Median

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In order to access this I need to be confident with:

Negative numbers Arithmetic Decimals Fractions Rounding

This topic is relevant for:

GCSE Maths Statistics Mean Median Mode

Median

Here we will learn about the median, including what the median is and how to find it.

There are also median worksheets based on Edexcel, AQA and OCR exam questions, along with further guidance on where to go next if you’re still stuck.

What is the median?

The median is a type of average found by arranging the values in numerical order, from the smallest value to the highest value and finding the middle value.

E.g. Find the median

The median is $10$

When there is an odd number of values, finding the middle value can be relatively straightforward.

We can use a formula to help us find the position of the median:

\text{median}=(\frac{n+1}{2})^\text{th} \ \text{value}

Where $n$ is the number of values. So when $n=5$ , the median is the $3$ ^rd value.

\text{position of the median} = \text{median}=(\frac{n+1}{2})^\text{th} \ \text{value}=(\frac{5+1}{2})^\text{th}=3^\text{rd} \ \text{value}

However when there is an even number of values, we get a middle pair. Here, to find the median we need to find the midpoint of the middle pair of values. We can do this by sight or by finding the mean of the two middle numbers. We can add them together and then half the total.

E.g. Find the median

The middle pair of values is $8$ and $10$ . The midpoint of $8$ and $10$ is $9$ .

We find this by adding the two values together and dividing by $2$ .

\frac{8+10}{2}=\frac{18}{2}=9

The median is $9$

We can use a formula to help us find the position of the median:

\text{median}=(\frac{n+1}{2})^\text{th} \ \text{value}

Where $n$ is the number of values. So when $n=6$ , the median is the $3.5$ ^th value, so the midpoint of the $3$ ^rd and $4$ ^th values.

\text{position of the median} = \text{median}=(\frac{n+1}{2})^\text{th} \ \text{value}=(\frac{6+1}{2})^\text{th}=3.5^\text{rd} \ \text{value}

The median is a measure of central tendency because it describes a set of numbers by identifying a central position within the data.

What is the median?

How to find the median

In order to find the median:

Order the list of numbers.
Find the middle number.
Write down the median.

How to find the median

Mean, median, mode and range worksheet

Get your free median maths worksheet of 20+ mean, median, mode and range questions and answers. Includes reasoning and applied questions.

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Mean, median, mode and range worksheet

Get your free median maths worksheet of 20+ mean, median, mode and range questions and answers. Includes reasoning and applied questions.

DOWNLOAD FREE

Related lessons on mean, median, mode

Median is part of our series of lessons to support revision on mean, median, mode. You may find it helpful to start with the main mean, median, mode 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:

Median maths examples

Example 1: odd number of values

Find the median of this set of data:

Order the list of numbers.

The list of numbers is not in order, so we need to put the numbers in order from smallest number to largest number.

2Find the middle number.

To find the middle number we can count in from the bottom and the top of the list.

3Write down the median.

The median value is $11$

Alternatively there is a formula you can use to find the position of the median.

\text{median}=(\frac{n+1}{2})^\text{th} \ \text{value}

Where $n$ is the number of values. So when $n=5$ , the median is the $3$ ^rd value.

\text{median}=(\frac{n+1}{2})^\text{th} \ \text{value}=(\frac{5+1}{2})^\text{th}=3^\text{rd} \ \text{value}

The median is $11$

Example 2: odd number of values

Find the median of the following data:

Order the list of numbers.

The list of numbers is not in order, so we need to put the numbers in order from smallest to largest value.

Find the middle number.

To find the middle number we can count in from the bottom and the top of the list.

Write down the median.

The median is $10$

Alternatively there is a formula you can use to find the position of the median.

\text{median}=(\frac{n+1}{2})^\text{th} \ \text{value}

Where $n$ is the number of values. So when $n=7$ , the median is the $4$ ^th value.

\text{position of the median} = \text{median}=(\frac{n+1}{2})^\text{th} \ \text{value}=(\frac{7+1}{2})^\text{th}=4^\text{th} \ \text{value}

The median is $10$

Example 3: odd number of values

Find the median:

Order the list of numbers.

The list of numbers is not in order, so we need to put the numbers in order from smallest to largest value.

Find the middle number.

To find the middle number we can count in from the bottom and the top of the list.

Write down the median.

The median is $9$

Alternatively there is a formula you can use to find the position of the median.

\text{median}=(\frac{n+1}{2})^\text{th} \ \text{value}

Where $n$ is the number of values. So when $n=9$ , the median is the $5$ ^th value.

\text {position of the median} = \text{median}=(\frac{n+1}{2})^\text{th} \ \text{value}=(\frac{9+1}{2})^\text{th}=5^\text{th} \ \text{value}

The median is $9$

Example 4: even number of values

Find the median:

Order the list of numbers.

The list of numbers is not in order, so we need to put the numbers in order from smallest to largest value.

Find the middle number.

To find the middle number we can count in from the bottom and the top of the list.

Since there is an even number of values we have a middle pair. We need to find the mean of this middle pair.

\frac{4+6}{2}=\frac{10}{2}=5

Write down the median.

