Given that,
(I). y=ex
On differentiate
dydx=ex
Hence, this is the required solution
(II). Given that,
y=e2x
dydx=2.e2x
Let I =∫exe4x+e2x+1dx.J=∫e−xe−4x+e−2x+1dx,Then, for an arbitrary constant c, the value of J-I equals