I suggest you do this. There are only a few paragraphs in the postgraduate mathematics, such as the first chapter limit. You can find out the limit contact, work out the problem there, look at the real problem in previous years and understand the solution. It takes about 4 days for a plate to be sorted out, which takes about 1 day. Find the limit of differential integral. Look at Li Yongle's analysis of real problems. One is the real problem, which is very clear. The most important thing is to talk about that. Generally, there are several issues involved. If you read less, you can pass the big questions, especially the first few big questions. Then you can take a closer look and see the probability of line generation in about 3 days. This kind of difficulty is relatively low, mainly because the traces of things are relatively rigid and have patterns. Obviously do more real questions, so I feel that it is still possible.
Don't just look at the concept without looking at the real problem. Then make sure you can't define a concept when you are nervous in the examination room. Besides, if you write the formula, I will calculate it faster. The more I write, the less I feel. Later, it was discovered that Wendeng had a book with five pages, and he only remembered the most basic formula ... so memorizing formulas is definitely more difficult than memorizing politics ... Besides, memorizing them is not necessarily useful.