dxdy=2x2−ey+x1
dxe−ydy=xe−y+2x2−1
dx−e−ydy+xe−y=2x21
Let e−y=t...(i)
e−y(−1)dxdy=dxdt
dxdt+xt=2x21
I.F=e∫x1dx=elnx=x
tx=∫2x21⋅xdx+C
Using equation (1)
e−yx=21ℓnx+C
Given, y(e)=1
⇒e−1e=21+C⇒C=21
e−yx=21(1+ℓnx)
Put x=1 then y is ⇒y=ℓn2orloge2