Consider a binary operation `*` on N defined as `a" "*" "b" "=a^3+b^3` . Choose the correct answer. (A) Is `*` both associative and commutative? (B) Is `*` commutative but not associative? (C) Is `*` associative but not commutative? (D) Is

Consider a binary operation. on N defined a ** b = a^3 + b^3. Choose the correct answer. (A) Is ** both associative and commutative? (B) Is ** commutative but not associative? (C) Is ** associative but not commutative? (D) Is ** neither commutative nor associative?

Commutative and associative

Matrix addition is associative as well as commutative.

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

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

Show that the binary operation * on Z defined by a*b=3a+7b is not commutative.

A binary operation * on Z defined by a*b=3a+b for all a,b in Z, is (a) commutative (b) associative (c) not commutative (d) commutative and associative

Let * be a binary operation on N, the set of natural numbers, defined by a*b= a^b for all a , b in Ndot Is '*' associative or commutative on N ?