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Question

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


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Solution

STEP 1 : Draw the diagram

Let us draw a circle with centre O and diameter as AB.

Let PQ be the tangent at point A and RS be the tangent at point B

STEP 2 : Proving that the tangents drawn from point A and B are parallel

We know that PQ is a tangent at point A. Therefore,

OAPQ (Tangent at any point on the circle is perpendicular to the radius through point of contact)

OAP=90° ...(1)

Similarly, we know that RS is a tangent at point B. Thus,

OBRS (Tangent at any point on the circle is perpendicular to the radius through point of contact)

OBS=90° ...(2)

From equations (1) and (2) we get,

OAP=OBS=90°

BAP=ABS

Since, AB is a transversal for lines PQ and RS and BAP=ABS

i.e. If alternate angles are equal then the lines are parallel

Therefore, PQRS

Hence, the tangents drawn at the ends of a diameter of a circle are parallel.


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