The median is $5$

Alternatively there is a formula you can use to find the position of the median.

\text{median}=(\frac{n+1}{2})^\text{th} \ \text{value}

Where $n$ is the number of values. So when $n=6$ , the median is the $3.5$ ^th value. This would be the average of the $3$ ^rd and $4$ ^th values.

\text {position of the median} = \text{median}=(\frac{n+1}{2})^\text{th} \ \text{value}=(\frac{6+1}{2})^\text{th}=3.5^\text{th} \ \text{value}

Example 5: even number of values

Find the median:

Order the list of numbers.

The list of numbers is not in order, so we need to put the numbers in order from smallest to largest value.

Find the middle number.

To find the middle number we can count in from the bottom and the top of the list.

Since there is an even number of values we have a middle pair. We need to find the mean of this middle pair.

\frac{16+17}{2}=\frac{33}{2}=16.5

Write down the median.

The median is $16.5$

Alternatively there is a formula you can use to find the position of the median.

\text{median}=(\frac{n+1}{2})^\text{th} \ \text{value}

Where $n$ is the number of values. So when $n=8$ , the median is the $4.5$ ^th value. This would be the average of the $4$ ^th and $5$ ^th values.

\text{position of the median} = \text{median}=(\frac{n+1}{2})^\text{th} \ \text{value}=(\frac{8+1}{2})^\text{th}=4.5^\text{th} \ \text{value}

The median is $16.5$

Example 6: even number of values

Find the median:

Order the list of numbers.

The list of numbers is not in order, so we need to put the numbers in order from smallest to largest value.

Find the middle number.

To find the middle number we can count in from the bottom and the top of the list.

Since there is an even number of values we have a middle pair. We need to find the mean of this middle pair.

\frac{8+11}{2}=\frac{19}{2}=9.5

Write down the median.

The median is $9.5$

Alternatively there is a formula you can use to find the position of the median.

\text{median}=(\frac{n+1}{2})^\text{th} \ \text{value}

Where $n$ is the number of values. So when $n=10$ , the median is the $5.5$ ^th value. This would be the average of the $5$ ^th and $6$ ^th values.

\text{position of the median} = \text{median}=(\frac{n+1}{2})^\text{th} \ \text{value}=(\frac{10+1}{2})^\text{th}=5.5^\text{th} \ \text{value}

The median is $9.5$

Common misconceptions

Check which average you are being asked for

Check if you have been asked for the median, mode or mean average.

Numbers in ascending order

Check that the list of numbers is in numerical order before finding the median number.

The median can be a number that is not in the original data set

When there is an odd number of values, the median is one of the original values.

When there is an even number of values, it is acceptable that the median is NOT one of the original values.

Practice median maths questions

13

14.5

15

14

Put the numbers in order from the smallest to largest value. Then find the middle value.

The middle value is $15$ , so this is the median.

17

14

11

15

Put the numbers in order from the smallest to largest value. Then find the middle value.

The middle value is $14$ , so this is the median.

13

17

15

18

Put the numbers in order from the smallest to largest value. Then find the middle value.

The middle value is $18$ , so this is the median.

20

23

21.5

21

Put the numbers in order from the smallest to largest value. Then find the middle value.

The middle pairs of values are $20$ and $23$ . The mean of these is $21.5$ . The median is $21.5$ .

\frac{20+23}{2}=\frac{43}{2}=21.5

11

15

9.5

14

Put the numbers in order from the smallest to largest value. Then find the middle value.

The middle pairs of values are $13$ and $15$ . The mean of these is $14$ . The median is $14$ .

\frac{13+15}{2}=\frac{28}{2}=14

15.5

19.5

18

13

Put the numbers in order from the smallest to largest value. Then find the middle value.

The middle pairs of values are $13$ and $18$ . The mean of these is $14$ . The median is $15.5$ .

\frac{13+18}{2}=\frac{31}{2}=15.5

Median maths GCSE questions

1. Here is a list of numbers.

4 8 3 12 6

Work out the median.

(1 mark)

Show answer

$6$
For the correct answer only

(1)

2. Here is a list of numbers.

23 17 11 21 19 18 13

Work out the median.

(2 marks)

Show answer

$11 13 17 18 19 21 23$
For putting the numbers in order

(1)

$18$
For the correct answer only

(1)

3. These are the heights, in metres, of members of a water polo team.

1.71 1.78 1.67 1.72 1.83 1.79 1.76

Find the median height of the $7$ players.

(2 marks)

Show answer

$1.67 1.71 1.72 1.76 1.78 1.79 1.83$
For putting the numbers in order

(1)

$1.76$
For the correct answer only

(1)

Learning checklist

You have now learned how to:

Find the median when there is an odd number of values

Find the median when there is an even number of values

The next lessons are

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Introduction

What is the median?

How to find the median

Median maths worksheet

Median maths examples

↓

Example 1: odd number of values Example 2: odd number of values Example 3: odd number of values Example 4: even number of values Example 5: even number of values Example 6: even number of values

Common misconceptions

Practice median maths questions

Median maths GCSE questions

Learning checklist

Next lessons

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