I have a rather easy-to-understand question.

I have a set of data and I want to estimate how good this data fit a **standard normal distribution**. To do so, I start with my code:

```
[f_p,m_p] = hist(data,128);
f_p = f_p/trapz(m_p,f_p);
x_th = min(data):.001:max(data);
y_th = normpdf(x_th,0,1);
figure(1)
bar(m_p,f_p)
hold on
plot(x_th,y_th,'r','LineWidth',2.5)
grid on
hold off
```

Fig. 1 will look like the one below:

Easy to see that the fit is quite poor, altough the bell-shape can be spotted. The main problem resides therefore in the **variance** of my data.

To find out the proper number of occurrances my data-bins should own, I do this:

```
f_p_th = interp1(x_th,y_th,m_p,'spline','extrap');
figure(2)
bar(m_p,f_p_th)
hold on
plot(x_th,y_th,'r','LineWidth',2.5)
grid on
hold off
```

which will result in the following fig. :

Hence, the question is: how can I scale my data-block to match the Gaussian distribution as in **Fig.2** ?

**CAUTION**

I wanna stress the focus on one point: I **don't** wanna **find** the **best distribution fitting the data**; the **problem** is **reversed**: starting from my data, I'd like to manipulate it in such a way that,in the end, its distribution reasonably fits the Gaussian one.

Unfortunately, at the moment, I don't have a real idea on how to perform this data "filter", "transform" or "manipulation".

Any support would be welcome.

editing, not by posting new questions. But that's just my opinion, of course. – Eitan T Mar 21 '13 at 14:18