# I want to use matplotlib to make a 3d plot given a z function

I have a z function that accepts x and y parameters and returns a z output. I want to plot this in 3d and set the scales. How can I do this easily? I've spent way too much time looking through the documentation and not once do I see a way to do this.

-
The capability for 3D plots in matplotlib was only added in very recent versions, as far as I know. –  David Z Jan 4 '12 at 6:33
I've already looked at that page and was unable to find any example of passing an arbitrary z-function to a 3d plotter –  WhatsInAName Jan 4 '12 at 6:39

The plotting style kind of depends on your data (i.e. are you trying to plot a 3d curve, or a surface, or a scatter...), but this should give you an working example to start playing with.

Basically, you don't pass the function to the plot, you first create a domain of xs and ys, and then calculate the zs from that. In my example I've just used a simple grid of evenly spaced points in the x-y plane for the domain.

``````import numpy as np
from mpl_toolkits.mplot3d import Axes3D
import matplotlib.pyplot as plt
import random

def fun(x, y):
return x + y

fig = plt.figure()
n = 10
xs = [i for i in range(n) for _ in range(n)]
ys = range(n) * n
zs = [fun(x, y) for x,y in zip(xs,ys)]

ax.scatter(xs, ys, zs)

ax.set_xlabel('X Label')
ax.set_ylabel('Y Label')
ax.set_zlabel('Z Label')

plt.show()
``````

For surfaces it's a bit different, you pass in a grid for the domain in 2d arrays. Here's a smooth surface example:

``````import numpy as np
from mpl_toolkits.mplot3d import Axes3D
import matplotlib.pyplot as plt
import random

def fun(x, y):
return x**2 + y

fig = plt.figure()
x = y = np.arange(-3.0, 3.0, 0.05)
X, Y = np.meshgrid(x, y)
zs = np.array([fun(x,y) for x,y in zip(np.ravel(X), np.ravel(Y))])
Z = zs.reshape(X.shape)

ax.plot_surface(X, Y, Z)

ax.set_xlabel('X Label')
ax.set_ylabel('Y Label')
ax.set_zlabel('Z Label')

plt.show()
``````

-
For some reason when I change the function, the graph pretty much stays the same? Is there any way to just do a smooth surface? –  WhatsInAName Jan 4 '12 at 6:59
OK, I've updated my answer with a sloping parabolic surface. –  wim Jan 4 '12 at 7:33