биссектр. одного из углов параллелограма пересекаясь с его стороной образует с ней угол равный 32

Finding the Angle of a Parallelogram

To find the angles of a parallelogram, we need to use the information given about the angle formed by the bisector of one of the angles of the parallelogram intersecting one of its sides.

Let's denote the angle formed by the bisector as x and the angle opposite to it as y.

According to the given information, the angle formed by the bisector and the side of the parallelogram is equal to 32 degrees.

We can use the properties of parallelograms to find the values of x and y.

In a parallelogram, opposite angles are congruent. Therefore, x and y are congruent.

Since the angle formed by the bisector and the side is 32 degrees, we have:

x = 32 degrees.

Since x and y are congruent, we also have:

y = 32 degrees.

Therefore, the angles of the parallelogram are:

x = 32 degrees and y = 32 degrees.

I hope this helps! Let me know if you have any further questions.

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