) AB=DC and diagonal AC and BD intersect at Pin cyclic quadrilateral prove that.
Answers
Answer:
Since abcd is a cyclic quadrilateral whose diagonal ac and bd intersect at p if ab = dc, our aim is to prove that triangle pas is congruent to triangle pdc ,pa=pb ,pc=pb ,ad is parallel to bc. ... In third part, we are given that diagonals are bisectors, so ABCD is a parallelogram, therefore AD║BC.
Answer:
Since abcd is a cyclic quadrilateral whose diagonal ac and bd intersect at p if ab = dc, our aim is to prove that triangle pas is congruent to triangle pdc ,pa=pb ,pc=pb ,ad is parallel to bc.
Hence, for the fist part, we have:
In order to prove that ΔAPB and ΔDPC are congruent:
∠ABD = ∠ACD
⇔ ∠BAC = ∠BDC
⇔ AB = DC
⇒ ΔAPB ≅ ΔDPC
For the second part we can conclude that PA = PD and PB = PC by C.P.C.T.
In third part, we are given that diagonals are bisectors, so ABCD is a parallelogram, therefore AD║BC