Determine whether * on `N` defined by `a*b=a^b` for all `a ,\ b in N` define a binary operation on the given set or not:

Prove that the operation ** on ZZ defined by a**b=a|b| for all a,binZZ is a binary operation

Examine whether the operation @ on ZZ^(+) defined by a@b=|a-b| for all a,binZZ^(+) , is a binary operation on ZZ^(+) or not.

An operation ** on ZZ , the set of integers, is defined as, a**b=a-b+ab for all a,binZZ . Prove that ** is a binary operation on ZZ which is neither commutative nor associative.

Define a commutative binary operation no a non-empty set A.

Define an associative binary operation on a non-empty set S.

Prove that the operation * an Z defined by a*b = a|b| for all a,b in Z is closed under*.

Show that the operation ** on ZZ , the set of integers, defined by. a**b=a+b-2 for all a,b inZZ (i) is a binary operation: (ii) satisfies commutaitve and associative laws: (iii) Find the identity elemetn in ZZ , (iv) Also find the inverse of an element ainZZ.

The binary operation * define on N by a*b = a+b+ab for all a,binN is

let ** be a binary on QQ , defined by a**b=(a-b)^(2) for all a,binQQ . Show that the binary operation ** on QQ is commutative but not associative.