> -kcapm%* X,\ܗpܖPX,S0ZUUU0YPCC {  X,\ܗpܖPX,R@Z  [ P[lCC  X,\ܗpܖPX,Q(2)z,] $ LfQ{l:2}ܚa|p@k`] ]CC%* X,\ܗpܖPX,Q(1)z,] $ LfQ{l:1}ܚa|p@k`] ]CC{  X,\ܗpܖPX,Q(0)z,] $ LfQ{l:0}ܚa|p@k`] ]CC v{ X,\ܗpܖPX,Q(3)z,] $ LfQ{l:3}ܚa|p@k`] ]CC  %1AutT X,\ܗpܖPX,Calculator Chooser ompact Pro Connect ToContrP s Bezier Curve - N. Jackiw 5/95 95 P0-P4 are the control points of a single Bezier curve. gs Phone Pad Scrapbook B?GD Pan X,\ܗpܖPX,Hvers Find FileGSP Key Caps Key ChainKiwieD@B BGB X,\ܗpܖPX,GCycle FRandom Cycle BRanom CycleScan Script ToolsSoftaCڀB ejAut% X,\ܗpܖPX,ECalculator Chooser ompact Pro Connect ToContrPCC @ E X,\ܗpܖPX,P(3)z,\$ KP{l:3}ܚ\@k`\ \CCNr X,\ܗpܖPX,P(2)z,\$ KP{l:2}ܚ\@k`\ \CCEJp X,\ܗpܖPX,P(1)z,\$ KP{l:1}ܚ\@k`\ \BC 9o>t/H X,\ܗpܖPX,P(0)z,\$ KP{l:0}ܚ\@k`\ \BC  S X,\ܗpܖPX,MoveH*0I \h"^ X,\ܗpܖPX,Move+[\9[\;\^<^   X,\ܗpܖPX,Move Q(0)->P(3)HH] ]` @ I X,\ܗpܖPX,P(2)z,\$ KP{l:2}\@k`\ \CD e x X,\ܗpܖPX,1st order continuity PLL H u]p  X,\ܗpܖPX,v[4HH]CCCC?$Aut  X,\ܗpܖPX,uCalculator Chooser ompact Pro Connect ToContrPCCCC?z*  X,\ܗpܖPX,tCCCC? E%F?5  X,\ܗpܖPX,sH@]4\]4NS]4 CCCC? D  X,\ܗpܖPX,rH u}\83A` P(1)z,\$ BC CC? D>t  X,\ܗpܖPX,q H @HDj]]`BCBC ? AGD`X  X,\ܗpܖPX,jUUUUO/*/ 0JUUUCڀBD@B? 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TOs `S /g6/-?.s @ m f=|` HmnCC@R { X,\ܗpܖPX,2nd order continuity  xrܕ(ܕ( BX,\ܗpܖPX,m15????SSSSUUUUCCCC!!!!ȦDDDD\\\\^^^^KK(Q{l:2}: ]X,rb\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH**Coordinate(Point Q(2)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@NBX,\ܗpܖPX,m14UU H\]]]UUUU PQ{l:1}: ]X,rb\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH**Coordinate(Point Q(1)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@NB\X,\ܗpܖPX,m13YHH]Q{l:0}: ]X,rb\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH**Coordinate(Point Q(0)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@NBX,\ܗpܖPX,m12Q{l:3}: ]X,rb\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH**Coordinate(Point Q(3)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@NCU=b-_X,\ܗpܖPX,m5\0\4\UUUUHЁ-@qJHH {D:GI}{GH} = rb\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH**t = dinate(Point Q(3)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@N Qf _ X,\ܗpܖPX,m4.R@=@ T(h fnf m$PJg0&DJ.g kf7| kgHP{l:1}: H} = rb\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH**Coordinate(Point P(1)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@N ;P T (X,\ܗpܖPX,m3`YO/*Nz-_*.Hnp/NJo j/ X//.N`nP{l:2}: H} = rb\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH**Coordinate(Point P(2)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@N %:0HX,\ܗpܖPX,m2|)B. S1G`* S0@!/.HnHnN n P-hSGJGn S$H5nnP{l:3}: H} = rb\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH**Coordinate(Point P(3)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@N $X,\ܗpܖPX,m1 J<UJ@UP{l:0}: H} = rb\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH**Coordinate(Point P(0)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@N2N m" X,\ܗpܖP5 X,\py ܙ r$Pܚ@ACCCB?