I mean graphs where a slice of a 3d surface yeilsds a 2d graph. How To Slice $Re(1/(1+z))$ Into A Cartesian Function For Any Angle?
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I think it's called complex analysis, but thanks for pointing me to your earlier, very interesting question. – David K Oct 26 '17 at 16:24
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@ DavidK Complex analysis is fairly large. Is there a particular area of complex analysis that deals with this? Something to do with Functions perhapse? – User3910 Oct 26 '17 at 22:44
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1Actually your earlier question uses bits and pieces of a few things; complex functions and linear algebra come to mind. It's not quite a real three-D space nor a complex space, however, due to the combination of complex input and real output of the graphed function. But you can relate it to the intersection of surfaces in real Euclidean space with Cartesian coordinates. – David K Oct 27 '17 at 03:56
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https://mathematica.stackexchange.com/questions/138808/plotting-a-2d-slice-of-a-3d-function – User3910 Nov 01 '17 at 16:50