The sides PQ, PR of triangle PQR are equal, and S,T are points on PR,PQ such that ∠PSQand∠PTR are right angles. And hence, the triangles PSR and PSQ are congruent If the above statement is true then mention answer as 1, else mention 0 if false
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In △PTR and △PSQ, ∠PTR=∠PSQ (Each 90∘) PR=PQ (Given) ∠TPR=∠SPQ (Common) Thus, △PTR≅△PSQ (ASA rule)
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Q1
The sides PQ, PR of triangle PQR are equal, and S,T are points on PR,PQ such that ∠PSQand∠PTR are right angles. And hence, the triangles PSR and PSQ are congruent If the above statement is true then mention answer as 1, else mention 0 if false
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Q2
The sides PQ, PR of ΔPQR are equal, and S, T are points on PR, PQ such that ∠PSQ and ∠PTR are right angles. Hence, ΔPTR≅ΔPSQ
State whether the above statement is true or false.
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Q3
In triangle PQR; PQ =PR and PT is perpendicular to QR. then, QT = TR If the above statement is true then mention answer as 1, else mention 0 if false
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Q4
Triangle ABC is similar to triangle PQR. If AD and PM are altitudes of the two triangles, Hence, ABPQ=ADPM. If the above statement is true then mention answer as 1, else mention 0 if false
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Q5
In triangle PQR; PQ=PR and PT is perpendicular to QR. then, PT bisects angle TPR.
If the above statement is true then mention answer as 1, else mention 0 if false.