(New page: The span of vectors <math>v_1, v_2... v_n</math> is the set of all possible linear combination of those vectors. A vector <math>\overrightarrow{x}</math> is in the span of <math>v_1, ...) |
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A vector <math>\overrightarrow{x}</math> is in the span of <math>v_1, v_2... v_n</math> if it can be written as a [[linear combination]] of those vectors. | A vector <math>\overrightarrow{x}</math> is in the span of <math>v_1, v_2... v_n</math> if it can be written as a [[linear combination]] of those vectors. | ||
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Latest revision as of 11:06, 19 January 2009
The span of vectors $ v_1, v_2... v_n $ is the set of all possible linear combination of those vectors.
A vector $ \overrightarrow{x} $ is in the span of $ v_1, v_2... v_n $ if it can be written as a linear combination of those vectors.
