In the given figure, O is the centre of a circle. PT and PQ are tangents to the circle from an external point P. If $∠$ TPQ = $70^{o}$ , find $∠$ TRQ.

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Solution

We have a circle having its centre at 0.

Now, OT and OQ are the radii of the circle.

PT and PQ are the tangents to the circle from an external point P.

We know that tangent to a circle is always $⊥$ to its radius at the point of contact.

Hence, $∠ O T P = ∠ O Q P = 90^{o}$ .

Now, $∠ T P Q = 70^{o}$

In quadrilateral PQOT,

$∠ Q O T + ∠ O T P + ∠ T P Q + ∠ O Q P = 360^{o}$ [Angle sum property]

$∠ Q O T + 90^{o} + 70^{o} + 90^{o} = 360^{o}$

$∠ Q O T = 110^{o}$

We know that angle subtended by an arc at the centre is double the angle subtended by the same
arc at any pointy on the circle.

Consider the arc QT that subtends $∠ Q O T$ at the centre and $∠ Q R T$ at any point R on the circle.
Now, $∠ Q O T = 2 ∠ Q R T$

$110^{o} = 2 \times ∠ Q R T$

$∠ Q R T = 55^{o}$

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Similar questions

∠ P O Q = 70^{\circ}

∠ T P Q

In the given figure, O is the centre of a circle, PQ is a chord and PT is the tangent at P. If $∠$ POQ = $70^{o}$ , then $∠$ TPQ is equal to

(a) $35^{o}$ (b) $45^{o}$ (c) $55^{o}$ (d) $70^{o}$

O

P Q

P T

P

∠ P O Q = 70^{0}

∠ T P Q

P Q

P R

O

P

∠ Q P R = 2 ∠ O Q R

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