GSPk F,d capmdtC] IӜ+eά0s+2IӜ &Ƭs+2+2RQH is the orthocenter I is the incenter G is the centroid C is the circumcentert"ADPC tDmIrBCC t>oCtDV ?8NE @*DC tuiznDBC  tC"rjCCDPC? tCtk^@_@@@@@`@@@@ @@@6@t@@@3DPCDC? tClCtargelA.?AVCObjecDCCC? t"opDPCǐDx@C? tC rktktq{Vk{{o)CCCC? thGCt{tr{{tk{{tkDCDC?t#FX_METATE@@xRAlRA@A.?AV_AFX_THREA@CC t.3#CTL3F_AFX_WIN_STATE@@A.?ACWinThread@@A.?AVCWinAp D@C tns@G.PAXA.PAVCObject@@A.PAVCSimpleException@@ACC t49I,@#}'@F'@MA@,, }mCϚC tG'os{{{{{{{{{{{{{{{{DCDB?tr St{{{{@C@CuCC?tGou{{{{{{{{{{{{{@C@C#DC? t"smDPCCC? tC3rnCC D@C?  tCtoDC@CC? tA!F{ Hdx#}'@F'@MAxdd }mEDZC tGo2 2  vPRl(w @ w AP //3 @CCCsC?tS 5s wIӜ nBxIӜ+{{FάBx DCCC? tGeoI#p xz)NBxIӜnF΁֥JNBxIӜC3CDC? t9>G#}'@F'@MA }mUCUUC t5:C#}'@F'@MA }mCRC t$x8{ m2{{ HC = Distance(H to C) = tx# m1{{{ HG = Distance(H to G) =  t4!Fy{{tk{{EDZCCRC?t9^\wP m3dd=Ftd$dd {D:HG}{HC} = $Distance(H to G)/Distance(H to C) = "ArialEE