Types of Quadrilaterals

Types Of Quadrilaterals

Before talking about the types of quadrilaterals, let us recall what a quadrilateral is. A quadrilateral is a polygon which has the following properties

  • 4 vertices and 4 sides enclosing 4 angles
  • The sum of all interior angles of a quadrilateral is 360 degrees
  • We can also derive the sum of interior angle from the formula of polygon i.e. (n -2) × 180, where n is equal to the number of sides of the polygon

A quadrilateral, in general, has sides of different lengths and angles of different measures. However, squares, rectangles, etc. are special types of quadrilaterals with some of their sides and angles being equal. This is the reason that the area of quadrilateral depends on which type of quadrilateral it is. In this article, we will discuss the special types of quadrilaterals and their basic properties.

Table of Contents:

Different Types of Quadrilaterals

There are six basic types of quadrilaterals. They are:

  1. Trapezium
  2. Parallelogram
  3. Rectangle
  4. Rhombus
  5. Square
  6. Kite

Trapezium

It is a quadrilateral with one pair of opposite parallel sides. In the trapezium, ABCD, side AB is parallel to side CD.

Trapezium

Parallelogram

It is a quadrilateral with two pairs of parallel sides. The opposite sides are parallel and equal in length. The opposite angles are equal in measure. In the parallelogram, ABCD, side AB is parallel to side CD and side AD is parallel to side BC.
Also, the two diagonals formed to intersect each other at the midpoints. As in the figure given below, E is the point where both the diagonals meet. So
Length AE = EC, & Length BE = ED

Parallelogram

Rectangle

It is a quadrilateral with all the 4 angles of equal measure, that is, each of them is 90°. Both the pairs of opposite sides are parallel and equal in length.

Rectangle

Rhombus

It is a quadrilateral with all four sides having equal lengths. The Opposite sides of a rhombus are parallel and opposite angles are equal.

Rhombus

Square

It is a quadrilateral in which all the sides and angles are equal. Every angle is a right angle (i.e. 90° each). The pairs of opposite sides are parallel to each other.

Square

Kite

It is a quadrilateral that has 2 pairs of equal-length sides and these sides are adjacent to each other.

Kite

Some points about quadrilaterals to be kept in mind are:

  • Square, rectangle, and rhombus are types of parallelograms.
  • A square is a rectangle as well as a rhombus.
  • The rectangle and rhombus are not a square.
  • A parallelogram is a trapezium.
  • A trapezium is not a parallelogram.
  • Kite is not a parallelogram.

Properties of Different Types of Quadrilaterals

The below table contains the properties of various types of quadrilaterals and their corresponding basic formulas.

Type of QuadrilateralPropertiesFormulas
Trapezium
  • Only one pair of opposite sides are parallel
  • Non-parallel sides are called legs
  • Diagonals intersect each other
  • The length of the mid-segment is equal to half the sum of the parallel bases
Area of trapezium = (½) (a + b)h
= (½) (Sum of two parallel sides) × HeightPerimeter = Sum of all the sides
Parallelogram
  • The opposite sides are parallel and equal
  • The opposite angles are equal
  • The sum of two consecutive angles is 180 degrees
  • If any one of the angles is a right angle, then all the other angles will be right angles
  • Diagonals bisect each other
  • Each diagonal bisects the parallelogram into two congruent triangles
Area = Base × Height

Perimeter = Sum of all the side

Rectangle
  • The opposite sides are parallel and equal
  • Each interior angle is a right angle
  • The diagonals bisect each other and have the same length
Area = Length × Breadth

Perimeter = 2(Length + Breadth)

Rhombus
  • All sides of the rhombus are congruent, and the opposite sides are parallel
  • Opposite angles of a rhombus are congruent
  • Diagonals bisect each other at right angles
  • Diagonals bisect the interior angles of a rhombus
  • The sum of two adjacent angles is equal to 180 degrees
Area = (½) (d1 × d2)

= (½) (Product of the length of diagonals)

Perimeter = 4(side length)

Square
  • All four sides of the square are equal, and the opposite sides of the square are parallel to each other
  • The measure of each interior angle is 90 degrees
  • The diagonals of the square are equal to each other and bisect each other at right angles
Area  = (side)²

Perimeter = 4(side)

Kite
  • Two pairs of adjacent sides are congruent
  • One pair of opposite angles are equal 
  • An axis of symmetry through one pair of opposite angles
  • Two diagonals are not of the same length
  • Diagonals intersect each other at right angles
Area = (½) (d1 × d2)

= (½) (Product of the length of diagonals)

Perimeter = Sum of all the sides

Solved Examples

Example 1:

If the perimeter of a square is 72 cm, then find its area.

Solution:

Let a be the side of a square.

Perimeter of a square = 4a

4a = 72 cm (given)

a = 72/4 = 18

Thus, side of the square = 18 cm

Area of the square = a² = (18)² = 324 cm²

Example 2:

The area of a trapezium is 180 cm², and its height is 9 cm. If one of the parallel sides is longer than the other by 6 cm, find the two parallel sides.

Solution:

Let x be the length of the shorter parallel side.

So, the length of the longer side = (x + 6) cm

Height of a trapezium (distance between two parallel sides) = h = 9 cm

As we know,

Area of trapezium = (1/2) × (sum of parallel sides) × Height

Thus, (1/2) (x + x + 6) × 9 = 180 [given]

2x + 6 = (180 × 2)/9

2x + 6 = 40

2x = 40 – 6 = 34

x = 34/2 = 17. cm

Now, x + 6 = 17 + 6 = 23 cm

Therefore, the length of the two parallel sides will be 17 cm and 23 cm.


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