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

Subtraction of integers is commutative but not associative commutative and associative associative but not commutative (d) neither commutative nor 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=ab+1. Then,* is commutative but not associative associative but not commutative neither commutative nor associative (d) both commutative and associative

If ** be binary operation defined on R by a**b = 1 + ab, AA a,b in R . Then the operation ** is (i) Commutative but not associative. (ii) Associative but not commutative . (iii) Neither commutative nor associative . (iv) 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

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

Vector addition is commutative and associative explain.

On the power set P of a non-empty set A, we define an operation * by X * Y=( X^-nn Y) uu (X nn Y^- ) Then which are the following statements is true about 1) commutative and associative without an identity 2)commutative but not associative without an identity 3)associative but not commutative without an identity 4) commutative and associative with an identity