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प्रश्न
In the given figure, PQRS and PXYZ are parallelograms. Prove that they are of equal area.
[Hint: Join XQ. Area (ΔXPQ) = `1/2` of each || gm]
सिद्धांत
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उत्तर
Given:
- Two parallelograms: PQRS and PXYZ
- Hint: Join XQ
To prove: Area (PQRS) = Area (PXYZ)
Step 1: Use the hint
Join XQ. This will divide both parallelograms into triangles:
- In parallelogram PQRS: Triangle ΔPQX forms half of the parallelogram PXYZ
- In parallelogram PXYZ: Triangle ΔXPQ also forms half of the parallelogram PXYZ
Step 2: Areas of triangles
Recall the formula for area of a parallelogram:
Area of parallelogram = Base × Height
For triangle ΔXPQ (inside PXYZ):
Area (ΔXPQ) = `1/2` Area (PXYZ)
For triangle ΔXPQ (inside PQRS):
Area (ΔXPQ) = `1/2` Area (PQRS)
Step 3: Equate the areas of the triangles
Since ΔXPQ is common to both parallelograms:
`1/2` Area (PQRS) = `1/2` Area (PXYZ)
Multiply both sides by 2:
Area (PQRS) = Area (PXYZ)
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