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One mathematical shape that every student is familiar with is the square. As well as being a shape, squaring is also a procedure that can be applied to a number or algebraic letter.

When we square a number, we multiply it by itself. The term comes from the method of calculating the area of a square of known side-length.

The symbol we use to show that a number is to be squared is ² – a superscript 2. So if we want to say ‘6 squared’ we could write it as 6².

The square below has a side length of 4 m, what is its area?

To calculate the area of this square, we would multiply 4 m by 4 m which gives us 16 m². The square of 4 is 16.

Example

What is 16 squared?

Solution

If you had a square of side length 16 m, what would be its area?

16 m × 16 m = 256 m². So 16 squared is 256.

The general rule when squaring numbers with indices is that you double the power.

(Z³)² = Z⁶

(p⁵)² = p¹⁰

Square root

If we know the area of a square and want to calculate its side-length, then we are trying to find its square root. This can seem more difficult to achieve but you should know the square numbers up to 12² (or 12 × 12). So you can calculate the square root of these. For any other number you will need a calculator.

Example

Find the square root of 144.

Solution

We know that 12 × 12 = 144, therefore the square root of 144 is 12.

Example

A square has an area of 640.09 cm², what is the perimeter of the square?

Solution

As the perimeter of a square is the side length multiplied by 4, we have 4 × 25.3 = 101.2 cm

The general rule when square-rooting numbers with indices is that you halve the power.