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What basic problems are suitable for liberal arts mathematics in senior three?
Let's talk about some scattered modules first. For example, your algorithm will have a small problem of five points. Linear regression will make a small problem of five points. Three views will lead to a small problem of five points. Complex numbers and sets will each have a small problem of five points. Vectors may or may not cause small problems, but they will combine with trigonometric functions to form big problems. Or combine it with analytic geometry to form a big problem. The binomial theorem will do a five-point problem.

Several other larger modules:

First of all, the big problem of trigonometric function module is generally based on solving triangles. There may be a big problem with the series. The problem is that some formulas of identity transformation of trigonometric functions will be reflected in the conditions of solving triangles. From the past experience, trigonometric function and sequence are the alternatives in the first big problem.

Secondly, the solid geometry module, which will produce a big problem. The difficulty is moderate. The calculation amount can be larger. But the general idea will be clear.

Then the probability statistics module. This part is a compulsory exam. A big question must be tested. This problem is not difficult, but it is very innovative.

Then the analytic geometry module. Analytic geometry is often a fuss, accounting for about 17. This chapter is more difficult. Especially, the calculation of the second problem of analytic geometry is very large.

Finally, the derivative part. The pouring part will definitely produce a grand ending of 12 points. It is very difficult.

In the end, the choice is left. Choose to do the problem, ten points. You can choose a parametric equation. You can also choose inequality. It depends on who is good at it.