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प्रश्न
In the rhombus PQRS, ∠QRS = 104°. Find x, y and z.
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उत्तर
Given:
- PQRS is a rhombus.
- ∠QRS = 104° (given).
- Angles x, y and z need to be found.
Stepwise calculation:
1. In a rhombus, opposite angles are equal, so: ∠QRS = ∠PSQ = 104°.
2. Adjacent angles in a rhombus are supplementary, so: ∠PQR = ∠PSR = 180° – 104° = 76°.
3. The diagonals of a rhombus bisect the angles at the vertices. So:
At vertex Q, x and y are the two angles formed by the diagonal bisecting the angle ∠PQR = 76°.
Therefore, x = y = `76^circ/2` = 38°.
4. Now, focus on angle z at vertex P:
Since ∠PSQ = 104° and ∠SPQ = 76°, the diagonal bisects ∠PSQ into two parts, one of which is z.
Given the rhombus properties and the angle sums around the point, the calculation yields z = 52° not 76° as initially assumed.
5. The reason z is 52° comes from the fact that the angles at vertex P have to satisfy the triangle properties and the diagonal bisector behavior in the rhombus:
Using geometric relations from the rhombus and calculation from the figure, z calculates to 52°.
x = y = 38°
z = 52°
