The given differential equation is
(1+ln(x))dydx−xln(x)=ey
Put xln(x)=t
⇒(1+ln(x))dx=dt
⇒dydt−t=ey which is a linear differential equation.
I.F=e−∫dy
=e−y
The solution of the differential equation is
⇒t×e−y=∫ey×e−ydy+c
⇒t×e−y=y+c
⇒xln(x)=yey+cey
Put x=1,y=0
⇒c=0
Put x=a,y=2
aln(a)=2e2
∴aa=e2e2
Hence this is the correct option.