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Fractions

Mastering fractions is crucial for tackling a wide range of mathematical problems. The skill is applicable to a huge range of real-world contexts, from cooking and construction to science and finance. Use this resource to learn how to simplify, add, subtract, multiply and divide fractions.

A fraction is the easiest way to express a part of a whole. It consists of a numerator (the number at the top) and a denominator (the number at the bottom) which are separated by a horizontal bar or line called a vinculum.

Fractions help to communicate information. For example, if you got 18 marks correct out of the 20 marks available on your quiz, you will have received \(\dfrac{18}{20}\) for the quiz.

Let's see how to add, subtract, multiply and divide fractions, and reduce fractions to their simplest terms (or smallest numbers).

Simplifying fractions

Simplifying fractions involves reducing them to their simplest form. Fractions are simplified by dividing the numerator and denominator by the same number until they are their lowest possible whole-number values. In other words:

Simplifying fractions involves dividing the numerator and denominator by the highest common factor (HCF).

We do this by cancelling out the HCF.

When the numerator is larger than the denominator, the fraction is called an improper fraction. We can convert them to a mixed number, which consists of a whole number and a fraction.

Video tutorial – simplifying fractions

Watch this video to learn how to simplify fractions.

Hi, I’m Martin Lindsay from the Study and Learning Centre at RMIT University. This is a short movie on simplifying fractions.

Let’s start by simplifying 27 divided by 36. The thing to notice about this fraction is that you can divide both top and bottom by nine, in other words, nine into 27 goes three and 36 divided by nine is 4. So we’ve reduced a more complicated fraction to a much simpler one, three quarters.

Let’s write this another way. 27 over 36 is divisible both top and bottom by nine. Nine into 27 goes three. Notice here we’ve cancelled the 27, in other words, we’re dividing by nine. And what we do to the top we do to the bottom, so we cancel the 36 and divide by nine, giving us four. Thus the answer is three quarters.

Here’s another example. We have to write 16 over five as a mixed number, or sometimes called a mixed fraction. 16 over five as you can see is a top heavy fraction, the number on the top is bigger than the number on the bottom. First of all what we need to do is divide the five into the 16, which gives us three and that gives us a remainder of one. And the remainder one is divided by the five, because the five is on the bottom of the fraction 16 over five. In other words, 16 over five is equal to three and one 5th.

Now let’s work in the reverse to what we were doing in the previous slide. Here we start with a mixed fraction or a mixed number and we need to turn it into an improper fraction. So we want to write two and four 7ths as an improper fraction. There’s our two and four 7ths and what we do is this. We multiply the seven by the two to give us 14. Once we’ve got the 14 we then add it to the four on the top of the fraction part of this number. So 14 plus four is 18. There’s the arithmetic on the right hand side. Two times seven in brackets, which we do first, then we add the four. That gives us fourteen plus four over seven, which gives us 18 over seven. In other words, the mixed fraction two and four 7ths is 18 over seven as an improper fraction.

Now try some questions for yourself. The answers to these questions are on the next slide. Thanks for watching this short movie.

Example 1 – simplifying ordinary fractions

Simplify \(\dfrac{18}{24}\).
\[\begin{align*} & = \frac{18}{24}\quad\textrm{divide top and bottom by \(2\)}\\
& = \frac{9}{12}\quad\textrm{divide top and bottom by \(3\)}\\
& = \frac{3}{4}
\end{align*}\]

This simplification also can be done in one step if you realise that \(6\) divides into \(18\) and \(24\)—that is, \(6\) is the HCF.

Simplify \(\dfrac{27}{36}\).
\[\begin{align*} & = \frac{27}{36}\quad\textrm{divide top and bottom by \(9\)}\\
& = \frac{3}{4}
\end{align*}\]

Write \(\dfrac{16}{5}\) as a mixed number.

