On `Q` , the set of all rational numbers a binary operation * is defined by `a*b=(a+b)/2` . Show that * is not associative on `Qdot`

Let * be a binary operation on Zdefined by a*b=a+b- 15 for a,binZ .Show that *is associative

Let * be a binary operation on Zdefined by a*b=a+b- 15 for a,binZ . Show that *is commutative

On the set Q^+ of all positive rational numbers if the binary operation * is defined by a * b = 1/4ab for all a,b in Q^+ find the identity element in Q^+ .

Show that the binary operation ** defined on RR by a**b=ab+2 is commutative but not associative.

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

On the set QQ^(+) of all positive rational numbers if the binary operation ** is defined by a**b=(1)/(4)ab for all a,binQQ^(+) , find the identity element in QQ^(+) . Also prove that any element in QQ^(+) is invertible.

Number of binary opertions on the set {a,b} are

QQ^(+) denote the set of all positive raional numbers. If the binary operation @ on QQ^(+) is defined as a@b=(ab)/(2) , then the inverse of 3 is---

Let A = N xx N and ** be the binary opertion on A defined by (a,b) ** (c,d) = (a + c, b+d) Show that ** is commutative and associative.

A binary operation ** on QQ the set of all rational numbers is defined as a**b=(1)/(2)ab for all a,binQQ . Prove that ** is commutative as well as associative on QQ .