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关于三个或三个以上的实变量的諾模图,已經有不少方法制作和使用,本文介紹关于复变量的諾模图,供大家参考。一、制作原理在平面上取定直角坐标系oxy以后,平面上点集合便与复数集合之間有一个一一对应,故平面上的点M有坐标(x,y),那末与它对应的复数就是z=x+iy。 給定函数: w=f(z),w为复数 w=u+iv。記f(z)之实部与虛部分别为φ(x,y),ψ(x,y),則
There are many methods for making and using nomograms with three or more real variables. This article describes nomograms of complex variables for your reference. First, the production principle In the plane to take the rectangular coordinate system XY, the point set on the plane and the complex number set there is a one-to-one correspondence, so the point on the plane M coordinates (x, y), then it corresponds to The complex number is z=x+iy. Given a function: w=f(z), w is a complex number w=u+iv. Remember that the real and imaginary parts of f(z) are φ(x,y) and ψ(x,y) respectively.