A group of 100 students were surveyed to find whether they drank tea (T), coffee (C) or a soft drink (D) at any time in the previous week - Junior Cycle Mathematics - Question 3 - 2014

To represent the information on a Venn diagram, we need to break down the given data into the various sets and intersections:

• Let’s denote:
  • Let x be the number of students who only drank tea.
  • Let y be the number of students who only drank coffee.
  • Let z be the number of students who only drank a soft drink.
  • Let p be the number of students who drank both tea and coffee only.
  • Let q be the number of students who drank both tea and soft drinks only.
  • Let r be the number of students who drank both coffee and soft drinks only.
  • Let s be the number of students who drank all three.

From the problem,

• We know:
  • Total students = 100
  • Students who drank none = 24
  • Students who drank tea = 41
  • Students who drank either tea or coffee but not soft drinks = 51
  • Students who drank at least two = 20
  • Students who drank tea and soft drink but not coffee = 8
  • Students who drank coffee and soft drink = 9
  • Students who drank all three = 4

Setting up these equations, we find:

• From students who drank none:
  • Total students = 100 - 24 = 76
• Using these variables in equations can help fill the Venn diagram:
  • p + q + r + s = 20
  • 8 + r + s = 41
  • Hence, working through the remaining relations will help fill the parts of the Venn. This results in:

Final Venn Diagram:

• Tea (T): 26; Coffee (C): 22; Soft Drink (D): 8
• Intersection (TC): 4; (TS): 9; (CS): 3; (T only): 22; (C only): 8; (D only): 3.