Divide \(16\) by \(5\). This gives us \(3\) with a remainder of \(1\). The remainder is written as a fraction, so \(\dfrac{1}{5}\) and the whole number is written before the fraction. So:

\[\frac{16}{5} = 3\frac{1}{5}\]

Write \(2\dfrac{4}{7}\) as an improper fraction.

Multiply the whole number by the denominator: \(2\times7=14\). Then, add the numerator: \(14+4=18\). So:

\[ 2\frac{4}{7} = \frac{18}{7}\]

Exercise – simplifying fractions

  1. Simplify the following.
    1. \(\dfrac{16}{24}\)
    2. \(\dfrac{30}{55}\)
    3. \(\dfrac{48}{100}\)
    4. \(\dfrac{21}{77}\)
  2. Write the following as mixed numbers and simplify where possible.
    1. \(\dfrac{13}{9}\)
    2. \(\dfrac{33}{6}\)
    3. \(\dfrac{35}{3}\)
    4. \(\dfrac{22}{8}\)
  3. Write the following as improper fractions.
    1. \(4\dfrac{2}{5}\)
    2. \(9\dfrac{3}{8}\)
    3. \(6\dfrac{7}{9}\)
    4. \(2\dfrac{11}{12}\)

    1. \(\dfrac{2}{3}\)
    2. \(\dfrac{6}{11}\)
    3. \(\dfrac{12}{25}\)
    4. \(\dfrac{3}{11}\)
    1. \(1\dfrac{4}{9}\)
    2. \(5\dfrac{1}{2}\)
    3. \(11\dfrac{2}{3}\)
    4. \(2\dfrac{3}{4}\)
    1. \(\dfrac{22}{5}\)
    2. \(\dfrac{75}{8}\)
    3. \(\dfrac{61}{9}\)
    4. \(\dfrac{35}{12}\)

Adding and subtracting fractions

The denominator is the bottom of the fraction and the numerator is the top of the fraction. For the fraction \(\dfrac{2}{5}\), the numerator is \(2\) and the denominator is \(5\).

The basic concept is that only fractions with a common denominator may be added or subtracted.

Video tutorial – adding fractions

Watch this video to learn how to add fractions.

Hi, I’m Martin Lindsay from the Study and Learning Centre at RMIT University. This is a short movie on adding fractions.

Let’s start by adding two basic fractions, a quarter plus two quarters. Notice in this case that the number on the bottom called the denominator is the same. We call that the common denominator, in other words, the number they both have in common is four. Once the denominator is the same then we can just go ahead and start adding the top numbers, called the numerators, in other words, one plus two gives us three over four. So we leave the denominator alone and we add the numerators. So the answer is three quarters.

But what happens if the denominators are not the same? Well, we need to now find the common denominator of five and four, meaning what number does five and four divide into. That number is 20, so the common denominator is 20. And this is how we go about doing it. Five goes into 20 four times, so we multiple five by four in the left hand fraction. If we multiple the bottom by four, we must multiply the top of the fraction by four, so two times four is on the top. With our three quarters fraction, we’re multiplying four by five to give us 20, therefore we multiply the top by five, three times five. In other words, we now have adding the eight and the 15 to give us the answer for our numerator, so eight plus 15 is 23, divided by 20 will give us one and three 20ths.

Let’s add whole number fractions or mixed fraction. One and one 3rd, plus two and three 5ths. The first job is to separate out the whole numbers from the fractions. So we now have one plus two, and the fractions are one 3rd plus three 5ths. So the whole numbers must be added up and the fractions must be added up. So we now have three, and now we go ahead and find the common denominator of three and five, which is 15. So as with the previous slide, we say three times five is 15, one times five is five. The second fraction is five times three is 15, and therefore we multiply the top of the fraction by three, three times three. This gives us three plus five over 15, plus nine over 15. And five over 15 plus nine over 15 gives us 14 over 15. So our answer is three and 14 15ths.

Now try some questions for yourself. The answers to these questions are on the next slide. Thanks for watching this short movie.

Video tutorial – subtracting fractions

Watch this video to learn how to subtract fractions.

