35% of 60 students of a class likes to play football. How many students does not like to play football?
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Answers
Answer:
It is given that out of 60 students, 5 students play none of the sports so the no of students playing atleast one game (cricket or football) is 60–5=55.
Using the Venn diagrams, it can be said that
n(A∪B) =n(A) +n(B) - n(A∩B)
where ,
n(A) is the number of students playing cricket =45
n(B) is the number of students playing football =30
n(A∪B) is the number of students playing atleast cricket or football = 55 (as said above)
n(A∩B) is number of students playing both cricket and football which we should find out . So using above formula
55=45+30-n(A∩B),
n(A∩B)=45+30–55=20.
So the number of students playing both cricket and football is 20
Answer:
39 students don't like to play football
Step-by-step explanation:
because , 60/100 - 35 = 39 ok
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