Alexoooo137idn
Answered

Get detailed and reliable answers to your questions with IDNLearn.com. Get timely and accurate answers to your questions from our dedicated community of experts who are here to help you.

From the following Venn diagram, write the elements of the set A and B and verify n(AUB) + n(A∩B) = n(A) + n(B)​

From The Following Venn Diagram Write The Elements Of The Set A And B And Verify NAUB NAB NA NB class=

Sagot :

SalmonWorldTopperidn

Step-by-step explanation:

Solution :-

From the given Venn diagram ,

A = { a,c,d,f,n }

Number of elements in the set A = 5

=> n(A) = 5

B = { a,b,d,e,g,n }

Number of elements in the set B = 56

=> n(B) = 6

AUB = { a,b,c,d,e,f,g,n}

Number of elements in the set AUB = 8

=> n(AUB) = 8

AUB = { a,d,n}

Number of elements in the set AnB = 3

=> n(AnB) = 3

Now

n(AUB)+n(AnB)

=> 8+3

=> 11

n(AUB)+n(AnB) = 11 --------------------------(1)

On taking n(A)+n(B)

=> 5+6

=> 11

n(A)+n(B) = 11 -------------------------------(2)

From (1)&(2)

n(AUB) + n(AnB) = n(A)+n(B)

Verified .

Used formulae:-

→ Fundamental Theorem on sets

n(AUB) = n(A)+n(B)- n(AnB)

→ The set of all elements in either A or in B or in both A and B is AUB.

→ The set of all common elements in both A and B is AnB.

→ The number of elements in A is denoted by n(A).

Hope this helps.

We appreciate your presence here. Keep sharing knowledge and helping others find the answers they need. This community is the perfect place to learn together. Your questions deserve accurate answers. Thank you for visiting IDNLearn.com, and see you again for more solutions.