GSPk Fb"capm%dtu |Drag and resize the (Green) Circle of Inversion to find a position that simplifies the geometry of the Inverted (Red) Image.tszhInversion Example (2): Find the Radius of the enclosed, small Circle within the Square of side length at"YCA tXCh t?6I7>{C Cg! RlϵC lNl>-CʡCp Ch t"C6HcW} _k}'zB=C6AC\'z_kB,CB=C6CA t 6 B>DC{C tDo6 A.gssScript02.gss7/ۤ7/.gss.txt_g>S>NzCVC t$ T <\Read the associated Word File to see how Inversion Theory can be used to determine the radiit$ T <\Read the associated Word File to see how Inversion Theory can be used to determine the radiit_ ]Read the associated Word File to see how Inversion Theory can be used to determine the radiust WMove H->Y t QMove I->X t tRMove I->B[yj됃 {0h;⍅Ph;1yf Ht,Htt4zϞ@6 Drag'?'?o8j:q :BtlAl CABj}?/t?6 A'.gssScript02.gss7/ۤ7/.gss.txt_g>S>NzCCSC  t6j/CC|CVCC?tP3C^6 R= oss,DЁCos 'zoCwcCd'z}n m {S:AB} = R =  tGuZRandom PositionW(>\L:EN3mOW((OW M  t#6 m24 Radius Drag = Radius(Circle Drag) = t#6 m21 Radius Drag = Radius(Circle Drag) = t#6 m18 Radius Drag = Radius(Circle Drag) = t6 m15 Radius Drag = Radius(Circle Drag) = t/C46 m12aths\geometry\sketch~1\ownske1\invers~1\square.gss Radius Drag = Radius(Circle Drag) = t$6 m9yCg}˷?NC+Cp?eCպC y [?΀C"C Radius Drag = Radius(Circle Drag) = tkpo6?6 L( ܶC t6 m6< _kd _,CC]T  Radius Drag = Radius(Circle Drag) =  t6k'z 'z 'z# 'zrzA`'z 'z 'zPcD 'VCCSC?t?6 B'>DC{VCSC  t?6j'/CC|CCSCC?t'30WJ6 r = 4*R/25=  {D:4{!:*}R}{25} = r = 4*R/25 =  tQ*FWJ6 x = 4*R/5=  {D:4{!:*}R}{5} = x = 4*R/5 =  t `XsMove H->B'PUWWWWPWPEPSHu%{0_^[jXf*0  tR<6 N3hd33; @IL! CqOC ti26 m83_ 3@@ _Wh@ 3o  HL = Distance(H to L) =  tR" 6n j ÁÀCAܶC?t+?6c1P $ 'z~A^U 'zRU 'zZU ('z# 'z 'z>Q VCTCF%5?F%5? t?6j''/CC|CCSCVCSC?t*&FDY6 y=  (r = 4*R/25) = y =  tb-g2r6+B''>DC{CvC  t2ECircle of Inversion (Hint)\L:EN3mOW((OW M !tH=6 PwCSC &tj.6 m11(Y;͏~STEM HN = Distance(H to N) = " teY6o S\Sh33h333DosCACqOC?"tWJ6 m10 "{D:{(:Radius {!:C}HI}{u:2}}{HL} = 'Radius(Circle HI)^2/Distance(H to L) = #t>C6DBC`` $CSC &tjo6 CPz 4dhh CC % t? aP'?'?o8jp Uq [t VCVCSCW?