@jLe@@ 6ؒ@t3pgLY+Qe@[˭l"ْ@&LŎe@$=ْ@Kce@tLْ@@bKye@hk$ْ@l\ZLe@b-P$tْ@kLe@2ْ@㜁 lLY+Qe@KpIڒ@9bLŎe@a͐~ڒ@Kce@+ڒ@3SKye@ڒ@!7{Le@#Aے@;?̡Le@uے@I݁LY+Qe@ ݒ@6LŎe@Џ˖ݒ@UWLce@H;ݒ@YLye@;rq]ے@T~Le@RyKHܒ@ćLe@.2ݒ@+HLY+Qe@^ޒ@mEVLŎe@%iYߒ@:Lce@xߒ@^l*Lye@gܒ@9Me@6X~Cޒ@+yMe@]ߒ@ILY+Qe@e )@b}LŎe@@Lce@ԋlI@XɷLye@!a"ݒ@bDMe@Zߒ@ 4Me@usRc@%5$MY+Qe@uܖ @/ MŎe@pDS @vXLce@!R@m`oLye@Lէݒ@ӼѿMe@aaeߒ@ol Me@r@no'PMY+Qe@K8@[MŎe@杒ױ@GWsMce@ovT@S8/Mye@ +W!ݒ@}@(Me@Bzdޒ@SMe@Wߒ@T NY+Qe@oC@0!h>NŎe@Q4@iONce@z@"8ZNye@v9?ڒ@4Ne@^9 ڒ@{ifNe@jv4xے@λKNY+Qe@~ܒ@'NŎe@2cܒ@ Oce@'ݒ@&DOye@NGtfג@J[BNe@Hݍג@ TXwNe@ ڏג@6;NY+Qe@s}nג@A'_OŎe@L)naג@ɩd(Oce@#fYג@p#C=Oye@%0 Ӓ@ Ne@#aҒ@;D=?  point  *w@6Mye@ftreemeg attrib  ^) torus surface  ؒ@Ne@?@? tcoedge coedge  a `   b  (g.P@)b;@ tcoedge coedge  f  ` S Z  nClR? tedge edge    "Y=< Y(R? R  tangent h(K? pcurve    exppc nubs(R"Y=~7?(g.P@*a$Ĩ=(g.P@MbP? spline  ref tedge edge    z dj h? a  tangent T ]SG? pcurve    exppc nubszj h?f(?' ;@? ;@MbP? spline  ref  face    b    point  '0В@*K@ye@tcoedge coedge   f  Z  R{<  loop  R   pcurve    exppc nubsQAk`@0⣔_@?QAk`?0⣔_MbP? spline  exactsur nubs??0⣔_6~(5["R56ʒ@\{Lewe@sXXZʒ@4z3 \L߹e@ڿʒ@vqL`e@|(mȒ@¥ϿLe@{lǒ@U K:ake@6ƒ@SK+ze@]%1ʒ@׻KLjяe@n"ʒ@\nvLe@0)Uʒ@LauL.3e@xWkȒ@NLۚe@ǒ@BH K~ e@}K4ƒ@ܐp-K.F e@ʒ@P}Lr(e@o9K˒@,rLM{e@`fZʒ@!;MxLDƯe@Iɒ@*[I Lk}e@{ b@Ȓ@ZQnyKAe@[fǒ@cKBʑe@+ ̒@{ L+9te@3˒@j AڰLZsNe@ 7˒@yL'Be@wOʒ@8%!LoVe@!fɒ@arszLT.be@A2gȒ@KCe@!̒@Ң&Be@ô3ʒ@iwKsYe@[ɒ@}.%K e@#qsR ϒ@oƅLpmpe@Β@L)he@.oΒ@-!dL0I2e@}͒@C7LԡKe@0w̒@55KLQ3e@7F܎̒@wqKY !ze@n YВ@LZz$e@ ~ϒ@E~LUKge@V ]ϒ@&!wOLHJԛe@I,@A[C^Lde@+?m@W9nLx~ e@@dLfׯe@ ’@"ViLSjɫe@Ē@v_~LhEe@N ƒ@p!Le@Y?1ɒ@\7L$oe@'ʒ@p)L phe@@ƫ Β@=q LΌae@JBϒ@pQLղxz_e@pӒ@ T~L˒F`e@9Ւ@_Q-^L-vMde@ؒ@rULfB6 oe@Eshڒ@>K we@~k;ے@)BKM soe@@@ sphereͶʒ@Je@-!@MbP? spline  ref tvertex vertex  y 6 [f}?ellipse curve  aK@ ŁKLf@ ߴsAaK?_Hl=|=P??  coedge      pcurve    exppc nurbs,T!*T!<hK@@x(@?v % @lR{(@$k?~MaP@*)(@?BG O@Y,'@Q*k?> O@%@?:0yE> plane4T%@Qf@5^<?5^< ellipse curve  +@^aMf@ȼ&_8L#FJ=,nŭT=?  