Lecture

Test_VF_suite_Cauchy

Description

This lecture discusses a real function that is increasing and bounded, from which a sequence a_n is defined. The question addressed is whether a_n is a Cauchy sequence. It is shown that since f is increasing and bounded, a_n is also increasing and bounded, leading to the conclusion that a_n is convergent, which is equivalent to a_n being Cauchy.

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Official source

https://mediaspace.epfl.ch/media/0_iobxm7k7

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Ontological neighbourhood

Mathematics

Analysis: Calculus

Topology: General topology

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