In figure, $P A$ and $P B$ are tangents to the circle with centre $O$ such that $∠ A P B = 50 °$ .
Write the measure of $∠ O A B$

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Solution

Solve for the value of $∠ O A B$
As it is given that PA and PB are two tangents to the circle with center O from point P.
$\Rightarrow P A = P B$
$\Rightarrow ∠ P A B = ∠ P B A$ { Since $P A = P B$ , $△ P A B$ is an isosceles triangle}
By Angle Sum Property(ASP), sum of angle can be written like
$\begin{array}{rcl} ∠ A P B + ∠ P A B + ∠ P B A & = & 180 ° \\ 50 ° + ∠ P A B + ∠ P A B & = & 180 ° \\ 2 ∠ P A B & = & 130 ° \\ ∠ P A B & = & 65 ° \end{array}$
$\Rightarrow ∠ O A B = 90 - ∠ P A B = 90 ° - 65 ° \Rightarrow ∠ O A B = 25 °$ (the radius from the center of the circle to the point of tangency is perpendicular to the tangent line.)
Hence the value of $∠ O A B$ is $25 °$

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