GSPk& F c apmdt1% The inversion of a straight line is a circle that passes through the Centre of Inversion, unless the object line passes through the Centre of Inversion. In this case it inverts to another straight line also through the Centre of Inversion and coincident to the object line.t3  o is a CircletC R (Circle of Inversion)jp Oq btC@DCt{V[ a O?"8%168%-6袜GCD tOT  Drag Ќ V*e(>L:EN Vme((e@ lC@TD t~ ( Drag Ќ V*e(>TL:EN Vme((e@ T@DC t3  oThe Inversion of a Linet xp Hide Solution*(>LL:ENm*((*; V so anott cuw Show Solution*(>L:ENm*((*; L t@  E'CC 4CClCC LCC Vqe@lCC\C@D t }o@ c3 @CiC CiCjCiC  nCD' CF%5?F%5?tOT@  B' CCT CR@CC CCCCC@TD t~ @  A'| BC4  BBCD BC kāBDC tRY  Drag Ќ V*e(>L:EN Vme((e@ l@DCC@TD? t  m2 'Radius {!:C}OR (Circle of Inversion) = *Radius(Circle OR (Circle of Inversion)) = t %4P?  A'1 @  N"o  Bȣ| $  PR{D0>D t  c4C 4CCwCwC HCwC >M@wCwC\ C@D@F%5?F%5? tJY c2!BC nU}d@BC BCQcCꤍC4 C@TD@F%5?F%5? ty  c1 ?UCCF\CC  L CșC B@DC@F%5?F%5? t S2 Animate``t',@  A''1 @  N"o  Bȣ| $  PRl= D0>D t b m1 OA = Distance(O to A) =  tzUY  k 4syC4 C4CC\  4CC;CCD{D0>D? t t p3 | CD YV C4CCD CDF%5?F%5?C@DC@D tJX p2CNvC8 # CNvCT +@CNvC CF%5?F%5?C@TDC@TD ty   p1CyC ?CyCT @WCyC WCyC?CyCF%5?F%5?@DCāBDCt* c7@{D0>D@F%5?F%5?t + m3ppppppppppppp "{D:{(:Radius {!:C}OR}{u:2}}{OA} = 'Radius(Circle OR)^2/Distance(O to A) =  t) p5F%5?F%5?{D0>Dl= D0>DtV[ +O'?"8%168%-6袜GpCD t' c61}"s$ TD'CDpBF%5?F%5?tB  A'?"8%1:8%-:袜GC%D 'tp;X ?A'?"8%1:8%-:袜G X t@  A''"8%1:8%-:袜GEC%D  t L?` Hide !t 7|K Inversion Locus1:8%-:袜G ]1C!t c8@C%D@F%5?F%5? " t! p6@F%5?F%5?C%DEC%D%"ArialX[4