Determine whether this series converges:
$\Sigma e^{-j+sinj}$
I know that this series is $\leq$ than $\Sigma e^{-j+1}$, but I am having trouble getting this in a form appropriate for a convergence test...
Determine whether this series converges:
$\Sigma e^{-j+sinj}$
I know that this series is $\leq$ than $\Sigma e^{-j+1}$, but I am having trouble getting this in a form appropriate for a convergence test...
Hint: For a geometric series with $|r|\lt1$, $$ \sum_{k=0}^\infty ar^n=\frac{a}{1-r} $$