second mean value theorem for integrals

theorem in integral calculus

Intangible theorem Q4127961

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second mean value theorem for integrals

Summary

second mean value theorem for integrals is a theorem^[1].

Key Facts

second mean value theorem for integrals's instance of is recorded as theorem^[2].
second mean value theorem for integrals's part of is recorded as mean value theorem for integrals^[3].
second mean value theorem for integrals's main subject is recorded as definite integral^[4].
second mean value theorem for integrals's main subject is recorded as mean^[5].
second mean value theorem for integrals's defining formula is recorded as \exists c \in [a, b] : \int_a^b f(x) \phi(x) \, \mathrm{d}x = f(a) \int_a^c \phi(x) \, \mathrm{d}x + f(b) \int_c^b \phi(x) \, \mathrm{d}x^[6].
second mean value theorem for integrals's studied by is recorded as calculus^[7].
second mean value theorem for integrals's Google Knowledge Graph ID is recorded as /g/155s6lg_^[8].
second mean value theorem for integrals's maintained by WikiProject is recorded as WikiProject Mathematics^[9].
second mean value theorem for integrals's in defining formula is recorded as f^[10].
second mean value theorem for integrals's in defining formula is recorded as \phi^[11].
second mean value theorem for integrals's in defining formula is recorded as \int_a^b f(x) \, \mathrm{d}x^[12].
second mean value theorem for integrals's Digital Library of Mathematical Functions ID is recorded as 1.4.E30^[13].

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Quick Facts

Instance of theorem

Part of mean value theorem for integrals

Properties

Defining formula \exists c \in [a, b] : \int_a^b f(x) \phi(x) \, \mathrm{d}x = f(a) \int_a^c \phi(x) \, \mathrm{d}x + f(b) \int_c^b \phi(x) \, \mathrm{d}x

Imported from wholeness_audit_2026-05-02

In defining formula f, \phi, \int_a^b f(x) \, \mathrm{d}x

Main subject definite integral, mean

Maintained by wikiproject WikiProject Mathematics

Studied by calculus

External References (2)

Digital library of mathematical functions id 1.4.E30

Google knowledge graph id /g/155s6lg_

🌐 Available in 3 languages

enSecond mean value theorem for definite integrals ruВторая теорема о среднем zh积分第二中值定理

References

Programmatic citations — every numbered marker resolves to a verifiable graph row below.

Direct Wikidata claims

Class ancestry

[1] ↑ second mean value theorem for integrals is an instance of theorem (Q65943) [P31, primary]. Wikidata. wikidata.org.

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APA

4ort.xyz Knowledge Graph. (2026). second mean value theorem for integrals. Retrieved May 3, 2026, from https://4ort.xyz/entity/second-mean-value-theorem-for-integrals

MLA

“second mean value theorem for integrals.” 4ort.xyz Knowledge Graph, 4ort.xyz, 3 May. 2026, https://4ort.xyz/entity/second-mean-value-theorem-for-integrals.

BibTeX

@misc{4ortxyz_second-mean-value-theorem-for-integrals_2026, author = {{4ort.xyz Knowledge Graph}}, title = {{second mean value theorem for integrals}}, year = {2026}, url = {https://4ort.xyz/entity/second-mean-value-theorem-for-integrals}, note = {Accessed: 2026-05-03}}

LLM prompt

According to 4ort.xyz Knowledge Graph (aggregator of Wikidata, Wikipedia, and authoritative open-data sources): second mean value theorem for integrals — https://4ort.xyz/entity/second-mean-value-theorem-for-integrals (retrieved 2026-05-03)

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