edge      7 tangent  point  T@Mf@ coedge   8 9   pcurve    exppc nubs+0si0+L .4T%Tњ(@A_JCq:(@;nQ^(@cky}(@628G9(@6ަpu(@CDcopu(@? plane4T%@Qf@5^<?5^< tcoedge coedge     : }3)% h}  point  wA@ϣ"בLf@ coedge    ;   pcurve    exppc nubs ,hr;{8B@|e|%8B@)OT!  cone=1y@أ"בLMf@t ~:ƿB`\5< ?t ~:ֿ? ?? -DT! }tedge edge   < RR [ h?  = tangent |>n(C? pcurve    exppc nubsRR[ h?>_{|@-DT! =_{|@} cone=1y@أ"בLMf@t ~:ƿB`\5< ?t ~:ֿ? ?? -DT! } point  ΍ ,-Ē@VbK3]7e@tcoedge coedge    > ?  @ U%@з(@  pcurve    exppc nubs[ hRR:?U%@TMu<U%@MbP? spline  ref tedge edge   A Xؼ FR?  B tangent ZOрK? pcurve    exppc nubsXؼFR?2:ʕ?H~(@H#?R(@MbP? spline  ref  face C    D straight curve  @TT@@e@  edge  t hGjP jGj7P  E unknown ftreemeg attrib  < plane surface  dތy|7@V@d@¸O??  coedge  - F    coedge  (  F G   edge   ~ʼ4@  H unknown  vertex   I straight curve  @TT@d@?  vertex  J straight curve  4@T@`f@  point  @TT@e@ellipse curve  VA@\PS@e@?΀¸O<j\sQ?LF@lv?  coedge    k  point  VA@\PS@@e@ vertex   K straight curve  4@L@@e@? straight curve  4@Z`f@@%?dOL2?  point  @qW"Z`f@tcoedge coedge    L M > N mFj@ 0v&h@ ellipse curve  Ͷʒ@Pe@@?  -DT!?tcoedge coedge    O ݆mW!; tedge edge   ;@ ݆mW!@ P tangent >)? pcurve    exppc nubs;@܆mW!@;@݆mW!@MbP? spline  ref tcoedge coedge    Q  R ĸ Uc (f  pcurve    exppc nubsRac(mf?hfMbP? spline  ref tvertex vertex  S JxC?ellipse curve  {Ò@V#Oke@sQ;⿀^V¿5? ?s???  vertex  T ellipse curve  Kj@\(n5Oe@/n ~:ƿ$T?4= 6?1T1?? ftreemeg attrib    face U  K  V spline surface   ref tcoedge coedge  L  W X R+ = tedge edge   m/= Y &R?  Z tangent K? pcurve    exppc nubsm/=&R??hO %Mz>1O MbP? spline  ref  face [  \   ]  point  Ͷʒ@dV Pe@tvertex vertex  ^ y| d/T,kffgy]6,@?49ٕI?0fy3fTRA?&S͂=eZ1?yU 4ݿt>|mnz^?beːT? oūKjXt?ݏ>(S>̴׿2>8?ǿa%zh=MbP? spline  ref  vertex  a ellipse curve   T@Nf@?8T͙?? straight curve  @.\(n5Of@ tedge edge   h}@ }3)% @ b tangent o'? pcurve    exppc nubsh}@}3)% @h}@}3)% @MbP? spline  ref  point  wA@1\(n5Of@ point  @L(n5Of@ftreemeg attrib   cone surface  =1y@أ"בLMf@t ~:ƿB`\5< ?t ~:ֿ? ?? -DT! }tcoedge coedge    c d  e os!@ -v'@  pcurve    exppc nubs<V%?r;?=l!@FM1 ?!