How to normalize a histogram, so it is a probability density (how is that the sum of all bins are equal to 1?).

My answer to this is the same as in an answer to your earlier question. For a probability density function, the integral over the entire space is 1. Dividing by the sum will not give you the correct density. To get the right density, you must divide by the area. To illustrate my point, try the following example.
You can see for yourself which method agrees with the correct answer (red curve). Another Method (more straight forward than Method 2) to normalize the histogram is divide by "sum(f*dx)" which expresses the integral of the prob density function. I.e.



There is an excellent three part guide for Histogram Adjustments in MATLAB, the first part is on Histogram Stretching. 


The area for each individual bar is height*width. Since MATLAB will choose equidistant points for the bars, so the width is:
Now if we sum up all the individual bars the total area will come out as
So the correctly scaled plot is obtained by



For some Distributions, Cauchy I think, I have found that trapz will overestimate the area, and so the pdf will change depending on the number of bins you select. In which case I do



or if you want a oneliner:
Documentation:Edit: This solution answers the question How to have the sum of all bins equal to 1. This approximation is valid only if your bin size is small relative to the variance of your data. The sum used here correspond to a simple quadrature formula, more complex ones can be used like 

