An easier solution of a Diophantine problem about triangles, in which those lines from the vertices which bisect the opposite sides may be expressed rationally
This is an English translation from the Latin original of Leonhard Euler's
``Solutio facilior problematis Diophantei circa triangulum, in quo rectae ex
angulis latera opposita bisecantes rationaliter exprimantur''. In this paper,
Euler proves that there exist triangles with integer length sides such that the
length of the bisectors of the sides to the opposite angles are integer valued,
and he gives a general method for making a certain class of such triangles.
%0 Generic
%1 citeulike:3036295
%A Euler, Leonhard
%D 2005
%K Vor1850 available-in-tex-format mathematics number-theory pre1850
%T An easier solution of a Diophantine problem about triangles, in which those lines from the vertices which bisect the opposite sides may be expressed rationally
%U http://arxiv.org/abs/math/0503052
%X This is an English translation from the Latin original of Leonhard Euler's
``Solutio facilior problematis Diophantei circa triangulum, in quo rectae ex
angulis latera opposita bisecantes rationaliter exprimantur''. In this paper,
Euler proves that there exist triangles with integer length sides such that the
length of the bisectors of the sides to the opposite angles are integer valued,
and he gives a general method for making a certain class of such triangles.
@misc{citeulike:3036295,
abstract = {This is an English translation from the Latin original of Leonhard Euler's
``Solutio facilior problematis Diophantei circa triangulum, in quo rectae ex
angulis latera opposita bisecantes rationaliter exprimantur''. In this paper,
Euler proves that there exist triangles with integer length sides such that the
length of the bisectors of the sides to the opposite angles are integer valued,
and he gives a general method for making a certain class of such triangles.},
added-at = {2009-08-02T17:14:35.000+0200},
archiveprefix = {arXiv},
author = {Euler, Leonhard},
biburl = {https://www.bibsonomy.org/bibtex/297cea16a3d87380fd3029802ed10c00b/rwst},
citeulike-article-id = {3036295},
citeulike-linkout-0 = {http://arxiv.org/abs/math/0503052},
citeulike-linkout-1 = {http://arxiv.org/pdf/math/0503052},
description = {my bookmarks from citeulike},
eprint = {math/0503052},
interhash = {e88090a7205a6fca08b0d20c7e7b4d47},
intrahash = {97cea16a3d87380fd3029802ed10c00b},
keywords = {Vor1850 available-in-tex-format mathematics number-theory pre1850},
month = Mar,
posted-at = {2008-07-23 08:53:57},
priority = {2},
timestamp = {2009-08-06T10:27:27.000+0200},
title = {An easier solution of a Diophantine problem about triangles, in which those lines from the vertices which bisect the opposite sides may be expressed rationally},
url = {http://arxiv.org/abs/math/0503052},
year = 2005
}