@MbP? spline  ref  pcurve    exppc nubsvuV%<|d)> -v'@9? -v'@MbP? spline  ref  face f     g tvertex vertex  9 h |g}?ellipse curve  rK@:~f$Of@ ߴO@aKu _*zv?I.'O?? ftreemeg attrib    spline surface   ref tedge edge   `r7@ % $@ # i tangent sN{v9? pcurve    exppc nubs`r7@% $@`r7@% $@MbP? spline  ref tvertex vertex  j k 5c?ellipse curve  i,@Y|f$O> Kf@vzƿ^TbK?3ݎ9?8t7e?a.r?? ftreemeg attrib    spline surface   ref  edge  ,zJ4p@ .@ f l unknown  vertex  m ellipse curve  ,@v1Od@?! Kf@MzƿTbKuݎ9?p?z=}:?? tvertex vertex  w 4M.?ellipse curve  @nW@U$בL.~:f@Dg ~:ƿZ+=??Kd ~:?? ftreemeg attrib    spline surface   ref ftreemeg attrib   %  loop  c  cone surface  hK@Q@f@?@? @  coedge   ! x y  tcoedge coedge  ! Q  z (f@ĸ Uc @ tcoedge coedge  { ! W | wmFj@ 0v&h@ tedge edge   } wmFj@ Y  0v&h@ ! ~ tangent x?? pcurve    exppc nubs 0v&h=ܙN6iBwmFj@@̫@Eq8@f%>r?h>͈R@:c? ^ @ "   edge   T@ < pu(@  tangent  coedge  # j   pcurve    exppc nubs% $ `r7[Wj@8"\@6t?PRa@d?,:@?,p?HFY@SlV?Xڽd@a"?0T@4T? T@b'? planeDxgzǒ@Qڂf@ ?t ~:?t ~:ƿ ? straight curve  %)Ē@%\(n5Odf@p ~:ֿ? ellipse curve  ,@K@e@lv@lv@?  point  Ԓ@Fd@straight curve  4@T@d@ straight curve  @qW"Z`f@OL2?>%  coedge  = >  face   >  tcoedge coedge  @  T{CPS!? tedge edge    T{C E PS!? @ tangent Y~Zqd? pcurve    exppc nubsPS!T{C=Ɔ+1d^)1jDT!MbP? torusؒ@Ne@?@? tvertex vertex  A ]KK?ellipse curve  ؒ@Pe@@?  -DT!?tcoedge coedge  C J  >h: tcoedge coedge  C Y h?  loop  \ straight curve  *w@ ye@@  point  *w@Nye@tcoedge coedge  J I K l _c:R!?  pcurve    exppc nubs] h?MbP? spline  ref tedge edge    [>h? J tangent &Sh.S? pcurve    exppc nubs>h?&8/$?ԗ@?UD@MbP? spline  ref tcoedge coedge  Q   )b;(g.P tedge edge    (g.P@  )b;@  tangent ?? pcurve    exppc nubs(g.P@)b;@(g.P@)b;@MbP? spline  ref tcoedge coedge  R Y Z 0⣔_Ak`  pcurve    exppc nubs"Y=<(R?ٽz>1P.?C_IMbP? spline  ref tvertex vertex  ??ellipse curve  HͶʒ@9Lx&umke@8*Olh ^V¿r ?,x?n$ ?? tvertex vertex   5D?ellipse curve  '0В@2"בL`e@]=b @=P=D?? ftreemeg attrib  W  spline surface   ref  pcurve    exppc nubsFRX<я?