PQ is a chord of the circle with center at C of radius 4cm.The tangents drawn at P and Q to the circle intersects at R at a distance of 2√7 from the center of the circle. Then the length of chord PQ is
Answers
Answered by
2
Answer:
Joint OT.
Let it meet PQ at the point R.
Then ΔTPQ is isosceles and TO is the angle bisector of ∠PTO.
[∵TP=TQ= Tangents from T upon the circle]
∴OT⊥PQ
∴OT bisects PQ.
PR=RQ=4 cm
Now,
OR=
OP
2
−PR
2
=
5
2
−4
2
=3 cm
Now,
∠TPR+∠RPO=90
∘
(∵TPO=90
∘
)
=∠TPR+∠PTR(∵TRP=90
∘
)
∴∠RPO=∠PTR
∴ Right triangle TRP is similar to the right triangle
PRO. [By A-A Rule of similar triangles]
∴
PO
TP
=
RO
RP
⇒
5
TP
=
3
4
⇒TP=
3
20
cm.
Similar questions
Math,
3 hours ago
Math,
3 hours ago
India Languages,
5 hours ago
English,
5 hours ago
Social Sciences,
8 months ago
Math,
8 months ago