First, you should learn about operator precedence, so you can avoid many of the confusing brackets you have.

Second, as most other people have mentioned here, `inline`

is slow and not suited for this purpose. You're better off using (and leaning how to use properly) anonymous functions, a.k.a. function handles.

Third, if you want to find the roots of this function, you'd better use an extensively tested Matlab function dedicated to that purpose, rather than design & implement your own version:

```
>> f = @(x) 3/2*7.02^2 - 2*18*x.*(1-x/18).*(1-exp(-18./x));
>> root1 = fzero(f, 14)
root1 =
1.440303362822718e+01
>> root2 = fzero(f, 2.5)
root2 =
2.365138420421266e+00
>> root3 = fzero(f, 0) %# (if you're into that kind of perversion)
root3 =
0
```

I found the initial values by randomly testing values from `-100:100`

and then `unique`

-ing the outcomes. This is by no means a robust way to find all roots, but I trust you can come up with something better (the problem is fairly straightforward to solve analytically anyway).

`f=@(x)((3/2)*(7.02^2))-(2*18*x*((1-(x/18))*(1-(exp(-18/x)))))`

, and find the value at`x=3`

as`f(3)`

– Jonas Aug 15 '12 at 14:51