(1) Prove that Tangent to a circle at a point is perpendicular to the radius through the point of contact.Given: A circle C(O,r) and a tangent AB at a point P .
To Prove:OP⊥AB
Construction: Take any PointQ , other than P , on the tangent AB . Join OQ . Suppose OQ meets the circle at R .
Proof: We know that among all line segments joining the point O to a point on AB the shortest one is perpendicular to AB . So, to prove that OP⊥AB , it is sufficient to prove that OP is shorter than any other segment joining O to any point of AB .
Cleraly,OP=OR [Radii of the same circle]
Now,OQ=OR+RQ
⇒ OQ>OR
⇒ OQ>OP [OP=OR ]
⇒ OQ<OQ
Thus,OP is shorter than any other segment joining O to any point of AB .
Hence,OP⊥AB .
To Prove:
Construction: Take any Point
Proof: We know that among all line segments joining the point Cleraly,
Now,
Thus,
Hence,
(2) Prove that from a point, lying outside a circle, two and only two tangents can be drawn to it.When the point lies outsides the circle, there are exactly two tangents to circle from a point which lies outside the circle. As shown in figure.
(3) Prove that the lengths of the two tangents drawn from an external point to a circle are equal.Given: AP and AQ are two tangents from a point A to a circle C(O,r) .
To Prove:AP=AQ
Construction: JoinOP,OQ and OA
Proof: In order to prove that AP=AQ we shall first prove that ΔOPA≅ΔOQA .
Since a tangent at any point of a circle is perpendicular to the radius through the point of contact.
OP⊥AB and OQ⊥AQ
⇒∠OPA=∠OQA=90∘ ....(i)
Now, in right triangleOPA and OQA , we have
OP=OQ [Radii of a circle]
∠OPA=∠OQA [From (i)]
And,OA=OA [Common]
So, by RHS-Criterion of congruence, we get
ΔOPA≅ΔOQA
⇒ AP=AQ
To Prove:
Construction: Join
Proof: In order to prove that Since a tangent at any point of a circle is perpendicular to the radius through the point of contact.
Now, in right triangle
And,
So, by RHS-Criterion of congruence, we get
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