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=Supplementary Explanations of a Basis=
 
=Supplementary Explanations of a Basis=
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It is important to first check out the [[Basis|original basis page]] for the more rigorous definition of a Basis. If you still don't understand, then come back to this page. This page assumes that one already fully understands the terms [[Span|"span"]],  [[Linearly_Independent|"linear independence"]] and [[Subspace|"subspace"]].
 
It is important to first check out the [[Basis|original basis page]] for the more rigorous definition of a Basis. If you still don't understand, then come back to this page. This page assumes that one already fully understands the terms [[Span|"span"]],  [[Linearly_Independent|"linear independence"]] and [[Subspace|"subspace"]].
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This previous definition is shamelessly copied from the rigorous definition of a Basis.
 
This previous definition is shamelessly copied from the rigorous definition of a Basis.
  
However, what does this mean?
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However, what does this mean? Let's say you are given two vectors, <math>
 +
\begin{pmatrix}
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x & y \\
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z & v
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\end{pmatrix}

Revision as of 13:22, 11 March 2013

Supplementary Explanations of a Basis

It is important to first check out the original basis page for the more rigorous definition of a Basis. If you still don't understand, then come back to this page. This page assumes that one already fully understands the terms "span", "linear independence" and "subspace".

What is a Basis?

From the rigorous definition of a Basis, we know that a group of vectors $ v_1, v_2... v_n $ are defined as a basis of a Subspace V if they fulfill two requirements:

This previous definition is shamelessly copied from the rigorous definition of a Basis.

However, what does this mean? Let's say you are given two vectors, $ \begin{pmatrix} x & y \\ z & v \end{pmatrix} $

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