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在数学中,构造函数解题是一种较重要的解题方法之一。这种解题方法不仅能拓宽思路,提高解题技能和加深对数学内容的理解,而更重要的是,用构造函数解题的方法本身体现着运动变化的辩证思想,这正是微积分的基石,也是我们学习数学的一项重要任务。下面仅对三角问题举几个巧构函数解题的例子,供大家参考。
In mathematics, constructing a problem solving problem is one of the more important problem solving methods. This problem solving method can not only broaden ideas, improve problem-solving skills and deepen the understanding of mathematics content, but more importantly, the method of solving problems with constructors itself embodies the dialectical thinking of motion change, which is precisely the calculus The cornerstone is also an important task for us to study mathematics. In the following, only a few examples of problem solving of triangular problems are provided for your reference.