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| Subject: | Mathematics |
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Lecture Description
This video lecture, part of the series Advanced Matrix Theory and Linear Algebra for Engineers by Prof. , does not currently have a detailed description and video lecture title. If you have watched this lecture and know what it is about, particularly what Mathematics topics are discussed, please help us by commenting on this video with your suggested description and title. Many thanks from,
- The CosmoLearning Team
- The CosmoLearning Team
Course Index
- Systems of Linear Equations
- Matrix Notation
- Diagonalization of a Square Matrix
- Linear Systems Part 1
- Linear Systems Part 2
- Linear Systems Part 3
- Linear Systems Part 4
- Vector Spaces Part 1
- Vector Spaces Part 2
- Linear Independence and Subspaces Part 1
- Linear Independence and Subspaces Part 2
- Linear Independence and Subspaces Part 3
- Linear Independence and Subspaces Part 4
- Basis Part 1
- Basis Part 2
- Basis Part 3
- Linear Transformations Part 1
- Linear Transformations Part 2
- Linear Transformations Part 3
- Linear Transformations Part 4
- Linear Transformations Part 5
- Inner Product and Orthogonality Part 1
- Inner Product and Orthogonality Part 2
- Inner Product and Orthogonality Part 3
- Inner Product and Orthogonality Part 4
- Inner Product and Orthogonality Part 5
- Inner Product and Orthogonality Part 6
- Diagonalization Part 1
- Diagonalization Part 2
- Diagonalization Part 3
- Diagonalization Part 4
- Hermitian and Symmetric matrices Part 1
- Hermitian and Symmetric matrices Part 2
- Hermitian and Symmetric matrices Part 3
- Hermitian and Symmetric matrices Part 4
- Singular Value Decomposition (SVD) Part 1
- Singular Value Decomposition (SVD) Part 2
- Back To Linear Systems Part 1
- Back To Linear Systems Part 2
- Epilogue
Course Description
This is Advanced Matrix Theory and Linear Algebra for Engineers by Prof. Vittal Rao ,Centre For Electronics Design and Technology, IISC Bangalore. Topics include Introduction, Vector Spaces, Solutions of Linear Systems, Important Subspaces associated with a matrix, Orthogonality, Eigenvalues and Eigenvectors, Diagonalizable Matrices, Hermitian Matrices, General Matrices, Jordan Canonical form (Optional)*, Selected Topics in Applications (Optional).
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