泰勒公式论文答辩

【摘要】In this paper, leads to Fermat's theorem Rolle Mean Value Theorem, and then constructing auxiliary function of the Lagrange mean value theorem and Cauchy's Mean Value Theorem to prove that. The use of Differential Mean Value Theorem (Rolle theorem, Lagrange's theorem, Cauchy's theorem) to solve a number of derivative and limit the problem. Through the polynomial approximation to function, resulting in more than a Peano-type and Lagrange remainder of the Taylor formula, using elementary functions Maclaurin expansions to address the limits and the approximate evaluation of the problem. Through the study of this article requires proficiency in differential intermediate value theorem and Taylor's formula to prove, using theorem to solve a number of conclusions related questions, so can a clear understanding of this kind of problem solving ideas.【关键词】Differential intermediate value theorem Taylor formula Derivative More than最后一个我不怎么会，所以。。。。别介意哦

This article draws out through the fima theorem rolls the theorem of mean, constructs the auxiliary function again the theorem of mean carries on the proof to west the Lagrange theorem of mean and the tan oak. (Rolls theorem using the differential theorem of mean, the Lagrange theorem, Cauchy's theorem) solves some derivatives and the limit question. Through multinomial approximating function, thus obtains has wears the Asian error term and Lagrange the error term Taylor formula, the use elementary function's Maclaurin expansion solves the limit and the approximate evaluation question. Through this article study, the request grasps the differential theorem of mean and the Taylor formula proof skilled, solves some using the theorem conclusion with it related question, enables to understand this kind of question explicitly the problem solving mentality. Differential theorem of mean Taylor formula derivative error term

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