AB is a line and P is its midpoint. D and E are two points on the same side of line segment AB such that `angleBAD=angleABE and angleEPA=angleDPB`. Prove that
`AD=BE`

AB is a line and P is its midpoint. D and E are two points on the same side of line segment AB such that angleBAD=angleABE and angleEPA=angleDPB . Prove that DeltaDAP-=DeltaEBP

AB is a line segment and P is its midpoint. D and E are points on the same side of AD such that angleBAD=angleABE and angleEPA=angleDPB . Show that (i) DeltaDAP~=DeltaEBP, (ii) AD=BE.

AB is a line segment and P is its mid-point. D and E are points on the same side of AB such that angleBAD = angleABE and angleEPA = angleDPB (see figure). Show that AD=BE

AB is a line segment D and P is its mid-point. D and E are points on the same side of AB such that angleBAD = angleABE and angleEPA = angleDPB (see figure). Show that DeltaDAP~=DeltaEBP

In the given figure, ABCD is a quadrilateral and E and F are points on AD and CD respectively such that AB = CB, angleABE=angleCBF and angleEBD=angleFBD. Prove that BE=BF.

AB is a line segment.AX and BY are two equal line segments drawn on opposite sides of line AB such that AX||BY If AB and XY intersect each other at P, prove that APX~=BPY( ii) AB and XY bisect each other.

D and E are points on equal sides AB and AC of an isosceles triangle ABC such that AD=AE .Prove that B,C,D,E are concylic.

D and E are points on equal sides AB and AC of an isosceles triangle ABC such that AD=AE. Prove that B,C,D,E are concylic.

If C and D are the points of internal and external division of line segment AB in the same ratio, then AC,AB, AD are in