Two equal chords AB and CD of a circle with centre O, intersect each other at point P inside the circle. Prove that:
i) AP=CP
ii) BP=DP
Answers
Answered by
39
I hope it will help you
Pls mark as a brainlist
Draw ON \perp CD and OM \perp AB
(Theorem 5: A perpendicular to a chord, from the center of the circle, bisects the chord.)
Sending 2 pics
See the solution in picture
Pls mark as a brainlist
Draw ON \perp CD and OM \perp AB
(Theorem 5: A perpendicular to a chord, from the center of the circle, bisects the chord.)
Sending 2 pics
See the solution in picture
Attachments:
Answered by
7
Answer:
Step-by-step explanation:
Similar questions