(\))N " X,\ܗpܖP4 X,\pxD*bS?4**vrr@ܙ8CCD C?Q"[  X,\ܗpܖPX,HideK|6  \l  `emenX,\ܗpܖPX,m19s used in your sketch. The mesurement becomes undefined when the angs t{u:3} = } = rb\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH**t^3 = nate(Point P(0)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@N$  ed RX,\ܗpܖPX,m18/b Edit Text /b Edit Textpu$ n 3{!:*}t{u:2}{!:*}{(:1 t} = b\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH**3*t^2*(1 t) = P(0)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@N! $B033X,\ܗpܖPX,m17I ;6 3{!:*}t{!:*}{(:1 t}{u:2} = b\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH**3*t*(1 t)^2 = P(0)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@N} $B%%%%X,\ܗpܖPX,m16####11115555//// {(:1 t}{u:3} = t}{u:2} = b\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH** (1 t)^3 = 2 = P(0)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@Nd$a\`X,\ܗpܖPX,m9P\p0\ff t{u:3} = {u:3} = t}{u:2} = b\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH**t^3 = )^3 = 2 = P(0)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@N$\X,\ܗpܖPX,m8I,ff33 3{!:*}t{u:2}{!:*}{(:1 t} = b\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH**3*t^2*(1 t) = P(0)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@N $\X,\ܗpܖPX,m7 I8ff33 3{!:*}t{!:*}{(:1 t}{u:2} = b\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH**3*t*(1 t)^2 = P(0)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@N $zX,\ܗpܖPX,m6I<Ԁff33 {(:1 t}{u:3} = t}{u:2} = b\@Ė@!\ܒ ~,b@dA@@ \\ ܒ8]X,rP@C;HH** (1 t)^3 = 2 = P(0)): ,r\ܒrܒܒ~rܒܒܒrܓrܒܓ$^Lܔ:ܓܓ>rܓZܓ.~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@N$ #*MFSX,\ܗpܖPX,m210Hpj y{l:M}{!:*}{(:{(:1 t}{u:3}} + y{l:P}{!:*}{(:3{!:*}t{!:*}{(:1 t}{u:2}} + y{l:O}{!:*}{(:3{!:*}t{u:2}{!:*}{(:1 t}} + y{l:N}{!:*}t{u:3} = \\ ܒ8]X,rP@C;HH**y[Coordinate(Point M)]*((1 t)^3) + y[Coordinate(Point P)]*(3*t*(1 t)^2) + y[Coordinate(Point O)]*(3*t^2*(1 t)) + y[Coordinate(Point N)]*(t^3) = ~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@N}#/ .!-", #!dilaX,\ܗpܖPX,m20series of four nested pentagon, each offset from the previous one by   x{l:M}{!:*}{(:{(:1 t}{u:3}} + x{l:P}{!:*}{(:3{!:*}t{!:*}{(:1 t}{u:2}} + x{l:O}{!:*}{(:3{!:*}t{u:2}{!:*}{(:1 t}} + x{l:N}{!:*}t{u:3} = \\ ܒ8]X,rP@C;HH**x[Coordinate(Point M)]*((1 t)^3) + x[Coordinate(Point P)]*(3*t*(1 t)^2) + x[Coordinate(Point O)]*(3*t^2*(1 t)) + x[Coordinate(Point N)]*(t^3) = ~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@N}#/ .!-",)QX,\ܗpܖPX,m11_I Calculator^ItWWXXXX ZZZ y{l:P{l:0}}{!:*}{(:{(:1 t}{u:3}} + y{l:P{l:1}}{!:*}{(:3{!:*}t{!:*}{(:1 t}{u:2}} + y{l:P{l:2}}{!:*}{(:3{!:*}t{u:2}{!:*}{(:1 t}} + y{l:P{l:3}}{!:*}t{u:3} = 8]X,rP@C;HH**Zy[P(0)]*((1 t)^3) + y[P(1)]*(3*t*(1 t)^2) + y[P(2)]*(3*t^2*(1 t)) + y[P(3)]*(t^3) = (Point O)]*(3*t^2*(1 t)) + x[Coordinate(Point N)]*(t^3) = ~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@N(3%2&1'0AZjX,\ܗpܖPX,m10ssss uuu u     P{l:0}{!:*}{(:1 t}{u:3} + P{l:1}{!:*}3{!:*}t{!:*}{(:1 t}{u:2} + P{l:2}{!:*}3{!:*}t{u:2}{!:*}{(:1 t} + P{l:3}{!:*}t{u:3} = t}} + y{l:P{l:3}}{!:*}t{u:3} = 8]X,rP@C;HH**Zx[P(0)]*((1 t)^3) + x[P(1)]*(3*t*(1 t)^2) + x[P(2)]*(3*t^2*(1 t)) + x[P(3)]*(t^3) = (Point O)]*(3*t^2*(1 t)) + x[Coordinate(Point N)]*(t^3) = ~:r8ܓRܓNܓ*rܓ^rܓZܓ^LܔܓxNH]X,rܔaܔ8]X,\@\Wܔ@:F@@@@&@&@&@@Jh`@ܚ Ң*A*A*A5\ܕ<@N(3%2&1'0 X,\ܗpܖP;X,Q0HH\MCCiw 45Aut X,\ܗpܖP;X,JCalculator Chooser ompact Pro Connect ToContrPCpGC9 67q (' TasksX,\ܗpܖP?X,Q0HH\M8($/.-,548dJ ('UX,\ܗpܖP?X,JCalculator Chooser ompact Pro Connect ToContrP9($3210769V  X,\ܗpܖPX,Hide0ZK\\\d\(UUUUZ  H:`t&  X,\ܗpܖPX,Show 2nd Curve$@ xr%  :v X,\ܗpܖPX,Reset] @ xr1 1* <