| 微分学中不等式的证明 |
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| 引用本文: | 杨黎霞.微分学中不等式的证明[J].数学学习,2011,14(1):56-59. |
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| 作者姓名: | 杨黎霞 |
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| 作者单位: | 江南大学,理学院,江苏,无锡214122 |
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| 摘 要: | 针对微分学不等式列出五种常用证明方法,即利用单调性证明法,利用拉格朗日中值定理证明法,利用最值证明法,利用泰勒公式证明法,和利用凹凸性证明法.实例说明每种方法的使用细节,以达到使初学者能尽快掌握微分学不等式证明的目的.
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| 关 键 词: | 不等式 单调性 中值定理 凹凸性 |
Proofs of Inequalities by Derivatives |
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| YANG Li-xia.Proofs of Inequalities by Derivatives[J].Studies In College Mathematics,2011,14(1):56-59. |
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| Authors: | YANG Li-xia |
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| Institution: | YANG Li-xia (School of Sciences, Jiangnan University, Wuxi 214122, PRC) |
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| Abstract: | In this paper, common methods of proving inequalities by derivatives are summarized into five categories: monotonicity, differential mean-value theorem, maximum and minimum, Taylor formula, and concave-convex property. Using examples, we illustrate each method in details with the purpose of enabling learners to master the proof of inequalities by derivative quickly. |
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| Keywords: | inequality monotonieity differential mean-value theorem concave-convex property |
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