Given : In trapezium PQRS, side PQ`abs()`SR, AR = 5 AP, AS = 5 AQ, then prove that SR=5 PQ.

Given : In trapezium PQRS, side PQ || side SR,AR=5AP, AS =5AQ then prove that, SR=5PQ

Given: In trapezium PQRS, sides PQ|| sides SR, AR=5AP,AS=5AQ, then prove that SR=5PQ .

In trapezium PQRS , side PQ|| side SR , AR=5AP , AS=5AQ then prove that SR=5PQ by completing the following activity. In DeltaPQA and DeltaRSA , /_PQA~=/_RSA ……( square ) /_PAQ~=/_RAS ....( square ) :.DeltaPQA~DeltaRSA ......( square ) (PQ)/(SR)=(square)/(AR) .........(Corresponding sides of similar triangles)..... (1) Substituting AR=5AP in (1) :.(PQ)/(SR)=(square)/(5AP) :.(PQ)/(SR)=(square)/(5) :.SR=5PQ

/_PQR=/_PRS, then prove that /_PQS=/_PRT

In trapezium PQRS ,side PQ|| side SR . Diagonals PR and QS intersect each other at point M . PQ=2RS . Prove that PM=2RM and QM=2SM .

If Q is a point on the side SR of a triangle PSR such that PQ=PR then prove that PS > PQ

In the given figures, if PQRS is a parallelogram and ABabs()PS , then prove that OCabs()SR .

In trapezium PQRS, PQ || SR and the ratio of PQ to SR is 3:2. If the area of the trapezium is 480 cm^(2) and the distance between PQ and SR is 12 cm, then the length of SR is

In a trapezium PQRS, PQ||SR and PQ= 2 SR. if the diagonals intersect at O and area of trianglePOQ = 96 cm^(2) , find th area of triangleSOR .

In the given figure, Q is a point on the side SR of DeltaPSR such that PQ = PR. Prove that PS gt PQ.