On Q define * by `a ** b = (ab)/3`. Show that * is associative.

On Q, define * by a ** b = (2ab)/3 . Show that * is both cummutative and associative.

On Q, define * by a ** b = (ab)/4 . Show that * is both commutative and associative.

Let * be a binary operation on the set R defined by a ** b = (a + b)/2 . Show that * is commulative but not associative.

On Z defined * by a ** b = a -b show that * is a binary operation of Z.

Let * be a Binary operation defined on N by a ** b = 2^(ab) . Prove that * is commutative.

On Q defined * by a ** b = ab + 1 show that * commutative.

Show that the binary operation * defined on R by a ** b = (a + b)/2 is not associative by giving a counter example.

Let * be a binary operation on N defined by a ** b = HCF of a and b. Show that * is both commutative and associative.

A binary operation * on N defined as a ** b = a^(3) + b^(3) , show that * is commutative but not associative.

Let A = N xx N and ** be the binary operation on A defined by (a,b) ** (c,d) = (a + c, b+d) Show that ** is commutative and associative. Find the identity element for ** on A, if any.