Question 12
The tangent at a point C of a circle and a diameter AB when extended intersect at P. If $∠ P C A = 110^{\circ}$ , find $∠$ CBA.

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Solution

Here, AB is a diameter of the circle from point C and a tangent is drawn which meets at a point P.

Join OC. Here OC is radius
Since tangent at any point of a circle is perpendicular to the radius through point of contact circle.
$∴$ OC $⊥$ PC
Now $∠$ PCA = $110^{\circ}$ [given]
$\Rightarrow ∠ P C O + ∠ O C A = 110^{\circ} \Rightarrow 90^{\circ} + ∠ O C A = 110^{\circ} \Rightarrow ∠ O C A = 20^{\circ}$
$∵$ OC= OA = Radius of circle
$∠$ OCA = $∠$ OAC = $20^{\circ}$
[Since two sides are equal, then their opposite angles are equal]
Since PC is a tangent So, $∠ B C P = ∠ C A B = 20^{\circ}$
[ angle in a alternate segment are equal]
In $Δ$ ABC, $∠ P + ∠ C + ∠ A = 180^{\circ}$
$∠ P = 180^{\circ} - (∠ C + ∠ A)$
$= 180^{\circ} = (110^{\circ} + 20^{\circ})$
$= 180^{\circ} - 130^{\circ} = 50^{\circ}$
In $Δ$ PBC,
$∠ B P C + ∠ P C B + ∠ P B C = 180^{\circ}$
[ Sum of all interior angles of any triangle is $180^{\circ}$ ]
$\Rightarrow 50^{\circ} + 20^{\circ} + ∠ P B C = 180^{\circ}$
$\Rightarrow ∠ P B C = 180^{\circ} - 70^{\circ}$
$\Rightarrow ∠ P B C = 110^{\circ}$
Since, APB is a straight line
$∴ ∠ P B C + ∠ C B A = 180^{\circ}$
$\Rightarrow ∠ C B A = 180^{\circ} - 110^{\circ} = 70^{\circ}$

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