ISRO-2018

Question 5

( G, *) is an abelian group. Then

A	x = x^-1, for any x belonging to G
B	x = x², for any x belonging to G
C	(x * y )² = x² * y², for any x, y belonging to G
D	G is of finite order

Engineering-MathematicsSet-TheoryVideo-Explanation

Question 5 Explanation:

An abelian group is a commutative group. As per the above options, option C is the correct answer because it follows commutative property.
(x * y )² = x² * y², for any x, y belonging to G

Correct Answer: C

Question 5 Explanation:

An abelian group is a commutative group. As per the above options, option C is the correct answer because it follows commutative property.
(x * y )² = x² * y², for any x, y belonging to G

Question 11117 – Operating-Systems

ISRO-2018

Question 11117 – Operating-Systems

ISRO-2018

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