[Maths Class Notes] on Parallelogram Formula Pdf for Exam

Introduction to Parallelogram Formula

A parallelogram is one of the types of quadrilaterals. A quadrilateral is a closed geometric shape which has 4 vertices, 4 sides and hence 4 angles that lie on the same plane. Sum of the interior angles of a quadrilateral measures 3600. A quadrilateral is a type of a polygon. There are various kinds of quadrilateral embracing trapezoids, parallelograms and kites. A parallelogram is one of the types of quadrilateral in which opposite sides are equal and parallel and opposite angles are equal.

Properties of Parallelogram

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Let us consider the parallelogram ABCD represented in the above figure to understand the properties of a parallelogram in a better manner. The properties of a parallelogram are listed below.

i.e. AB || CD and AC || BD. Also AB = CD and AC = BD

∠ABC ⩭ ∠ADC and ∠BAD ⩭ ∠BCD

i.e. AC bisects BD and BD bisects AC.

Sum of any two interior adjacent angles of a parallelogram is a straight angle (i.e. it measures 1800).
If one of the interior angles of a parallelogram is a right angle, then all the interior angles are right angles.
The diagonal of a parallelogram divides the parallelogram into two congruent triangles.

i.e. If the diagonal AC is drawn for the parallelogram ABCD shown in the above figure, the diagonal divides the parallelogram into two triangles: ΔABC and ΔADC such that ΔABC ⩭ ΔADC

Important Parallelogram Formula

The Perimeter of a Parallelogram

The perimeter of a parallelogram is the measure of all sides of a parallelogram. A parallelogram is a two dimensional geometric shape. The two measurable dimensions are length and width. Since opposite sides of a parallelogram are congruent, its perimeter can be written as the sum of all the four sides in terms of length and width as:

The Perimeter of a Parallelogram = 2 (L + B)

In the above equation, ‘L’ is the length and ‘B’ is the breadth or width of the parallelogram.

Area of Parallelogram Formula

A deeper analysis of the parallelogram properties reveal that the parallelograms are made of two congruent triangles. (i.e. the diagonal of a parallelogram divides it into two congruent triangles.) Since the triangles are congruent, they have the same area. The area of a triangle is measured as half of the product of its base and height. Since the parallelogram has 2 triangles, its area is twice the area of the triangle. Therefore, the area of a parallelogram formula is equal to the product of its base and height.

Area of Parallelogram = Base x Height

Parallelogram Formula Example Problems

1. Find the area of a parallelogram whose base is 5 cm and height is 3 cm.

Solution:

Given: Length of the parallelogram / Base of the parallelogram (B) = 5 cm

Height of the parallelogram (H) = 3 cm

Area of parallelogram formula is given as:

Area = B x H

Area = 5 x 3

Area = 15 cm2

2. Determine the perimeter of a quadrilateral whose sides measure 5 cm, 4 cm, 5 cm and 4 cm taken in an order. Identify whether the given quadrilateral is a parallelogram or not. Justify your answer.

Solution:

Perimeter of a quadrilateral is the sum of all the 4 sides of the quadrilateral. So,

Perimeter = 5 + 4 + 5 + 4 = 18 cm.

The given quadrilateral is a parallelogram because its opposite sides are found to be equal. If the opposite sides are equal, obviously they will be parallel too.

Fun Quiz:

One of the most important learning outcomes of understanding the concept of parallelogram properties is that the student should be able to identify whether the given quadrilateral is a parallelogram or not.

Check whether the following quadrilaterals are parallelograms or not. Justify your answer.