Math, asked by akritpathania22, 7 months ago

4. Prove that the tangents drawn at the ends of a diameter of a circle are parallel​

Answers

Answered by alokraj2022004
7

Answer:

image send kar raha hu

Step-by-step explanation:

bro , solution is in image

i hope it will help you

So, plz mark me as a brainliest

Attachments:
Answered by urviharit05
1

To prove: PQ∣∣ RS

Given: A circle with centre O and diameter AB. Let PQ be the tangent at point A & Rs be the point B.

Proof: Since PQ is a tangent at point A.

OA⊥ PQ(Tangent at any point of circle is perpendicular to the radius through point of contact).

∠OQP=90degree …………(1)

OB⊥ RS

∠OBS=90degree ……………(2)

From (1) & (2)

∠OAP=∠OBS

i.e., ∠BAP=∠ABS

for lines PQ & RS and transversal AB

∠BAP=∠ABS i.e., both alternate angles are equal.

So, lines are parallel.

HOPE IT HELPS YOU

Similar questions