| 微分中值定理与Newton-Leibniz公式可互相证明 |
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| 引用本文: | 丁殿坤,邹玉梅.微分中值定理与Newton-Leibniz公式可互相证明[J].大学数学,2005,21(4):128-130. |
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| 作者姓名: | 丁殿坤 邹玉梅 |
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| 作者单位: | 山东科技大学,公共课部,山东,泰安,271019;山东科技大学,公共课部,山东,泰安,271019 |
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| 摘 要: | 首先用微分中值定理推出了Newton-Leibniz公式,同时也用Newton-Leibniz公式推出了三个微分中值定理,从而证明了微分中值定理与Newton-Leibniz公式可互相证明.
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| 关 键 词: | 微分中值定理 Newton-Leibniz公式 互相证明 |
| 文章编号: | 1672-1454(2005)04-0128-03 |
| 修稿时间: | 2004年9月1日 |
Differential Coefficient Median Theorem and Newton-Leibniz Formula Can Be Proved Each Other |
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| DING Dian-kun,ZOU Yu-mei.Differential Coefficient Median Theorem and Newton-Leibniz Formula Can Be Proved Each Other[J].College Mathematics,2005,21(4):128-130. |
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| Authors: | DING Dian-kun ZOU Yu-mei |
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| Abstract: | This paper proves Newton-Leibniz formula by differential coefficient medial theorem and also proves these three differential coefficient median theorems by Newton-Leibniz formula. Therefore differential coefficient median theorem and Newton-Leibniz formula can be proved each other. |
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| Keywords: | differential coefficient median theorem Newton-Leibniz formula be proved each other |
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