Euler's theorem (rotation)/Bibliography: Difference between revisions

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== Original source ==
== Original source ==


L. Eulero ''(Leonhard Euler)'' (E478):
Euler's theorem and its proof are contained in paragraphs 24-26 of the appendix (''Additamentum''. pp. 201-203)
Formulae generales pro translatione quacunque corporum rigidorum
: L. Eulero ''(Leonhard Euler)'' <br> ''Formulae generales pro translatione quacunque corporum rigidorum'' (General formulas for the translation of arbitrary rigid bodies),
''(General formulas for the translation of arbitrary rigid bodies)''
presented to the St. Petersburg Academy on October 9, 1775, and first published in
Novi Commentarii academiae scientiarum Petropolitanae 20, 1776, pp. 189-207
: Novi Commentarii academiae scientiarum Petropolitanae 20, 1776, pp. 189-207 (E478)
presented to the St. Petersburg Academy on October 9, 1775.
and was reprinted in
(p. 201 Additamentum. 24. Theorema.)
: ''Theoria motus corporum rigidorum'', ed. nova, 1790, pp. 449-460 (E478a)
and later in his collected works
: ''Opera Omnia'', Series 2, Volume 9, pp. 84 - 98.

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A list of key readings about Euler's theorem (rotation).
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Original source

Euler's theorem and its proof are contained in paragraphs 24-26 of the appendix (Additamentum. pp. 201-203)

L. Eulero (Leonhard Euler)
Formulae generales pro translatione quacunque corporum rigidorum (General formulas for the translation of arbitrary rigid bodies),

presented to the St. Petersburg Academy on October 9, 1775, and first published in

Novi Commentarii academiae scientiarum Petropolitanae 20, 1776, pp. 189-207 (E478)

and was reprinted in

Theoria motus corporum rigidorum, ed. nova, 1790, pp. 449-460 (E478a)

and later in his collected works

Opera Omnia, Series 2, Volume 9, pp. 84 - 98.