यदि `x^(y)=y^(x)` [जहाँ `x ne y`] का हल है -

If x^(y)=y^(x)" and "x=2y , then the values of x and y are ( x, y gt 0 )

Solve: 3 (2x+ y ) = 7xy 3(x+ 3y ) = 11xy , x ne 0 , y ne 0

If x - (1)/(x) = y , x ne 0 , find the value of (x- (1)/ (x) - 2y ) ^(3)

Solve the following differential equation: (1+ e ^(y/x)) dy + e^(y/x) (1- y/x) dx = 0 (x ne 0)

Solve the following differential equation: (1+ e ^(y/x)) dy + e^(y/x) (1- y/x) dx = 0 (x ne 0)

The solution of the differential equation x(dy)/(dx) + 2y = x^2 (X ne 0) with y(1) =1, is :

Solve for x and y : 2^(y-x) (x + y) = 1 and (x + y)^(x - y) = 2 .

For all nonzero numbers x and y, the operation grad is defined by the equation x grad y = (|x|)/(x^(2))+(y^(2))/(|y|) when x gt y and by the equation x grad y = (|x|)/(y^(2))-(x^(2))/(|y|) when x le y . If x grad y lt 0 , then which of the following could be true ? I. x^(3)=y^(3) II. (y+x)(y-x)gt 0 III. x-y gt 0

Solve for x and y : (2)/(x) + (3)/(y ) = 13, (5)/(x) - ( 4)/( y) = - 2 ( x ne 0 and y ne 0 )