导数在经济领域的应用.doc

导数在经济领域的应用——最优化分析

13000字 22页

目录
1.摘要····························································· 3
2.引言····························································· 4
3.导数····························································· 5
3.1导数的概念及意义···············································4
3.2经济分析中的常用导数···········································5
4.导数在经济分析中的应用·············································6
4.1边际分析及其应用·············································· 7
4.2需求价格弹性分析及其应用····································· 8
4.3收入价格弹性分析及其应用····································· 11
5.最优化分析及案例··················································12
5.1边际函数求最低成本············································13
5.2边际函数求最大利润············································14
5.3资源合理利用的最优化分析······································16
6.结论······························································ 19
参考文献···························································· 20
致谢································································ 21

摘 要
数学是一种适于定量分析的比较严密的抽象符号系统，具有较强的客观性，对经济学家来说，将数学作为分析工具，不仅仅可以给企业经营者提供客观、精确的数据，更突出的作用是能够在一定程度上避免主观因素所产生的负面影响。本文灵活运用导数这一核心概念，就导数在经济领域中的应用，分别对边际分析、弹性分析以及最优化分析问题进行探讨。着重探究导数在最优化分析上的应用，主要从最低成本，最大利润以及资源最优调配这三个方面进行讨论。通过给出导数在经济领域中的应用实例，旨在印证讨论的正确性和严谨性，拓宽分析问题的思路，提高解决实际问题的能力，同时说明运导数分析问题在经济领域的重要性。
关键词：导数；经济学；边际分析；弹性分析；最优化分析


Derivative applications in economics ——optimization analysis
Abstract Math is a relatively tight for the quantitative analysis of abstract symbol systems, with a strong objectivity, for economists, mathematics as an analytical tool, not only can give business owners to provide objective, accurate data, more prominent role subjective factor can avoid the negative effects produced by a certain extent. In this paper, the flexible use of derivative core concept, the derivatives in the economic sphere of application of marginal analysis, respectively, elastic analysis and optimization analysis of issues were discussed. Focused on exploring derivative optimization analysis applications, mainly from the lowest cost, the maximum profit and the optimal allocation of resources to these three areas for discussion. Application examples are given by the derivative in the economic field, aims to discuss and confirm the correctness of rigor, broaden our thinking to analyze problems and improve the ability to solve practical problems, while the importance of transportation derivative analysis of the problem in the economic field.

Keywords: derivative; economics; marginal analysis; elastic analysis; optimization analysis