In figure, altitudes YZ and XT of `triangle WXY` intersect at P. Prove that
`square WZPT` is cyclic

In figure, altitudes YZ and XT of triangle WXY intersect at P. Prove that Points X,Z,T,Y are concyclic.

In figure, two circles intersect each other at points A and E. Their common secant through E intersects the circles at points B and D. The tangents of the circles at points B and D intersect each other at point C. Prove that square ABCD is cyclic.

If a line is drawn parallel to the base of an isosceles triangle to intersect its equal sides, prove that the quadrilateral, so formed is cyclic.

In the figure , altitudes AD and CE of DeltaABC intersect each other at the point P . Show that : DeltaAEP~DeltaCDP

In the adjoining figure, common tangents AB and CD to two circles intersect at P. Prove that AB=CD.

A circle intersects the side AD of a parallelogram ABCD at P and BC produced at Q. Prove that square PDQC is cyclic .

In the figure, if /_ ADC = /_ CBP then prove that square ABCD is cyclic.

If the altitudes of a triangle are in A.P,then the sides of the triangle are in

In the given figure, points S,T and U are the midpoints of sides PQ,QR and PR respectively. IF PV bot QR, then prove that square SVTU is a cyclic quadrilateral.

In the figure, two chords AB and CD intersect each other at the point P. Prove that : AP. PB = CP. DP