JIPAM - Journal of Inequalities in Pure and Applied Mathematics

JIPAM

Certain Inequalities Concerning Some Kinds Of Chordal Polygons

Authors:

Keywords:

Inequality, $k$-chordal polygon, $k$-inscribed chordal polygon, index of $k$-inscribed chordal polygon, characteristic of $k$-chordal polygon.

Date Received:

09/07/03

Date Accepted:

25/11/03

Subject Codes:

51E12

Editors:

Jozsef Sandor,

Abstract:

This paper deals with certain inequalities concerning some kinds of chordal polygons (Definition 1.2). The main part of the article concerns the inequality

$\displaystyle \sum_{j=1}^n \cos \beta_j > 2k,$

where

$\displaystyle \sum_{j=1}^n \beta_j = (n-2k)\frac{\pi}{2}, \quad n-2k>0, \qquad 0<\beta_j< \frac{\pi}{2}, \quad j=\overline{1,n}.$

This inequality is considered and proved in [5, pp. 143-145]. Here we have obtained some new results. Among others we found some chordal polygons with the property that $\sum_{j=1}^n \cos^2 \beta_j = 2k$ , where

(Theorem 2.17). Also it could be mentioned that Theorem 2.19 is a modest generalization of the Pythagorean theorem.;

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