Subbing infinity into limits of an Integral (1 Viewer)

frenzal_dude · Mar 14, 2010

How would you work this out?:
This is the answer to the integral, just need to sub in values for t.

(1/4)[(e^(j4PIct - j2PIft))/(j4PIc - j2PIf)]

from t = infinity to t = -infinity.

Hope you guys can help.

cutemouse · Mar 14, 2010

These are improper integral and are not in the scope of the current NSW syllabus for Extension 2 Mathematics I believe.

kaz1 · Mar 14, 2010

frenzal_dude said:
(1/4)[(e^(j4PIct - j2PIft))/(j4PIc - j2PIf)]

wtf?

Use Latex

frenzal_dude · Mar 14, 2010

now with latex:
$\frac{1}{4}\frac{e^{j4\pi ct - j2\pi ft}}{j4\pi c - j2\pi f}$

shaon0 · Mar 15, 2010

frenzal_dude said:
now with latex:
$\frac{1}{4}\frac{e^{j4\pi ct - j2\pi ft}}{j4\pi c - j2\pi f}$

Let u=j*4*pi*c-j*2*pi*f
y= t: (-inf,inf) (1/4) (e^tu/u)
= inf

Affinity · Mar 19, 2010

shaon0 said:
Let u=j*4*pi*c-j*2*pi*f
y= t: (-inf,inf) (1/4) (e^tu/u)
= inf

That j is probably sqrt(-1) so doesn't quite work that way

suspect the original poster made mistake somewhere. seems like it's some fourier transform. can you post the question?

jet · Mar 19, 2010

Yeah it looks like a fourier transform, which is beyond the HSC level. Moving it to extracurricular.

Subbing infinity into limits of an Integral (1 Viewer)

frenzal_dude

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cutemouse

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kaz1

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frenzal_dude

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shaon0

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Affinity

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jet

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