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प्रश्न
In ΔPQR, ∠Q = 90°, ∠P = 40°, RS bisects ∠PRQ.
∴ find x.
पर्याय
20°
25°
70°
65°
MCQ
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उत्तर
65°
Explanation:
1. Given:
∠Q = 90° ...(Right angle)
∠P = 40°
Therefore, ∠R = 180° – ∠P – ∠Q
= 180° – 40° – 90°
= 50°
2. RS bisects ∠PRQ:
Since RS is the angle bisector of ∠R = 50°, it divides ∠R into two equal parts:
`x = 50^circ/2`
= 25°
However, we need to find the angle ∠RPS i.e., ∠PRS + ∠P.
Since x = 25° half of ∠R and ∠P = 40°:
∠RPS = ∠P + ∠PRS
= 40° + 25°
= 65°
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