Let R be a region in the z-plane defined by points x + iy, and let S be a region of the w-plane defined by points u + iv. If
defines a set of points in S for each point in R, eq. 8.1 is a mapping or a transformation from R to S. This mapping can also be written as two real transformation equations
$$ w = f(z) $$
$$ u = u(x,y) $$
$$ v = v(x,y) $$
KeywordsConformal Mapping Bilinear Mapping Invariant Point Bilinear Transformation Equipotential Curf
These keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.
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