根据科学方法论的 RMI 原则,利用复数解决平面几何问题有很大的优越性。作为解决平面几何难题的一种有效方法,值得向读者推荐。但限于篇幅,本文摘要介绍如下。利用复数解决平面几何问题的 RMI 原则,就是先将平面几何问题化为复数范围内的问题,通过复数求解后,再返回原来的平面几何问题。这种方法的解题步骤,与平面解析几何学极为相似,所不同的,在平面解析几何学用实数对(x、y)表示一点,然后把平面几何问题 According to the scientific methodology of the RMI principle, the use of complex numbers to solve the problem of plane geometry has great advantages. As an effective way to solve the plane geometry problem, it is worth recommending to readers. However, due to space limitations, this paper summarizes the following. The RMI principle that uses complex numbers to solve plane geometry problems is to convert the plane geometry problems into complex range problems first and then return to the original plane geometry problems by complex numbers. The solving steps of this method, which are very similar to those of plane analytic geometry, differ in that plane analytic geometry uses a real number to represent (x, y) a point, and then the plane geometry problem