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2. In the adjoining figure, \( A B C D \) is a square. \( P , Q \) and \( R \) ane points on the sides \( A B , B C \) and \( C D \) respectively such that \( A P = B Q = C R \) and \( \angle P Q R = 90 ^ { \circ } . \) Prove that (a) \( \Delta \mathrm { PBQ } \cong \Delta \mathrm { QCR } \) (b) \( \mathrm { PQ } = \mathrm { QR } \) (c) \( \angle \mathrm { PRQ } = 45 ^ { \circ } \)

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Q1
In the adjoining figure, $$ABCD$$ is a square $$P,Q$$and $$R$$ are points on the sides $$AB, BC$$ and $$CD$$ respectively such that $$AP=BQ=CR$$ and $$\angle PQR =90^o$$. Prove that
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Q2
ABCD is a square P,Q and R are the points on AB, BC and CD respectively; such that AP=BQ=CR. Prove that
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Q3
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Q4

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Q5
Quadrilateral ABCD is a square. P, Q and R are the points on AB, BC and CD respectively, such that AP=BQ=CR. Hence,.If PQR is a right angle, find PRQ(in degrees)
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