Let some elements of A×B are (1,3), (2,4) and n (A×B) = 13. Is this possible. Why?Explain.
Answers
Answer:
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Step-by-step explanation:
Given, A = {1,2} and B = {3,4}.
Number of elements in set A = n(A)=2
Number of elements in set B = n(B)=2
Number of relations from A to B = 2
n(A)×n(B)
=2
2×2
=2
4
=16
SOLUTION :-
GIVEN :-
Let some elements of A×B are (1,3),(2,4) and n(A×B)=13
TO CHECK
IS this possible?Why?
CONCEPT TO BE IMPLEMENTED
Let A & B are two non empty sets then their cartesian product is denoted by A × B and defined as
A × B = { (a, b) : a ∈ A & b ∈ B }
EVALUATION
Here it is given that some elements of A × B are (1,3),(2,4)
So two of all elements of A are 1 , 2
Similarly two of all elements of B are 3 , 4
So the minimum number of elements of both sets A & B are 2
Again it is given that n(A×B)=13
∴ n(A) × n(B) = 13
Since 13 is prime
So either n(A) = 1 & n(B) = 13 or n(A) = 13 & n(B) = 1
Which contradicts that the minimum number of elements of both sets A & B are 2
Hence the given statement is impossible
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