GSPk F(! capmdtt Matt Golenor 2001t iniDATpC4WCTp.C4)Cp.ȂCTpC4TC\mC4ZC$'TpC4WCCBt7-<2CF?'FPR?'PFP0FCCtfzz ΏC>C ΒCACz NCiC@tCoCz NClCbDCz>By SAS, the triangles are congruent, so the LL property holds. t h<2T\jCBCRC T@?DC@(DCt'T DVC@ DCHT&DBCBCC?tin>C/XF?'FPR?'PFP0FCBt-2>C/ZF?'FPR?'PFP0FCC tm3sxAC = Distance(A to C) = t?y Show6CCz6CCbDCBCJCzz z` o@t  HideC$7CB!C /C'CC!C /Cy lCB t.4CkC'W\C1Ci DCd"CmF4U0LUmCݩ~Bd"CmFCt Ud"CCB+CC? th2>C/j'BCRC T@?DC@(DCt'T DVC@ DCHT&DBCBCC?tm4  mXZ = Distance(X to Z) = tlSqXc; BF?'FPR?'PFP0F{CraB tX Show  tE HideLength(Segment PM) =  t Uo0$ p2 D? CC{CraBCB t6Rq2C¬li DeBLT8 DCTC}mB\C2C 'W\C2C8 DCTS{CraBCC? t Rqnm}mB/ D.C 'W/ D.CSCC/YF?'FPR?'PFP0F6F DraBt%zW?m1v WꭃCjUB UQ< WЈCjCHTCmpǿCH C 'WCAB = Distance(A to B) = t!>^jm5BCC BOCMCBBCOBBCwzRC~(C /OfCkBD m{!:A}BAC = Angle(BAC) =  tU.0 p1?BCC6F DraBCB tR02>C/l' DeBLT8 DCTC}mB\C2C 'W\C2C8 DCTS6F DraBCC? tR0n>C/m'mB/ D.C 'W/ D.CSC