This book covers almost all the typical problems of conic curves, comprehensively optimizes the strategy of solving analytic geometry problems, and provides a powerful way for high school students to break through the difficulties of analytic geometry and sprint for the college entrance examination. She will eliminate all kinds of mysteries about analytic geometry and easily overcome the tedious operation of analytic geometry.
At the same time, she also helps to cultivate your innovative thinking and improve your practical ability to find and solve problems. It provides a full set of dynamic classes for senior high school math teachers and math competition teachers, which brings great convenience to your teaching. It also provides a good dynamic platform for mathematics enthusiasts to study conic curves.
One of the characteristics of this book is that there are many ready-made conclusions to prove (for example, the product of two line segments is a constant value, and a straight line must pass through a vertex, etc.). ). When reading, you can try to write your own proof process first, and then look at the answer if you can't write it. Another feature of this book is that it uses many methods that are rarely used in solving problems, such as setting a straight line as x = my+n, the second definition of conic curve and so on.
This book is still very good, but it contains a lot of content. If you want to read this book, brush a certain amount of conic questions before reading it, otherwise it is a waste of time to read this book.