Question
In a survey of 200 students from 7 different schools, 50 people do not play NFS, 40 people do not play Dota and 10 people play no online game. Then find the no. of people out of 200 people who do not play both the games provided these are the only two games on offer.
In a survey of 200 students from 7 different schools, 50 people do not play NFS, 40 people do not play Dota and 10 people play no online game. Then find the no. of people out of 200 people who do not play both the games provided these are the only two games on offer.
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Solution
The correct option is A 80
Let the no. of people who do not play NFS be n(Nc) = 50 (Given)
Similarly no. of people who do not play Dota be n(Dc) = 40 (Given)
And the no. of people who do not play any game n(Nc ∩ Dc) = 10 (Given)
We have to find the no. of people who do not play both the games =n(N∩D)c
From De Morgan's Law, we can say
(A∩ B)c = Ac ∪ Bc
∴n(N∩D)c=n(Nc∪Dc)=n(Nc)+n(Dc)−n(Nc∩Dc)=50+40−10=80
80
Let the no. of people who do not play NFS be n(Nc) = 50 (Given)
Similarly no. of people who do not play Dota be n(Dc) = 40 (Given)
And the no. of people who do not play any game n(Nc ∩ Dc) = 10 (Given)
We have to find the no. of people who do not play both the games =n(N∩D)c
From De Morgan's Law, we can say
(A∩ B)c = Ac ∪ Bc
∴n(N∩D)c=n(Nc∪Dc)=n(Nc)+n(Dc)−n(Nc∩Dc)=50+40−10=80
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