Abstract
Published with great thanksgiving for Yaohushua, the living One Yahowah, "Jesus Christ."
In previous work, Formalizing Mechanical Analysis Using Sweeping Net Methods I, sweeping net
methods have been extended to complex analysis, relying on the argument of complex functions defined
on the unit circle. In this paper, we reformulate these methods purely within a real-valued and geometric
framework, avoiding the use of complex analysis. By redefining the sweeping net constructs and the
associated theorems using real functions and geometric interpretations on the unit circle, we demonstrate
how singularities and their approximations can be effectively analyzed without the need for imaginary
numbers. This approach provides intuitive geometric insights and broadens the applicability of sweeping
net methods in mathematical analysis.