the circle which passes through vertices A and C of parellogram OABC has centre O .if BA produced meets the circle at D ,then prove that
Answers
Answer:
Step-by-step explanation:
Correct question:-
The circle passing through the vertices A, B and C of a parallelogram ABCD intersects side CD at a point P as shown in the figure. Prove that ∠APD = ∠ADP.
Answer:-
Question is to prove that ∠APD = ∠ADP
ABCD is a parallelogram.
=>Opposite angles are same.
=>∠ABC = ∠ADC
=>∠BAD = ∠BCD
A circle is drawn in such a way that it passes through A, B and C.
P is a point on circle intersecting with line CD.
ABCP is cyclic quadrilateral.
(Circle is passing through all four vertices. A, B, C and P).
From the property of Cyclic Quadrilateral, ∠ABC + ∠APC = 180°.
(Opposite angles are supplementary)
∠APC + ∠APD = 180°. (Angle on straight line)
From above 2, we can derive ∠ABC = ∠APD.
∠ABC = ∠ADP = ∠APD.
∠ADP = ∠APD