In the figure- the tangents PQ and PR are drawn to a circle such that - RPQ - 30- A chord RS is drawn parallel to the tangent PQ- Find the - RQS-

Step 1: State the given data and equate ∠ PQR amp; ∠ PRQAs given, PQ and PR are the tangents to the circle.∠ RPQ = 30°And, RS is a chord such that RS||PQ.Now ...

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Byju's Answer

Standard X

Mathematics

Angles in Alternate Segments

In the figure...

Question

In the figure, the tangents $ PQ$ and $ PR$ are drawn to a circle such that $ \angle RPQ = 30°$. A chord $ RS$ is drawn parallel to the tangent $ PQ$. Find the $ \angle RQS$.

AN

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Solution

Step 1: State the given data and equate $∠ P Q R$ & $∠ P R Q$
As given, $P Q$ and $P R$ are the tangents to the circle.
$∠ R P Q = 30 °$
And, $R S$ is a chord such that $R S | | P Q$ .
Now, since $P Q$ and $P R$ are the tangents drawn from the same point.
So, $P Q = P R$
In $△ P Q R$ , using the property of isosceles triangles,
$∵$ $P Q = P R$
$∴$ $∠ P Q R = ∠ P R Q$ $. . . (i)$
Step 2: Calculate the value of $∠ P Q R$ and $∠ P R Q$
Now, Using the angle sum property in the $△ P Q R$ ,
$\Rightarrow$ $∠ P Q R + ∠ P R Q + ∠ R P Q = 180 °$
$\Rightarrow$ $∠ P Q R + ∠ P Q R + ∠ R P Q = 180 °$ [Using equation $(i)$ ]
$\Rightarrow$ $∠ P Q R + ∠ P Q R + 30 ° = 180 °$ $[∵ ∠ R P Q = 30 °]$
$\Rightarrow$ $2 ∠ P Q R + 30 ° = 180 °$
$\Rightarrow$ $2 ∠ P Q R = 180 ° - 30 °$
$\Rightarrow$ $2 ∠ P Q R = 150 °$
$\Rightarrow$ $∠ P Q R = \frac{150 °}{2}$
$\Rightarrow$ $∠ P Q R = 75 °$
So, $∠ P R Q = ∠ P Q R$
$\Rightarrow$ $∠ P R Q = 75 °$
Step 3: Calculate the value of $∠ S R Q$ and $∠ Q S R$
Since $R S | | P Q$ and $Q R$ is a transversal.
So, $∠ S R Q = ∠ P Q R$ [alternate interior angles]
$\Rightarrow$ $∠ S R Q = 75 °$
Now, according to the alternate segment theorem, the angle between a tangent and a chord of a circle is always equals to the angle made by the chord in the alternate segment of the circle.
So, $∠ Q R P = ∠ Q S R$
Or, $∠ Q S R = ∠ Q R P$
$\Rightarrow$ $∠ Q S R = 75 °$ $[∵ ∠ Q R P = ∠ P R Q = 75 °]$
Step 4: Calculate the value of $∠ R Q S$
Applying the angle sum property in the $∠ Q R S$ ,
$∠ S R Q + ∠ R Q S + ∠ Q S R = 180 °$
$\Rightarrow$ $75 ° + ∠ R Q S + 75 ° = 180 °$
$\Rightarrow$ $150 ° + ∠ R Q S = 180 °$
$\Rightarrow$ $∠ R Q S = 180 ° - 150 °$
$\Rightarrow$ $∠ R Q S = 30 °$
Hence, the value of $∠ R Q S$ is $30 °$ .

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In the figure, the tangents $ PQ$ and $ PR$ are drawn to a circle such that $ \angle RPQ = 30°$. A chord $ RS$ is drawn parallel to the tangent $ PQ$. Find the $ \angle RQS$.AN

In the figure, the tangents $ PQ$ and $ PR$ are drawn to a circle such that $ \angle RPQ = 30°$. A chord $ RS$ is drawn parallel to the tangent $ PQ$. Find the $ \angle RQS$.

AN