A binary operation * is defined on the set
`X=R-{-1}` by `x**y=x+y +xy, AA x, y in X`.
Check whether * is commutative and associative. Find its identity element and also find the inverse of each element of X.

Let A=R xx R 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.

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

Discuss the commutativity and associativity of binary operation .*. defined on A = Q - {1} by the rule a**b=a-b+ab for all a, b in A . Also, find the identity element of * in A and hence find the invertible elements of A.

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, if it exists.

Let * be the binary operation on N given by a*b = LCM of a and b. Find (i) 5*7,20*16 (ii) Is* commutative? (iii) Is * associative? (iv) Find the identity of* in N. (v) Which elements of N are invertible for the operation ?

Check whether the relation R defined on the set A = {1,2,3,4,5,6} as R = {(x,y):y is divisible by x} is reflexive, symmetric and transitive.

Constract the composition table/multiplication table for the binary operation * defined on {0,1,2,3,4}by a**b =axxb ("mod" =5) . Find the identity element if any. Also find the inverse elements of 2 and 4.

Find the identity elements if any for the binary operations defined by a**b=a+b+1,a,b inZ .