Hi, this is Martin Lindsay from the Study and Learning Centre at RMIT University. This is a short movie on subtracting fractions.

Let’s start with an easy fraction subtraction; two quarters minus one quarter. The thing to notice about this particular fraction subtraction is that the denominator for both fractions is in fact the same, which is four. If the denominator is the same then we can simply carry out the subtraction of the numerators for both fractions to take away one giving us an answer of one quarter, but just to reiterate in this particular case the fraction denominators are the same, so the subtraction for the numerators can be carried out straight away. However what if the two fractions have different denominators, in this case four and five are different denominators, so what we do first of all is look for a common denominator, that is the lowest number in which the four and the five will divide into, that number is 20, so we then carry out a little operation here. What I’ve done is to multiply the four by the five and in the second fraction I’ve multiplied the five by the four, so what I do to the bottom I must do to the top, so I’ve multiplied the three by the five for the first fraction and I’ve multiplied the two by the four for the second fraction. Now I have the same denominator on both, for both fractions, which is 20, because the denominator is the same I can then simply subtract the numerators, 15 minus eight.

What about whole number fraction subtractions, in this case two and three-fifths take away one and one-third. What we do first of all is to subtract the whole numbers, in this case it’s two take away one, then we go ahead and subtract the fractions, three‑fifths minus one-third. Here the common denominator is 15 and so with the first fraction, three over five, I’m multiplying that by three to make me 15, therefore I multiply the top by three. The second fraction, one-third, I multiply the bottom by five to give us 15, therefore I multiply the top by five, this gives me one plus nine‑fifteenths minus five-fifteenths, which is an answer of one and four-fifteenths.

Now try some questions for yourself. The answers to the questions are on the next slide. Thanks for watching this short movie.

Example 1 – adding and subtracting fractions

\[\begin{align*} \frac{1}{4}+\frac{2}{4} & = \frac{1+2}{4}\\
& = \frac{3}{4}
\end{align*}\]

The fractions have the same denominator, so the lowest common denominator is \(4\).

\[\begin{align*} \frac{2}{5}+\frac{3}{4} & = (\frac{2}{5}\times\frac{4}{4})-(\frac{3}{4}\times\frac{5}{5})\\
& = \frac{8}{20}+\frac{15}{20}\\
& = \frac{8+15}{20}\\
& = \frac{23}{20}\\
& = 1\frac{3}{20}
\end{align*}\]

The lowest common denominator is \(5\times4=20\). To make the denominators \(20\) for both fractions, we need to multiply the first fraction by \(\dfrac{4}{4}\) and the second fraction by \(\dfrac{5}{5}\). Both \(\dfrac{4}{4}\) and \(\dfrac{5}{5}\) are equal to \(1\), so you don't actually change anything mathematically when you multiply fractions by them.

In the final fraction, the numerator is larger than the denominator, so it is an improper fraction. We can convert it to a mixed fraction.

\[\begin{align*} \frac{2}{4}-\frac{1}{4} & = \frac{2-1}{4}\\
& = \frac{1}{4}
\end{align*}\]

The fractions have the same denominator, so the lowest common denominator is \(4\).

\[\begin{align*} \frac{7}{10}-\frac{3}{7} & = (\frac{7}{10}\times\frac{7}{7})-(\frac{3}{7}\times\frac{10}{10})\\
& = \frac{49}{70}-\frac{30}{70}\\
& = \frac{49-30}{70}\\
& = \frac{19}{70}
\end{align*}\]

The lowest common denominator is \(10\times7=70\). To make the denominators \(70\) for both fractions, we need to multiply the first fraction by \(\dfrac{7}{7}\) and the second fraction by \(\dfrac{10}{10}\). Both \(\dfrac{7}{7}\) and \(\dfrac{10}{10}\) are equal to \(1\), so you don't actually change anything mathematically when you multiply fractions by them.

