Timeline for How to isolate coefficiets from complex fourier series?
Current License: CC BY-SA 4.0
6 events
| when toggle format | what | by | license | comment | |
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| Sep 26, 2020 at 3:13 | vote | accept | TeilZeitGott | ||
| Sep 24, 2020 at 13:52 | answer | added | AJN | timeline score: 1 | |
| Sep 24, 2020 at 1:32 | comment | added | AJN |
Since you are referring to a transfer function, I assume the circuit is a linear time invariant system. Then, it has the property that the output for the sum of a set of signals is same as the sum of the outputs of the individual signals. Your U_in is the sum of certain signals. Can you take it from here?
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| Sep 23, 2020 at 21:17 | comment | added | TeilZeitGott | thats what answer should be | |
| Sep 23, 2020 at 15:45 | comment | added | AJN | One of your images say \$\hat{y}_n = \frac{\hat{x}_n}{1+jn\omega_0 R C}\$. Doesn't that already give you the ratio \$\frac{\hat{y}_n}{\hat{x}_n}\$ ? | |
| Sep 23, 2020 at 13:40 | history | asked | TeilZeitGott | CC BY-SA 4.0 |