本文是在回转曲面的共轭回转面如何确定的基础上,提出并解决了共轭回转面的再一次共轭的回转面的确定问题。在图解时应用了“旋转换面综合投影变换法”,把直线变换成一条双曲线。这样,对于任意回转面只要能给出它的法线就可以很方便地作出它的复共轭回转面。文中给出了基本几何体(圆柱、圆锥、弧锥)的复共轭回转面的图解表示及其解析公式,并用复共轭回转面的理论对斜轧生产中辊型设计,加工,修磨,以及轧机操作调整后各个几何参数的变化对产品几何形状的影响进行了详细的分析。 This paper is based on the determination of the conjugate gyration surface of the gyration surface and proposes and resolves the problem of determining the conjugate gyration surface of the conjugate gyration surface again. In the graphic application of the “rotating face integrated projection transformation method”, the straight line into a hyperbola. In this way, it is easy to make its complex conjugate gyroscopic surface for any given surface as long as its normal can be given. In this paper, we give a graphical representation of the complex conjugate gyration surfaces of basic geometries (cylinders, cones, arc cones) and their analytical formulas. The complex conjugate gyroscopic surface theory is applied to the design, processing, As well as the geometric parameters of the mill after the adjustment of the changes in the geometry of the product were analyzed in detail.