Let* be a binary operation on R - (-1) defined by a*b= `(a)/(b+1)` for all a, b `in` R-{-1} is

Let be a binary operation defined by a*b = 7a+9b. Find 3*4.

Let * is a binary operation on N given by a **b=LCM (a, b) for all a, b in N . Find 5**7 .

Let * be a binary operation on N given by a**b=LCM(a, b) for all a, b in N . (i) Is * commutative. (ii) Is * associative.

Let * is a binary operation defined by a * b = 3a + 4b - 2 , find 4*5 .

Let the binary operation on Q defined as a * b = 2a + b - ab , find 3*4 .

Let A=N cup {0} xx N cup {0} and Let * be a binary operation on a defined by (a, b) **(c, d)=(a+c, b+d) for (a, b), (c, d) in N. Show that. (i) B commutative as A (ii) * is associative on A

Let S =Q xx Q and let * be a binary operation on S defined by (a, b)* (c,d) = (ac, b+ad) for (a, b), (c,d) in S. Find the identity element in S and the invertible elements of S.

Find the idenity and inverse if any for the binary operation ** on Q-{0} defined by a**b=(ab)/4, a, b in Q-{0}

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.