*__MbP? spline  ref  face   Z   coedge  x ]  edge    Ud@ ! @  tangent  vertex  ellipse curve  ؒ@£"בL_e@=?? ftreemeg attrib  a  cone surface  @"בL_e@? ?@ -DT! }straight curve  Ԓ@Hd@? straight curve  D@Kd@ ;`7 ;`7@ point  4@O@@e@ coedge  j l +  straight curve  4@T@d@¸O??  coedge  m l n  edge   o 3@ ( unknown  point  dތy|7@V@d@ coedge  q .   edge  /  $@ q unknown  vertex  r straight curve  dތy|@ AV@d@?  point  @TT@@e@intcurve curve   bldcur+L .@si0@+0@? spline  ref null_surface nubs+L .@+0@+L .@+0@ nullbs   tcoedge coedge  8 { 4 "xYMcv'! tedge edge   } !@ "xYMcv'@ 3 tangent Phݹ3w? pcurve    exppc nubs!@"xYMcv'@!@"xYMcv'@MbP? spline  ref  point  hK@+ŁKLf@straight curve  T@@Kf@@  coedge  c 3 9  edge   U)\@ } Tњ(@ 8 tangent  pcurve    exppc nubs}3)% V`z&h}CDcoT@6ަT@62pi@c(e @ƾ;nX\B@A_Jx۾@4T%`)\@? plane4T%@Qf@5^<?5^<  edge   t%8B@ < =_{|@ tangent  vertex  ; ellipse curve  Jj@"בLe@Oq ~:ƿ=/? ?N=t ~:?? tcoedge coedge  ?  з(U% tedge edge   < U%@ A з(@ > tangent Ѳ)? pcurve    exppc nubsU%@з(@U%@ з(@MbP? spline  ref tvertex vertex  ? xC?ellipse curve  {Ò@ L~e@I;+^V?5?TXYF?vD?? ftreemeg attrib    spline surface   ref straight curve  J8$Wl@I)@@e@¸O  coedge  G   edge   $@ unknown straight curve  @TT@`f@¸O?  point  @TT@`f@ point  4@T@`f@ point  4@T@d@tcoedge coedge  { M W  0v&hmFj tedge edge    0v&h mFj tangent z]?,B3? pcurve    exppc nubsmFj@ҸB@i@N6@@=@ 0v&h@Tr 0G׿Z$׿'|kBZؿ5n$8ؿTe,Xؿ2]E4uؿTm,F4;ٿ|KTٿvDŽI%ܸ5;ڿ,e0-+,ڿd#j-~ۿj<>D/ܿUyZbݿMbP? cone@Pe@lv@lv? @  pcurve    exppc nubs݆mW!xO D0 Zq.`97Ƴ;T@ȸω@T@* &r@U5Y@8(@L]@gxm@8C1fg@L@xo@>3K@Y=o}@c|@G2@d@𝡲[@V;vk@N%)@h@%@/ X@J1s@)'=?<@Or\@I @nߒE@MbP? cone'0В@Qe@?@? @ intcurve curve   bldcur;@ן@݆mW!@롕? spline  ref null_surface nubs;@܆mW!@;@݆mW!@ nullbs   tedge edge   Y ĸ Uc (f tangent 0c? pcurve    exppc nubsĸ Uc (fĸ Uc (fMbP? spline  ref  point  56ʒ@V#Obwe@ point  MȒ@\(n5O=e@ftreemeg attrib   spline surface   ref  loop  {  pcurve    exppc nubs&Rm/Ĩ= 0v&h@*5? 0v&h@MbP? spline  exactsur nubs ??