A circle is drawn to pass through vertex P & to touch QR & RS at A & B of rectangle PQRS. If length of perpendicular from P onto AB is `sqrt(7)`, then area of rectangle PQRS is.

ABCD is a rectangle. A circle passing through vertex C touches the sides AB and AD at M and N respectively. If the distance lof the line MN from the vertex C is P units then the area of rectangle ABCD is

ABCD is a rectangle. A circle passing through vertex C touches the sides AB and AD at M and N respectively. If the distance lof the line MN from the vertex C is P units then the area of rectangle ABCD is

ABCD is a rectangle. A circle passing through vertex C touches the sides AB and AD at M and N respectively. If the distance lof the line MN from the vertex C is P units then the area of rectangle ABCD is

PQRS is a rectangle. The perpendicular ST from S on PR divides angle S in the ratio 2:3. Find angle TPQ.

ABCD is a rectangle.A circle passing through vertex C touches the sides AB and AD at M and N respectively.If the distance lof the line MN from the vertex C is P units then the area of rectangle ABCD is

PQR is an isosceles triangle such that PQ = QR = 10 cm and angle PQR = 90^(@). What is the length of the perpendicular drawn from Q on PR ?

PQRS is a rectangle. T is a point on PQ such that RTQ is an isosceles triangle and PT = 5 QT.If the area of triangle RTQ is 12 sqrt3 sq.cm, then the area of the rectangle PQRS is:

A triangle ABC is such that a circle passing through vertex C, centroid G touches sides AB at B. If AB=6, BC=4 then the length of median through A

PQRS is a rectangle. When the length and breadth of the rectangle increases, the rectangle is enlarged to VWRT and the area of the rectangle is enlarged by 226 cm^(2) . If the length of rectangle PQRS is twice its breadth. Find (i) Perimeter of rectangle PQRS. (ii) Area of rectangle VWRT.

In Delta PQR , the line drawn from the vertex P intersects QR at a point S. If QR = 4.5 cm and SR = 1.5 cm then the ratios of the area of triangle PQS and triangle PSR is