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

Let ∗ be the binary operation on N defined by a*b=H.C.F. of a and b . Is ∗ commutative?

Let ** be binary operation on N given by a ** b = LCM of a and b. Find Is ** commutative

Let '*' be a binary operation on Q defined by a * b = (3ab)/5. Show that * is commutative as well as associative. Also, find its identity element, if it exists.

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.

Let ∗ be the binary operation on N defined by a*b=H.C.F. of a and b . Is ∗ associative?

let A = N xxN 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 identify element for * on A, if any.

Let '*' be a binary operation on Q defined by : a* b = (3ab)/5 . Show that * is commutative as well as associative. Also find its identity element, if its exists.

Let A = R xx R and * be a 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. Also find the inverse of every element (a,b) in A.

Let A = Q xx Q,Q being the set of rationals. Let '*' be a binary operation on A, defined by (a,b) * (c,d) = (ac,ad+b). Show that '*' is not commutative.