If `x log x (dy)/(dx)+ y= log x ^(2) and y (e) =0,` then `y (e ^(2)) =`

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

(d)/(dx) {log ((x ^(2))/(e ^(x)))}=

If y = 2 ^(ax ) and (dy)/(dx) =log 256 at x =1, then a =

The solution of x (dy)/(dx) + y log y = xy e^(x) is

If x ^(y) = log x then (dy)/(dx) at x =e is

If y = (lot _(e) x)/(x) and z = log _(e) x, then (d ^(2) y)/(dz^(2)) + (dy)/(dz) =

The solution of x log x (dy)/(dx) + y = 2 log x is