Let *be a binary operation defined on R, the set of all real numbers, by a*b = `sqrt(a^(2)+b^(2)), AA a, b in R.` Show that is associative on R

Let * be the binary operation defined on set 8 of rational numbers as a**b=a^(2)+b^(2), AA a, b in theta , then find sqrt(8**6) .

Let * be a binary operation on the set S of all non-negative real numbers defined by a**b= sqrt(a^(2)+b^(2)) . Find the identity elements in S with respect to *.

Let ast be a binary operation on the set of real numbers, defined by a astb=frac[ab][5] , for all a,binR . Show that ast is both commutative and associative.

Determine if the binaary operation o on the set R of real numbers defined by aob = a+b-3 AA a, b inR is commutative/ associative.

Let* is a binary operation on the set of all non-zero real numbers, given by a*b = (ab)/(5),AA a,b in R-{0) . Find the value of x, given that 2*(x*5) = 10.

Let * is a binary operation on the set of all non-zero real numbers, given by a**b=(ab)/(5) for all c, b in R -(0) . Find the value of x, given that 2**(x**5)=10 .

Let* be the binary operation defined on Q. Which of the binary operations are commutative? a*b=a^(2)+b^(2) , AA, a,b in Q

Let* be the binary operation defined on Q. Which of the binary operations are commutative? a*b= (a-b)^(2) , AA a , b in Q

Let* be the binary operation defined on Q. Which of the binary operations are commutative? a*b=a-b, AA a,b in Q

Let ast be a binary operation on the set of real numbers, defined by a astb=frac[ab][5] , for all a,binR . Find the inverse elements.