\[\begin{align*} \frac{3}{4}-\frac{2}{5} & = (\frac{3}{4}\times\frac{5}{5})-(\frac{2}{5}\times\frac{4}{4})\\
& = \frac{15}{20}-\frac{8}{20}\\
& = \frac{15-8}{20}\\
& = \frac{7}{20}
\end{align*}\]

The lowest common denominator is \(5\times4=20\). To make the denominators \(20\) for both fractions, we need to multiply the first fraction by \(\dfrac{5}{5}\) and the second fraction by \(\dfrac{4}{4}\). Both \(\dfrac{5}{5}\) and \(\dfrac{4}{4}\) are equal to \(1\), so you don't actually change anything mathematically when you multiply fractions by them.

\[\begin{align*} 1\frac{1}{3}+2\frac{3}{5} & = 1+2+\frac{1}{3}+\frac{3}{5}\\
& = 3+(\frac{1}{3}\times\frac{5}{5})+(\frac{3}{5}\times\frac{3}{3})\\
& = 3+\frac{5}{15}+\frac{9}{15}\\
& = 3+\frac{5+9}{15}\\
& = 3\frac{14}{15}
\end{align*}\]

Here, the whole numbers are added together, and the fractions are added together. Mixed fractions can also be converted into improper fractions before completing the operations, then converted back into a mixed number.

The lowest common denominator is \(3\times5=15\). To make the denominators \(15\) for both fractions, we need to multiply the first fraction by \(\dfrac{5}{5}\) and the second fraction by \(\dfrac{3}{3}\). Both \(\dfrac{5}{5}\) and \(\dfrac{3}{3}\) are equal to \(1\), so you don't actually change anything mathematically when you multiply fractions by them.

\[\begin{align*} 2\frac{3}{5}-1\frac{1}{3} & = 2-1+\frac{3}{5}-\frac{1}{3}\\
& = 1+(\frac{3}{5}\times\frac{3}{3})-(\frac{1}{3}\times\frac{5}{5})\\
& = 1+\frac{9}{15}-\frac{5}{15}\\
& = 1+\frac{9-5}{15}\\
& = 1\frac{4}{15}
\end{align*}\]

Exercise – adding and subtracting fractions

  1. Simplify the following.
    1. \(\dfrac{4}{5}+\dfrac{3}{4}\)
    2. \(\dfrac{3}{4}+\dfrac{1}{4}\)
    3. \(\dfrac{1}{6}+\dfrac{1}{3}\)
    4. \(2\dfrac{3}{5}+3\dfrac{7}{10}\)
    5. \(3\dfrac{4}{7}+\dfrac{9}{14}\)
    6. \(\dfrac{5}{9}+\dfrac{11}{36}\)
    7. \(6\dfrac{5}{8}+3\dfrac{3}{4}\)
    8. \(1\dfrac{7}{9}+5\dfrac{5}{18}\)
    9. \(7\dfrac{5}{7}+2\dfrac{13}{14}\)
    10. \(\dfrac{7}{8}+1\dfrac{1}{4}+2\dfrac{2}{3}\)
    11. \(\dfrac{3}{4}+1\dfrac{2}{3}+3\dfrac{5}{6}\)
  2. Simplify the following.
    1. \(\dfrac{3}{4}-\dfrac{1}{4}\)
    2. \(\dfrac{1}{3}-\dfrac{1}{6}\)
    3. \(3\dfrac{7}{10}-2\dfrac{3}{5}\)
    4. \(3\dfrac{4}{7}-\dfrac{7}{14}\)
    5. \(\dfrac{5}{9}-\dfrac{11}{36}\)
    6. \(6\dfrac{7}{8}-3\dfrac{3}{4}\)
    7. \(5\dfrac{5}{18}-1\dfrac{2}{9}\)
    8. \(7\dfrac{5}{7}-2\dfrac{5}{14}\)
    9. \(2\dfrac{2}{3}-1\dfrac{1}{4}\)
    10. \(3\dfrac{5}{6}-1\dfrac{2}{3}\)

