We shall use partial integration:
int u dv=uv-int v du
Therefore, we have
int e^(-3x)sin5xdx=|[u=e^(-3x),dv=sin5xdx],[du=-3e^(-3x)dx,v=-1/5cos5x]|=
-1/5e^(-3x)cos5x-3/5int e^(-3x)cos5xdx=|[u=e^(-3x),dv=cos5xdx],[du=-3e^(-3x)dx,v=1/5sin5x]|=
-1/5e^(-3x)cos5x-3/25e^(-3x)sin5x-9/25inte^(-3x)sin5xdx
We can see that we have the same integral as the one we've started with. In other words we have the following equation
int e^(-3x)sin5xdx=-1/5e^(-3x)cos5x-3/25e^(-3x)sin5x
-9/25inte^(-3x)sin5xdx
Let us add 9/25int e^(-3x)sin5xdx to the whole equation.
34/25int e^(-3x)sin5xdx=-1/5e^(-3x)cos5x-3/25e^(-3x)sin5x
Now we only need to multiply the whole equation by 25/34 to obtain the solution to our starting problem.
int e^(-3x)sin5xdx=-5/34e^(-3x)cos5x-3/34e^(-3x)sin5x+c, c in RR
https://en.wikipedia.org/wiki/Integration_by_parts
Tuesday, September 1, 2015
int e^(-3x)sin5x dx Find the indefinite integral
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