Mathematica and the complex plane
- To: mathgroup
- Subject: Mathematica and the complex plane
- From: stevec (Steve Christensen)
- Date: Tue, 11 Apr 89 19:43:51 CDT
>From @VMD.CSO.UIUC.EDU:zaccone at sol.bucknell.edu Tue Apr 11 16:04:44 1989 Received: from bardeen.ncsa.uiuc.edu by yoda.ncsa.uiuc.edu (4.0/NCSA-1.2) id AA05896; Tue, 11 Apr 89 16:04:42 CDT Received: from newton.ncsa.uiuc.edu by bardeen.ncsa.uiuc.edu (4.0/NCSA-1.2) id AA24390; Tue, 11 Apr 89 16:02:06 CDT Received: from VMD.CSO.UIUC.EDU by newton.ncsa.uiuc.edu (4.0/NCSA-1.2) id AA12119; Tue, 11 Apr 89 16:02:02 CDT Received: from BKNLVMS.BITNET by VMD.CSO.UIUC.EDU (IBM VM SMTP R1.2) with BSMTP id 2679; Tue, 11 Apr 89 16:02:03 CDT Return-Path: zaccone%sol.bucknell.edu at VMD.CSO.UIUC.EDU Received: from rigel.bucknell.edu by BKNLVMS.BITNET; Tue, 11 Apr 89 16:57 EDT Received: by rigel.bucknell.edu (4.0/SMI-3.2) id AA04064; Tue, 11 Apr 89 16:56:03 EDT Date: Tue, 11 Apr 89 16:56:03 EDT From: Rick Zaccone <zaccone%sol.bucknell.edu at VMD.CSO.UIUC.EDU> Subject: Mathematica and the complex plane To: steve at ncsa.uiuc.edu Message-Id: <8904112056.AA04064 at rigel.bucknell.edu> Status: R Could you please forward this to sci.math.symbolic and anywhere else that seems appropriate? I would like to know how to get Mathematica to produce plots in the complex plane. For example, if x is complex, how do I graph the following on the complex plane? Abs[ 1 + x + x^2/2] == 1 Rick Zaccone zaccone at bknlvms.bitnet zaccone at rigel.bucknell.edu