大家知道,解析几何是用代数方法解决几何问题的.这种就既体现了代数的灵活多变性、也体现了几何的直观性.因此在解决解析几何的有关问题时,如若稍加留意就会发现其中的一些结论性的问题(这里称作命题),这些命题是几何最值中的一些特殊位置或特殊图形,应用这些命题解答一些选择题、填空题的最值问题,将会起到多题一解的迅速准确作用,下面是本人在解析 As you know, analytical geometry solves geometric problems with algebraic methods. This not only reflects the flexibility and versatility of algebra, but also embodies the intuitiveness of geometry. Therefore, if you pay attention to the problem of analytical geometry, you will notice it. Discover some of the conclusive problems (herein called propositions). These propositions are special positions or special patterns in the geometrical values. Applying these propositions to answer the questions of the multiple-choice and fill-in questions will play a more important role. The quick and accurate role of a solution is as follows: