`squareABCD` is a parallelogram. A circle passing throught D, A, B cuts BC in P. Prove that DC=DP.

squareABCD is a parallelogram . Side BC intersects circle at point P . Prove that DC = DP .

squareABCD is a parallelogram. Point E is on side BC , line DE intersects Ray AB in point . T Prove that : DExxBE=CExxTE .

ABCD is a parallelogram. L is a point on BC which divides BC in the ratio 1:2 . AL intersects BD at P.M is a point on DC which divides DC in the ratio 1 : 2 and AM intersects BD in Q. Point Q divides DB in the ratio

The diagonal AC of a parallelogram ABCD intersects DP at the point Q, where ‘P’ is any point on side AB. Prove that CQ xx PQ = QA xx QD .

Prove that the parallelogram circumscibing a circle is a rhombus.

ABCD is quadrilateral with AB parallel to DC. A line drawn parallel to AB meets AD at P and BC at Q. prove that (AP)/(PD) = (BQ)/(QC)

In squareABCD is a quadrilateral. M is the midpoint of diagonal AC and N is the midpoint of diagonal BD. Prove that : AB^(2)+BC^(2)+CD^(2)+DA^(2)=AC^(2)=AC^(2)+BD^(2)+4MN^(2).

Two circles intersect at A and B. From a point P on one of the circles lines PAC and PBD are drawn intersecting the second circle at C and D. Prove that CD is parallel to the tangent at P.

A circle with centre P. arc AB = arc BC and arc AXC = 2 arc AB . Find measure of arc AB, arc BC and arc AXC. Prove that chord AB~= chord BC .

If the chord of contact of tangents from a point P to a given circle passes through Q , then the circle on P Q as diameter.