" 13.Bisectors of angles "A" and "B" of a parallelogram "ABCD" meet at point "M" .Prove that "/_AMB=(1)/(2)(/_C+/_D)" ."

Bisectors of angles A and B of a parallelogram ABCD meet at point M. Prove that angleAMB=(1)/(2)(angleC+angleD)

Bisectors of angles A and B of a parallelogram ABCD meet at point M. Prove that angleAMB=(1)/(2)(angleC+angleD)

Bisectors of angles A and D of a quadrilateral ABCD meet at P. Prove that angleAPD=(1)/(2)(angleB+angleC)

Bisectors of angles A and D of a quadrilateral ABCD meet at P. Prove that angleAPD=(1)/(2)(angleB+angleC)

In triangle ABC,the bisector of interior angle A and the bisector angle C meet at point O. Prove that angle AOC=(1)/(2)angleB

In triangle ABC,the bisector of interior angle A and the bisector angle C meet at point O. Prove that angle AOC=(1)/(2)angleB

The diagonal BD of a parallelogram ABCD bisects angles B and D. Prove that ABCD is a rhombus.

In Fig. find the four angles A, B, C and D in the parallelogram ABCD.

If AP and BP are the bisectors of the angle A and angle B of a parallelogram ABCD, then value of the angle APB is