&t,)~8?6c3 \b}rMgVCSC)CF%5?F%5?(tmi6 m14 HP = Distance(H to P) = * tY6p(" CAwCSC?*tDl Y6 m13 "{D:{(:Radius {!:C}HI}{u:2}}{HN} = 'Radius(Circle HI)^2/Distance(H to N) = +t<A"6+H'cW} _k}'zB=C6AC\'z_kB,CB=C6jDA -t/4~o>6 J?H .C=.C ;?1Cg%-C p?e5CN,C A?Β9CVChTBB 0ti>I@6c2oiC3C P'zCSCBF%5?F%5?.t`6 a1 'z'-x'zP WVCNSC5?5?VCSCC/t~zA6 F2ccc0cpccc{D:4{!:*}R}{5} = 6.1̿CSC &1t;@?6!RhCrB 8tY6 m16 "{D:{(:Radius {!:C}HI}{u:2}}{HP} = 'Radius(Circle HI)^2/Distance(H to P) = 2t"6+H'cW} _k}'zB=C6AC\'z_kB,CB=C6oCA 4to?6c8  c2s72 Td3CAX/CF%5?F%5?5ttgN?6 m5j-? CByC l'?iCCe\?RJC3C] HJ = Distance(H to J) = 6 t +6mJeCU')CH?nCպ*C}˷?gxCU-C?CS1CCAVChTBB?6t>gCl'6 EWw@ dCNC CB 7t}16lcXcdcPP$c.U  cr cAZU( c̿CC̿CB?&9tr?6+F'2ccc0cpccc{D:4{!:*}R}{5} = 6.1C@C 9' tY6qCAhCrB?:td#6 m17 HR = Distance(H to R) = :t"6+H'cW} _k}'zB=C6AC\'z_kB,CB=C6,CA ;taM6c9sZCC|os9C#CCPos~C-CCx osCAP~3BF%5?F%5?<t6 Md3h, 3ho3 CXCi8 $=t`Y6 m7 "{D:{(:Radius {!:C}HI}{u:2}}{HJ} = 'Radius(Circle HI)^2/Distance(H to J) = >ti6 a2'z `'z'zWh \'z\'zyCSCB@#(CSCVCSC@t^@6c4@zDTLW).'-̿CSCBF%5?F%5?9Btcz?6!T !CC It7Y6 m19 "{D:{(:Radius {!:C}HI}{u:2}}{HR} = 'Radius(Circle HI)^2/Distance(H to R) = DtbL6c10CAe1BF%5?F%5?EtINz6 OLLos&(8N Stylus COOR 60000:N Stylus CCB ,F't  ( ?Md3h, 3ho3 CG($#-5=Gt"6+H'cW} _k}'zB=C6AC\'z_kB,CB=C6CA Ht~6 GB<. Hc_@Hc_ \'z@@̿C|1C AJ t$Y6rCA !CC?Ktd#6 m20 HT = Distance(H to T) = Ktpu"6+H'cW} _k}'zB=C6AC\'z_kB,CB=C6CDA LtIN6 Q)CFB 3M't( ?OLLos&(8N Stylus COOR 60000:N Stylus CN(",+4<FNtcK6c7%/1/  Y'CA0-BF%5?F%5?Pt^?6c5  O]GF](W?gg̿C|1CBF%5?F%5?Q9t7HY6 m22 "{D:{(:Radius {!:C}HI}{u:2}}{HT} = 'Radius(Circle HI)^2/Distance(H to T) = St;s6c11CA dCF%5?F%5?T'tq.T( ?QU(&*32;EMUta!f&6 KfC B ?WtejP6 V _&08I' Xt"6+H'cW} _k}'zB=C6AC\'z_kB,CB=C6CA Yt H6 STD'zoh'z}D_C CZ't[=( ?K\(06?>HPW\ tUY6sCAM:EN3mOW((OW l4 s[&X{I80tShow Original Shape>\L:EN3mOW((OW M a0a&X{I80tk0Hide InversionOW(>\L:EN3mOW((OW M [zVisdOt nShow InversionOW(>\L:EN3mOW((OW M Ts[zVisdOt ">:6Show [zVsiOd6\G"N*U:cKo]wt <:T6Hide [zVsiOd6\G"N*U:cKo]wD6EuclidINVERS~2\EX2.GSPD-asec~ArialL4[