# Polar contour plot in Maxima

How can I make a polar contour plot in Maxima? Given an expression such as

``````exp(-r) * cos(phi)
``````

I'd like to plot contours in the x-y plane which have the same value of the expression at all points along the contour.

I've tried

``````draw3d(cylindrical(exp(-r) * cos(phi), r, 0, 5, phi, 0, 2*%pi), contour=map))
``````

but `cylindrical` plots r as a function of z and phi, not z as a function of r and phi. It would be nice to not have to convert manually to Cartesian coordinates.

-

``````contour_plot(exp(-r)*cos(phi), [r,0,2], [phi, 0, 2*%pi], [transform_xy, polar_to_xy],
[gnuplot_preamble, "set cntrparam levels 10;"]);
``````

The polar_to_xy option interprets the first two variables as distance from the z axis and azimuthal angle.

-

What is the problem using something like

``````draw3d(explicit(20*exp(-x^2-y^2)-10,x,0,2,y,-3,3),
contour_levels = 15,
contour        = map,
surface_hide   = true) ;
``````

I think that in that case is straigthforward to do it.

-
So, you're right, it's always possible to convert to Cartesian coordinates and then plot using `explicit`. I was just wondering if there was a better way. –  1'' Apr 2 '14 at 3:38
You can ask directly to Mario (the programmer of the Draw Package), maybe he knows a better way. –  nicoguaro Apr 4 '14 at 1:17