Diagonals of a parallelogram `A B C D` intersect at `OdotA L\ a n d\ C M` are perpendiculars to `B D` such that `L\ a n d\ M` lie on `B D` . IS `A L=C M ?` why or why not?

Diagonals of a parallelogram A B C D intersect at O. dotA L\ a n d\ C M are perpendiculars to B D such that L\ a n d\ M lie on B D . IS A L=C M ? why or why not?

The diagonals of a parallelogram A B C D intersect at OdotA line through O intersects A B\ at X\ a n d\ D C at Ydot Prove that O X=O Y

The diagonals of a parallelogram A B C D intersect at O . A line through O meets A B\ in X\ a n d\ C D in Y . Show that a r\ (q u a d rilateral A X Y D)=1/2a r(paral l e l ogram\ \ A B C D)

B D is one of the diagonals of a quadrilateral A B C Ddot\ \ A M\ a n d\ C N are the perpendiculars from A\ a n d\ C , respectively, on B Ddot Show That a r\ (q u a ddotA B C D)=1/2B Ddot(A M+C N)

Draw a parallelogram A B C D in which A B=8c m ,\ A D=5c m\ a n d\ /_A=60^0dot

B D is one of the diagonals of a quadrilateral A B C D . A M and C N are the perpendiculars from A\ a n d\ C , respectively, on B D . Show that ar (quad. A B C D )= 1/2B D (A M+C N)

In Figure, A B C D is a rectangle. B M\ a n d\ D N are perpendicular from B\ a n d\ D respectively on A C . Prove that M B C~= D N A (ii) B M=D N

In Figure, B M\ a n d\ D N are both perpendiculars to the segments A C\ a n d\ B M=D N . Prove that A C\ bisects B D .

A B C D is a parallelogram. L\ a n d\ M are points on A B\ a n d\ D C respectively and A L=C M . Prove that L M\ a n d\ B D bisect each other.

A B C D is a parallelogram. L\ a n d\ M are points on A B\ a n d\ D C respectively and A L=C M . Prove that L M\ a n d\ B D bisect each other.