Is there a way to convert a Cartesian expression in SymPy to a polar one? I have the following expression:

1/sqrt(x^2+y^2)

However, I can't seem to get SymPy to acknowledge that this is 1/r in polar coordinates. I tried using the 'subs' command, both of the following options (I imported sympy as asp, and defined all of the symbols earlier):

expr = 1/sp.sqrt(x**2+y**2)
expr.subs((x,y),(r*cos(theta),r*sin(theta))
expr.subs((sp.sqrt(x**2+y**2),sp.atan(y/x)),(r,theta))

but in both cases, I simply receive the original expr again.

Is there a way to convert a Cartesian expression to a polar one in SymPy?

up vote 0 down vote accepted
subs((x,y),(r*cos(theta),r*sin(theta))

is not a correct syntax for subs. When multiple symbols are to be replaced, one has to provide either a dictionary

subs({x: r*sp.cos(theta), y: r*sp.sin(theta)})

or an iterable with pairs (old, new) in it:

subs(((x, r*sp.cos(theta)), (y, r*sp.sin(theta))))

The former is more readable; the latter is needed when substitutions must be carried out in a particular order (not the case here).

Either way, to achieve 1/r you also need to declare r as nonnegative

r = sp.symbols('r', nonnegative=True)

and simplify the result of substitution:

expr.subs({x: r*sp.cos(theta), y: r*sp.sin(theta)}).simplify()
  • It works now, thanks for your help! I just assumed the syntax would be like that, without questioning it. – Linde Apr 22 at 14:39
  • Ok. On Stack Overflow one usually marks the best answer as accepted by clicking the checkmark to the left of it. – Welcome to Stack Overflow Apr 22 at 15:28

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