&h!Fwb1%1j׌^%aޚܿʻ(K̿t9,,w:K@^unE@{m}n@ 0v&h@7 ؒ@^p7ODkBe@Mفؒ@ˣ#tO!te@*Mْ@{zOQ[g+e@%@ ܒ@MPe@9[ޒ@iPO%e@͐Uޒ@XﭞPe@@{^oPmJe@ؒ@M)O/4e@ oؒ@򲙚hO䟕.e@>ܒ@&#;O'9e@ޒ@*̑( P Ĩe@ZV^@JbQ P%Nle@;Oؒ@n ODBe@i;ؒ@n%aO礤e@s~ ~ْ@(A@~P^e@ y ؒ@M)O|B\e@z%0ؒ@ YOXe@jbْ@ 0Ob8e@J],Rܒ@`O'ee@a' oޒ@D50nPѨhKe@H@d)P0oe@ Pmؒ@V%ۨO`P 2e@z zؒ@VWO=e@KkYْ@4CO9se@6 Gܒ@H>Oũe@i&Icޒ@>WP߂7e@]@3$2PE-PFe@Jd@pPV,|e@Fؒ@Ss (O)Ge@\Qrؒ@ QOCYe@z<ْ@V}pO3ʕ3e@&@"ܒ@^sO e@po9ޒ@ P}e@ZJS@2 }?PP1"!e@HF~ؒ@ = OUse@/Jcؒ@;BOOpe@O,ْ@*ΒOƶFe@ߘH ܒ@.cEgO p.e@ vޒ@Pbbe@x[4@ES_Pԙ9e@Xwؒ@b/3 O{eT>e@u]ؒ@PNO.|fe@·%ْ@|tOe@Hܒ@FEOuJ檻e@ bޒ@BLP()e@'@е[PfĘe@lؒ@mO qe@bSؒ@]LO+oe@ْ@r O7e@= ے@aY1Oph Oպe@oޒ@.>P1)7e@ysB@emP!e@ʸhؒ@qOӫe@#^Oؒ@-o6WLOI ..e@cVْ@xT#O,~e@|9ے@oYOM2e@ݒ@=P Ke@I` @"kPIk4e@ -ג@&RNe@4ג@tc>O!le@/iؒ@,_OWre@:/Eے@",OVe@)ݒ@Y?OzSe@:2Eߒ@OUe@^]ג@#OYv e@>'ג@MAO腷e@qג@]OWĴe@5l:+ڒ@9~O2Me@bے@wi45Ox:e@>ݒ@ uPk@e@~xԒ@1ZOIe@>Ԓ@^ SO>-?e@Ւ@c;OMy@e@37j֒@YdO`'e@ג@o=)PD.ˍe@1cRؒ@4:PiX e@Ϫ9OӒ@ b&*.Ooe@dsHӒ@#\(aOI=we@EӒ@q!` O+e@Ԓ@X1OWmąe@FWlLՒ@hPH/e@-BՒ@pg P&k<$|e@В@ƙ6O.ee@7В@2hOWe@В@!vNOq9ʛe@xeВ@ !OxX9e@%ђ@ -ZmP=\ge@XL1 ђ@YuP)Fye@D@iϒ@Y5Oe@ϒ@HWgO69e@ϒ@ hSOTT5e@o~ϒ@ xI Oeּe@l5ƷSϒ@/F(PJ2фe@X(ϒ@GPԾ[zye@"Β@X@-O}e@DRΒ@*6R`O޵e@JΒ@?vOQU'le@QaN1͒@ plane4T%@Qf@5^<?5^< ellipse curve  @Nf@> nŭ?  point  T@Nf@intcurve curve   bldcurh}@V`z&@}3)% @? spline  ref null_surface nubsh}@}3)% @h}@}3)% @ nullbs   tcoedge coedge  8 d  -v'os! tedge edge   os!@  -v'@ c tangent m ݹ3w? pcurve    exppc nubsos!@ -v'@os!@ -v'@MbP? spline  ref ftreemeg attrib    spline surface   ref  point  hK@:~f$Of@intcurve curve   bldcur`r7@ @% $@b'? spline  ref null_surface nubs`r7@% $@`r7@% $@ nullbs    edge   x2\@ fњ(@ tangent  point  L ƒ@Y|f$Od}:Vf@straight curve  D@@Qd@?  point  D@v1Od@straight curve  D@v1Od@? ;`7 ;`7@ point  D@K@e@ point  D@Kd@ellipse curve  L@O@@e@lvlv?  point  L@L@@e@straight curve  @L@@e@  pcurve    exppc nubsSF; sK!?[Ec&4T?Do(@b"?`#(@SlV?!(@?,p?\:\S(@d?@wb(@6t?VO(@[Wj@dњ(@t'? planeDxgzǒ@Qڂf@ ?t ~:?t ~:ƿ ? intcurve curve   bldcur?[Ec&@sK!@SF; @t'? spline  ref null_surface nubs?[Ec&@SF; @?[Ec&@SF; @ nullbs    point  L ƒ@PKLd}:Vf@ point  Q7ǒ@p$בL4'W!f@ coedge   y  edge   } ,T@  t(@ x tangent  pcurve    exppc nubs(f@4?