Complementing the answer of @DanHickstein, you can also use `trisurf`

to visualize the polygons obtained in the marching cubes phase.

```
import numpy as np
from numpy import sin, cos, pi
from skimage import measure
import matplotlib.pyplot as plt
from mpl_toolkits.mplot3d import Axes3D
def fun(x, y, z):
return cos(x) + cos(y) + cos(z)
x, y, z = pi*np.mgrid[-1:1:31j, -1:1:31j, -1:1:31j]
vol = fun(x, y, z)
iso_val=0.0
verts, faces = measure.marching_cubes(vol, iso_val, spacing=(0.1, 0.1, 0.1))
fig = plt.figure()
ax = fig.add_subplot(111, projection='3d')
ax.plot_trisurf(verts[:, 0], verts[:,1], faces, verts[:, 2],
cmap='Spectral', lw=1)
plt.show()
```

### Update: May 11, 2018

As mentioned by @DrBwts, now marching_cubes return 4 values. The following code works.

```
import numpy as np
from numpy import sin, cos, pi
from skimage import measure
import matplotlib.pyplot as plt
from mpl_toolkits.mplot3d import Axes3D
def fun(x, y, z):
return cos(x) + cos(y) + cos(z)
x, y, z = pi*np.mgrid[-1:1:31j, -1:1:31j, -1:1:31j]
vol = fun(x, y, z)
iso_val=0.0
verts, faces, _, _ = measure.marching_cubes(vol, iso_val, spacing=(0.1, 0.1, 0.1))
fig = plt.figure()
ax = fig.add_subplot(111, projection='3d')
ax.plot_trisurf(verts[:, 0], verts[:,1], faces, verts[:, 2],
cmap='Spectral', lw=1)
plt.show()
```

### Update: February 2, 2020

Adding to my previous answer, I should mention that since then PyVista has been released, and it makes this
kind of tasks somewhat effortless.

Following the same example as before.

```
from numpy import cos, pi, mgrid
import pyvista as pv
#%% Data
x, y, z = pi*mgrid[-1:1:31j, -1:1:31j, -1:1:31j]
vol = cos(x) + cos(y) + cos(z)
grid = pv.StructuredGrid(x, y, z)
grid["vol"] = vol.flatten()
contours = grid.contour([0])
#%% Visualization
pv.set_plot_theme('document')
p = pv.Plotter()
p.add_mesh(contours, scalars=contours.points[:, 2], show_scalar_bar=False)
p.show()
```

With the following result

### Update: February 24, 2020

As mentioned by @HenriMenke, `marching_cubes`

has been renamed to `marching_cubes_lewiner`

. The "new" snippet is the following.

```
import numpy as np
from numpy import cos, pi
from skimage.measure import marching_cubes_lewiner
import matplotlib.pyplot as plt
from mpl_toolkits.mplot3d import Axes3D
x, y, z = pi*np.mgrid[-1:1:31j, -1:1:31j, -1:1:31j]
vol = cos(x) + cos(y) + cos(z)
iso_val=0.0
verts, faces, _, _ = marching_cubes_lewiner(vol, iso_val, spacing=(0.1, 0.1, 0.1))
fig = plt.figure()
ax = fig.add_subplot(111, projection='3d')
ax.plot_trisurf(verts[:, 0], verts[:,1], faces, verts[:, 2], cmap='Spectral',
lw=1)
plt.show()
```