Linear Combination
Definition: Let (ui) = (u1, u2, ..., un) be a sequence of vectors in V. A sum of the form
- ai F, aiui = a1u1 + a2u2+ ... +anun
is called a "Linear Combination" of the ui.
Span
span(ui):= The set of all possible linear combinations of the ui's.
If V is any subset,
span
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:= The set of all linear combination of vectors in
|
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=
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even if is empty.
Theorem: For any V, span is a subspace of V.
Proof:
1. 0 span .
2. Let x span , Let x span ,
x = aiui, ui , y = bivi, vi .
x+y = aiui + bivi = ciwi where ci=(a1, a2,...,an, b1, b2,...,bm) and wi=ci=(u1, u2,...,un, v1, v2,...,vm).
3. cx= c aiui= (cai)ui span .
To be continued ...