@@uè@M^@>YG>z@de0@ĸ Uc @@E@6S@a@L`@05)@-$@C)7@8-@FB@rq6@z˼A@j6@l5&@IPc6@=ܤ@?-@z0q@9~s$@l&zp@0@ƊV<_@N@a@@̫@MbP? cone'0В@Qe@?@? @ tcoedge coedge  L W g h?  pcurve    exppc nubswmFj@ 0v&h@xmFj@ 0v&h@MbP? spline  ref tvertex vertex  y I5D?intcurve curve   bldcurxmFj@{m}n@ 0v&h@RRE? spline  rbblnsur blendsupsur cone'0В@Qe@?@? @ null_curve nullbs@@Q@e@ blendsupsur cone@Pe@lv@lv? @ null_curve nullbs@@Q@e@ intcurve  offintcur nubs &@rH/?74JMBeSZ]?޶ͯ@6@!@ 0v&h@w;) ޟ @x"/#@)$S$@KT%@@^p7One@^x@S8G5O6e@*@̮2OņUle@"@wb'Oue@8µ@ r_ O2+e@n?@sqOKye@tHl}@<OX\ޡe@=gH@A Oߒ@"OK e@M,Fߒ@~nN!e@+9ݒ@OODqe@O[ܒ@mO{ee@ekgْ@<֭iO§9re@$Z|ג@Cv_$Oifje@'Ӓ@5#3OU%ae@ Kyђ@|6O;Q6G_e@[z͒@v73O"#Eae@Hn˒@Mv,O<$2,Iee@Ϙ04Ȓ@hf~O貦re@˩>|ƒ@i O|e@tÒ@m@_%OrKԧe@+ԟ’@ZcND;`^e@87k@FOӝ>e@\[@G Oɴۻe@s?@fòOURYe@ @VrO/PrRe@M@rKYO!<@e@@@ cone@Pe@lv@lv? @ cone'0В@Qe@?@? @ nullbs nullbs   null_curve null_curve null_curve null_curve  ? ?RRE? ?? &h!Fwb1%1j׌^%aޚܿʻ(K̿t9,,w:K@^unE@{m}n@ 0v&h@RRE?@rH/?pbe74JM)74JMֿ74JMƿBeSZ]?BeSZ]?W?BeSZ]?h*?.$Gp?~3`ӵ?޶ͯ@d,(-@+i2^@nfs @6@ag@4@@Y<@eL@Li@!@r@&c@,@NiJ@ null_surface nubswmFj@ 0v&h@xmFj@ 0v&h@ nullbs   straight curve  MȒ@Q=e@?  coedge  3 c j  coedge    edge   pUd@   @  tangent ftreemeg attrib    cone surface  @Pe@lv@lv? @ tcoedge coedge   Y h tcoedge coedge   $|h?  loop   pcurve    exppc nubsT{CPS!??H@@?MbP? spline  exactsur nubs ??6?nP$?iv@ @~ @EtjD@̎y @Pt!@Fqݒ@Ne@$7ߒ@Ne@|`~@NY+Qe@>X@NŎe@bYi/b@Nce@*w@Nye@Fqݒ@m$Ne@$7ߒ@XNe@|`~@7hNY+Qe@>X@kMNŎe@bYi/b@Nce@*w@eNye@5+ݒ@ mtNe@%ߒ@BNe@@\vNY+Qe@3+@_ #NŎe@oˆ1@2Nde@O`b@fNye@F!$ݒ@UzNe@(ޒ@)td5Ne@]Sߒ@N}NY+Qe@qI@P#OŎe@_QE:@<q2Ode@s7+@dZi;Oye@Z ܒ@nS.Ne@Hݒ@DP*o Oe@/ߒ@4V&OY+Qe@5O@Pk2vWOŎe@ayp)@$0kOce@ݘR@fvOye@3nے@JqOe@6 ے@mkoHOe@ ܒ@8KsOY+Qe@82ޒ@:#%OŎe@.ޒ@TOce@8Aߒ@ez-Oye@댪ْ@#@0Oe@Yڒ@?`Oe@6P&ڒ@?nNjOY+Qe@;+Ʊے@r2OŎe@F8%aܒ@Fd:Pce@;ܒ@ǡ e Pye@"bs֒@49Oe@֒@0,̱lOe@~-֒@ZNOY+Qe@+rՒ@"Ay 'OŎe@@elՒ@)y Pce@PvKՒ@fAPye@ͺՒ@na*$Oe@nu07Ԓ@HPOe@r0hӒ@!}OY+Qe@z Ғ@-}OŎe@M4Cђ@tS0Oce@>.ђ@sBxOye@x/YҒ@t.=Ne@'<В@^+Ne@}!Eϒ@ΎNY+Qe@Vɱ̒@ŰOŎe@è˒@_Fc Oce@ ˒@$Oye@"ђ@TvNe@6_=EВ@qstNe@M Β@\"AqNY+Qe@˒@:|omNŎe@ʒ@r)-lNce@]ʒ@l0kNye@ЩӒ@FMe@9$Ғ@-Mce@LZޒ@A.Lye@,۔