`square ABCD ` is a parallelogram. Point E is on side BC. Line DE intersects Ray AB in point T. Prove that `DE xx BE=CE xx TE`.

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

In the adjoining figure, bisector of angleBAC intersects BC at point D. Prove that AB gt BD .

square ABCD is a trapezium in which AB||DC and its diagonals intersect each other at point O. Show that AO:BO = CO:DO.

In square ABCD , seg AD|| seg BC. Diagonal AC and digonal BD intersect each other in point P. Then show that (AP)/(PD)=(PC)/(BP) .

In the figure, square ABCD is a parallalogram. It circumscribes the cirlcle with centre T. Point E,F,G,H are touching points. If AE = 4.5, EB = 5.5, find AD.

In triangle ABC , points D and E are on sides BC and AB such that AD and CE intersect at point P. CE_|_AB , AD_|_BC . Prove that triangle AEP~triangle CDP

In triangle ABC , points D and E are on sides BC and AB such that AD and CE intersect at point P. CE_|_AB , AD_|_BC . Prove that triangle AEP~triangle ADB

In the adjoining figure, in DeltaABC , point D is on side BC such that, angleBAC = angleADC . Prove that, CA^2 = CB xx CD .

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

In square ABCD , AB||CD. Diagonals AC and BD intersect each other at point P. Prove that A(triangle ABP) : A(triangle CPD) = (AB)^2:(CD)^2 .