Finite number of minima and Maxima,, finite number of discontinuities,and absolutely integrable ... conditions must be satisfied. ....any signal to representation... thankyou mam
You've totally blown off the conditions because nowhere did you mention that we have to check for all these conditions within the bounds of the time period of signal. Which also implies that the signal should be absolutely integrable only over the time period, because if we assume the fist condition you've stated is true, then even a sinusoid signal like f(t) = sin(t) + cos(t) won't have a F.S. representation because these are power signals and hence not absolutely integrable over the entire number line.
True. A lot of youtube channels have made this mistake. I think they got confused between the dirichlet conditions for existence of a fourier series and a fourier transform.
Wrong Explanation. 2nd and 3rd conditions are bound for a periodic range but not for the entire signal. For clear explanation watch the video through the link: ua-cam.com/video/blS_OImUJ-c/v-deo.htmlsi=YGJLDwtOI4QCT67l
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Nice explanation, mam...Thanks.
Thank you ma'am
Very well explanation mam.
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Finite number of minima and Maxima,, finite number of discontinuities,and absolutely integrable ... conditions must be satisfied. ....any signal to representation... thankyou mam
Thank you 😊
You are awesome mam
Why multiple valued function don't have Fourier series??
Thanks ma'am
Well explanation mam🥰 thanks a lot
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mam, try to explain lecture with help of example.
Nicely explained mom. Thank you
drichlet condition exist for Discrete time?
Super madam
Dirichlets not a scientist he is Mathematician
You've totally blown off the conditions because nowhere did you mention that we have to check for all these conditions within the bounds of the time period of signal. Which also implies that the signal should be absolutely integrable only over the time period, because if we assume the fist condition you've stated is true, then even a sinusoid signal like f(t) = sin(t) + cos(t) won't have a F.S. representation because these are power signals and hence not absolutely integrable over the entire number line.
True. A lot of youtube channels have made this mistake. I think they got confused between the dirichlet conditions for existence of a fourier series and a fourier transform.
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can't get what shes saying 2nd point
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Wrong Explanation.
2nd and 3rd conditions are bound for a periodic range but not for the entire signal.
For clear explanation watch the video through the link:
ua-cam.com/video/blS_OImUJ-c/v-deo.htmlsi=YGJLDwtOI4QCT67l
who is here for the dc viva exam?