The suggestion is that after reading the textbook of Advanced Mathematics in 45 days, remember to watch a chapter of video, watch a chapter of teaching material in combination with video (you don't need a poor foundation), and then do the corresponding exercises immediately after class. Every problem should be calculated, and no speed is required. We need accuracy, and you can be accurate. Your effect may be three times better than others. Be sure to mark the knowledge points of the questions that you won't know the first time, and consolidate what you have marked this week every Sunday. If it still doesn't work, just focus on the mark, this is the first time! Then, it takes 10 to 15 days to see the problem for the first time, and ask for suggestions to fix it as much as possible!
Summarize the rules, such as: trigonometric function big questions, find eight different trigonometric function big questions to compare (generally look at the real questions in recent years), see what commonly used problem-solving methods and ideas are, be sure to compare, remember different problem-solving ideas, and then try to figure it out yourself, so that the next time you encounter trigonometric functions, you will definitely have some problem-solving ideas. Basically, a big problem and eight big problems can cover the basic problem-solving ideas with different ideas. As a result of this kind of training, when you encounter a big problem, you have a direction and thinking. You can try. The same is true of your specialized courses and English compositions.
In this way, the first round will last no more than 2 months, but laying a good foundation will get twice the result with half the effort. Ok, the first round of review for postgraduate mathematics is over. I hope everyone will do a good job in every day's work strictly, and you must give yourself a plan that is strictly implemented, so that you can see how much you review according to time every day.