What is the general solution of the differential equation dydx=ex+y\frac{dy}{dx} = e^{x+y}dxdy=ex+y?
e−y=−ex+Ce^{-y} = -e^x + Ce−y=−ex+C
ey=ex+Ce^y = e^x + Cey=ex+C
e−y=ex+Ce^{-y} = e^x + Ce−y=ex+C
−e−y=ex+C-e^{-y} = e^x + C−e−y=ex+C