# polar plot in python

I am trying to make a polar plot of 1/t. What I have so far is below (which may be wrong). How can I finish this or make it work?

from pylab import *
import matplotlib.pyplot as plt

theta = arange(0, 6 * pi, 0.01)

def f(theta):
return 1 / theta

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Check out the matplotlib gallery, which has example plots, and if you click them, will show you the respective source code to generate them. –  mtadd Apr 10 '13 at 21:27
can you specify what you mean by polar plot? –  Bitwise Apr 10 '13 at 21:27
@Bitwise I will post a Mathematica picture of it. –  dustin Apr 10 '13 at 21:31
@mtadd If you would look at the gallery, you would realize that is how some of the code was generated. –  dustin Apr 10 '13 at 21:36
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## 3 Answers

from mpl_toolkits.axes_grid.axislines import SubplotZero
from matplotlib.ticker import MultipleLocator, FuncFormatter
import matplotlib.pyplot as plt
import numpy as np

plt.ion()

fig = plt.figure(1)
ax = SubplotZero(fig, 111)
fig.add_subplot(ax)

for dir in ax.axis:
ax.axis[dir].set_visible(dir.endswith("zero"))

ax.set_xlim(-.35,.4)
ax.set_ylim(-.25,.45)
ax.set_aspect('equal')

tick_format = lambda x, i: '' if x == 0.0 else '%.1f' % x
for a in [ax.xaxis, ax.yaxis]:
a.set_minor_locator(MultipleLocator(0.02))
a.set_major_formatter(FuncFormatter(tick_format))

theta = np.arange(2*np.pi/3,6*np.pi,0.01)
r = 1 / theta

ax.plot(r*np.cos(theta), r*np.sin(theta), lw=2)

plt.show()
raw_input()

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is there a less esoteric way to generate the axis? I can understand the part that plots the function but the axis generation is too complicated for me. –  dustin Apr 10 '13 at 23:49
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If you want a square plot like Mathematica gave you, the standard plot function just takes an array of x values and an array of y values. Here, f(theta) is the radius, and cos and sin give the x and y directions, so

plt.plot(f(theta)*cos(theta), f(theta)*sin(theta))

should do the job. This will show all of the data, rather than a cleverly chosen subset like in Mathematica, so you might want to limit it. For example:

plt.xlim((-0.35,0.43))
plt.ylim((-0.23,0.45))

gives me the ranges in your version.

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I think the problem is that your first value of f(theta) is 1/0 = inf

theta = np.arange(0, 6*np.pi, .01)[1:]

def f(x):
return 1/x

plt.polar(theta, f(theta))

and it looks even nicer if you zoom in:

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