Exponential Fourier Series Example #3

my bro taught me a 1 hour class in 6 minutes

You're like a god to me

Excellent!
You are legend!

Although, I don't speak English very well, I understood your explanation, amazing explanation... Thank you so much!

the exponentials before integrating were e - e, why after integration it becomes e + e?

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Sir I have a doubt,
As W(omega)=2, then sinWt=sin2t but why did you represented the waveform as sint?

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The man, the myth, the legend of Euler. I have a craving for a honey butter chicken biscuit and captain crunch. Can't wait for Endgame to come out. Idk if Iron man will be able to stop Kylo Ren. Ehh, I'll just go to the beach for now, I heard octopuses are there.

What will be x(t) if we take 1,2 instead of Pi ,2Pi

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SIR =LIMIT OF INTEGRATION IS FROM ZERO TO PYE = SO THE FOURIER TRANSFORM IS SAME WHETHER U HAVE ONE WAVE OR WHETHER U HAVE INFINITE WAVES ?= THANK U

i like this presentation. thank u

sir does the value of e^(j*n*pi) and e^-(j*n*pi) is also -1

Thank you very much

An awesome explanation! It would be very nice if you added more exercises about Fourier series and transforms.

thank you so much

Great explanation like always. I'm a bit confused when you say e^[ j pi (1-2n) ] = -1 for all n. Would someone please explain how that works out? Thank you.

thank you so much for this, made a difficult concept and explained it in a really clear and concise manner

thanks sir for clearing my doubts. In most of the books it is given that the output of full wave rectifier contains only even harmonics but when I did the fourier analysis I found both even and odd harmonics. Thank you once again sir

Hey Guys, what is the table that I can refer to for solving sin(t) * e^(-jnwo*t)? If it's not a fourier series table, what integral table am I looking for?

I wish I could super-like this. I just threw my lecture notes away because I can pause, scrutinize, and take notes about what you're saying. Thanks for the clear explanation!

i had this question on my exam yesterday... they asked us to write down the series for abs(sin(t)) no clue it needed to be doen the complex way tho.. :/ thanks anyways haha

Thank you very much!!!

Thank you very much, I needed this for calculating the output from a smoothing circuit :)

Hey, thanks for the video! One remark dough, shouldn't the j be numerator after you write the alternative form of sin(t) ? I was checking in Wolfram by the way.

what about Co/ C_o?

Thank you so much Sir.