For all positive values of x and y, the value of `((1+x+x^(2))(1+y+y^(2)))/(xy)`

Find the least value of 3x+4y for positive values of x and y, object to the condition x^(2)y^(3)=6 .

If x+y = 12, then the minimum value of x^(2) + y^(2) is

If (x+ y ,x-y}=( 3,1) find the value of x and y

Solve for x and y , 1-2x-x^(2)=tan^(2)(x+y)+cot^(2)(x+y) .

If x-2y = 4, then the minimum value of xy is

If sin 2 x=n sin 2 y then the value of (tan (x+y))/(tan (x-y))=

If x,y,z be three positive numbers such that xyz^(2) has the greatest value (1)/(64) , then the value of (1)/(x)+(1)/(y)+(1)/(z) is

if f(x) = cos (log x) then the value of f(x) f(y)-(1//2) [f(x//y) + f(xy) ] is

If (x+1, y-2)=(3,1), find the values of x and y.