Lecture

Vector Spaces: Bases and Dimensions

Description

This lecture covers the concept of vector spaces, bases, and dimensions, including the completion of linearly independent elements into a base, the properties of subspaces, and the relationship between the dimension of a subspace and the dimension of the vector space. It also discusses the rank of a transformation, the dimension of the image and kernel of a transformation, and how to find a basis for the image. The lecture concludes with the relationship between the dimension of a vector space, the kernel, and the rank of a transformation.

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Official source

https://mediaspace.epfl.ch/media/0_m8iosy1u

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Ontological neighbourhood

Mathematics

Algebra: Linear algebra

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