微积分的中间点与积分中值定理有关

General Letters in Mathematics Pub Date : 2020-06-01 DOI:10.2478/gm-2020-0005

Emilia-Loredana Pop, D. Duca, A. Raţiu

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引用次数: 0

摘要

摘要若f, g: [a, b]→𝕉是两个连续函数，则存在一个点c∈(a, b)使得∫acf(x)dx+(c-a)g(c)=∫cbg(x)dx+(b-c)f(c)。\int ＿a^c {f\left (x \right) }dx +\left ({c - a}\right)g \left (c \right) = \int ＿c^b {g\left (x \right) }dx +\left ({b - c}\right)f \left (c \right)。本文研究了当b趋近于a时，点c趋近于a的问题。

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Calculus for the intermediate point associated with a mean value theorem of the integral calculus

Abstract If f, g: [a, b] → 𝕉 are two continuous functions, then there exists a point c ∈ (a, b) such that ∫acf(x)dx+(c-a)g(c)=∫cbg(x)dx+(b-c)f(c). \int_a^c {f\left(x \right)} dx + \left({c - a} \right)g\left(c \right) = \int_c^b {g\left(x \right)} dx + \left({b - c} \right)f\left(c \right). In this paper, we study the approaching of the point c towards a, when b approaches a.

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General Letters in Mathematics

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审稿时长

6 weeks