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Here we will learn about converting improper fractions to mixed numbers including how to recognise improper fractions and mixed numbers.
There are also improper fractions and mixed numbers worksheets based on Edexcel, AQA and OCR exam questions, along with further guidance on where to go next if you’re still stuck.
Proper fractions and improper fractions are types of fractions.
A proper fraction is a fraction where the numerator (top number) is smaller than the denominator (bottom number).
Here are some examples of proper fractions:
An improper fraction is a fraction where the numerator (top number) is larger than the denominator (bottom number). They are sometimes called “top-heavy fractions”.
Here are some examples of improper fractions:
A mixed number has a whole number part and a fractional part.
Here is an example of a mixed number, it means 1 whole and 3 fifths.
We can change improper fractions to mixed numbers and vice versa. To do this we know how many equal parts there are and how many of them make a whole.
There is 1 whole that is split into 5 equal pieces. 1 whole is equal to 5 fifths.
Altogether there are 8 fifths or 1 whole and 3 fifths.
In order to change an improper fraction to a mixed number:
Get your free improper fraction to mixed number worksheet of 20+ questions and answers. Includes reasoning and applied questions.
DOWNLOAD FREEGet your free improper fraction to mixed number worksheet of 20+ questions and answers. Includes reasoning and applied questions.
DOWNLOAD FREEImproper fractions to mixed numbers is part of our series of lessons to support revision on fractions. You may find it helpful to start with the main fractions lesson for a summary of what to expect, or use the step by step guides below for further detail on individual topics. Other lessons in this series include:
Write the following improper fraction as a mixed number:
The denominator of the fraction is
2Work out the remainder.
The remainder is
The denominator stays the same.
3Write the mixed number with the whole number at the front and the remainder as the new numerator over the original denominator.
Write the following improper fraction as a mixed number:
Work out how many times the denominator divides into the numerator.
The denominator of the fraction is
Work out the remainder.
The remainder is
The denominator stays the same.
Write the mixed number with the whole number at the front and the remainder as the new numerator over the original denominator.
Write the following improper fraction as a mixed number:
Work out how many times the denominator divides into the numerator.
The denominator of the fraction is
Work out the remainder.
The remainder is
Write the mixed number with the whole number at the front and the remainder as the new numerator over the original denominator.
If the improper fraction has a denominator of 3 , then so will the mixed number and vice versa.
When putting a mixed number into a calculator, you must use the “shift” button and then the fraction button so that you can input the mixed number properly.
An improper fraction may be written as a mixed number but the fraction part of the mixed number still needs to be written in its simplest terms.
1. Write the following improper fraction as a mixed number:
\frac{5}{4}
2. Write the following improper fraction as a mixed number:
\frac{8}{3}
3. Write the following improper fraction as a mixed number:
\frac{23}{5}
4. Write the following improper fraction as a mixed number:
\frac{20}{7}
5. Write the following improper fraction as a mixed number:
\frac{41}{6}
6. Write the following improper fraction as a mixed number:
\frac{115}{11}
1. Write this improper fraction as a mixed number
\frac{25}{8}
(1 mark)
3\frac{1}{8}
(1)
2. Work out
\frac{4}{9} + \frac{7}{9}
Circle your answer
\frac{11}{18} \quad \quad \frac{11}{81} \quad \quad 1\frac{4}{9} \quad \quad 1\frac{2}{9}
(1 mark)
1\frac{2}{9}
(1)
3. Work out
\frac{3}{7}\times11
Give your answer as a mixed number
(2 marks)
(1)
\frac{33}{7}=\frac{4\times 7+5}{7}=4\frac{5}{7}
4\frac{5}{7}
(1)
You have now learned how to:
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