Independent thinking and hard training are fundamental.

Summing up and mastering the law is the trick.

Inference is a shortcut to multiple solutions to a problem.

The combination of numbers and shapes and the substitution of numbers are the most common.

Causality and reasoning are the core.

Adversity and rigor are magic weapons.

Focus on reviewing and practicing, and remember your own gains.

First of all, don't be afraid of math. Mathematics, like all other subjects, is something that every student can learn well. Believe in yourself and believe that you can learn math as well as your peers who have good math scores.

Don't be afraid of difficult questions. They are difficult because you are not familiar with conditions and conclusions, or the relationship between quantities. When you can see these relationships, you won't find it difficult. To be able to see these relationships, we can only start training from the most basic and simple place-this is exactly what many students are not interested in, and they often think it is too simple. Do you think the movements of those gymnastics champions in the Olympic Games are difficult? They all started training from the most basic and simple movements such as leg press and bending. The same is true of math learning. Those students who are very handy in solving difficult problems start with doing every simple problem well.

Any complicated and difficult math problem, if taken apart, is composed of several simple problems. If anyone can quickly break down the problem into several simple small problems, the problem will not be difficult, and this person will become an expert in solving the problem. Because this ability is what we call "analytical ability".

How can we quickly "divide" or "analyze" a mathematical problem into a simple small problem? There is only one way: take those humble "small problems" seriously, and when you are very familiar with them, they will faithfully repay you: let you become a master who can solve mathematical problems.

The following suggestions are for your reference:

1, no need to recite;

2. Mathematics has an invisible "mathematical thought", which is the soul of mathematics. In learning, we should always pay attention to understanding it and grasping it;

3. On the premise of resolutely opposing "sea tactics", we must emphasize doing a certain number of mathematical exercises;

4. Be prepared: the more you learn later, the more abstract, the more flexible and interesting you will be;

5. From primary school, mathematics knowledge is closely linked, and every bit can't be missed; If there is any omission, it should be made up in time;

6. Don't be afraid of knowledge barriers (such as encountering problems). ), the real kung fu of mathematics is practiced in front of mathematical obstacles;

Believe in yourself, start from the simplest and most basic place (also the most important place), don't worry, you will certainly gain something.