Matrix addition is associative as well as commutative.

If * is a binary operation in N defined as a*b =a^(3)+b^(3) , then which of the following is true : (i) * is associative as well as commutative. (ii) * is commutative but not associative (iii) * is associative but not commutative (iv) * is neither associative not commutative.

Addition is commutative for

Give an example of a binary operation (i) which is commutative as well as associative. (ii) which is neither commutative nor associative.

Subtraction of integers is commutative but not associative commutative and associative associative but not commutative (d) neither commutative nor associative

On Z an operation * is defined by a*b=a^(2)+b^(2) for all a,b in Z .The operation* on Z is commutative and associative associative but not commutative (c) not associative (d) not a binary operation

Both addition and multiplication of numbers are operations which are neither commutative nor associative associative but not commutative commutative but not associative commutative and associative

Let ^(*) be a binary operation on R defined by a*b=ab+1. Then,* is commutative but not associative associative but not commutative neither commutative nor associative (d) both commutative and associative

Let * be a binary operation on R defined by a*b=a b+1 . Then, * is commutative but not associative associative but not commutative neither commutative nor associative (d) both commutative and associative

Let * be a binary operation on R defined by a*b= a b+1 . Then, * is (a)commutative but not associative (b)associative but not commutative (c)neither commutative nor associative (d) both commutative and associative