Math, asked by ankitraj4037, 5 months ago

show that the bisectors of angles of a parallelogram form a rectangle

Answers

Answered by Sanchiu13

Answer:

yaar thoda chota pucho na

Answered by karneomkar

Step-by-step explanation:

To prove: MNOP is a rectangle.

In parallelogram ABCD

∠A=∠D=90

∘

[they form a straight line]

∴IN△AMD,∠M=90

∘

∠M=∠N=90

∘

[they form a straight line]

Similarly,

∠M=∠P=90

∘

And

∠P=∠O=90

∘

∴∠MPO=∠PON∠ONM=∠NMO=90

∘

∴ MNOP is a rectangle. [A rectangle is a parallelogram with one angle 90

∘

]

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show that the bisectors of angles of a parallelogram form a rectangle​

Answers

show that the bisectors of angles of a parallelogram form a rectangle