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VARIOUS CENTROIDS OF POLYGONS AND SOME CHARACTERIZATIONS OF RHOMBIopen access
- Issue Date
- 2017
- Publisher
- KOREAN MATHEMATICAL SOC
- Keywords
- center of gravity; centroid; perimeter centroid; rhombus; kite; polygon; quadrangle
- Citation
- COMMUNICATIONS OF THE KOREAN MATHEMATICAL SOCIETY, v.32, no.1, pp 135 - 145
- Pages
- 11
- Indexed
- SCOPUS
ESCI
KCI
- Journal Title
- COMMUNICATIONS OF THE KOREAN MATHEMATICAL SOCIETY
- Volume
- 32
- Number
- 1
- Start Page
- 135
- End Page
- 145
- ISSN
- 1225-1763
2234-3024
- Abstract
- For a polygon P, we consider the centroid Go of the vertices of P, the centroid G(1) of the edges of P and the centroid G(2) of the interior of P. When P is a triangle, (1) we always have Go = G(2) and (2) P satisfies Gi = G(2) if and only if it is equilateral. For a quadrangle P, one of Go = G(2) and Go = G1 implies that P is a parallelogram. In this paper, we investigate the relationships between centroids of quadrangles. As a result, we establish some characterizations for rhombi and show that among convex quadrangles whose two diagonals are perpendicular to each other, rhombi and kites are the only ones satisfying G(1) = G(2). Furthermore, we completely classify such quadrangles.
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