Venn Diagrams (AQA AS Maths: Statistics)

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Venn Diagrams

What is a Venn diagram?

  • A Venn diagram is a way to illustrate events from an experiment and are particularly useful when there is an overlap (or lack of) between possible outcomes
  • A Venn diagram consists of
    • a rectangle representing the sample space
    • a bubble (usually drawn as a circle/ellipse/oval) for each event
      • Bubbles may or may not overlap depending on which outcomes are shared between events
      • Bubble(s) is not a technical term but we like it!

How are Venn diagrams labelled and what do the numbers inside mean?

  • The rectangle is usually labelled with an S – as it represents the sample space (all possible outcomes from the experiment)
    • It is often referred to as the Universal Set and is commonly labelled with S comma space U comma space xi (the Greek lower case letter Xi) or calligraphic E(Kunstler script font)
      There is no standardised symbol used for this purpose
  • Bubbles are labelled with their event name (A, B, etc)
  • The numbers inside a Venn diagram (there should be one in each region) will represent either a frequency or a probability
    • In the case of probabilities being shown, all values should total 1

3-1-2-fig1-basic-venn

What do the different regions and bubbles overlapping mean on a Venn diagram?

  • This will depend on how many events there are and how the outcomes overlap
  • Venn diagrams show ‘AND’ and ‘OR’ statements easily
  • Venn diagrams also instantly show mutually exclusive events
    • Independence can be deduced from the probabilities involved

3-1-2-fig2-various-venns-part-1

3-1-2-fig2-various-venns-part-2

How do I solve probability problems involving Venn diagrams?

  • Draw, or add to a given Venn diagram, filling in as many values as possible from the information provided in the question
  • It is usually helpful to work from the centre outwards
    • i.e. fill in intersections (overlaps) first
    • This is particularly crucial with Venn diagrams with three events
      • the intersection of events A and B  will include the intersection of events A, B  and C
      • a question would make it clear if a given frequency or probability is only for events A and B , and not C
  • Any frequencies or probabilities not given may be able to be calculated from those that are
    • Use the results from Basic Probability to deduce missing frequencies or probabilities and answer questions
        • straight P left parenthesis not space A right parenthesis equals 1 minus P italic left parenthesis A italic right parenthesis
        • For independent events, straight P left parenthesis A space and space B right parenthesis equals straight P left parenthesis A right parenthesis cross times straight P left parenthesis B right parenthesis
        • For mutually exclusive events, straight P left parenthesis A space or space B right parenthesis equals straight P left parenthesis A right parenthesis plus straight P left parenthesis B right parenthesis
  • Check a completed Venn diagram that the frequencies sum to the total involved or that probabilities sum to 1

Worked example

40 people were surveyed regarding which games consoles they owned.

8 people said they owned a Playstation 5 (P ) and an Xbox Series X (X ); 11 people said they owned a Playstation 5 (P) and a Nintendo Switch (N); 7 people said they owned an Xbox Series X (X) and a Nintendo Switch (N).

4 people said they owned none of these consoles whilst 2 people said they owned all 3.

Of those people that owned only one games console, twice as many owned a Nintendo Switch as a Playstation 5 and half as many owned an Xbox Series X as a Playstation 5.

(a)
Draw a complete Venn diagram to illustrate the information given above.

 

(b)
One of the 40 people is chosen at random. Find the probability that this person

 

(i)
owns all three consoles,
(ii)
owns exactly two consoles,
(iii)
doesn’t own a Playstation 5.

 

(c)
Determine if the events X and N are independent.
(a)
Draw a complete Venn diagram to illustrate the information given above.

3-1-2-fig3-we-solution-part-1

(b)
One of the 40 people is chosen at random. Find the probability that this person

 

(i)
owns all three consoles,
(ii)
owns exactly two consoles,
(iii)
doesn’t own a Playstation 5.

 3-1-2-fig3-we-solution-part-2

(c)
Determine if the events X and N are independent.
3-1-2-fig3-we-solution-part-3

Examiner Tip

  • Always draw the box in a Venn diagram; it represents all possible outcomes of the experiment so is a crucial part of the diagram, the bubbles merely represent the events we are particularly interested in
  • In complicated problems it can be helpful to draw a “mini-Venn” diagram for part of a question and shade/label the regions of the diagram that are relevant to that part

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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.