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, A D is a median and B L ,\ C M are perpendiculars drawn from B\ a n d\ C respectively on A D\ a n d\ A D produced. Prove that B L=C M

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.

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, 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 .

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

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)

In a triangle A B C ,\ B M\ a n d\ C N are perpendiculars from B\ a n d\ C respectively on any line passing through A . If L is the mid-point of B C , prove that M L=N L . .

In a A B C ,\ B M\ a n d\ C N are perpendiculars from B\ a n d\ C respectively on any line passing through Adot If L is the mid-point of B C , prove that M L=N L .

In a /_\ A B C ,\ B M\ a n d\ C N are perpendiculars from B\ a n d\ C respectively on any line passing through A . If L is the mid-point of B C , prove that M L=N L .