解析几何的本质是用代数方法研究图形的几何性质,它沟通了代数与几何之间的联系,体现了数形结合的重要思想,颇为精妙,但代数语言与几何背景的转化互译对学生的思维能力要求较高,一直以来学生均视之为畏途,如何才能帮助学生探索其中的规律,学会快速找到解析几何问题的突破口,笔 The essence of analytical geometry is to use algebraic methods to study the geometric properties of graphs. It communicates the connection between algebra and geometry, embodies the important idea of ​​the combination of numbers and shapes, and is rather subtle, but the translation and translation of algebraic languages ​​and geometric backgrounds is a problem for students. The students’ ability to think is high, and students have always regarded it as a fearful way. How can we help students explore the laws and learn to quickly find breakthroughs in analytical geometry?