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I am trying to plot the region $x^{p}+y^{p}\le 1$ in the xy-plane. But when I ran commands like this:

RegionPlot[x^0.7 + y^0.7 <= 1, {x, -500, 500}, {y, -500, 500}]

I always encounter error messages like:

LessEqual::nord: Invalid comparison with -91.0952+125.382 I attempted. >>

I am confused - how can I make mathematican know I am seeking the region in R^{2}, not in C^{2}?

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you accepted an answer too quick see below.. – agentp Dec 31 '12 at 17:54

3 Answers 3

up vote 1 down vote accepted

Your plotting range is invalid. You're calculating (-500)^0.7, which is a complex number (-45.5509762 + 62.69554i to be specific).

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You might suggest using Re or Im or Abs. – b.gatessucks Dec 30 '12 at 16:58

The invalid comparison error is actually not the problem here. RegionPlot[] will plot the region where the expression evaluates to True. The regions where the expression is complex do not evaluate True and regionplot will leave them blank.

The reason you see a fully blank plot is simply that your absolute range is too large. RegionPlot uses a coarse grid by default and misses the small True region all together.

This works (throwing the Invalid comparison as a warning)

RegionPlot[TrueQ[( x^0.7 + y^0.7 <= 1)], {x, -1, 1}, {y, -1, 1},
             PlotPoints -> 100]

enter image description here

You can surpress the warning:

Quiet[RegionPlot[TrueQ[( x^0.7 + y^0.7 <= 1)], {x, -1, 1}, {y, -1, 1},
             PlotPoints -> 100], {LessEqual::nord}]
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RegionPlot[Table[x^i + y^i <= 1, {i,.1,1,.1}], {x,0,1}, {y,0,1}, Evaluated->True]

Mathematica graphics

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