Rationalising with a Conjugate – Formula Practice

\( Rationalise \tfrac{1}{2+\sqrt{5}} \)

Explanation

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Statement

If the denominator is of the form \(a + \sqrt{b}\), we rationalise by multiplying top and bottom by the conjugate \(a - \sqrt{b}\). This removes the surd from the denominator and leaves a simplified expression:

\[ \frac{1}{a + \sqrt{b}} \times \frac{a - \sqrt{b}}{a - \sqrt{b}} = \frac{a - \sqrt{b}}{a^2 - b}. \]

Why it’s true

The product of conjugates uses the difference of two squares: \((a+\sqrt{b})(a-\sqrt{b}) = a^2 - b\).
This eliminates the square root from the denominator, leaving a rational number below.

Recipe (how to use it)

Identify a denominator of the form \(a + \sqrt{b}\) or \(a - \sqrt{b}\).
Multiply numerator and denominator by the conjugate (\(a - \sqrt{b}\) or \(a + \sqrt{b}\)).
Simplify: denominator becomes \(a^2 - b\).

Spotting it

This appears when fractions have denominators that are part rational, part surd.

Common pairings

Simplifying expressions with surds in denominators.
Manipulating exact trigonometric values.
Preparation for algebraic proof or calculus simplifications.

Mini examples

\(\tfrac{1}{2+\sqrt{3}} = \tfrac{2-\sqrt{3}}{4-3} = 2-\sqrt{3}\).
\(\tfrac{1}{3+\sqrt{2}} = \tfrac{3-\sqrt{2}}{9-2} = (3-\sqrt{2})/7\).

Pitfalls

Forgetting to use the conjugate — multiplying by \(a+\sqrt{b}\) again won’t remove the surd.
Incorrectly expanding the denominator — must use difference of squares.
Not simplifying numerator fully when possible.

Exam strategy

Always check if the denominator has a rational and a surd part.
Show multiplication by the conjugate clearly to get full marks.
Simplify the denominator to \(a^2 - b\), not leaving it expanded with surds.

Summary

When the denominator has both a number and a square root, rationalisation requires multiplying by the conjugate. This removes surds from the denominator and leaves an exact simplified fraction, which is standard GCSE practice.

Worked examples

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Rationalise 1 / (2 + √3)
1. Multiply by (2-√3)/(2-√3)
2. \( Denominator: (2+√3)(2-√3) = 4-3 = 1 \)
3. \( Numerator = 2-√3 \)
Answer: 2 - √3
Rationalise 1 / (3 + √2)
1. Multiply by (3-√2)/(3-√2)
2. \( Denominator: 9-2=7 \)
3. \( Result = (3-√2)/7 \)
Answer: (3-√2)/7
Simplify 1 / (4 + √5)
1. Multiply by (4-√5)/(4-√5)
2. \( Denominator: 16-5=11 \)
3. \( Result = (4-√5)/11 \)
Answer: (4-√5)/11
Rationalise 1 / (5 + √3)
1. Multiply by (5-√3)/(5-√3)
2. \( Denominator: 25-3=22 \)
3. \( Result = (5-√3)/22 \)
Answer: (5-√3)/22
Simplify 1 / (6 + √2)
1. Multiply by (6-√2)/(6-√2)
2. \( Denominator: 36-2=34 \)
3. \( Result = (6-√2)/34 \)
Answer: (6-√2)/34
Rationalise 1 / (7 + √3)
1. Multiply by (7-√3)/(7-√3)
2. \( Denominator: 49-3=46 \)
3. \( Result = (7-√3)/46 \)
Answer: (7-√3)/46
Simplify 1 / (8 + √5)
1. Multiply by (8-√5)/(8-√5)
2. \( Denominator: 64-5=59 \)
3. \( Result = (8-√5)/59 \)
Answer: (8-√5)/59
Simplify 1 / (9 + √2)
1. Multiply by (9-√2)/(9-√2)
2. \( Denominator: 81-2=79 \)
3. \( Result = (9-√2)/79 \)
Answer: (9-√2)/79
Rationalise 1 / (a + √b)
1. Multiply by (a-√b)/(a-√b)
2. \( Denominator = a^2 - b \)
Answer: \( (a-√b)/(a^2-b) \)
Simplify 1 / (10 + √3)
1. Multiply by (10-√3)/(10-√3)
2. \( Denominator: 100-3=97 \)
3. \( Result = (10-√3)/97 \)
Answer: (10-√3)/97