If you have MMA V8 you could use the new `DistributionFitTest`

```
disFitObj = DistributionFitTest[daList, NormalDistribution[a, b],"HypothesisTestData"];
Show[
SmoothHistogram[daList],
Plot[PDF[disFitObj["FittedDistribution"], x], {x, 0, 120},
PlotStyle -> Red
],
PlotRange -> All
]
```

```
disFitObj["FittedDistributionParameters"]
(* ==> {a -> 55.8115, b -> 20.3259} *)
disFitObj["FittedDistribution"]
(* ==> NormalDistribution[55.8115, 20.3259] *)
```

It can fit other distributions too.

Another useful V8 function is `HistogramList`

, which provides you with `Histogram`

's binning data. It takes about all of `Histogram`

's options too.

```
{bins, counts} = HistogramList[daList]
(* ==> {{0, 20, 40, 60, 80, 100}, {2, 10, 20, 17, 7}} *)
centers = MovingAverage[bins, 2]
(* ==> {10, 30, 50, 70, 90} *)
model = s E^(-((x - \[Mu])^2/\[Sigma]^2));
pars = FindFit[{centers, counts}\[Transpose],
model, {{\[Mu], 50}, {s, 20}, {\[Sigma], 10}}, x]
(* ==> {\[Mu] -> 56.7075, s -> 20.7153, \[Sigma] -> 31.3521} *)
Show[Histogram[daList],Plot[model /. pars // Evaluate, {x, 0, 120}]]
```

You could also try `NonlinearModeFit`

for fitting. In both cases it is good to come with your own initial parameter values to have the best chances that you end up with a globally optimal fit.

In V7 there is no `HistogramList`

but you could get the same list using this:

The function fh in Histogram[data,bspec,fh] is applied to two
arguments: a list of bins {{Subscript[b, 1],Subscript[b,
2]},{Subscript[b, 2],Subscript[b, 3]},[Ellipsis]}, and corresponding
list of counts {Subscript[c, 1],Subscript[c, 2],[Ellipsis]}. The
function should return a list of heights to be used for each of the
Subscript[c, i].

This can be used as follows (from my earlier answer):

```
Reap[Histogram[daList, Automatic, (Sow[{#1, #2}]; #2) &]][[2]]
(* ==> {{{{{0, 20}, {20, 40}, {40, 60}, {60, 80}, {80, 100}}, {2,
10, 20, 17, 7}}}} *)
```

Of course, you can still use `BinCounts`

but the you miss MMA's automatic binning algorithms. You have to provide a binning of your own:

```
counts = BinCounts[daList, {0, Ceiling[Max[daList], 10], 10}]
(* ==> {1, 1, 6, 4, 11, 9, 9, 8, 5, 2} *)
centers = Table[c + 5, {c, 0, Ceiling[Max[daList] - 10, 10], 10}]
(* ==> {5, 15, 25, 35, 45, 55, 65, 75, 85, 95} *)
pars = FindFit[{centers, counts}\[Transpose],
model, {{\[Mu], 50}, {s, 20}, {\[Sigma], 10}}, x]
(* ==> \[Mu] -> 56.6575, s -> 10.0184, \[Sigma] -> 32.8779} *)
Show[
Histogram[daList, {0, Ceiling[Max[daList], 10], 10}],
Plot[model /. pars // Evaluate, {x, 0, 120}]
]
```

As you can see the fit parameters may depend quite a bit on your binning choice. Particularly the parameter I called `s`

depends critically on the amount of bins. The more bins, the lower the individual bin counts and the lower the value of `s`

will be.