In `squareABCD, "seg " AD||"seg " BC.` Diagonal AC and diagonal BC intersect each other in point P. Then show that `(AP)/(PD)=(PC)/(BP)`

In squareABCD," side "BC|| side AD. Diagonal AC and diagonal BD intersects in point Q. If AQ=(1)/(3)AC, then show that DQ=(1)/(2)BQ.

Attempt any Two of the following: In squareABCD ,seg AB ||seg CD . Diagonal AC and BD intersect each other at point P . Prove : (A(DeltaABP))/(A(DeltaCPD))=(AB^(2))/(CD^(2))

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

The diagonals of a quadrilateral ABCD intersect each other at point ‘O’ such that (AO)/(BO) = (CO)/(DO) . Prove that ABCD is a trapezium

In the adjoing figure, squareABCD is a square. DeltaBCE on side BC and DeltaACF on the diagonal AC are similar to each other. Then, show that A(DeltaBCE)=(1)/(2)A(DeltaACF)

Diagonal of a rectangle ABCD intersect at point P, angleBPC=50^@ . Then find anglePAD .

In the figure seg AC and seg BD intersects each other at point P and (AP)/(CP)=(BP)/(DP) . Then Prove that DeltaABP~DeltaCDP .

In a quadrilateral ABCD, it is given that AB |\|CD and the diagonals AC and BD are perpendicular to each other. Show that AD.BC >= AB. CD .

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

Bisector of angleB" and "angle C " in "DeltaABC meet each other at P. Line Ap cuts the side BC at Q. Then prove that : (AP)/(PQ)=(AB+BC)/(BC)