The Perimeter of a Parallelogram Formula

The Perimeter of a Parallelogram Formula

Everything you need to know about the Perimeter of a Parallelogram formula is provided below. Please proceed to read the whole document carefully to understand the topic completely.

Greek “parallelogramma,” which means “bounded by parallel lines,” is the source of the term “parallelogram.”  The English word “parallelogram” was taken from this Greek word. As a result, a parallelogram is defined as a quadrilateral that has parallel lines serving as its boundaries. It is a form that has opposing sides that are parallel to one another and are of equal length.

The perimeter may be calculated by adding together the lengths of each of the four sides. The entire distance that is outside of the confines of a parallelogram is denoted by the term “perimeter.” Because the opposing sides of a parallelogram are equal to one another, the perimeter of the parallelogram is equal to two times the total of its two parallel sides, which we will refer to as a and b.

Solved Examples

Q1: Calculate the perimeter of a parallelogram with a base of 8 cm and a side of 12 cm.

Provided a = 12cm

b = 8cm

Perimeter = 2(a+b)

p = 2(8+12)

= 2(20)

= 40cm

Q2: Calculate the perimeter of a parallelogram with a base of 20 cm and a side of 40 cm.

Provided a = 40cm

b = 20cm

Perimeter = 2(a+b)

p = 2(20+40)

= 2(60)

= 120cm

Important Formulas: