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I want to generate a plot like the following

enter image description here

I am not sure how to generate a shading even though I can get the frame done. I'd like to know the general approach to shade certain areas in a plot in Mathematica. Please help. Thank you.

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3 Answers

up vote 8 down vote accepted

Perhaps you are looking for RegionPlot?

RegionPlot[(-1 + x)^2 + (-1 + y)^2 < 1 && 
 x^2 + (-1 + y)^2 < 1 && (-1 + x)^2 + y^2 < 1 && x^2 + y^2 < 1, 
 {x, 0, 1}, {y, 0, 1}]

Mathematica graphics

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Note the use of op_ in the following (only one set of equations for the curves and the intersection!):

t[op_] :=Reduce[op[(x - #[[1]])^2 + (y - #[[2]])^2, 1], y] & /@ Tuples[{0, 1}, 2]
tx = Texture[Binarize@RandomImage[NormalDistribution[1, .005], 1000 {1, 1}]];

Show[{

  Plot[y /. ToRules /@ #, {x, 0, 1}, PlotRange -> {{0, 1}, {0, 1}}] &@ t[Equal], 
  RegionPlot[And @@ #, {x, 0, 1}, {y, 0, 1}, PlotStyle -> tx] &@ t[Less]}, 

Frame->True,AspectRatio->1,FrameStyle->Directive[Blue, Thick],FrameTicks->None]

enter image description here

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If, for any particular reason, you want the dotted effect in your picture, you can achieve this like so:

pts = RandomReal[{0, 1}, {10000, 2}];
pts = Select[pts,
  And @@ Table[Norm[# - p] < 1, {p,
   {{0, 0}, {1, 0}, {1, 1}, {0, 1}}}] &];
Graphics[{Thick,
  Line[{{0, 0}, {1, 0}, {1, 1}, {0, 1}, {0, 0}}],
  Circle[{0, 0}, 1, {0, Pi/2}],
  Circle[{1, 0}, 1, {Pi/2, Pi}],
  Circle[{1, 1}, 1, {Pi, 3 Pi/2}],
  Circle[{0, 1}, 1, {3 Pi/2, 2 Pi}],
  PointSize[Small], Point[pts]
}]

Mathematica graphics

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1  
I wonder why some of the points seem to be "leaking": click here to see Might be some incorrect rounding or other imprecision with graphics rendering. Note that they only leak on the top left edge. –  Szabolcs Jan 1 '12 at 13:20
1  
The original post seems to have this effect as well. Of course, the points do have positive diameter. The effect seems worse using PointSize[Large] and not quite as bad with PointSize[Tiny]. –  Mark McClure Jan 1 '12 at 14:00
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