斐波那契数列毕业论文

2024年4月5日发(作者：中学数学试卷模板)

华中农业大学本科毕业论文〔或设计〕

斐波那契数列

摘要

通过对斐波那契数列的定义、性质，以及它的属性的研究，介绍斐波那契数列在各

个领域，包括数学界，自然界以及社会生活的应用，从而了解和研究斐波那契数列。

关键词

斐波那契数列；定义和性质；应用

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华中农业大学本科毕业论文〔或设计〕

Geometry - the arithmetic mean inequality and its application in

algebra

Abstract

Geometry - the arithmetic average of in equality is very importa nt in equality

,

The most

widely used in modern analytical mathematics

,

Many of the conclusions proved to be using

this in equality on the basis of, Clever use of this in equality can make many of the problems

is a beautiful solution , Brought a lot of convenience for our research work. The proof of this in

equality and we are in terested in.

With the in equality continues to be prove n and be used to prove the other con clusi ons

Lead to the use of in equality greatly adva nee. Geometry - the arithmetic average of the in

equality in the extreme value, the con diti onal extremum seek ing some iterative series limit,

series conv erge nee and in equality derivati on of a large nu mber of widely used

,

Apply this

in equality can be many un expected results, It also results of the use and developme nt of a

variety of tran sformatio n. On the geometry - the arithmetic mea n in equality research and

extension, our problem-solving ideas will be to develop mathematical thinking will be a

corresp onding in crease in, which is of practical sig nifica nee to explore some of the substa

ntive issues.

Key words

Geometry - the arithmetic average of in equality ;Eleme ntary Proof ;The use of in equality

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