Math, asked by josephhummel, 9 months ago

Given parallelogram ABCD, m\angle A=4x+27m ∠ A = 4 x + 27, and m\angle C=6x-23m ∠ C = 6 x − 23, find m\angle Bm ∠ B

Answers

Answered by harvindersingh16982
1

Answer:

it is tough question not soon colectvely

Answered by sonuvuce
0

The measure of ∠B  is  53°

Step-by-step explanation:

In parallelogram ABCD

\angle A=4x+27

\angle C=6x-23

We know that in a parallelogram, opposite angles are equal

Therefore,

\angle A=\angle C

\implies 4x+27=6x-23

\implies 2x=50

\implies x=25

Therefore,

\angle A=4\times 25+27=100+27=127^\circ

Also, DA and CB sides will be parallel

AB will be transversal line to it

Therefore, sum of one side of angles will be equal to 180°

i.e. \angle A+\angle B=180^\circ

\implies \angle B=180^\circ-127^\circ

\implies \angle B=53^\circ

Hope this answer is helpful.

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