数学思想方法是数学的灵魂,是知识的综合和能力的提升,学习数学就是要学习数学的解题思想和方法。《圆锥曲线》一章蕴含了许多数学思想,同学们在掌握其基础知识的同时,还应注意数学思想的提炼和总结。下面介绍几例,供同学们参考。一、函数与方程思想在解析几何里,不少问题中某些元素处于运动变化之中,存在着相互联系、相互制约的量,它们之间往往构成函数关系,从而可用函数的思想方法来 Mathematical thinking method is the soul of mathematics, is the synthesis of knowledge and ability to enhance, learning mathematics is to learn the mathematical problem-solving ideas and methods. The chapter “Conic Curve” contains many mathematical ideas. Students should pay attention to the refinement and conclusion of mathematical ideas while mastering their basic knowledge. Here are a few examples for the students reference. First, the function and equation ideas In analytic geometry, some of the problems in some elements in the movement changes, there are interrelated, mutual restraint of the amount, between them often constitute a functional relationship, which can be used to think of ways to function