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Important Properties of Triangles

In the given ...

Question

In the given figure, PQRS is a square and SRT is an equilateral triangle. Prove that
(i) PT = QT
(ii) ∠TQR = 15°

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Solution

It is given that

Δis a square and Δ is an equilateral triangle.

We have to prove that

(1) and (2)

(1)

Since,

(Angle of square)

(Angle of equilateral triangle)

Now, adding both

Similarly, we have

Thus in and we have

(Side of square)

And (equilateral triangle side)

So by congruence criterion we have

Hence.

(2)
Since
QR = RS ( Sides of Square)
RS = RT (Sides of Equilateral triangle)

We get
QR = RT

Thus, we get
$∠ T Q R = ∠ R T Q$ (Angles opposite to equal sides are equal)

Now, in the triangle TQR, we have

$∠ T Q R + ∠ R T Q + ∠ Q R T = 180^{0} ∠ T Q R + ∠ T Q R + 150^{0} = 180^{0} 2 ∠ T Q R + 150^{0} = 180^{0} 2 ∠ T Q R = 180^{0} - 150^{0} 2 ∠ T Q R = 30^{0} ∠ T Q R = \frac{30^{0}}{2} = 15^{0}$

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Similar questions

In the figure, PQRS is a square and SRT is an equilateral triangle. Prove that

(i) PT = QT (ii) $∠ T Q R = 15^{\circ}$

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Q. In the figure

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In the given figure PQRS is a square and SRT is an equilateral triangle. prove that 1.angle PST = angle QRT, 2.PT=QT,3.anhleQTR =15degree

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