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I've tried:

>> dsolve('Dy=(x+2)/(x*(3-x))','y(1)=2','x')

And got this answer:

ans = (pi*5*i)/3 - (5*log(x - 3))/3 + (5*log(2))/3 + (2*log(x))/3 + 2

The correct hand generated answer is:

y = 2/3*log(x) -5/3*log(3-x) + (2+5/3*log(2))

How do I eliminate the complex number in the Matlab answer?

OK, tried this:

>> dsolve(diff(y)==(x+2)/(x*(3-x)),y(1)==2,x)

ans =

(pi*5*i)/3 - (5*log(x - 3))/3 + (5*log(2))/3 + (2*log(x))/3 + 2

>> real(ans)

ans =

(2*log(abs(x)))/3 + (5*log(2))/3 - (5*log(abs(x - 3)))/3 + 2

>> pretty(ans)

  2 log(|x|)   5 log(2)   5 log(|x - 3|)
  ---------- + -------- - -------------- + 2
      3           3             3
share|improve this question
up vote 0 down vote accepted

If your use of matlab gives one answer and your manual labor gives another, don't be too quick to assume that matlab iis at fault.

That being said, getting the real part of a number is very easy, I can't try it but with the symbolic toolbox I believe you can just do:

real(y)
share|improve this answer
    
See above what I got. Looks like a solution to the problem. – David Jan 22 '14 at 16:52

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