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The foundational concept of linear algebra is the vector, understood through three perspectives: the physicist's view of arrows defined by length and direction [], the computer scientist's view of ordered lists of numbers where order is crucial [], and the mathematician's more abstract, generalized definition that underlies vector operations []. For the purpose of this series, vectors are primarily visualized as arrows rooted at the origin [], with their position and direction determined by coordinates. In two dimensions, these coordinates are an ordered pair representing movements along the x and y axes [], while in three dimensions, a third z-axis is introduced, requiring an ordered triplet of numbers [].
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The foundational concept of linear algebra is the vector, understood through three perspectives: the physicist's view of arrows defined by length and direction [], the computer scientist's view of ordered lists of numbers where order is crucial [], and the mathematician's more abstract, generalized definition that underlies vector operations []. For the purpose of this series, vectors are primarily visualized as arrows rooted at the origin [], with their position and direction determined by coordinates. In two dimensions, these coordinates are an ordered pair representing movements along the x and y axes [], while in three dimensions, a third z-axis is introduced, requiring an ordered triplet of numbers [].