Perimeter of a Rectangle

GCSE Geometry perimeter rectangle

Practice this formula All formulas

\( P=2(\ell+w) \)

Statement

The perimeter of a rectangle is the total distance around it. Since a rectangle has two lengths and two widths, the perimeter formula is:

\[ P = 2(\ell + w) \]

Here, \(\ell\) is the length and \(w\) is the width.

Why it’s true

The rectangle has two pairs of equal sides: two lengths and two widths.
Adding them gives \(P = \ell + w + \ell + w = 2\ell + 2w\).
This can be factored into \(P = 2(\ell + w)\).

Recipe (how to use it)

Identify the length (\(\ell\)) and width (\(w\)).
Add them together: \(\ell + w\).
Multiply the result by 2 to get the perimeter.

Spotting it

Any time you are asked to find the total boundary length of a rectangle or a square, use this formula.

Common pairings

Word problems about fencing a rectangular field.
Comparing perimeters of different rectangles.
Combined with area calculations.

Mini examples

Given: Length = 8, Width = 5. Find: Perimeter. Answer: \(P = 2(8+5) = 26\).
Given: Length = 12, Width = 7. Find: Perimeter. Answer: \(P = 2(12+7) = 38\).

Pitfalls

Forgetting to multiply by 2 after adding length and width.
Mixing up perimeter with area (\(A = \ell \times w\)).

Exam strategy

Always label length and width clearly in word problems.
Write out the sum first before multiplying by 2.
If only perimeter and one side are given, rearrange formula to solve for the other side.

Summary

The perimeter of a rectangle is given by \(P=2(\ell+w)\). It represents the distance around the shape. Remember: add length and width, then double.