New properties of the Intermediate Point from Bonnet Theorem

Pop, Emilia-Loredana; Duca, Dorel I.; Raţiu, Augusta

doi:10.2478/gm-2024-0002

Abstract

In this paper, the following result is presented: if f, g : [a, b] → ℝ are two continuous functions and f is monotone, then there exists a function ̄c : [a, b] → [a, b] continuous in a with the property: $\int_{a}^{x} f (t) g (t) d t = f (a) \int_{a}^{\bar{c} (x)} g (t) d t + f (x) \int_{\bar{c} (x)}^{x} g (t) d t,$ \int_a^x {f\left( t \right)g\left( t \right){\rm{d}}t = f\left( a \right)\int_a^{\bar c\left( x \right)} {g\left( t \right){\rm{d}}t + f\left( x \right)\int_{\bar c\left( x \right)}^x {g\left( t \right){\rm{d}}t,} } } for all x ∈ [a, b]. Then, under specified conditions, the function ̄c that is differentiable at point a is presented, and ${\bar{c}}^{'} (a)$ \bar c'\left( a \right) is also calculated.

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New properties of the Intermediate Point from Bonnet Theorem

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