Venn Diagram : Pictorial representation of sets by means of diagrams is termed as Venn Diagrams.
Elements of Sets : The objects in a set are termed as elements or members of sets.
Let A and B are two sets, such that
A= { 1, 2, 3, 4, 5, 6, 7, 8, 9, 10 }
B= { 2, 4, 6, 8, 10, 12, 14, 16, 18, 20 }
For this Venn Diagram representation will be :
Where,
A - B = This set has elments which are only in A
B - A = This set has elments which are only in B
A ∩ B is set which has comman elements both from A and B
Also number of elements in A ∪ B is same as number of elements in B ∪ A
So, n(A ∪ B) = n(B ∪ A)
Also, n(A ∩ B) = n(B ∩ A)
From Venn Diagram we can see that n(A) = n(A-B) + n(A∩B) ...........(a)
Similarly, n(B) = n(B-A) + n(B∩A) ............(b)
Also from Diagram we can write,
n(A∪B) = n(A-B) + n(A∩B) + n(B-A) .............(c)
On adding (a) and (b)
n(A) + n(B) = n(A-B) + n(B-A) + n(A∩B) + n(A∩B)
or n(A) + n(B) - n(A∩B) = n(A-B) + n(B-A) + n(A∩B) ..................(d)
From equation (c) and (d) we can write
n(A∪B) = n(A) + n(B) - n(A∩B)
Ex. Among 56 people collected in a dinner party, 24 eats non veg food but not veg food and 28 eats non-veg food.
Q(1)= Find out how how many eat veg and non veg both ?
Solution : here n(N∪V) = 56 , n(N-V) = 24 and n(N) = 28
Now n(N) = n(N-V)+ n(N ∩V)
28=24+ n(N ∩V)
So, n(N ∩V) =4 , Hence 4 people eat veg and non veg both
Q(2) Find out how many of them eat Veg but not non veg ?
Solution : We can write n(N∪V) = n(N) + n(V) - n(N∩V)
56 = 28 + n(V) - 4
n(V) = 32
Also, n(V) = n(V-N) + n(V∩N)
32 = n(V-N) + 4
n(V-N) = 28, Hence 28 people eats Veg but not non veg
Ex. In a club of 48 people, 24 plays cricket and 16 plays cricket but not hockey. Find the number of people in club who plays hockey but not cricket ?
Solution :Let C denotes the cricket and H denotes hockey, according to question,
n(C∪H)=48, n(C)=24 n(C-H)=16
Now n(C)= n(C - H) + n(C∩H)
24 = 16 + n(C∩H)
n(C∩H)= 8
Now, n(C∪H)=n(C)+n(H)-n(C∩H)
48 = 24 + n(H) - 8
n(H)=32
n(H)=n(H-C)+ n (H ∩C)
32 = n(H-C) + 8
n(H-C)= 32-8 = 24
So, people in club who plays hockey but not cricket are 24
Ex. In a society of 80 people, 42 read Times Of India and 35 read The Hindu, while 8 people don not read any of the two news papers.
Q(1) Find the number of people , who read at least one of the two news papers .
Solution : Here total number of people are 80 out of which 8 do not read any news paper, so 80 - 8 = 72 people read remaning two news papers
So, n(T∪H)=72, n(T)=42, n(H)=35
So, the number of people , who read at least one of the two news papers = n(T∪H)=72
Q(2) Find the number of people in society , who read both news papers .
Solution :n(T∪H) = n(T) + n(H) - n(T∩H)
72 = 42 + 35 - n(T∩H)
n(T∩H) = 77 - 72 = 5
So, the number of people in society , who read both news papers = 5
Ex. In a society 50 % people read Times Of India, 25 % read The Hindu. 20 % read both news papers. What % of people read neither Times Of India nor The Hindu ?
Solution : n(T)=50, n(H)=25, n(T∩H)=20
n(T∪H) = n(T) + n(H) - n(T∩H)
n(T∪H) = 50 + 25 - 20 = 55
Since 55 % people read either Times Of India or The Hindu , so remaning 100 - 55 = 45 %
So, 45 % of people read neither Times Of India nor The Hindu
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