It shouldn't be difficult to get a 60. First, it is easy to understand the most basic mathematics knowledge by reading textbooks. Reading textbooks in order is compulsory. There are also optional textbooks 2- 1 and 2-3. To understand these elective textbooks, you must calm down and read the main examples and exercises after class. It may take a month to watch it many times at a time. It must be easy to forget. It seems best to get a small mathematical formula law. It seems that Qian Yuan is very practical.

Get several sets of college entrance examination math papers with detailed answers, which are usually sold in bookstores.

Then that is to say, the first multiple-choice question is usually set. You are sure to do this problem. If you can't even do this, your textbook is not optimistic.

The second choice should be a complex number. This question is also given for nothing. If it is not at all, then read the textbook and understand. Generally speaking, as long as the IQ is ok, you can do it right.

Then there is a multiple-choice question, which is the program block diagram. It seems that anyone without a mathematical foundation can do it right.

There is also a multiple-choice question, probability. The chapter of 2-3 probability is generally not difficult to explain clearly. This is an elective course in mathematics.

There is also a three-view. Most junior high school students can do it, right

You must do these problems correctly. You have five questions at 25 minutes.

After that, trigonometric functions, vectors, analytic geometry, and textbooks can all be understood. Choose to fill in the blanks, with a score of 10. If you are lucky, you should be able to get one or two more.

There's another big problem. You can only answer the first question. The second question ignores the general big problem. The first possibility is arithmetic geometric series. After reading the textbook, you should practice more questions and look at the answering steps of such questions in the college entrance examination paper. It should be no problem to understand, followed by the above spatial solid geometry method, and then the frequency distribution of the big problem of 19. It may also be the probability of finding mathematical expectations. ...

If it's all the same, ten points is not difficult.

Finally, the choice of examination questions is generally geometric proof or coordinate system or inequality. Depends on which one your teacher chooses.

Personally, I think it is easier to prove geometry. In short, you can choose one to do it, or look at the textbook to do the after-school questions, then look at the answering steps of the college entrance examination paper, and finally do the multiple-choice questions yourself, and you can get points.

It shouldn't be difficult to score above 60. Personal views are for reference only.

Hand-to-hand combat has no merit, but also hard work. Give me some advice.