查詢結果分析
來源資料
相關文獻
- 不等式中的伸縮因子
- 組織內非複記限制連記法最適配票策略之研究
- Pole Clustering Inside a Disk for Generalized State-Space Systems-An LMI Approach
- Theory of Differential Inequalities Associated with n芌Order Nonlinear Differential Equations and Their Applications to Three Point Boundary Value Problems
- Discrete Poincare-Type Inequalities
- 絕對值定積分之簡易表列式教學
- On the Characterization of Probability Measures Which Admit Poincare Inequalities
- On Some Inequalities of Martingale
- Local Time Inequlities Stopping at Any Time
- 一些新的Opial不等式
頁籤選單縮合
題 名 | 不等式中的伸縮因子=Magnifying-Shrinking Factors in an Inequality |
---|---|
作 者 | 沈淵源; | 書刊名 | 東海學報 |
卷 期 | 39:2(理學院) 民87.07 |
頁 次 | 頁45-51 |
分類號 | 314.16 |
關鍵詞 | 不等式; 伸縮因子; Inequality; Magnifying-schrinking factor; |
語 文 | 中文(Chinese) |
中文摘要 | 証明不等式的方法大致上可分為兩大煩,其一為構造分析法,其二為代數的方法; 而後者又可分為硬性配方法及軟性變大變小法。我們將此變大變小的因子稱之為伸縮因子, 並舉例說明如何選取伸縮因子使得証明不等式能更加簡化。 |
英文摘要 | There are two ways to establish an inequality: the method of structural analysis and the algebraic method. The latter can be divided into two categories: the hard (completing square) method and the soft method which we call magnifying-shrinking factor method. We give examples to explain how can we choose an appropriate magnifying-shrinking factors. It makes the proof of an inequality simpler. |
本系統中英文摘要資訊取自各篇刊載內容。