泰勒公式毕业答辩论文摘 要泰勒公式是高等数学中一个非常重要的内容,它将一些复杂函数近似地表示为简单的多项式函数,这种化繁为简的功能,使它成为分析和讨论其他数学问题的有力杠杆。但一般高数教材中仅介绍了如何用泰勒公式展开函数,而对泰勒公式的应用方法并未深化讨论,在教学过程中学生常因学用脱离而难以理解。本文论述了泰勒公式的一些基本内容,并着重介绍了它在数学分析中的一些应用。泰勒公式是数学分析中的重要知识,在某些题目中运用泰勒公式会达到快速解题的目的。本文主要从不同的方面对泰勒公式进行综合论述:利用泰勒公式求极限,求无穷远处极限,证明中值公式,中值点的极限,证明不等式,导数的中值,关于界的估量,方程中的应用,用泰勒公式巧解行列式。对于泰勒公式如何更广泛的应用于高等代数中这一问题,还在进一步的讨论中。关键字: 泰勒公式 极限 函数不等式 函数方程ABSTRACT Taylor formula is a very important concept in advanced mathematics. It divides complicated functions into polynomial functions. It have became a powerful leverage when we analysis and research other mathematics problem because of its simplicity. However, normal advanced mathematic textbooks only introduce how to use Taylor formula to expand the functions and never get into the applications of Taylor formula, The students are always hard to use it because we teach it detached from use in teaching process . This paper discusses some of Taylor's formula for the basic content, and focused on mathematical analysis in some applications. Taylor's formula is the mathematical analysis of the important knowledge, the use of certain topics in Taylor formula to reach the purpose of solving problems quickly. In this paper, different aspects from the Taylor formula for a comprehensive discussion: the use of Taylor's formula for the limit, for infinite distance limit, the proof of the value of the formula in the limit point to prove that inequality in the value of derivativ...
