Linear Algebra In A Jiffy
Abstract
Every n-tuple in Fn has a first non-zero entry and a last non-zero entry. What do the positions of such entries in the elements of a subspace W of Fn reveal about W? It turns out, a great deal! This insight offers a beeline to the fundamental results on general bases and dimension (including dimensions of complements, rank of a transpose, Rank-Nullity Theorem, Full Rank Factorization, and existence/uniqueness of RREF), bypassing some of the traditional stumbling blocks and time sinks.
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