# how to evaluate curve fitting in Matlab

I'm using Matlab to analyse a couple of data, for I that I need the curve fitting, I've wrote this code from the documentation :

``````% I is  14 points vector that change its value in a loop

y =0:13;
[p,S] = polyfit(I,y,1);
[fx, delta] = polyval(p,I,S);
plot(y,I,'+',fx,I,'-');
``````

here is what I get :

my question is , how can evaluate this 'fitting', I mean how good it is , and how can I get the slope of this line?

UPDATE

after Rafaeli's answer , I had some trouble understand the results, since `fx` is the fitting curve fitting for `y` considering 'I' , meaning that I get for `fx':

``````-1.0454    3.0800   4.3897    6.5324   4.0947  3.8975   4.3476   9.0088  5.8307  6.7166 9.8243  11.4009  11.9223
``````

instead the `I` values are :

`````` 0.0021  0.0018   0.0017  0.0016  0.0018 0.0018 0.0017   0.0014  0.0016 0.0016  0.0014 0.0012 0.0012 0.0013
``````

and the plot has exactly the value of `I' :

so the result I hope to get should be near to those values ! Itried to switch the

``````[p,S] = polyfit(y,I,1);
``````

but is didn't the wasn't any better `fx= 0.0020`,so my question is how can I do that ?

2nd UPDATE got it, here is the code :

y = 0:13 p = polyfit(y,I,1) fx = polyval(p,y); plot(y,I,'+',y,fx,'o')

here is the result :

thanks for any help !

-

The line is defined by `y = ax + b`, where `a = p(1)` and `b = p(2)`, so the slope is `p(1)`.
A simple way to know how good is the fit is to take the root mean square of the error: `rms(fx - I)`. The lesser the value, better the fit.