Rationalising a Simple Surd

GCSE Algebra surds rationalise

\( \frac{1}{\sqrt{a}}=\frac{\sqrt{a}}{a}\;(a>0) \)

Statement

When a fraction has a single square root in the denominator, we can rationalise it by multiplying top and bottom by the same square root:

\[ \frac{1}{\sqrt{a}} = \frac{\sqrt{a}}{\sqrt{a}\cdot\sqrt{a}} = \frac{\sqrt{a}}{a}, \quad (a>0). \]

Why it’s true

Multiplying numerator and denominator by \(\sqrt{a}\) eliminates the surd from the denominator.
Since \(\sqrt{a}\times \sqrt{a} = a\), the denominator becomes rational.

Recipe (how to use it)

Identify a denominator of the form \(\sqrt{a}\).
Multiply numerator and denominator by \(\sqrt{a}\).
Simplify the result as \(\tfrac{\sqrt{a}}{a}\).

Spotting it

This occurs in simple fractions like \(\tfrac{1}{\sqrt{2}}\), \(\tfrac{1}{\sqrt{5}}\), or more generally \(\tfrac{1}{\sqrt{a}}\).

Common pairings

Surds simplification in GCSE algebra.
Exact trigonometric values (e.g. \(\sin 45^\circ = \tfrac{1}{\sqrt{2}} = \tfrac{\sqrt{2}}{2}\)).
Probability and geometry questions requiring simplified denominators.

Mini examples

\(\tfrac{1}{\sqrt{2}} = \tfrac{\sqrt{2}}{2}\).
\(\tfrac{1}{\sqrt{5}} = \tfrac{\sqrt{5}}{5}\).

Pitfalls

Forgetting to multiply both numerator and denominator by the surd.
Leaving the denominator irrational when the question explicitly asks for rational form.
Not simplifying the final fraction fully.

Exam strategy

Always show the rationalisation step explicitly.
Check if the surd simplifies before rationalising (e.g. \(\sqrt{12} = 2\sqrt{3}\)).
In trigonometry, remember to give exact forms (like \(\sqrt{2}/2\)) instead of decimals.

Summary

Rationalising a simple surd is a straightforward process: multiply top and bottom by the same surd to remove it from the denominator. The result is cleaner, exact, and consistent with exam expectations.