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

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.

If angleA : angleB=3:1 in the parallelogram ABCD , then angleA =

If the difference between angleA and angleB(angleAgtangleB) of the parallelogram ABCD be 20^(@), "then" angleA

Let us consider one vertex and one side through the vertex along x -axis of a triangle . Now the coordinates of the vertices B,C and A of any triangle ABC (0,0) ,(a,0) and (h,k) respectively should be taken . If internal bisector of angle angleA of the triangle ABC intersects BC at D such that BD =4 and DC =2 then -

The length of the base AB of the parallelogram ABCD is 10 cm. If the area of ABCD be 110 sq.cm, then the height of ABCD with respect to the base AB is

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.

Two diagonals AC and BD of a cyclic quadrilateral ABCD intersect at P. If angleAPB = 68^@ and angleCBD =24^@ , then angleADB =

The diagonals of the parallelogram ABCD intersect at E. If vec(a), vec(b), vec(c) " and " vec(d) be the position vectors of its vertices with respect to an arbitary origin O, then show that vec(a)+vec(b)+vec(c)+vec(d)=4vec(OE) .

ABCD is a cyclic quadrilateral .The side BC is extended to E .The bisectors of the angles angleBADandangleDCE intersect at the point P .Prove that angleADC=angleAPC .