I think this question is better posed on sage-support, which I am cc'ing. sage-edu is about teaching with SAGE.
Am I correct in assuming you have a parameterization of your line integral (with parameter q) and so you can write the contour integral as int_a^b f(q) dq after some substitutions? I'm not sure where you are stuck. On Mon, May 12, 2008 at 3:29 PM, ohitmano <[EMAIL PROTECTED]> wrote: > > Hi all, need do solve contour integral of a very complex function > contour is provided with equations: x = cos(q) + cos(4q); y = sin(q) - > sin(4q). > function is very long and complex and I won't post it here, but will > say about some conditions: > it depends on variable(r) that must be >0 because it contains log() > and if r = 0 then there will be devision by zero. > > Can somebody tell me how can I solve contour integral in sage? > > > > --~--~---------~--~----~------------~-------~--~----~ To post to this group, send email to sage-support@googlegroups.com To unsubscribe from this group, send email to [EMAIL PROTECTED] For more options, visit this group at http://groups.google.com/group/sage-support URLs: http://www.sagemath.org -~----------~----~----~----~------~----~------~--~---
