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Question 10
Prove that a diameter AB of a circle bisects all those chords which are parallel to the tangent at the point A.
Prove that a diameter AB of a circle bisects all those chords which are parallel to the tangent at the point A.
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Solution
Given AB is a diameter from point A. Draw a chord CD parallel to the tangent MAN.
So, CD is a chord of the circle and OA is a radius of the circle.
∠MAO=90∘
[ tangents at any point of a circle is perpendicular to the radius through the point of contact]
∠CEO=∠MAO
∴∠CEO=90∘
Thus, OE bisects CD, [ perpendicular from centre of circle to chord bisects the chord]
Similarly, the diameter AB bisects all chords which are parallel to the tangent at the point A.
So, CD is a chord of the circle and OA is a radius of the circle.
∠MAO=90∘
[ tangents at any point of a circle is perpendicular to the radius through the point of contact]
∠CEO=∠MAO
∴∠CEO=90∘
Thus, OE bisects CD, [ perpendicular from centre of circle to chord bisects the chord]
Similarly, the diameter AB bisects all chords which are parallel to the tangent at the point A.
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