Given
Total number of families = 10000
Percentage of families that buy newspaper A = 40
Percentage of families that buy newspaper B = 20
Percentage of families that buy newspaper C = 10
Percentage of families that buy newspaper A and B = 5
Percentage of families that buy newspaper B and C = 3
Percentage of families that buy newspaper A and C = 4
Percentage of families that buy all three newspapers = 2
Find out
We have to determine the number of families which buy
(i) A only,
(ii) B only,
(iii) none of A, B, and C
Solution
Number of families that buy newspaper A = n(A) = 40% of 10000 = 4000
Number of families that buy newspaper B = n(B) = 20% of 10000 = 2000
Number of families that buy newspaper C = n(C) = 10% of 10000 = 1000
Number of families that buy newspaper A and B = n(A ∩ B) = 5% of 10000 = 500
Number of families that buy newspaper B and C = n(B ∩ C) = 3% of 10000 = 300
Number of families that buy newspaper A and C = n(A ∩ C) = 4% of 10000 = 400
Number of families that buys all three newspapers = n(A ∩ B ∩ C)=v = 2% of 10000 = 200
We have, n(A ∩ B) = v + t 500 = 200 + t
t = 500 – 200 = 300
n(B ∩ C) = v + s
300 = 200 + s
s = 300 – 200 = 100
n(A ∩ C) = v + u
400 = 200 + u
u = 400 – 200 = 200
p = Number of families that buy newspaper A only
We have, A = p + t + v + u
4000 = p + 300 + 200 + 200 p = 4000 – 700
p = 3300
Therefore, Number of families that buy newspaper A only = 3300
(ii) Number of families that buy newspaper B only q = Number of families that buy newspaper B only B = q + s + v + t 2000 = q + 100 + 200 + 300 q = 2000 – 600 =1400 Therefore, Number of families that buy newspaper B only = 1400
(iii) Number of families that buys none of the newspaper
Number of families that buy none of the newspaper = 10000 – {n(A) + n(B) + n(C) – n(A ∩ B) – n(B ∩ C) – n(A ∩ C) + n(A ∩ B ∩ C)}
= 10000 – (4000 + 2000 + 1000 – 500 – 300 – 400 + 200)
= 10000 – 6000
= 4000
Therefore, Number of families that buy none of the newspaper = 4000