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प्रश्न
In the given figure, PQRS is a rhombus in which the diagonal PR is produced to T. If ∠SRT = 152°, find x, y and z.
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उत्तर
Rhombus PQRS is given.
Diagonal PR is produced to T.
Also, ∠SRT = 152°.
We know that in a rhombus, the diagonals bisect each other at right angle.
Therefore,
y = 90°
Now,
∠1 + ∠SRT = 180°
∠1 +152° = 180°
∠1 = 28°
In ΔSOR, by angle sum property of a triangle, we get:
∠1 +y +∠OSR = 180°
28° +90° +∠OSR = 180°
118° +∠OSR = 180°
∠OSR = 62°
Or, ∠QSR = 62° (Because O lies on SQ)
We have, SP || PQ .Thus the alternate interior opposite angles must be equal.
Therefore,
x = ∠QSR
x = 62°
In ΔSPR,we have
Since opposite sides of a rhombus are equal.
Therefore,
PS = SR
Also,
Angles opposite to equal sides are equal.
Thus,
z = ∠1
But ∠1 = 28°
Thus, z = 20°
Hence the required values for x,y and z are 62°,90° and 28° respectively.
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