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Integral gives wrong answer

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Frank Hansper
Frank Hansper on 5 Jan 2017
Edited: Frank Hansper on 7 Jan 2017
Hey forum
When I solve this integral:
-x * (1/2) * int(log10(x)/x^2) + (1/2)*x^3 * int(log10(x)/x^4)
I get
(3*log(5) + 4)/(9*log(10))
which is the same as the answer from my other program:
(1/3)·log10(x)+0.193
But this is wrong!
The real answer should be:
(4/9) + log10(x)/3
How can this be?
Frank
  1 Comment
Frank Hansper
Frank Hansper on 5 Jan 2017
The reason why I know:
(4/9) + log10(x)/3
Is right, is because im solving a nonhomogeneous linear ODE and when i pop it in, it gives the right answer.
When I try with the other solution, it gives me a wrong answer.

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Accepted Answer

David Goodmanson
David Goodmanson on 5 Jan 2017
Edited: David Goodmanson on 5 Jan 2017
Hello Frank, This might be more of an observation than an answer, but one point not in your favor is that since log10(x) = log(x)/log(10), your entire integral is proportional to 1/log(10):
Int = (1/log(10)) * [ -x * (1/2) * int(log(x)/x^2) + (1/2)*x^3 * int(log(x)/x^4) ]
With the annoying log10 behavior out of there, the rest of the integral is
(1/3)log(x) + 4/9
and the entire answer is what your symbolic math programs are saying. However, there are a couple of indefinite integrals here and it's possible that there is an additional constant floating around having to do with the lower limit for x in the integrals (and of course things also depend on whether you are using log or log10 in the ODE).
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Walter Roberson
Walter Roberson on 5 Jan 2017
I did some searching a couple of months ago, and I had difficulty finding a programming language which used ln() or loge() for natural log; all the ones I checked used log() for natural log.
Frank Hansper
Frank Hansper on 7 Jan 2017
Edited: Frank Hansper on 7 Jan 2017
I will remember that. Matlab is my "first" encounter with programming language (pl), so my experience with others is limited. The reason I was confused is that my advisor is fond of solving integrals by hand, so I was puzzled to see log as ln (expecting him not to write in pl).
I have talked to him now and he said: "In my world log = ln", so it was a misunderstanding and my question is now all cleared out.

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