How do you solve for this question? :
n=
The complex Fourier series f(x)= ∑ce^(jnπx/L), (n = -∞ to n = ∞) uses complex exponentials as (orthogonal) basis
n =−∞
functions rather than the sines and cosines of a regular Fourier series.
Hint for parts A, B, and C: Express the sine and cosine function as complex exponentials and properly treat the three cases when m≠n , m=n and m=−n .
a) Find the regular Fourier series coefficients of f (x)=e^(jmπx/L) for the case where integer m0.

Question

How do you solve for this question? :
n= 
The complex Fourier series f(x)= ∑ce^(jnπx/L), (n = -∞ to n = ∞) uses complex exponentials as (orthogonal) basis
n =−∞
functions rather than the sines and cosines of a regular Fourier series.
Hint for parts A, B, and C: Express the sine and cosine function as complex exponentials and properly treat the three cases when m≠n , m=n and m=−n .
a) Find the regular Fourier series coefficients of f (x)=e^(jmπx/L) for the case where integer m>0.

goformit100 · Answer

@electrokid HELP ME

anonymous · Answer

just apply the formula for $c_n$

anonymous · Answer

now the question makes a little more sense