# Calculating the Perimeter of Parallelogram WXYZ

Calculating the Perimeter of Parallelogram WXYZ

Parallelograms are quadrilaterals with opposite sides that are parallel and congruent. They have unique properties such as equal opposite angles and the diagonals bisect each other. Parallelogram WXYZ is no exception. Its sides WX and YZ are parallel and congruent while sides XY and WZ are also parallel and congruent. To calculate the perimeter of parallelogram WXYZ, we need to add up the lengths of all its sides.

The formula for the perimeter of any polygon is the sum of all its sides. In the case of parallelogram WXYZ, we have:

Perimeter = WX + XY + YZ + WZ

To use this formula, we need to know the lengths of all four sides of parallelogram WXYZ. Let’s assume that side WX has a length of 10 units, side XY has a length of 8 units, side YZ has a length of 10 units, and side WZ has a length of 8 units. Substituting these values into the formula, we get:

Perimeter = 10 + 8 + 10 + 8
Perimeter = 36 units

Therefore, the perimeter of parallelogram WXYZ is 36 units. It’s that simple!

In conclusion, calculating the perimeter of parallelogram WXYZ requires adding up the lengths of its four sides. Knowing the length of each side is essential to applying the formula for finding the perimeter. From our example, we see how easy it can be to calculate the perimeter of any parallelogram given its side lengths.