# Make contour of scatter

In python, If I have a set of data

``````x, y, z
``````

I can make a scatter with

``````import matplotlib.pyplot as plt
plt.scatter(x,y,c=z)
``````

How I can get a `plt.contourf(x,y,z)` of the scatter ?

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## 2 Answers

Use the following function to convert to the format required by contourf:

``````from numpy import linspace, meshgrid
from matplotlib.mlab import griddata

def grid(x, y, z, resX=100, resY=100):
"Convert 3 column data to matplotlib grid"
xi = linspace(min(x), max(x), resX)
yi = linspace(min(y), max(y), resY)
Z = griddata(x, y, z, xi, yi)
X, Y = meshgrid(xi, yi)
return X, Y, Z
``````

Now you can do:

``````X, Y, Z = grid(x, y, z)
plt.contourf(X, Y, Z)
``````

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you import griddata from ? ... `from scipy.interpolate import griddata` or `from matplotlib.mlab import griddata` – JuanPablo Sep 12 '13 at 13:08
@JuanPablo, ups, you are right, fixed(`from matplotlib.mlab import griddata` is the right one). – elyase Sep 12 '13 at 13:12

`contour` expects regularly gridded data. You thus need to interpolate your data first:

``````import numpy as np
from scipy.interpolate import griddata
import matplotlib.pyplot as plt
import numpy.ma as ma
from numpy.random import uniform, seed
# make up some randomly distributed data
seed(1234)
npts = 200
x = uniform(-2,2,npts)
y = uniform(-2,2,npts)
z = x*np.exp(-x**2-y**2)
# define grid.
xi = np.linspace(-2.1,2.1,100)
yi = np.linspace(-2.1,2.1,100)
# grid the data.
zi = griddata((x, y), z, (xi[None,:], yi[:,None]), method='cubic')
# contour the gridded data, plotting dots at the randomly spaced data points.
CS = plt.contour(xi,yi,zi,15,linewidths=0.5,colors='k')
CS = plt.contourf(xi,yi,zi,15,cmap=plt.cm.jet)
plt.colorbar() # draw colorbar
# plot data points.
plt.scatter(x,y,marker='o',c='b',s=5)
plt.xlim(-2,2)
plt.ylim(-2,2)
plt.title('griddata test (%d points)' % npts)
plt.show()
``````

Note that I shamelessly stole this code from the excellent matplotlib cookbook

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when I use gridata of `scipy.interpolate`, the program are running a long time, this never stop. – JuanPablo Sep 12 '13 at 13:50
That of course depends on your data, which you didn't specify in your initial post. You should definitely try playing with the `method` argument of `griddata`. Try `method="nearest"`, which should give the fastest interpolation. – David Zwicker Sep 12 '13 at 14:00