Just like we did with triangles , we can take any four points that do not lie on a line and join them with four segments to form a shape. We call this shape a quadrilateral.

First box has 4 dots. Second box has 4 connected dots forming a quadrilateral. Third box has quadrilateral with angle arcs.

There is an enormous variety of four-sided shapes. The one thing they all have in common is that they can always be split down the middle to make two triangles. This means that: the angle sum of a quadrilateral is 360\degree.

This image shows the angle sum of a quadrilateral. Ask your teacher for more information.

The two triangles each form a straight angle, and together they form a full revolution.

We will explore the different kinds of quadrilaterals and the families they are organised into.

The first division lies between the convex quadrilaterals and the concave quadrilaterals:

This image shows examples of convex and concave quadrilaterals. Ask your teacher for more information.

Notice that the concave quadrilaterals stick into themselves - we can form a triangle with three of their points, with the fourth one lying inside it:

Concave quadrilaterals where the internal points are highlighted and dashed lines are opposite of them forming a triangle.

The internal point has been highlighted for each concave quadrilateral.

Most of the time we will be looking at convex quadrilaterals. With one exception, all the special quadrilaterals we mention in this lesson are convex.

Examples

Example 1

Solve for the value of x in the diagram below.

Concave quadrilateral with angles of 64, 23, x, and 19 degrees.

Worked Solution

Create a strategy

Add the angles and equate to 360.

Apply the idea

\displaystyle x+64+23+19	\displaystyle =	\displaystyle 360	Add the angles and equate to 360
\displaystyle x+106	\displaystyle =	\displaystyle 360	Evaluate the addition
\displaystyle x+106-106	\displaystyle =	\displaystyle 360-106	Subtract 106 from both sides
\displaystyle x	\displaystyle =	\displaystyle 254	Evaluate

Idea summary

A quadrilateral is any shape that has four sides. The sum of its angles is 360\degree.

Concave quadrilaterals can form a triangle with its three points which makes it different to convex quadrilaterals.

Special quadrilaterals

If two sides of a quadrilateral are parallel, we call it a trapezium. The angles on the sides connecting the parallel lines are always supplementary, because they form a cointerior angle pair:

A trapezium with 2 parallel sides and each pair of cointerior angles between the parallel sides are supplementary.

If the four sides of a quadrilateral form two pairs of parallel sides, we have a special kind of trapezium called a parallelogram. Here are some parallelograms:

3 different parallelograms with different orientations and sizes.

These shapes always have all of these properties:

Opposite sides are parallel (by definition)
Consecutive angles are supplementary (because it is a trapezium in two ways)
Opposite angles are equal
Opposite sides are equal in length

If a quadrilateral has any one of these properties, it will be a parallelogram with all the other properties as well.

2 parallelograms where the first shows the opposite sides and the second shows the opposite angles have same markings.

Here are two more shapes that are also parallelograms.

Because these shapes have one of the above properties, they have all of them - including the defining one, that opposite sides are parallel.

A different kind of quadrilateral is called a kite, where the shape has two pairs of adjacent sides that are equal in length. Unlike the trapezium family, kites can be both concave and convex. Sometimes you might hear a concave kite referred to as a dart.

If a shape is a kite, it has an additional property. The angles between each pair of equal sides may be different, but the other two angles are always the same:

Opposite angles between the convex and concave kites have double markings.

If a parallelogram has four equal angles, they are automatically right angles. A parallelogram with four right angles is called a rectangle.

2 rectangles where the first shows 4 right angles and the second shows each pair of opposite sides have the same markings.

Rectangles have these properties:

All angles are right angles (by definition)
Opposite sides are parallel and equal in length (because it is a parallelogram)

A different kind of shape is both a parallelogram and a kite at the same time, called a rhombus, which has these properties:

Opposite sides are parallel (because it is a parallelogram)
Consecutive angles are supplementary (because it is a trapezium)
Opposite angles are equal (because it is a parallelogram)
All sides are equal in length, because:
- Opposite sides are equal in length (parallelogram)
- Two pairs of adjacent sides that are equal in length (kite)

Here are two rhombuses:

Two rhombuses with different orientations but both show all sides of them has the same markings.

The most special kind of quadrilateral is the square. It is a combination of a rectangle and a rhombus, so it is also a parallelogram, a kite, and a trapezium.