GSPk F(!capmdt<<vC,2.9 inches@ DC |+The diagonals of a rectangle are congruent.t$fNC C߳CyECYjNCDkCe^?W߳CyC߳CyEMatt Golenor 2001t5:oC A!)!&,C? !kCoC!CCtBv HideCCCP>=EHp  t: ShowC@CD p e lSAtnDR j!KC_Ct!KC_CCCT!>B\C@CbC!, C?Cd!C)CCC? t$:H"  pC"gCCDC"`DCDC"nCoC" DC)CCC?tHC kp!DC|!CCCCd!@D1CDC!bCGCpC1CiC!C?tC= mC"{CpC"=D@C'CIC@COC"9#D[]RC<"CCCYCC?tA`Fevh CD8"  "CC "CC, "nCC "@ DDC  t D n "uCpCDC!D[]!CCC"uCpC!D[]!C"!D[]!CDCDC? t$BFe[]C  q@CC"ICpC" DC` DC"D[]C<"CCCCDC?  t4Fe! sCD(CL"XCCD.C"lCCD.C"CC !C)CDC? t;m3 m{!:A}ADC = Angle(ADC) =  tQVC B@ po!P`>D-FC  t m1@%i@{ m {S:AC} = Length(Segment AC) =  t'Tc p1GS**.gs*?CCDCD-FCC)C  t4VD@  o!"CoCD@C"D[]CCC"yCoC"D[]C""D[]CD-FCC)C? t@VeZC  r C ! !$!9!NV!] "DCD-FC? t$VHa>C t@CC<"C9CaD-FCCC?t9Ym4 m{!:A}ABC = Angle(ABC) =  tXx}m5fdD2E(ե,LݳԞ'‘4Xn f5A.` ֗JO[lӋɜOQM4Z m{!:A}DAB = Angle(DAB) = tvHQm6:f.k ΄,ɠ*l-tS*YxEZmBVlJ" {co& m{!:A}BCD = Angle(BCD) =  t m2 m {S:BD} = Length(Segment BD) = t V5 EU;'j!먺Ϥ-=&+n7bp„>;>dL'-ԝCD˂Ct@t HideeYDkCYC kCt: ShowCTYoVCCCYraoVC&D C?WC ?W"ArialO8GG