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[[Fasciculus:3D Vector.svg|thumb|Vector ''a'' = (a<sub>x</sub>, a<sub>y</sub>, a<sub>z</sub>). Est etiam combinatio linearis vectores ''i, j, k'' qui sunt basis spatii: ''a = a<sub>x</sub> i + a<sub>y</sub> j + a<sub>z</sub>k'')]]
'''Vector''' (-oris, m)
== Fundamenta mathematica ==
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Hac in formula <math> F_{s} </math> longitudinem repraesentantis eius vectoris, qui proiectio normalis vectoris <math> \vec F </math> in spatium <math> \vec s </math> est, atque <math> s </math> longitudinem repraesentantis <math> \vec s </math> designat (vide etiam definitionem multiplicationis scalaris). Labor etiam negativus esse potest; hic casus est, si <math> \vec F_{s} </math> directionem contrariam atque <math> \vec s </math> habet (resque igitur in directionem "falsam" movetur).
== Notae ==
<references/>
== Bibliographia ==
* Ferrante Neri, ''Linear Algebra for Computational Sciences and Engineering.'' Helvetia: Springer, 2016.
* C. E. Weatherburn, ''Elementary Vector Analysis, with Applications to Geometry and Physics.'' Londini: G. Bell & sons, 1935.
[[Categoria:Algebra linearis]]
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