Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

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}]

enter image description here

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]]

enter image description here

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.

enter image description here

share|improve this question
    
@beliarius: When using ArcTan in the form ArcTan[x,y] the range is (-Pi,Pi] –  Heike Sep 17 '11 at 20:07
    
@belisarius, Sorry, I am just so out of it now :-(. Thank you for your help ! –  500 Sep 17 '11 at 20:31
    
@500 Pay attention to Heike's solution as it seems to match the positions better –  belisarius Sep 17 '11 at 21:13
    
@belisarius, true ! –  500 Sep 17 '11 at 21:18
3  
I provided an answer to this question where you originally asked it. –  Sjoerd C. de Vries Sep 17 '11 at 21:27

2 Answers 2

up vote 5 down vote accepted

You could use the ChartElementFunction option to position the sectors accurately. The first argument of ChartElementFunction is of the form {{angleMin, angleMax}, {rMin,rMax}}. The first sector has bounds {angleMin, angleMax} = {-Pi/12, Pi/12}, the second one {Pi/12, 3 Pi/12}, etc. Therefore, to get the right rotation you could do something like

Module[{Countz, maxScale, angleDivisions, dAng},
 maxScale = 4;
 angleDivisions = 12;
 dAng = (2 \[Pi])/angleDivisions;
 Countz = BinCounts[
   Flatten@Map[ArcTan @@ (# - ScreenCenter) &, list, {1}], 
    {-Pi, Pi, dAng}];

 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,

  ChartElementFunction -> 
   Function[{range}, Disk[{0, 0}, range[[2, 2]], - 11 Pi/12 + range[[1]]]]]]

enter image description here

share|improve this answer
    
the moment I thought I was good I com back and see your solution and belisarius comments, thank you I did not even paid attention to the bar location this is so neat. –  500 Sep 17 '11 at 21:20

Just checking right now, but your first plot seems flawed:

list = {{21, 16}, {16, 14}, {11, 11}, {11, 12}, {13, 15}, 
        {18, 17}, {19, 11}, {17, 16}, {16, 19}};
ScreenCenter = {20, 15};

Show[ListPlot[list, PlotStyle -> Directive[PointSize[Medium], Purple]], 
     Graphics[
              {Red, PointSize[Large], Point[ScreenCenter], 
               Circle[ScreenCenter, 10]}], 
AspectRatio -> 1, Axes -> False]

enter image description here

ListPolarPlot[{ArcTan[Sequence @@ ##], Norm[##]} &/@ (#-ScreenCenter & /@ list), 
 PolarAxes -> True, 
 PolarGridLines -> Automatic, 
 Joined -> False, 
 PolarTicks -> {"Degrees", Automatic}, 
 BaseStyle -> {FontFamily -> "Arial", FontWeight -> Bold, FontSize -> 12},
 PlotStyle -> {Red, PointSize -> 0.02}]  

enter image description here

Edit

I did not followed all your code, but a reflection on the Screen Center seems to fix the thing:

Module[{Countz, maxScale, angleDivisions, dAng}, 
 Countz = BinCounts[
               {ArcTan[Sequence @@ ##]} & /@ (# + ScreenCenter & /@ -list), 
           {-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]]

enter image description here

Edit

Here you may see the small misalignment in my code, that is solved in Heike's answer (vote for it!)

Show[Module[{Countz, maxScale, angleDivisions, dAng}, 
  Countz = BinCounts[{ArcTan[
        Sequence @@ ##]} & /@ (# + 
         ScreenCenter & /@ -list), {-\[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]],
 ListPlot[Plus[# - ScreenCenter] & /@ list/2.5, 
  PlotMarkers -> Image[CrossMatrix[10], ImageSize -> 10]]
 ]

enter image description here

share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.