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Fractions, Decimals and Percentages

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·Edexcel GCSE Mathematics·Pearson Edexcel 1MA1·5 min

N8·N10·N11·N12

Exact Calculations with Fractions and Multiples of π

Exact answers use fractions, surds or multiples of $π$ rather than rounded decimals. Edexcel exam questions that say "give an exact answer" or "leave your answer in terms of $π$ " require this.

Why fractions give exact answers:

$\frac{1}{3} = 0.333 \dots$ — as a decimal this never terminates. As a fraction it is exact. Calculations involving $\frac{1}{3}$ must stay as fractions to remain exact.

Multiples of π:

$π = 3.14159 \dots$ is irrational — its decimal expansion never terminates or repeats. An exact answer involving $π$ keeps it as a symbol.

Worked example — a circle has radius 5 cm. Give the circumference and area as exact values.

Circumference $= 2 π r = 2 \times π \times 5 = 10 π$ cm

Area $= π r^{2} = π \times 5^{2} = 25 π$ cm²

Worked example — calculate $\frac{5}{6} + \frac{3}{4}$ exactly.

Common denominator is 12: $\frac{10}{12} + \frac{9}{12} = \frac{19}{12} = 1 \frac{7}{12}$ ✓

Terminating and Recurring Decimals

A terminating decimal has a finite number of digits after the decimal point: $0.5, 0.125, 3.75$ .

A recurring decimal has one or more digits that repeat infinitely: $0. \dot{3} = 0.333 \dots$ ; $0. \dot{1} \dot{4} = 0.141414 \dots$

Which fractions terminate? A fraction $\frac{p}{q}$ in lowest terms terminates if and only if $q$ has no prime factors other than 2 and 5.

Fraction	Denominator factors	Terminating?	Decimal
$\frac{3}{8}$	$8 = 2^{3}$	Yes	0.375
$\frac{7}{20}$	$20 = 2^{2} \times 5$	Yes	0.35
$\frac{1}{3}$	$3$ (prime, not 2 or 5)	No	$0. \dot{3}$
$\frac{5}{12}$	$12 = 2^{2} \times 3$	No	$0.41 \dot{6}$

Converting terminating decimals to fractions:

$0.375 = \frac{375}{1000} = \frac{3}{8}$ (divide numerator and denominator by HCF = 125) ✓

Converting Recurring Decimals to Fractions (Higher)

The algebraic method: let $x$ equal the recurring decimal, multiply to shift one full cycle, then subtract.

Worked example — convert $0. \dot{7}$ to a fraction.

Let $x = 0.777 \dots$

$10 x = 7.777 \dots$

Subtract: $10 x - x = 7$ , so $9 x = 7$ , giving $x = \frac{7}{9}$ ✓

Worked example — convert $0.2 \dot{7} \dot{3}$ to a fraction (the repeating block is 73).

Let $x = 0.2737373 \dots$

$10 x = 2.737373 \dots$

$1000 x = 273.7373 \dots$

Subtract: $1000 x - 10 x = 271$ , so $990 x = 271$ , giving $x = \frac{271}{990}$ ✓

(This method also works in reverse — to convert a fraction to a recurring decimal, perform long division.)

Fractions and Percentages as Operators

Both fractions and percentages can be used to operate on a quantity — to find a part of a whole.

Fractions as operators:

$\frac{3}{5}$ of 240 $= \frac{3}{5} \times 240 = \frac{720}{5} = 144$

Percentages as operators — convert the percentage to a decimal multiplier:

Percentage	Decimal multiplier
20% of $x$	$0.2 x$
7.5% of $x$	$0.075 x$
135% of $x$	$1.35 x$

Worked example — a shirt has an original price of £42. A 30% discount is applied. Find the sale price.

Discount amount: $30% of £42 = 0.3 \times 42 = £12.60$

Sale price: $£42 - £12.60 = £29.40$ ✓

Note: 30% of £42 gives the discount amount, not the final price. Read the question carefully — it may ask for the discount, the final price, or the original price.

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Fractions in Ratio Problems

Ratio and fraction notation describe the same proportional relationship.

Converting a ratio to fractions:

If the ratio of girls to boys is $3 : 2$ , then girls form $\frac{3}{5}$ of the total and boys form $\frac{2}{5}$ of the total.

Worked example — a drink is mixed in the ratio orange juice : lemonade $= 2 : 3$ . What fraction of the drink is lemonade?

Total parts: $2 + 3 = 5$ . Lemonade is $\frac{3}{5}$ of the drink.

Worked example — a class of 30 students has a boys-to-girls ratio of $2 : 3$ . How many girls are there?

Girls $= \frac{3}{5} \times 30 = 18$ ✓

Using fractions to split quantities in a given ratio:

Divide £240 in the ratio $5 : 3$ :

Total parts: $5 + 3 = 8$ . Each part $= £240 \div 8 = £30$ .

Shares: $5 \times £30 = £150$ and $3 \times £30 = £90$ . Check: $150 + 90 = 240$ ✓

Common Exam Mistakes

1. Rounding π when an exact answer is required

If a question says "give an exact answer" or "in terms of π", write $10 π$ not $31.4 \dots$ . Rounding $π$ loses marks.

2. Confusing terminating with recurring

$0.666 \dots$ is recurring — it is equal to $\frac{2}{3}$ , not $0.7$ . Likewise $0.125$ is terminating and equals $\frac{1}{8}$ exactly.

3. Percentage of — applying to the wrong value

"30% off the original price of £60" and "30% of the sale price" give different answers. The percentage applies to the base value specified in the question.

4. Ratio-to-fraction conversion

In ratio $3 : 2$ , the fraction of the whole that is the first part is $\frac{3}{5}$ , not $\frac{3}{2}$ . Divide by the total number of parts (denominator = sum of all ratio parts).

Mistake	Correction
"Exact answer for area of circle with $r = 4$ : $50.27$ cm²"	Exact answer is $16 π$ cm²
" $0. \dot{3} = \frac{1}{3.33}$ "	$0. \dot{3} = \frac{1}{3}$ (use the algebraic subtraction method)
"Ratio $3 : 4$ , so first part is $\frac{3}{4}$ of total"	First part is $\frac{3}{7}$ of total (denominator = sum of ratio parts)