Syllabus Edition

First teaching 2021

Last exams 2024

Converting between FDP (CIE IGCSE Maths: Extended)

Revision Note

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Mark

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Maths

FDP Conversions

How do I convert from a percentage to a decimal?

Divide by 100 (move digits two places to the right)

6% as a decimal is 6 ÷ 100 = 0.06
40% as a decimal is 40 ÷ 100 = 0.4
350% as a decimal is 350 ÷ 100 = 3.5
0.2% as a decimal is 0.2 ÷ 100 = 0.002

How do I convert from a decimal to a percentage?

Multiply by 100 (move digits two places to the left and add a % sign)

0.35 as a percentage is 0.35 × 100 = 35%
1.32 as a percentage is 1.32 × 100 = 132%
0.004 as a percentage is 0.004 × 100 = 0.4%

How do I convert from a decimal to a fraction?

If it has one decimal place, write the digits over 10

0.3 is $\frac{3}{10}$
1.1 is $\frac{11}{10}$

If it has two decimal places, write the digits over 100

0.07 is $\frac{7}{100}$
0.13 is $\frac{13}{100}$
30.01 is $\frac{3001}{100}$

If it has n decimal places, write the digits over 10ⁿ

0.513 is $\frac{513}{1000}$
0.0007 is $\frac{7}{10 000}$

Learn simple recurring decimals as fractions

0.33333… = $0 . \dot{3}$ is $\frac{1}{3}$ and 0.66666… = $0 . \dot{6}$ is $\frac{2}{3}$

Whole numbers can be written as fractions (by writing them over 1)

5 is $\frac{5}{1}$

How do I convert from a percentage to a fraction?

Write the percentage over 100

37% is $\frac{37}{100}$

How do I convert from a fraction to a decimal?

Order by Size Notes fig2a

Fractions written over powers of 10 are quicker

$\frac{3}{5} = \frac{6}{10}$ which is 0.6
$\frac{7}{20} = \frac{35}{100}$ which is 0.35
$\frac{1}{500} = \frac{2}{1000}$ which is 0.002

How do I convert from a fraction to a percentage?

Change fractions into decimals (see above), then multiply by 100

$\frac{4}{5} = \frac{8}{10}$ which is 0.8 as a decimal, which is 0.8 × 100 = 80%

Exam Tip

A calculator can be used to check conversions between fractions and decimals (even if the question says to show working without a calculator)

Recurring Decimals

What are recurring decimals?

A rational number is any number that can be written as an integer (whole number) divided by another integer
- A number written as $\frac{p}{q}$ in its simplest form, where p and q are integers is rational
When you write a rational number as a decimal, you either get a decimal that stops (e.g. ¼ = 0.25), called a "terminating" decimal, or one that repeats with a pattern (e.g. ⅓ = 0.333333…), called a "recurring" decimal
The recurring part can be written with a dot (or dots on the first and last recurring digit)
- $0.3333 . . . = 0 . \dot{3}$
- $0.121212 . . . = 0 . \dot{1} \dot{2}$
- $0.325632563256 . . . = 0 . \dot{3} 25 \dot{6}$

Converting recurring decimals to fractions

Write out the first few decimal places to show the recurring pattern and then:

Write the recurring decimal f = … (some similar methods use x = ...)
Multiply both sides by 10 repeatedly until two lines have the same recurring decimal part (in order)
Subtract those two lines
DIVIDE both sides to get f = … (and cancel if necessary to get fraction in lowest terms)

Worked example

Write $0 . \dot{3} \dot{7}$ as a fraction in its lowest terms,

$0 . \dot{3} \dot{7}$ means $0.3737373737 . . .$

Use a variable to represent this number.

$x = 0.3737373737 . . .$

Multiply both sides by 100 to get another number with the same recurring decimal part.

$100 x = 37.3737373737 . . .$

Subtract the two equations to cancel out the recurring decimal parts.

$\begin{array}{l} 100 x = 37.37373737 . . . - (x = 0.3737373 . . .) 99 x = 37 \end{array}$

Divide both sides by 99

$x = \frac{37}{99}$

Type the fraction in your calculator and change to a decimal to check it is correct.

$\frac{37}{99}$

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