உள்வட்டமையம் (Tamil Wikipedia)

Analysis of information sources in references of the Wikipedia article "உள்வட்டமையம்" in Tamil language version.

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ams.org

Kimberling, Clark (1994), "Central Points and Central Lines in the Plane of a Triangle", Mathematics Magazine, 67 (3): 163–187, JSTOR 2690608, MR 1573021.
Franzsen, William N. (2011), "The distance from the incenter to the Euler line" (PDF), Forum Geometricorum, 11: 231–236, MR 2877263. Lemma 3, p. 233.
Edmonds, Allan L.; Hajja, Mowaffaq; Martini, Horst (2008), "Orthocentric simplices and biregularity", Results in Mathematics, 52 (1–2): 41–50, எண்ணிம ஆவணச் சுட்டி:10.1007/s00025-008-0294-4, MR 2430410, It is well known that the incenter of a Euclidean triangle lies on its Euler line connecting the centroid and the circumcenter if and only if the triangle is isosceles {{citation}}: line feed character in |quote= at position 93 (help).

Euclid's Elements, Book IV, Proposition 4: To inscribe a circle in a given triangle. David Joyce, Clark University, retrieved 2014-10-28.

Edmonds, Allan L.; Hajja, Mowaffaq; Martini, Horst (2008), "Orthocentric simplices and biregularity", Results in Mathematics, 52 (1–2): 41–50, எண்ணிம ஆவணச் சுட்டி:10.1007/s00025-008-0294-4, MR 2430410, It is well known that the incenter of a Euclidean triangle lies on its Euler line connecting the centroid and the circumcenter if and only if the triangle is isosceles {{citation}}: line feed character in |quote= at position 93 (help).
Kodokostas, Dimitrios (April 2010), "Triangle equalizers", Mathematics Magazine, 83: 141–146, எண்ணிம ஆவணச் சுட்டி:10.4169/002557010X482916.

Franzsen, William N. (2011), "The distance from the incenter to the Euler line" (PDF), Forum Geometricorum, 11: 231–236, MR 2877263. Lemma 3, p. 233.
Dragutin Svrtan and Darko Veljan, "Non-Euclidean versions of some classical triangle inequalities", Forum Geometricorum 12 (2012), 197–209. http://forumgeom.fau.edu/FG2012volume12/FG201217index.html
Marie-Nicole Gras, "Distances between the circumcenter of the extouch triangle and the classical centers" Forum Geometricorum 14 (2014), 51-61. http://forumgeom.fau.edu/FG2014volume14/FG201405index.html
Arie Bialostocki and Dora Bialostocki, "The incenter and an excenter as solutions to an extremal problem", Forum Geometricorum 11 (2011), 9-12. http://forumgeom.fau.edu/FG2011volume11/FG201102index.html

Kimberling, Clark (1994), "Central Points and Central Lines in the Plane of a Triangle", Mathematics Magazine, 67 (3): 163–187, JSTOR 2690608, MR 1573021.