The bisectors of `angleA and angleB` of the parallelogram ABCD meet at the point P on the side CD. If the length of the side AB be 4 cm , find the length BC.

The bisectors of angleA and angleB meet at a point E on the side CD of the parallelogram ABCD . If the length of the side BC be 2 cm , find the length of the side AB.

The bisectors of angleA of the parallelogram ABCD intersect DC at P , If anglePDA=110^(@), " then" angleAPD =

The area of the parallelogram ABCD is 44 sq.cm. P is the mid-point of BC. Determine the area of the DeltaABP .

The diagonals AC and BD of the parallelogram ABCD intersect each other at O . Any straight line passing through O intesects the sides AB and CD at the points P and Q respectively . Prove that OP = OQ.

If in the parallelogram ABCD angleA : angleB = 3 : 2 , then find the angles of the parallelogram ABCD.

P, Q, R and S are the mid-point of the sides AB, BC, CD and DA of the parallelogram ABCD respectively. If the area of the ABCD be 88 sq.cm, then the area of the PQRS is

In the figure, O is the centre of the circle. Find the length of CD, if AB = 5 cm.

In the adjacent figure ABCD is a parallelogram and E is the midpoint of the side BC. If DE and AB are produced to meet at F, show that AF = 2AB .

The perimeter of a parallelogram is 50cm , If the length of its greater side be 15 cm , then the length of its smaller side is equal to -

The length of the side AB of the rhombus ABCD is 4 cm and angleBCD = 60^(@) then find the length of AC.