In the given figure, O is the center of the circle, AB is diameter and CPD is a tangent to the circle at P. If ∠BPD = 30°, find :

(i) ∠APC

(ii) ∠BOP

(iii) ∠OAP

(i) From figure,

∠APB = 90° [∵ angle in semicircle is equal to 90]

From figure,

⇒ ∠APC + ∠APD = 180° [∵ they form linear pair]

⇒ ∠APC + ∠APB + ∠BPD = 180°

⇒ ∠APC + 90° + 30° = 180°

⇒ ∠APC + 120° = 180°

⇒ ∠APC = 180° - 120°

⇒ ∠APC = 60°.

Hence, the value of ∠APC = 60°.

(ii) From figure,

⇒ ∠BAP = ∠BPD = 30°. (∵ angles in alternate segment are equal.)

Arc BP subtends ∠BOP at the centre and ∠BAP at the remaining part of the circle.

∴ ∠BOP = 2∠BAP [∵ angle subtended at centre by an arc is double the angle subtended at remaining part of circle.]

⇒ ∠BOP = 2 × 30° = 60°.

Hence, the value of ∠BOP = 60°.

(iii) From figure,

⇒ ∠AOP + ∠BOP = 180° [∵ they form linear pair]

⇒ ∠AOP + 60° = 180°

⇒ ∠AOP = 180° - 60° = 120°.

From figure,

⇒ OA = OP [Radius of the same circle]

⇒ ∠OAP = ∠OPA = a(let) (Angles opposite to equal sides are equal)

In △ OAP,

⇒ ∠OAP + ∠OPA + ∠AOP = 180°

⇒ a + a + 120° = 180°

⇒ 2a = 180° - 120°

⇒ 2a = 60°

⇒ a = $\dfrac{60°}{2}$ = 30°

Hence, the value of ∠OAP = 30°.