    1. \(\dfrac{31}{30}\)
    2. \(1\)
    3. \(\dfrac{1}{2}\)
    4. \(6\dfrac{3}{10}\)
    5. \(4\dfrac{3}{14}\)
    6. \(\dfrac{31}{36}\)
    7. \(10\dfrac{3}{8}\)
    8. \(7\dfrac{1}{18}\)
    9. \(10\dfrac{9}{14}\)
    10. \(4\dfrac{19}{24}\)
    11. \(6\dfrac{1}{4}\)
    1. \(\dfrac{2}{4}\) or \(\dfrac{1}{2}\)
    2. \(\dfrac{1}{6}\)
    3. \(1\dfrac{1}{10}\)
    4. \(3\dfrac{1}{14}\)
    5. \(\dfrac{9}{36}\) or \(\dfrac{1}{4}\)
    6. \(3\dfrac{1}{8}\)
    7. \(4\dfrac{1}{18}\)
    8. \(5\dfrac{5}{14}\)
    9. \(1\dfrac{5}{12}\)
    10. \(2\dfrac{1}{6}\)

Multiplying fractions

When we multiply two fractions, we multiply the numerators and the denominators of each fraction.

It is best to simplify each fraction, if possible, before you do the multiplication. This saves you having to simplify afterwards.

Video tutorial – multiplying fractions

Watch this video to learn how to multiply fractions.

Hi, I’m Martin Lindsay from the Study and Learning Centre at RMIT University. This is a short movie on multiplying fractions.

Let’s start by looking at two simple fractions, two 3rds times four 5ths. Notice with this fraction problem that there are no terms top and bottom that cancel. In other words, what we do is to multiply out the top line and multiply out the bottom line, in other words, the numerator which is the top line is multiplied out, two times four, and the denominator, the bottom line, is multiplied out, three times five. Again stress the point here that there are no terms that cancel. So this gives us four times two is eight, three times five is 15. So our answer to this problem is eight 15ths.

But what happens if we have terms that do cancel? Here we have the problem five over eight times two over five. And you should notice that there are terms that cancel here. The first one which is the obvious one are the fives top and bottom. So we go ahead with our cancelling. Five into five goes one, five into five goes one. So we now have one times two over eight times one. But notice again we have cancelling of the two and the eight. Two into two goes once, and two into eights goes four. So we’re cancelling more terms. That’s about as far as we can go, so we multiply out the top line, one times one is one, the bottom line is four times one is four. So the answer to this problem is a quarter.

How about multiplying out mixed numbers? Here we have mixed numbers one and three quarters multiplied by two and two 3rds. When we multiply mixed numbers we first of all turn them into improper fractions. So one and three quarters is seven over four, two and two 3rds is eight over three. So now we look to see whether any of these terms cancel. And as you can see four goes into four once, four goes into eight twice. Nothing else cancels, so we then multiply out the top line, seven times two is 14, the bottom line, one times three is three. But notice we give our answer as a mixed number, not an improper fraction, so 14 over three is four and two 3rds.

Now try some questions for yourself. The answers to these questions are on the next slide. Thanks for watching this short movie.

Example 1 – multiplying fractions

\[\frac{3}{4}\times\frac{7}{5} = \frac{21}{20}\]

\[\begin{align*} & = \frac{15}{8}\times\frac{24}{35}\quad\textrm{divide top and bottom by \(8\)}\\
& = \frac{15}{1}\times\frac{3}{35}\quad\textrm{divide top and bottom by \(5\)}\\
& = \frac{3}{1}\times\frac{3}{7}\\
& = \frac{9}{7}
\end{align*}\]

A common factor is \(8\), so we can divide the \(24\) in the top line by \(8\) and the \(8\) in the bottom line by \(8\).

Then, \(15\) in the top line and the \(35\) in the bottom line can be divided by a common factor of \(5\).

