Res[ ((s^3)*(exp(1/s))) ] in Matlab

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Sourav Kumar
Sourav Kumar on 16 Sep 2017
Commented: David Goodmanson on 18 Sep 2017
Sir,
i want to evaluate the Residue of the function
F(s)= ((s^3)*(exp(1/s)))
in Matlab, so how can i do it?
with thanks
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Sourav Kumar
Sourav Kumar on 18 Sep 2017
Hi Star , so can't we find its Residue in Matlab??
Star Strider
Star Strider on 18 Sep 2017
That would be my assessment.
To do a partial fraction expansion, you have to have a series of symbolic fractions in ‘s’.

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Answers (1)

David Goodmanson
David Goodmanson on 16 Sep 2017
Hi Sourav,
The function has an essential singularity at s = 0, but you can still expand exp(1/s) in a Taylor series in 1/s, just as if it were a Taylor series for exp(x), i.e.
exp(1/s) = 1 + c_1*(1/s) + c_2*(1/s)^2 + c_3*(1/s)^3 + ...
where the Taylor coefficients c_1 etc. you should know. Then multiply everything by s^3, and the find the coefficient of the term that now goes like 1/s. The residue is positive and < .05
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John D'Errico
John D'Errico on 18 Sep 2017
Sourav - since this is clearly a homework problem, I assume that David does not wish to do all of the work for you. He told you exactly what to do however. He knows the result, because he did the computation that he told you to do. It is quite easy to do. So why not make an effort? The reason he told you it is positive and less than 0.05, is so that you can know if you got it correct.
David Goodmanson
David Goodmanson on 18 Sep 2017
Hi Sourav,
What John said is true in all respects. The Taylor series for an exponential is probably the most common example there is, and I think you can get this with a bit of effort. Due to other things going on I won't be getting back to site for awhile, but if it doesn't work out and you show what you have done, John or others on this site can help.

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