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
```