Let A, B and C be three sets A B = A C and A B = A C, show that B = C
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Step-by-step explanation:
IF A/B = A/C
THEN WE CAN WRITE
A/B × C/A = 0
THEREFORE BY CUTTING OUT 'A',
WE GET THAT,
1/B = 1/C
THUS THEIR RECIPROCAL IS
B= C ( PROVED )
Answered by
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Answer:
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Step-by-step explanation:
Step-1:Prove using suitable formula of sets.
It is given that,
A∪B = A∪C …(1)
A∩B = A∩C…(2)
Taking ’∩ C’ on both sides in equation (1)
(A∪B)∩C = (A∪C)∩C
We know that,
(A∪B)∩C = (A∩C)∪(B∩C) and (A∪C)∩C = C
So,
(A∩C)∪(B∩C)=C
(A∩B)∪(B∩C)=C…(3)[From(2))
Again,
Taking ’∩ B’ on both side in equation (1)
(A∪B)∩B = (A∪C)∩B
B = (A∩B)∪(C∩B)
B = (A∩B)∪(B∩C)
B = C[From (3)]
Hence, proved.
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