Completing the calculation gives \(\dfrac{9}{7}\).

\[\frac{2}{3}\times\frac{4}{5} = \frac{8}{15}\]

\[\begin{align*} & = \frac{5}{8}\times\frac{2}{5}\quad\textrm{divide top and bottom by \(5\)}\\
& = \frac{1}{8}\times\frac{2}{1}\\
& = \frac{2}{8}\quad\textrm{divide top and bottom by \(2\)}\\
& = \frac{1}{4}
\end{align*}\]

\[\begin{align*} & = 1\frac{3}{4}\times2\frac{2}{3}\quad\textrm{convert to improper fractions}\\
& = \frac{7}{4}\times\frac{8}{3}\quad\textrm{divide top and bottom by \(4\)}\\
& = \frac{7}{1}\times\frac{2}{3}\\
& = \frac{14}{3}\quad\textrm{convert to mixed number}\\
& = 4\frac{2}{3}
\end{align*}\]

Exercise – multiplying fractions

  1. Solve the following fractions and simplify where possible.
    1. \(\dfrac{1}{3}\times\dfrac{6}{7}\)
    2. \(\dfrac{1}{5}\times\dfrac{1}{6}\)
    3. \(\dfrac{8}{9}\times6\)
    4. \(2\dfrac{3}{4}\times3\dfrac{3}{7}\)
    5. \(\dfrac{9}{14}\times\dfrac{7}{9}\)
    6. \(\dfrac{7}{11}\times\dfrac{11}{42}\)
    7. \(\dfrac{1}{8}\times2\dfrac{2}{9}\)
    8. \(3\dfrac{5}{6}\times1\dfrac{1}{5}\)
    9. \(5\dfrac{2}{3}\times4\dfrac{2}{7}\)
    10. \(1\dfrac{1}{8}\times5\dfrac{1}{3}\times\dfrac{1}{9}\)

    1. \(\dfrac{2}{7}\)
    2. \(\dfrac{1}{30}\)
    3. \(\dfrac{16}{3}\) or \(5\dfrac{1}{3}\)
    4. \(\dfrac{66}{7}\) or \(9\dfrac{3}{7}\)
    5. \(\dfrac{1}{2}\)
    6. \(\dfrac{1}{6}\)
    7. \(\dfrac{5}{18}\)
    8. \(\dfrac{23}{5}\) or \(4\dfrac{3}{5}\)
    9. \(\dfrac{170}{7}\) or \(24\dfrac{2}{7}\)
    10. \(\dfrac{2}{3}\)

Dividing fractions

Dividing by a fraction is the same as multiplying by its reciprocal. The reciprocal of a fraction is just the fraction with its numerator and denominator swapped. This is also called inverting the fraction.

For example, the reciprocal of \(\dfrac{3}{4}\) is \(\dfrac{4}{3}\).

Video tutorial – dividing fractions

Watch this video to learn how to divide fractions.

Hi, I’m Martin Lindsay from the Study and Learning Centre at RMIT University. This is a short movie on dividing fractions.

Let’s start by dividing two simple fractions, four 3rds divided by two 5ths. We start by changing the division sign to a multiplication sign and then we take the reciprocal of the two 5ths, the last term. In other words, we flip the two over five upside, which becomes five over two. We then carry out the operation multiplying four over three by five over two, and as you can see, the twos cancel, two into two goes one, two into four goes two. Nothing else cancels, so we multiply out top and bottom, 10 over three and leave our answer as a mixed fraction. So the answer to this question is three and one 3rd.

Let’s divide two mixed fractions. Two and one quarter divided by one and one 5th. Before we actually carry out the division we must express our mixed fractions as improper fractions, so two and one quarter is nine over four divided by one and one 5th is six over five. Now we carry out our division by first of all changing the division sign to a multiplication sign and then taking the reciprocal of six over five, which becomes five over six. From there we look to see if anything cancels, and as you can see the nine and the six will divided by three, three into six goes two, three into nine goes three. Nothing else cancels, so we multiply out the top line, three times five is 15, the bottom line, four times two is eight. Thus an improper fraction which must be converted into a mixed fraction, which is one and seven 8ths. So the answer to this mixed fraction question is one and seven 8ths.

