`y=x(c-x)` where `c` is a constant. Find maximum value of `y`.

If y=x^(3)-3x . Find the maximum value of y.

If xy=a^(2) and S=b^(2)x+c^(2)y where a,b and c are constants then the minimum value of S is

if 2x+y=1 then find the maximum value of x^(2)y

If x^(2)+x=1-y^(2) , where x gt 0, y gt 0 , then find the maximum value of x sqrt(y) .

If xy=a^2 and S = b^2x + c^2y where a, b and c are constants then the minimum value of S is

If the solution of the differential equation (1+e^((x)/(y)))dx+e^((x)/(y))(1-(x)/(y))dy=0 is x+kye^((x)/(y))=C (where, C is an arbitrary constant), then the value of k is equal to

If the solution of the differential equation (1+e^((x)/(y)))dx+e^((x)/(y))(1-(x)/(y))dy=0 is x+kye^((x)/(y))=C (where, C is an arbitrary constant), then the value of k is equal to

The value of the integral I=inte^(x)(sinx+cosx)dx is equal to e^(x).f(x)+C, C being the constant of integration. Then the maximum value of y=f(x^(2)), AA x in R is equal to

The value of the integral I=inte^(x)(sinx+cosx)dx is equal to e^(x).f(x)+C, C being the constant of integration. Then the maximum value of y=f(x^(2)), AA x in R is equal to