Let `RR` be the set of real numbers. Show that the operation `**` defined on `RR-{0]` by `a**b=|ab|,a,binRR-{0}` is a binary operation on `RR-{0}.`

Show that the operation ** defined on RR-{0} by a**b=|ab| is a binary operation. Show also that ** is commutative and associative.

Let M_(2)={:[(x,0),(0,y)]:},x,yinRR-{0} be the set of 2xx2 matrices, prove that the operation ** defined on M_(2) by A**B=AB,A,BinM_(2) is a binary operation.

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

Prove that the operation ^^ on RR defined by x^^y= min. of x and y for all x,yinRR is a binary operation on RR .

An operation ** is defined on the set of real numbers RR by a**b=ab+5 for all a,binRR . Is ** a binary operation on RR ?.

Show that an operation ** on RR , the set of real numbers, defined by a**b=3ab+sqrt2, for all a,binRR . Is a binary operaion on RR.

Show that identity of the binary operation ** on RR defined by a**b=|a+b| for all a,binRR, does not exist.

Let @ be an operation defined on RR . The set of real numbers, by a@b=min(a,b) for all a,binRR . Show that @ is a binary operation on RR .

Prove that an operation ** on RR , the set of real numbers, defined by x**y=2xy+sqrt5, for all x,yinRR , is a binary operation on RR .

Prove that the operation @ on QQ , the set of rational numbers, defined by a@b=ab+1 is binary operational on QQ .