Relation of Chord Between The Point Of Contact and Tangent
Relation of Chord Between The Point Of Contact and Tangent
Relation of Chord Between The Point Of Contact and Tangent: From a point outside a circle two tangents are drawn. The angle of Chord joining the point of contact with the radius is half of the angle between the to tangents,
Given: Two tangents BP and BQ are drawn to a circle with centre O from an external point TB. To Prove: Proof: Let Now, We know that BP = BQ. So, BPQ is an isosceles triangles. So, This gives |  |
ILLUSTRATION: In the figure PA and PB are two tangents from point P to the circle prove that
Solution : OP is the bisector of Now and OT is the angle bisector Therefore OT In |  |
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