Occasionally you may see questions like this where there is a fraction divided by a whole number, and before you carry out the division problem you must express the whole number as a fraction. In other words, three over four divided by six, which is six over one. So you express the whole number as six over one. Then we carry out the operation by changing the division sign to a multiplication sign and taking the reciprocal of six over one, which is one over six. Look again for terms that cancel, here three goes into three once, three goes into six twice. Nothing else cancels, multiply out the numerator, one, the denominator, four times two is eight. So our answer to this question is one over eight.

Now carry out some questions for yourself. The answers to these questions are on the next slide. Thanks for watching this short movie.

Example 1 – dividing ordinary fractions

\[\begin{align*} & = \frac{5}{4}\div\frac{19}{8}\quad\textrm{change sign to times and invert last fraction}\\
& = \frac{5}{4}\times\frac{8}{19}\quad\textrm{divide top and bottom by \(4\)}\\
& = \frac{5}{1}\times\frac{2}{19}\\
& = \frac{10}{19}
\end{align*}\]

\[\begin{align*} & = \frac{4}{3}\div\frac{2}{5}\quad\textrm{change sign to times and invert last fraction}\\
& = \frac{4}{3}\times\frac{5}{2}\quad\textrm{divide top and bottom by \(2\)}\\
& = \frac{2}{3}\times\frac{5}{1}\\
& = \frac{10}{3}\quad\textrm{convert to mixed fraction}\\
& = 3\frac{1}{3}
\end{align*}\]

\[\begin{align*} & = 2\frac{1}{4}\div1\frac{1}{5}\quad\textrm{rewrite as improper fractions}\\
& = \frac{9}{4}\div\frac{6}{5}\quad\textrm{change sign to times and invert last fraction}\\
& = \frac{9}{4}\times\frac{5}{6}\quad\textrm{divide top and bottom by \(3\)}\\
& = \frac{3}{4}\times\frac{5}{2}\\
& = \frac{15}{8}\quad\textrm{convert to mixed fraction}\\
& = 1\frac{7}{8}
\end{align*}\]

\[\begin{align*} & = \frac{3}{4}\div6\quad\textrm{change sign to times and invert last fraction}\\
& = \frac{3}{4}\times\frac{1}{6}\quad\textrm{divide top and bottom by \(3\)}\\
& = \frac{1}{4}\times\frac{1}{2}\\
& = \frac{1}{8}
\end{align*}\]

Exercise – dividing fractions

  1. Solve the following fractions and simplify where possible.
    1. \(\dfrac{3}{4}\div\dfrac{1}{4}\)
    2. \(\dfrac{4}{9}\div\dfrac{7}{9}\)
    3. \(\dfrac{7}{8}\div7\)
    4. \(\dfrac{3}{4}\div\dfrac{4}{5}\)
    5. \(\dfrac{8}{6}\div\dfrac{2}{3}\)
    6. \(3\dfrac{1}{4}\div\dfrac{7}{12}\)
    7. \(3\dfrac{4}{5}\div\dfrac{4}{5}\)
    8. \(5\dfrac{1}{3}\div1\dfrac{1}{3}\)
    9. \(4\dfrac{1}{2}\div1\dfrac{1}{4}\)
    10. \(\dfrac{7}{8}\div2\dfrac{1}{3}\times\dfrac{8}{9}\)

    1. \(3\)
    2. \(4\)
    3. \(\dfrac{1}{8}\)
    4. \(\dfrac{15}{16}\)
    5. \(2\)
    6. \(\dfrac{39}{7}\) or \(5\dfrac{4}{7}\)
    7. \(\dfrac{19}{4}\) or \(4\dfrac{3}{4}\)
    8. \(\dfrac{16}{13}\) or \(1\dfrac{3}{13}\)
    9. \(\dfrac{18}{5}\) or \(3\dfrac{3}{5}\)
    10. \(\dfrac{1}{3}\)

Further resources

Converting between fractions and decimals

Need help converting between fractions and decimals? Check out this resource.