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#1 2006-04-13 16:05:28
- coolwind
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- Registered: 2005-10-30
- Posts: 30
A integral problem
∫(t+1)e^(-jwkt)dt
Thanks...
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#2 2006-06-01 08:56:02
- Prakash Panneer
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- Registered: 2006-06-01
- Posts: 110
Re: A integral problem
You didn't give any information about j,k,and w. So, i took these are constants.
Problem: Integral ( t+1 ) e ^ ( -jwkt ) dt
To solve this problem, we have to use "Integration by parts method,"
Take u = t+1 , dv = e^ (-jwkt)dt
du = dt and v = e^(-jwkt)/(-jwk) (Oops)
Integrantion by parts formula Integral ( u dv) = uv- integral(vdu)
So, we will get, Integral ( t+1 ) e ^ ( -jwkt ) dt = {(t+1)e^(-jwkt) /(-jwk)} - Integral ( -e^(-jwkt)/(jwk)) dt
= {-(t+1)e^(-jwkt)/(jwk)} - e^ (-jwkt)/ (jwk)^2.
= {e^(-jwkt)/(jwk)} {-(t+1)- (1/jkw)}
This is our required answer.
Last edited by Prakash Panneer (2006-06-04 01:05:40)
Letter, number, arts and science
of living kinds, both are the eyes.
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#3 2006-06-01 11:11:28
- John E. Franklin
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- Registered: 2005-08-29
- Posts: 3,588
Re: A integral problem
I'm rusty on calculus.
Why in above is the integral of dv = e^(-jwkt)dt
become:
v = (e^(-jwkt)) / (-jwkt)
Does this mean that if y = e^(kx) then y'=kx e^(kx) ?
igloo myrtilles fourmis
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#4 2006-06-03 21:22:56
- George,Y
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- Registered: 2006-03-12
- Posts: 1,379
Re: A integral problem
is there an "i' instead of a "j"?
Last edited by George,Y (2006-06-03 21:23:28)
X'(y-Xβ)=0
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#5 2006-06-04 01:09:22
- Prakash Panneer
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- Registered: 2006-06-01
- Posts: 110
Re: A integral problem
Oops....................
I made a mistake.
That means dv = e^(kx) dx
Integrating with respect to x on both sides, we get,
v = e^(kx)/k.
If y = e^(kx) then y' = k e^kx.
Last edited by Prakash Panneer (2006-06-04 01:12:21)
Letter, number, arts and science
of living kinds, both are the eyes.
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