ܒ@\z> Ne@K<ޒ@T&SMe@ߒ@) MY+Qe@XNV@J}eMŎe@z5@@EF\~Mde@k}=@UֆqMye@8Rݒ@wzFaNe@d *#ߒ@"XNe@Z9ܩ@‰PNY+Qe@O8@gBBNŎe@؞\?@%nX@GpRaNŎe@bYi/b@_{@d^Nce@*w@^a\Nye@Fqݒ@Ne@$7ߒ@Ne@|`~@NY+Qe@>X@NŎe@bYi/b@Nce@*w@Nye@?6?nP$?iv@ @~ @EtjD@̎y @ ?  ?  ellipse curve  ג@bNye@?h&>SU ?  point  ג@PrPye@ coedge   pcurve    exppc nubs>h:89@*H9@GT!  coneFqݒ@ _e@?? ?@ -DT! }tedge edge    E Y h? tangent n(C? pcurve    exppc nubsY h?:@-DT! :@} coneFqݒ@ _e@?? ?@ -DT! }tcoedge coedge    R!l _c tedge edge   ! l _c: R!? tangent Ϲ? pcurve    exppc nubsl _c:p67R?p67R?R!?p67R? (Ŧ?R!?s 2>>R?R>9?޾e-??mA^0 ?܉c?9 ? x?C-(>O?(Z +?J(?Lx%q;?;_ē?}S4B?%a?Y]+0?@NI?ysDUL0Hù@ه.$?ԗ@MbP? spline  ref  vertex  ellipse curve  xFqݒ@M`e@!Qǎ=?t"=p2?? tcoedge coedge  >    Ak`@0⣔_@  pcurve    exppc nubs)b;qHssY#I@ x(g.Pt@)DT!?u@2b?pJe@U7I?BW@T$%?ȣͣ@Fq?( [@&sR? \@x`G?QG@ *?HGf@l%绰?rPy@dvO?`V@:c?{Gc@1>r?`{@̫@MbP? cone'0В@Qe@?@? @ intcurve curve   bldcur(g.P@6,@)b;@PTRE? spline  ref null_surface nubs(g.P@)b;@(g.P@)b;@ nullbs   tedge edge   A 0⣔_  Ak` tangent 70c? pcurve    exppc nubs0⣔_Ak`0⣔_Ak`MbP? spline  ref  point  l͒@4LTse@ point  '0В@F"בLe@ftreemeg attrib     spline surface   ref  loop  straight curve  @"בLe@@  point  ؒ@"בLe@ coedge  F - *   edge  /  ~ʼ4@ unknown  vertex  G straight curve  dތy|7@V@`f@ straight curve  dތy|@ AV@`f@¸O  point  dތy|@ AV@`f@ pcurve    exppc nubs"xYMcv'%$&E%ր*)$g.t#NW"!fњ@OJWƿa@-%bPҿlIw@ )ڿtV/n@R~멡HSfi@Ȱ'bvo[d@{b1& d@zZ. d@@OE>ii@πDzޝ1n@M[8tw@̽Ok@$o@@XJњ@`DT!MbP? conehK@Q@f@?@? ?@ intcurve curve   bldcur!@'#@ػ$@"xYMcv'@~f<ټ? spline  ref null_surface nubs!@"xYMcv'@!@"xYMcv'@ nullbs   straight curve  hK@Qf@? straight curve  nZÒ@أ"בL=[f@p ~:?  point  MȒ@"בL=e@ pcurve    exppc nubsз(E@6(;c'fWR'n.:|&d%U%[}{@ߒE@laa@Or\@S@Z1s@+k@c@%@1&R@;vk@\@j@pSaH@ c|@ {@ >3K@`^L|@L@6ْ@@xm@'Ue@8(@|pu@3&r@|pu@ȸω@MbP? cone'0В@Qe@?