PQRS is a square. PR and SQ intersect at O. State the measure of `/_POQ`.

ABCD is a square.AC and BD intersect at O .State the measure of /_AOB

PQRS is a square. PR and SQ intersect at O. Then angle POQ is a

P Q R S is a square such that P R\ a n d\ S Q intersect at Odot State the measure of /_P O Q

In the given figure, PQRS is a quadrilateral ,PR and QS intersect at O. If anglePQR=70^(@), angleSPQ=80^(@) , and anglePRQ=60^(@) , then find angleSPR .

PQRS is a cyclic quadrilateral. PR and QS intersect at T. If angleSPR=40^(@)andanglePQS=80^(@) , then what is the value (in degrees) of anglePSR ?

PQR is a triangle such that PQ = PR. RS and QT are the median to the sides PQ and PR respectively. If the medians RS and QT intersect at right angle, then what is the value of "(PQ/QR)"^(2) ?

PQRS is a square. SR is a tangent (at point S) to the circle with centre O and TR = OS. Then, the ratio of area of the square to the area of the circle is :