- #1
Rat3dR
- 6
- 0
Hi there!
I'm new to the forum, in the sense that I've just registered, i have been reading the forum for years now, but this time I feel like i need to ask a question myself :P.
What I'm trying to figure out is how to get to the series of cos(exp(-z)). I know the result should be:
cos(exp(-z)) = cos(1) + z*sin(1) + (1/2)*z^2*(-sin(1) - cos(1)) + ...
I already figured out the "sub-series" of cos(z) and exp(-z) which are:
cos(z) = 1 - z^2/2! + z^4/4! - ...
exp(-z) = 1 - z + z^2/2! - z^3/3! + ...
I've tried many strategies to find the complete series from the two sub-series, but whatever i try, it just doesn't work.. Any hints? Because I'm completely stuck, while I'm probably just overlooking some easy, but essential, step.
Thanks, R.
I'm new to the forum, in the sense that I've just registered, i have been reading the forum for years now, but this time I feel like i need to ask a question myself :P.
What I'm trying to figure out is how to get to the series of cos(exp(-z)). I know the result should be:
cos(exp(-z)) = cos(1) + z*sin(1) + (1/2)*z^2*(-sin(1) - cos(1)) + ...
I already figured out the "sub-series" of cos(z) and exp(-z) which are:
cos(z) = 1 - z^2/2! + z^4/4! - ...
exp(-z) = 1 - z + z^2/2! - z^3/3! + ...
I've tried many strategies to find the complete series from the two sub-series, but whatever i try, it just doesn't work.. Any hints? Because I'm completely stuck, while I'm probably just overlooking some easy, but essential, step.
Thanks, R.