In this video we will learn how to check if a set of polynomials are a basis of the vector space of polynomials P2, described by the formula P = at ^ 2 + bt + c. As in previous videos, we will see that for a set is a basis of a vector space, in this case a basis of a vector space of polynomials, it is necessary to verify that the polynomials generate the vector space that will verify and are linearly independent, thus we see that are the basis of a polynomial vector space. Below I leave the direct link of the video above, where we explain in a conversational way that is a basis of a vector space, you will like the way, is very close to what we already know, then, as indicated in that video, we, although we do not know, we know how to identify the basis of a vector space.
The Basis of a vector space Explicacion
• Base de un Espacio Vec...
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• Base de un Espacio Vec...
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