@? @ intcurve curve   bldcurU%@$#'@ з(@롕? spline  ref null_surface nubsU%@з(@U%@ з(@ nullbs    point  56ʒ@; Lbwe@straight curve  4@T@`f@¸O??  pcurve    exppc nubs 0v&hmFj? 0v&h@?mFj@MbP? spline  ref tvertex vertex  M  L'N?intcurve curve   bldcurmFj@{m}n@ 0v&h@RRE? spline  ref  null_surface nubsmFj@ 0v&h@?mFj@? 0v&h@ nullbs   intcurve curve   bldcurĸ Uc N(fm ? spline  ref null_surface nubsĸ Uc (fĸ Uc (f nullbs    face  W   point  l͒@O#OTse@ftreemeg attrib  \  cone surface  Fqݒ@ _e@?? ?@ -DT! } pcurve    exppc nubs -v'w&$fb%- $JTE#nž"os!k#\?`DT!qU?r@@XQwl?ԿOkɌBĜ#?޷[,-?ЀDzZm6?hAE徙j6?zZ.F Ig6?|b1&Xe2-?Ȱ'bvR#?멡0lgh?)ڿe planeUdڒ@Qe@? ellipse curve  ג@qMe@r#ȎJ#_8L@1>֤ŭ?T?  point  tFqݒ@Me@ pcurve    exppc nubsAk`@ iTR@=̑@&$@8@@0⣔_@,?{@̫@ 0~@a@܏g~Ɨm@@zp@$o$+i@Lq@d@_ܤ@x5d@vИ5&@Fd@D˼A@ *i@GB@}m@lFC)7@YOv@{)@@V|@@{@@nE@MbP? cone'0В@Qe@?@? @ intcurve curve   bldcur0⣔_6Ak`c? spline  ref null_surface nubs0⣔_Ak`0⣔_Ak` nullbs    face    straight curve  dތy|@ AV@`f@¸O?  point  dތy|7@V@`f@ point  '0В@뽨rP@ye@ftreemeg attrib   spline surface   ref tcoedge coedge  RR!  coedge   edge    } Ud tangent  pcurve    exppc nubsg hUd@ET! Ud  cone@?\(n5O_e@?? ?@ -DT! }ellipse curve  '0В@#(n5O`e@lqHq==T-??  pcurve    exppc nubs|h$:G`GT!  cone@?\(n5O_e@?? ?@ -DT! } face   tedge edge    RR!? tangent 苓? pcurve    exppc nubs67R?67R?RR!?67R?o8Ŧ?RR!?9 2>ڰ>R?䦿 R>9?#>e-??h0 ?c? ] ?x?r`6(>O?ɥ +?#(?x%q;?eē? 4B?S%a?<+0?HNI?xCUL ù@6.$?vԗ@MbP? spline  ref  vertex  ellipse curve  ג@{(n5O_e@?f3 planeUdڒ@Qe@? straight curve  @?\(n5Oe@ ftreemeg attrib   cone surface  @?\(n5O_e@?? ?@ -DT! }ellipse curve  ג@D`Ne@̤ŭ?x?1?  point  ג@v(n5Oe@ End-of-ACIS-datal ʊ_lw!lTe@`W_ޓf@?;J7@{ ^`f@@􂢄\`f@?;J7@]9R`@e@ zAQB"a@e@?;J7@]9R`e@@-DT!@JWƿ?;J7@{ ^f@@-DT!?ω@?;J7@ݸփ`e@ zAQB"ae@?;J7@|I`He@[2`p ~:Vf@?;J7@zZ@i_f@@􂢄\f@?;J7@ zAQB"a@e@ zAQB"ae@?;J7@@􂢄\`f@@􂢄\f@?;J7@ݸփ`e@@-DT!@JWƿ?;J7@zZ@i_@f@@-DT!?ω@?;J7@zZ@i_@f@WWj_f@ف`[YL;h@[ھCb[YL;h@@@333?pJtj(@333?& -@@`! `!?r?@@[ھCbqrD2h@@@Arial w w'a'aDžu?u'a" #!@R4?;J7@ݸփ`e@UIa` ,`e@t]`LkAc@qSCZ`LkAc@@@333?pJtj(@333?y X8@@`! `!?r?@@> pO[t8c@@@Arial w w'a'aDžu?u'a" #!@R2?;J7@ zAQB"a@e@ zAQB"ae@Ĩ?b@e@Ĩ?be@@@333?pJtj(@333?@@@`! ?`!?-DT!?r?@@iSb(mmc@nģ