In the figure, O is the center of the circle, PQ is tangent to the circle at A. If $∠ P A B = 58^{\circ}$ , find $∠ A B Q$ and $∠ A Q B$ . [2 MARKS]

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Solution

Concept: 1 Mark
Application: 1 Mark

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As the tangent at any point of a circle is perpendicular to the radius through the point of contact.

$∠ O A P = 90^{\circ}$

$∠ O A B = ∠ O A P - ∠ P A B$

$∠ O A B = 90^{\circ} - 58^{\circ}$

$∠ O A B = 32^{\circ}$

OA = OB (Radius)

$∠ O A B = ∠ O B A$

Therefore $∠ O B A = 32^{\circ}$

$∠ A O Q = ∠ O A B + ∠ O B A$ (By exterior angle property)

$= 32^{\circ}$ + $32^{\circ}$

$= 64^{\circ}$

In $△ O A Q$

By angle sum property

$∠ O Q A = 180^{\circ} - ∠ A O Q - ∠ O A Q$

$∠ O Q A = 180^{\circ} - 64^{\circ} - 90^{\circ}$

$∠ O Q A = 26^{\circ}$

Therefore $∠ A B Q = 32^{\circ}$ and $∠ A Q B = 26^{\circ}$

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