Every point $$a = (a_1, \ldots , a_n)\in \mathbb {R\}{\textasciicircum}n$$a=(a1,…,an)∈Rn$\${\textbackslash}mathbb {R}, \mathbb {R\}{\textasciicircum}n$$R,Rncan be seen as a vectorVector connecting the origin $$0_n = \\{{\textbackslash}underbrace{0, \ldots , 0}_n\}$$0n={0,…,0⏟n}$$0_n$$0n of the coordinate system of $\${\textbackslash}mathbb {R\}{\textasciicircum}n$$Rnwith the point a.
CITATION STYLE
Trendafilov, N., & Gallo, M. (2021). Matrix analysis and differentiation (pp. 9–44). https://doi.org/10.1007/978-3-030-76974-1_2
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