A binary operation on a set has always the identity element.

Show that the number of binary operations on {1, 2} having 1 as identity and having 2 as the inverse. of 2 is exactly one.

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

Determine which of the following binary operations on the set R are associative and which are commutative : a^(**)b=((a+b))/2,AAa,binR

Prove that binary operation on set R defined as a**b = a +2b does not obey associative rule.

Determine which of the following binary operations on the set R are associative and which are commutative : a^(**) b = 1, AA a, b in R

Show that zero is the identity for addition on R and 1 is the identity for multiplication on R. But there is no identity element for the operations - : R xx R rarr R and divid R^(*) xxR^(*) rarr R.

L A = NxxN 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.

Given a non - empty set, X , consider the binary operation ** : P(X) xxP(X) rarr P(X) given by A **B = Acap B , AAA,B in P(X) , where P(X) is the power set X. Show that X is the identity element for this operation and X is the only invertible element in P(X) with respect to the operation ** .

** is a binary operation on the set Q. a"*"b = (2a+b)/4 then find 2"*"3 .