Thank you. That's very encouraging for me to hear.

Along the lines of what you just described, solid angle is what you get when you integrate the area element without a function, or rather with the function equal to unity, and then divide the result by the radius of curvature, Omega=[Int(dA)]/R^2. As for rectilinear versus polar, since the area that Int(dA) gives is part of a sphere, it is considerably easier to work in spherical polar coordinates when finding solid angle. If you integrate in rectilinear coordinates, then the integral probably isn't being evaluated on the surface of a sphere. (Ah, good, I just saw your 2nd post and see that you made an additional comment about converting to spherical before integrating. Great point!)