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

Matrix addition is associative as well as commutative.

Prove that binary operation on set R defined as a**b = a +2b does not obey associative rule.

On R - {-1}, a binary operation ** defined by a"*"b = a + b +ab then find a^(-1) .

Let R be the relation on the set N given by R= { (a, b): a= b-2, b gt 6} . Choose the correct answer.

A binary operation ** be defined on the set R by a**b = a+b +ab . Show that ** is commutative, and it is also 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.

** be a binary operation on R defined by a"*"b = (a)/(4)+b/(7) , a,b inR . Show that ** is not commutative and associative.

Let ** be the binary operation on Q define a**b = a + ab . Is ** commutative ? Is ** associative ?