Working with implicit functions in Mathematica

Can I plot and deal with implicit functions in Mathematica?

for example :-

`x^3 + y^3+z^3 -6x*y*z==0`

Can I plot a function like this?

-
why did someone edit to add a "z" not at all in the original question or any of the answers? –  george Feb 14 '13 at 18:16
That is not a function, it is an equation in the three Cartesian coordinates x, y, and z. The left-hand side of the equation, however, can be considered to give the 'rule' for a map (function) from \R^3 to \R. The equation then gives a particular level set of this scalar field (map, function), which is a two-dimensional surface in space. –  Andreas Rejbrand Oct 15 '13 at 14:25

``````ContourPlot[x^3 + y^3 == 6*x*y, {x, -2.7, 5.7}, {y, -7.5, 5}]
``````

1. Note the double equals sign and the multiplication symbols.
2. You can find this exact input via the WolframAlpha interface. This interface is more forgiving and accepts your input almost exactly - although, I did need to specify that I wanted some type of plot.

-
+1 for nice use of Wolfram|Alpha. –  Arnoud Buzing Jan 12 '12 at 4:04
thank you man .. but I didn't mean only plotting .. I want to deal with it .. like differentiation and stuff .. can I differentiate this equation implicitly ? –  Omar Osama Jan 13 '12 at 10:07

Yes, using `ContourPlot`.

And it's even possible to plot the text `x^3 + y^3 = 6xy` along its own curve, by replacing the `Line` primitive with several `Text` primitives:

``````ContourPlot[x^3 + y^3 == 6 x y, {x, -4, 4}, {y, -4, 4},
Background -> Black, PlotPoints -> 7, MaxRecursion -> 1, ImageSize -> 500] /.
{
Line[s_] :>
Map[
Text[Style["x^3+y^3 = 6xy", 16, Hue[RandomReal[]]], #, {0, 0}, {1, 1}] &,
s]
}
``````

Or you can animate the equation along the curve, like so:

``````res = Table[ Normal[
ContourPlot[x^3 + y^3 == 6 x y, {x, -4, 4}, {y, -4, 4},
Background -> Black,
ImageSize -> 600]] /.
{Line[s_] :> {Line[s],
Text[Style["x^3+y^3 = 6xy", 16, Red], s[[k]], {0, 0},
s[[k + 1]] - s[[k]]]}},
{k, 1, 448, 3}];

ListAnimate[res]
``````

-
Hardy har har! I can't decide if I should up vote or down vote. :) –  Mark McClure Jan 12 '12 at 3:55
How could one not vote for this answer: how could one possibly resist the "equation train" running along the track? –  murray Jan 12 '12 at 4:28
``````ContourPlot[x^3 + y^3 == 6 x*y, {x, -10, 10}, {y, -10, 10}]