Metrical relations in barycentric coordinates

Volenec, V.

Mathematical Communications, Vol. 8 No. 1, 2003.

Izvorni znanstveni članak

Metrical relations in barycentric coordinates

V. Volenec

Puni tekst: engleski pdf 153 Kb

str. 55-68

preuzimanja: 1.357

citiraj

APA 6th Edition

Volenec, V. (2003). Metrical relations in barycentric coordinates. Mathematical Communications, 8 (1), 55-68. Preuzeto s https://hrcak.srce.hr/749

MLA 8th Edition

Volenec, V.. "Metrical relations in barycentric coordinates." Mathematical Communications, vol. 8, br. 1, 2003, str. 55-68. https://hrcak.srce.hr/749. Citirano 01.05.2024.

Chicago 17th Edition

Volenec, V.. "Metrical relations in barycentric coordinates." Mathematical Communications 8, br. 1 (2003): 55-68. https://hrcak.srce.hr/749

Harvard

Volenec, V. (2003). 'Metrical relations in barycentric coordinates', Mathematical Communications, 8(1), str. 55-68. Preuzeto s: https://hrcak.srce.hr/749 (Datum pristupa: 01.05.2024.)

Vancouver

Volenec V. Metrical relations in barycentric coordinates. Mathematical Communications [Internet]. 2003 [pristupljeno 01.05.2024.];8(1):55-68. Dostupno na: https://hrcak.srce.hr/749

IEEE

V. Volenec, "Metrical relations in barycentric coordinates", Mathematical Communications, vol.8, br. 1, str. 55-68, 2003. [Online]. Dostupno na: https://hrcak.srce.hr/749. [Citirano: 01.05.2024.]

Sažetak

Let Δ be the area of the fundamental triangle ABC of barycentric coordinates and α=cot A,β =cot B, γ=cot C. The vectors $\boldsymbol{v}_i=[x_{i},y_{i},z_{i}]$ $(i=1,2)$ have the scalar product $2\Delta (\alpha x_{1}x_{2}+\beta y_{1}y_{2}+\gamma z_{1}z_{2})$. This fact implies all important formulas about metrical relations of points and lines. The main and probably new results are Theorems 1 and 8.

Ključne riječi

barycentric coordinates

Hrčak ID:

749

URI

https://hrcak.srce.hr/749

Datum izdavanja:

20.6.2003.

Posjeta: 1.873 *

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Mathematical Communications, Vol. 8 No. 1, 2003.

Sažetak

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Hrčak ID:

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