Based on Sjoerd, great solution and extension on Angles, Polar Coordinate in Mathematica, please consider the Following :

```
list = {{21, 16}, {16, 14}, {11, 11}, {11, 12},
{13, 15}, {18, 17}, {19, 11}, {17, 16}, {16, 19}}
ScreenCenter = {20, 15}
ListPolarPlot[{ArcTan[##], EuclideanDistance[##]} & @@@ (# - ScreenCenter & /@ list),
PolarAxes -> True, PolarGridLines -> Automatic, Joined -> False,
PolarTicks -> {"Degrees", Automatic},
BaseStyle -> {FontFamily -> "Arial", FontWeight -> Bold,
FontSize -> 12}, PlotStyle -> {Red, PointSize -> 0.02}]
```

```
Module[{Countz, maxScale, angleDivisions, dAng},
Countz = Reverse[BinCounts[Flatten@Map[ArcTan[#[[1]] - ScreenCenter[[1]], #[[2]] -
ScreenCenter[[2]]] &, list, {1}], {-\[Pi], \[Pi], \[Pi]/6}]];
maxScale = 4;
angleDivisions = 12;
dAng = (2 \[Pi])/angleDivisions;
SectorChart[{ConstantArray[1, Length[Countz]], Countz}\[Transpose],
SectorOrigin -> {-\[Pi]/angleDivisions, "Counterclockwise"},
PolarAxes -> True,
PolarGridLines -> Automatic,
PolarTicks -> {Table[{i \[Degree] + \[Pi]/angleDivisions,i \[Degree]},
{i, 0, 345, 30}], Automatic},
ChartStyle -> {Directive[EdgeForm[{Black, Thickness[0.005]}], Red]},
BaseStyle -> {FontFamily -> "Arial", FontWeight -> Bold,
FontSize -> 12}, ImageSize -> 400]]
```

**As you can see the histogram shows a rotational symmetry of what it should.
I tried everything to get those straight but did not succeed. Without Reverse it is worst. I tried RotateRight without success.I feel the problem is in my BinCount.
ArcTan output from -Pi to Pi whereas Sjoerd suggested I needed to go from 0 to 2Pi. But I don`t understand how to do so.**

EDIT : Problem solved. Thanks to Sjoerd, Belisarius, Heike solutions, I am able to show a histogram of the eye fixations locations given the center of gravity of an image.

`ArcTan`

in the form`ArcTan[x,y]`

the range is`(-Pi,Pi]`

– Heike Sep 17 '11 at 20:07