Two parallel tangents of a circle meet a third tangent at points P and Q. Then, PQ subtends a right angle at the centre.
True
A circle with centre O, AP and BQ are two parallel tangents. A third tangent PQ intersect them at P and Q. PO and QO are joined.
To Prove - ∠POQ=90∘
(Coast) - Join OA, OB and OC
Proof - In ΔOAP and ΔOCP,
OA = OC (Radii of the same circle)
CP =OP (Common)
PA=PC (Tangents from P)
∴ΔOAP≅ΔOCP (SSS Postulate)
∴∠APO=∠CPO (C.P.C.T) (i)
Similarly we can prove that
ΔOCQ≅ΔOBQ
∴∠CQO=∠BQO ....(ii)
∴∠APC=2∠CPO and ∠CQB=2∠CQO
But ∠APC+∠CQB=180∘
⇒∠CPO+∠CQO=90∘
Now in ΔPOQ,
∠CPO+∠CQO+POQ=180∘
⇒90∘+∠POQ=180∘
∴∠POQ=180∘−90∘=90∘