ASN2 - Something Interesting: Exponential: Difference between revisions
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<math> x(t)= \sum_{n=0}^\infty a_n e^{\frac{ j2 \pi nt}{T}} \!</math> |
<math> x(t)= \sum_{n=0}^\infty a_n e^{\frac{ j2 \pi nt}{T}} \!</math> |
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To obtain the coefffients <math>a_n</math> the solutions are almost identical. The benefit of using the eponetial funtion is that mathematical it is simplier for solving than using the cosine function. |
To obtain the coefffients <math>bigg a_n</math> the solutions are almost identical. The benefit of using the eponetial funtion is that mathematical it is simplier for solving than using the cosine function. |
Revision as of 06:51, 3 December 2009
Fourier Series
Using cosine to represent the basis functions
Using an exponential to represent basis functions
To obtain the coefffients the solutions are almost identical. The benefit of using the eponetial funtion is that mathematical it is simplier for solving than using the cosine function.