Syllabus Edition

First teaching 2023

First exams 2025

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Working with Statistical Diagrams (CIE IGCSE Maths: Extended)

Revision Note

Reading & Interpreting Statistical Diagrams

How do I read and interpret statistical diagrams?

  • Rather than present you with a list of values (raw data), questions may present information using a statistical diagram
    • Such diagrams may or may not be the ones that are already familiar
    • Unfamiliar diagrams will be reasonably straightforward to read and interpret
      • you won't need any new skills for such diagrams
  • Reading and interpreting statistical diagrams requires gathering any required information from a diagram
    • this enables meaningful statistics like the mean, median, mode, range and interquartile range to be calculated
    • from these, conclusions about the data can be made
  • Important things to look for in diagrams include
    • a key, and/or shading, that indicate what certain parts of the diagram mean
      • e.g. a (dual) bar-chart may show boys data in solid shading and girls data in striped shading
    • information given through the labels on the axes
    • key words on diagrams such as frequency
    • anything unusual or unexpected mentioned in words, whether they come before or after a diagram
    • anomalies (outliers)

Worked example

The dual line bar chart below shows the number of books loaned from a library by male and female adults each day for a week.

cie-igcse-4-5-3-dual-bar-line-chart

a)

Work out the mean number of books loaned per day by males during this particular week.

We need the number of books from the males (red line) for each of the five days and then find their mean.

Mean space equals space fraction numerator 10 plus 12 plus 12 plus 15 plus 15 over denominator 5 end fraction equals 64 over 5 equals 12.8

Mean number of books loaned per day by males is 12.8

b)

Work out the median number of books loaned by women per day by females during this particular week.

We need the number of books from the females (blue line) for each of the five days.

12, 15, 12, 16, 12

To find the median, these will need to be put into ascending order, then the middle value found.

12, 12, circle enclose 12, 15, 16

The median number of books loaned per day by females is 12

c)

Determine whether the males or females had the greater range of books loaned per day during this particular week.

Using the lists/values from the parts a) and b) ...

table row cell Male space range space end cell equals cell space 15 space minus space 10 space equals space 5 end cell row cell Female space range end cell equals cell 16 minus 12 equals 4 end cell end table

The males had the greater range of books loaned per day
(5 compared to 4 so their range was 1 book higher)

Comparing Statistical Diagrams

What is meant by comparing statistical diagrams?

  • Some questions may present you with data as a diagram rather than as a list of values
  • You may then be asked to compare one diagram with another that represent different characteristics
      • e.g.  one diagram/table may be for 'dogs' data, the other for 'cats'
        • so dogs and cats data/results can be compared;
      • e.g.  one diagram/table may be taken at one point in time, the other at a later date
        • this would allow comparisons that may reveal a change (improvement) over time
  • When data is presented as a diagram, it may be an unfamiliar diagram that you have not seen elsewhere on the course
    • in such cases the diagram will be explained in the question or through a key
    • such diagrams tend to be straightforward and fairly easy to interpret and read

How do I compare statistical diagrams?

  • By commenting on differences or similarities using some of the following
    • averages - mean, median and mode
    • spread - range and interquartile range
    • unusual data values (anomalies or outliers)
  • You should aim to make at least two pairs of comments when asked to compare data
    • The first pair of comments should use an average - mean or median, rather than mode
      • a comparison of an average mentioning the numbers involved
        e.g.  class A's median of 11 was higher than class B's median of 6
      • what that comparison means in the context of the question
        e.g.  on average class A scored higher marks on the test than class B
    • The second pair of comments should use a measure of spread - range or interquartile range
      • a comparison of a measure of spread mentioning the numbers involved
        e.g.  class A's interquartile range of 5 was higher than class B's interquartile range of 3
      • what that comparison means in the context of the question
        e.g.  the test scores in class A showed more variation than the scores in class B
  • The mode can be mentioned if appropriate - for example with non-numerical data
    • the mode is a relatively simple average so there are not always many marks available for using it
  • Before doing any comparisons of data or diagrams you may have to calculate averages and spread
  • You may also be asked to suggest assumptions, or problems with the data that could affect the reliability of results and comparisons
    • e.g.  do we assume that the test class A and class B took were the same?
    • e.g.  were class A and class B of similar ability/age?
    • It may be we cannot tell from the information given in the question
      • but they are considerations that would influence how valid comparisons are

Examiner Tip

  • When asked to compare data or diagrams consider how many marks are available
    • aim to write something different for each mark
      • 1 mark is often be for comparing the numbers involved
      • 1 mark is often for explaining what that then means in the context of the question

Worked example

Casey is a member of Sam’s research group.  She believes that the masses of male and female gentoo penguins follow different distributions.  The cumulative frequency graphs below show the masses of the male and female gentoo penguins in the sample.

q3-hard-2-3-working-with-data-edexcel-a-level-maths-statistics

By calculating the median and interquartile range, compare the two distributions.

The total frequency for each group is 100. So draw horizontal lines from 25, 50 and 75 to estimate the lower quartile, median and upper quartile.

comparing-distributions-cie-2025

  Median LQ UQ IQR
Male 6.6 6.05 7.2 1.15
Female 6.2 5.6 6.75 1.15

The interquartile ranges are the same (1.15 kg) so the middle 50% of the male and female populations are spread out to a similar extent.

However, the median for the male penguins (6.6 kg) is higher than for the female penguins (6.2 kg) so on average the males have a greater mass.

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Paul

Author: Paul

Expertise: Maths

Paul has taught mathematics for 20 years and has been an examiner for Edexcel for over a decade. GCSE, A level, pure, mechanics, statistics, discrete – if it’s in a Maths exam, Paul will know about it. Paul is a passionate fan of clear and colourful notes with fascinating diagrams – one of the many reasons he is excited to be a member of the SME team.