∠ACB = 90° and CD ⊥ AB Also OD ⊥ EF and bisects it (DE = DF) ∴ CD² = AD.DB = DE.DF = DE² = DF² So ∠ECF = 90° = ∠ACB Subtracting common ∠FCB from both sides, We get ∠ACF = ∠BCE
Note that m(ACB)=90 and triangle EOF is isosceles . OD is an altitude of tri. EOF ,so DE=DF In Circle O, power from point D is DA.DB=DE.DF=DE^2 (1) In circle O’, power from point D is DA.DB=DC^2 (2) From (1) and (2) we get DC=DE=DF and m( ECF)=90 Both angles( ACF) and ( BCE) supplement to angle (BCF) so m(ACF)=m(BCE)
∠ACB = 90° and CD ⊥ AB
ReplyDeleteAlso OD ⊥ EF and bisects it (DE = DF)
∴ CD² = AD.DB = DE.DF = DE² = DF²
So ∠ECF = 90° = ∠ACB
Subtracting common ∠FCB from both sides,
We get ∠ACF = ∠BCE
Note that m(ACB)=90 and triangle EOF is isosceles . OD is an altitude of tri. EOF ,so DE=DF
ReplyDeleteIn Circle O, power from point D is DA.DB=DE.DF=DE^2 (1)
In circle O’, power from point D is DA.DB=DC^2 (2)
From (1) and (2) we get DC=DE=DF and m( ECF)=90
Both angles( ACF) and ( BCE) supplement to angle (BCF) so m(ACF)=m(BCE)
Peter Tran