In this development we will consider the integration constant C = 0.
Calling I_n = int x^n e^x dx and after
d/(dx)(x^n e^x) = n x^{n-1}e^x + x^n e^x we have
int d/(dx)(x^n e^x)dx = n int x^{n-1}e^x dx + int x^n e^x dx
or
x^n e^x= n I_{n-1}+I_n
with I_0 = int x^0 e^x dx = int e^x dx = e^x
so we can iterate
I_0+I_1 = x e^x-> I_1 = x e^x - e^x = (x-1)e^x
2I_1+I_2 = x^2 e^x->I_2 = x^2e^x -2 (x-1)e^x
3I_2+I_3 = x^3 e^x->I_3 = x^3 e^x-3( x^2e^x -2 (x-1)e^x)
4I_3+I_4 = x^4 e^x->I_4 = x^4 e^x - 4( x^3 e^x-3( x^2e^x -2 (x-1)e^x))
and finally
5I_4+I_5 = x^5 e^x obtaining
I_5 = x^5 e^x - 5( x^4 e^x - 4( x^3 e^x-3( x^2e^x -2 (x-1)e^x)))
Our integral is 3I_5 so
int 3x^5 e^x dx = 3I_5
