first mean value theorem for integrals

Summary

first mean value theorem for integrals is a theorem^[1]. It draws 2 Wikipedia views per month (theorem category, ranking #276 of 1,306).^[2]

Key Facts

• first mean value theorem for integrals's image is recorded as 积分中值定理.jpg^[3].
• first mean value theorem for integrals's instance of is recorded as theorem^[4].
• first mean value theorem for integrals's part of is recorded as mean value theorem for integrals^[5].
• first mean value theorem for integrals's main subject is recorded as definite integral^[6].
• first mean value theorem for integrals's main subject is recorded as mean^[7].
• first mean value theorem for integrals's defining formula is recorded as \exists c \in [a,b] : \int_a^b f(x) \, \mathrm{d}x = f(c) (b - a)^[8].
• first 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(c) \int_a^b \phi(x) \, \mathrm{d}x^[9].
• first mean value theorem for integrals's studied by is recorded as calculus^[10].
• first mean value theorem for integrals's Google Knowledge Graph ID is recorded as /g/122_sk21^[11].
• first mean value theorem for integrals's maintained by WikiProject is recorded as WikiProject Mathematics^[12].
• first mean value theorem for integrals's in defining formula is recorded as f^[13].
• first mean value theorem for integrals's in defining formula is recorded as \phi^[14].
• first mean value theorem for integrals's in defining formula is recorded as \int_a^b f(x) \, \mathrm{d}x^[15].
• first mean value theorem for integrals's Digital Library of Mathematical Functions ID is recorded as 1.4.E29^[16].

Why It Matters

first mean value theorem for integrals draws 2 Wikipedia views per month (theorem category, ranking #276 of 1,306).^[2]