`y log y =(dy)/(dx) = log y-x`

Let y(x) be the solution of the differential equation ( x log x) (dy)/(dx) + y = 2x log x, ( x gt 1). then y (e) is equal to :

The solution of the differential equation y (1 + log x) (dx)/(dy) - x log x = 0 is

The solution of the differential equaton (dy)/(dx)=(x log x^(2)+x)/(sin y+ycos y) , is

If y=a^(x^(a^x..oo)) then prove that dy/dx=(y^2 log y )/(x(1-y log x log y))

The particular solution of the differential equation y(1+log x)(dx)/(dy)-x log x=0 when x=e,y=e^(2) is

The integrating factor of the differential equation (dy)/(dx)(x log_e x)+y=2 log_e x is given by

If xy=1+ log y and k (dy)/(dx)+y^2=0 , then k is