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This question already has an answer here:

First off, I'm new to python and matplotlib. I need to plot several systems of implicit equations in one figure.

The equations are in form of:


Is there an easy way to plot these, other than first making the equations explicit (i.e. y=...)?

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marked as duplicate by unutbu matplotlib Jun 26 '15 at 1:51

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

up vote 3 down vote accepted

You can use contour() to do implicit plots in two space dimensions:

x = numpy.linspace(-2., 2.)
y = numpy.linspace(-2., 2.)[:, None]
contour(x, y.ravel(), 3*x + 2*y, [1])

In 3 dimensions, I suggest using Mayavi instead of matplotlib.

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Hm.. This seems to generate a different graph than the graph for y=(1-3x)/2 which should be the same. Any ideas why? – 0sh Jan 14 '11 at 15:11
@mewoshh: Could you show your exact code, please? It should be something like contour(x.ravel(), y, y-(1-3*x)/2, [0]). And the graph should be the same as for the code above. – Sven Marnach Jan 14 '11 at 15:23
It is the same as contour(x.ravel(), y, y-(1-3*x)/2, [0]). The problem is that this is not the same as the factual graph of y=(1-3x)/2. Compare this with x=np.arange(-6,6,0.01); y=(1-3*x)/2; plot(x,y). – 0sh Jan 14 '11 at 15:38
@mewoshh: You are right, confused rows and columns! Will be corrected in a second... – Sven Marnach Jan 14 '11 at 15:44
It plotted the transposed graph. Fixed now. – Sven Marnach Jan 14 '11 at 15:45
import numpy as np
import matplotlib.pyplot as plt
# Note the order of y,x.

alt text

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And for three space dimensions, I suggest using Mayavi instead. (I'll delete my answer, because yours has a picture :) – Sven Marnach Jan 14 '11 at 11:52
@Sven Marnach: I like your solution because it uses less memory. Perhaps undelete it? – unutbu Jan 14 '11 at 11:58
OK, on your special request :) – Sven Marnach Jan 14 '11 at 12:44
Thanks both of you. One thing seems to be wrong however; for instance, 3x+2y=1 & 3x+4y=5 should intercept at (-1,2). MPL however gives med an intersection point of (2,-1). What's wrong? – 0sh Jan 14 '11 at 14:30
To clarify - the above graph is not the same as the graph for y=(1-3x)/2 (the explicit version of 3x+2y=1), hence the intersection points are wrong as a result of this. This is the main problem though - your solution doesn't give the correct graph. – 0sh Jan 14 '11 at 14:41

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