In `(S, **)`, is defined by `x ** y =x` where x, `y in S`, then

In (N, **) where ** is defined by x ** y = max (x,y) check the closure axion and identify anion.

Let S be a non-empty set and 0 be a binary operation on s defined by x 0 y =x, x, y in S . Determine whether 0 is commutative and association.

If the function f : [-3,3] to S defined by f(x) = x^(2) is onto, then S is

Let A={1,2,3....14}. Define a relation R from A to A by R={(x,y) : 3x-y=0," where "x, y in A} . Write down its domain, condomain and range.

If the function f : [-3, 3] to S defined by f(x) = x^(2) is onto, then S is .............

If tan^(2) {pi(x+y)}+cot^(2) {pi (x+y)}=1+sqrt((2x)/(1+x^(2))) where x, y in R , then find the least possible value of y.

Show that the general solution of the differential equation (dy)/(dx) + (y^(2) + y + 1)/(x^(2) + x + 1) = 0 is given by ( x + y + 1) = A(1 - x - y - 2xy) , where A is parameter.

Let U(x,y) =e^(x) sin y , where x=st^(2), y =s^(2) t, s, t in R . Find (del U)/(del S), (del U)/(del t) and evaluate them at s=t=1.

If set A and B are defined as A = {(x,y)|y = 1/x, 0 ne x in R}, B = {(x,y)|y = -x , x in R,} . Then