# Replacing Disks by Crosses using Graphics in Mathematica

Consider the following list :

``````dalist = {{47.9913, 11.127, 208}, {47.5212, 10.3002, 208},
{49.7695, 9.96838, 160}, {48.625, 12.7042, 436}}
``````

Those are coordinatees of Eye fixations on a screen where, within each sublist,

`#1` is the X coordinate,

`#2` the Y coordinate and

`#3`, the duration spent at that particular location

I then use the following :

``````Disk[{#[[1]], #[[2]]}, 3N[#[[3]]/Total[dalist[[All, 3]]]]] & /@ dalist
``````

to draw disk with duration weighted diameter.

I would like to draw cross instead where the 2 segments intersect at their middle and the length of each is equivalent to the disk diameter as illustrated bellow.

This is what I have yet :

``````Graphics[{
Line[{{#[[1]] - 3 N[#[[3]]/Total[dalist[[All, 3]]]], #[[2]]},
{#[[1]] + 3 N[#[[3]]/Total[dalist[[All, 3]]]], #[[2]]}}] & /@ dalist,
Line[{{#[[1]], #[[2]] - 3 N[#[[3]]/Total[dalist[[All, 3]]]]},
{#[[1]], #[[2]] + 3 N[#[[3]]/Total[dalist[[All, 3]]]]}}] & /@ dalist}]
``````

I was wondering if there was a simpler way, using something similar to PlotMarkers that exist in ListPlot

-
You have come this far. Why can't you draw two lines? –  Sjoerd C. de Vries Jun 25 '11 at 12:32
It'd probably be easier if you normalized the durations separately from constructing the graphics primitives. –  Brett Champion Jun 25 '11 at 12:43
@Sjoerd, please see the edit above, it just feels a bit wrong, this is why I allow myself to ask. –  500 Jun 25 '11 at 12:55
@Brett, ok, will try, thank you for the advise. –  500 Jun 25 '11 at 12:56
@500 +1 That's much better. It's always good to show what you have done so far. It's easier to spot the problem behind the problem. –  Sjoerd C. de Vries Jun 25 '11 at 14:15
show 1 more comment

Use two lines. Something like:

``````pointTrans =
{
Line[{{#[[1]] - l, #[[2]]}, {#[[1]] + l, #[[2]]}}],
Line[{{#[[1]], #[[2]] - l}, {#[[1]], #[[2]] + l}}]
} /. l -> #[[3]]/Mean[dalist[[All, 3]]] &;

pointTrans /@ dalist // Graphics // Show
``````
-
thank You ! –  500 Jun 25 '11 at 13:00

As you can already draw the circles, why not just use that like so:

``````circles=Graphics[Disk[{#[[1]], #[[2]]}, 3 N[#[[3]]/Total[dalist[[All, 3]]]]] & /@ dalist]
``````

and then

``````circles /. Disk[{x_, y_}, r_] :> Line[{{{x, y - r/2}, {x, y + r/2}}, {{x - r/2, y}, {x + r/2, y}}}]
``````

giving

-
Thank You again ! –  500 Jun 25 '11 at 13:46
+1 Funny, shows off MMA's mighty pattern matching capabilities. Of course, not the way to do if you start from scratch. –  Sjoerd C. de Vries Jun 25 '11 at 14:18
@Sjoerd obviously not, the way would be to actually draw a cross at each point, just like you suggested in your comment to the question :) –  acl Jun 25 '11 at 14:20

I think a little helper function is convenient here:

``````makeCross[{x_, y_, r_}, total_] := With[{scale = 3*r/total},
Line[{{{x - scale, y}, {x + scale, y}}, {{x, y - scale}, {x, y + scale}}}]]

total = Total[dalist[[All, 3]]];

Graphics[makeCross[#, mean] & /@ dalist]
``````
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thank You ! –  500 Jun 25 '11 at 14:00

You could also use `BubbleChart`:

``````plus[{x:{x0_, x1_}, y:{y0_, y1_}}, __] :=
Line[{{{x0, Mean[y]}, {x1, Mean[y]}}, {{Mean[x], y0}, {Mean[x], y1}}}]

BubbleChart[dalist, ChartElementFunction -> plus] (*or maybe "MarkerBubble" instead of plus*)
``````

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Thank You, May I ask you your opinion on the following : stackoverflow.com/questions/6477753/… I am really struggling there. Many thanks for your attention –  500 Jun 25 '11 at 16:06

I would like to offer this modification of Artefacto's code.

``````pointTrans =
With[{l = #3/2/Mean@dalist[[All, 3]]},
Line@{{{# - l, #2}, {# + l, #2}}, {{#, #2 - l}, {#, #2 + l}}}
] &;

Graphics[{Thick, pointTrans @@@ dalist}]
``````

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Thank you Mr. Wizard ! –  500 Aug 24 '11 at 14:43