1
Question
In
a group of 65 people, 40 like cricket, 10 like both cricket and
tennis. How many like tennis only and not cricket? How many like
tennis?
In a group of 65 people, 40 like cricket, 10 like both cricket and tennis. How many like tennis only and not cricket? How many like tennis?
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Solution
Let C denote the set
of people who like cricket, and
T denote the set of
people who like tennis
∴ n(C
∪
T) = 65, n(C)
= 40, n(C
∩
T) = 10
We know that:
n(C
∪
T) = n(C)
+
n(T)
– n(C
∩
T)
∴ 65
= 40 + n(T)
– 10
⇒ 65
= 30 + n(T)
⇒ n(T)
= 65 – 30 = 35
Therefore, 35 people
like tennis.
Now,
(T
– C) ∪
(T ∩
C) = T
Also,
(T
– C) ∩
(T ∩
C) = Φ
∴ n
(T) = n
(T – C) + n
(T ∩
C)
⇒ 35
= n
(T – C) + 10
⇒ n
(T – C) = 35 – 10 = 25
Thus, 25 people like
only tennis.
Let C denote the set of people who like cricket, and
T denote the set of people who like tennis
∴ n(C ∪ T) = 65, n(C) = 40, n(C ∩ T) = 10
We know that:
n(C ∪ T) = n(C) + n(T) – n(C ∩ T)
∴ 65 = 40 + n(T) – 10
⇒ 65 = 30 + n(T)
⇒ n(T) = 65 – 30 = 35
Therefore, 35 people like tennis.
Now,
(T – C) ∪ (T ∩ C) = T
Also,
(T – C) ∩ (T ∩ C) = Φ
∴ n (T) = n (T – C) + n (T ∩ C)
⇒ 35 = n (T – C) + 10
⇒ n (T – C) = 35 – 10 = 25
Thus, 25 people like only tennis.
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