M is a point on the side AD of the square ABCD such that `angleCMD=30^(@)`. If the diagonal BD intersects CM at a point P , then find `angleDPC`.

M is such a point on AD of the square ABCD that angleCMD = 60^(@) . The diagonal BD intersect CM at the point P , then find angleDPC .

E is the mid point of side OB of triangle OAB . D is a point on AB such that AD : DB = 2 : 1 . If OD and AE intersect at P , then -

P is any point on BC of the square ABCD. The perpendicular , drawn from B to AP intersects DC at Q . Prove that AP = BQ.

E is the mid-point of the side BC of the parallelogram ABCD. DE and extended AB intersects each other at F. If AB = 4 cm, then AF =

P is any point on the diagonal BD of the parallelogram ABCD. Prove that DeltaAPD=DeltaCPD .

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

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.

DeltaABC and DeltaDBC are situated on the same base BC and on the same side of BC . E is any point on the side BC . Two line through the point E and parallel to AB and BD intersects the sides AC and DC at the points F and G respectively. Prove that AD||FG .