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Linear Algebra

Math Academy official course import: Linear Algebra

180 节课

课程大纲

  1. 1.Preliminaries
    1. 1.1.1. Introduction to Set Theory
      1. 1
        Special Sets
      2. 2
        Statements and Predicates
      3. 3
        Equivalent Sets
      4. 4
        The Constructive Definition of a Set
      5. 5
        The Conditional Definition of a Set
      6. 6
        Describing Sets Using Set-Builder Notation
      7. 7
        Describing Planar Regions Using Set-Builder Notation
      8. 8
        Cardinality of Finite Sets
      9. 9
        Infinite Sets
      10. 10
        Subsets
    2. 2.1.2. Set Operations
      1. 1
        The Difference of Sets
      2. 2
        Set Complements
      3. 3
        The Cartesian Product
      4. 4
        Visualizing Cartesian Products
      5. 5
        Indexed Sets
      6. 6
        Sets and Functions
    3. 3.1.3. Vector Geometry
      1. 1
        The Vector Equation of a Line
      2. 2
        The Parametric Equations of a Line
      3. 3
        The Cartesian Equation of a Line
      4. 4
        The Vector Equation of a Plane
      5. 5
        The Cartesian Equation of a Plane
      6. 6
        The Parametric Equations of a Plane
      7. 7
        The Intersection of Two Planes
      8. 8
        The Shortest Distance Between a Plane and a Point
      9. 9
        The Intersection Between a Line and a Plane
  2. 2.Matrices
    1. 1.2.1. Determinants
      1. 1
        Cramer’s Rule for 2x2 Systems of Linear Equations
      2. 2
        Cramer’s Rule for 3x3 Systems
      3. 3
        The Determinant of an NxN Matrix
      4. 4
        Finding Determinants Using Laplace Expansions
      5. 5
        Basic Properties of Determinants
      6. 6
        Further Properties of Determinants
      7. 7
        Row and Column Operations on Determinants
      8. 8
        Conditions When a Determinant Equals Zero
      9. 9
        Finding Determinants Using Row and Column Operations
      10. 10
        Partitioned and Block Matrices
    2. 2.2.2. Gaussian Elimination
      1. 1
        Systems of Equations as Augmented Matrices
      2. 2
        Row Echelon Form
      3. 3
        Solving Systems of Equations Using Back Substitution
      4. 4
        Elementary Row Operations
      5. 5
        Creating Rows or Columns Containing Zeros Using Gaussian Elimination
      6. 6
        Solving 2x2 Systems of Equations Using Gaussian Elimination
      7. 7
        Solving 2x2 Singular Systems of Equations Using Gaussian Elimination
      8. 8
        Solving 3x3 Systems of Equations Using Gaussian Elimination
      9. 9
        Identifying the Pivot Columns of a Matrix
      10. 10
        Solving 3x3 Singular Systems of Equations Using Gaussian Elimination
      11. 11
        Reduced Row Echelon Form
      12. 12
        Gaussian Elimination For NxM Systems of Equations
    3. 3.2.3. Elementary Matrices
      1. 1
        Elementary 2x2 Matrices
      2. 2
        Row Operations on 2x2 Matrices as Products of Elementary Matrices
      3. 3
        Elementary 3x3 Matrices
      4. 4
        Row Operations on 3x3 Matrices as Products of Elementary Matrices
    4. 4.2.4. The Inverse of a Matrix
      1. 1
        The Invertible Matrix Theorem in Terms of 2x2 Systems of Equations
      2. 2
        Finding the Inverse of a 2x2 Matrix Using Row Operations
      3. 3
        Finding the Inverse of a 3x3 Matrix Using Row Operations
      4. 4
        Finding the Inverse of an NxN Square Matrix Using Row Operations
      5. 5
        Matrices With Easy-to-Find Inverses
    5. 5.2.5. LU Factorization
      1. 1
        Triangular Matrices
      2. 2
        LU Factorization of 2x2 Matrices
      3. 3
        LU Factorization of 3x3 Matrices
      4. 4
        LU Factorization of NxN Matrices
      5. 5
        Solving Systems of Equations Using LU Factorization
  3. 3.Vector Spaces
    1. 1.3.1. Vectors in N-Dimensional Space
      1. 1
        Vectors in N-Dimensional Euclidean Space
      2. 2
        Linear Combinations of Vectors in N-Dimensional Euclidean Space
      3. 3
        Linear Span of Vectors in N-Dimensional Euclidean Space
      4. 4
        Linear Dependence and Independence
    2. 2.3.2. Subspaces of N-Dimensional Space
      1. 1
        Subspaces of N-Dimensional Space
      2. 2
        Subspaces of N-Dimensional Space: Geometric Interpretation
      3. 3
        The Column Space of a Matrix
      4. 4
        The Null Space of a Matrix
    3. 3.3.3. Bases of N-Dimensional Space
      1. 1
        Finding a Basis of a Span
      2. 2
        Finding a Basis of the Column Space of a Matrix
      3. 3
        Finding a Basis of the Null Space of a Matrix
      4. 4
        Expressing the Coordinates of a Vector in a Given Basis
      5. 5
        Writing Vectors in Different Bases
      6. 6
        The Change-of-Coordinates Matrix
      7. 7
        Changing a Basis Using the Change-of-Coordinates Matrix
    4. 4.3.4. Dimension and Rank in N-Dimensional Space
      1. 1
        The Dimension of a Span
      2. 2
        The Rank of a Matrix
      3. 3
        The Dimension of the Null Space of a Matrix
      4. 4
        The Invertible Matrix Theorem in Terms of Dimension, Rank and Nullity
      5. 5
        The Rank-Nullity Theorem
    5. 5.3.5. Abstract Vector Spaces
      1. 1
        Introduction to Abstract Vector Spaces
      2. 2
        Defining Abstract Vector Spaces
      3. 3
        Linear Independence in Abstract Vector Spaces
      4. 4
        Subspaces of Abstract Vector Spaces
      5. 5
        Bases in Abstract Vector Spaces
      6. 6
        The Coordinates of a Vector Relative to a Basis in Abstract Vector Spaces
      7. 7
        Dimension in Abstract Vector Spaces
  4. 4.Linear Transformations
    1. 1.4.1. Linear Transformations
      1. 1
        The Standard Matrix of a Linear Transformation in Terms of the Standard Basis
      2. 2
        The Kernel of a Linear Transformation
      3. 3
        The Image and Rank of a Linear Transformation
      4. 4
        The Image of a Linear Transformation in the Cartesian Plane
      5. 5
        The Invertible Matrix Theorem in Terms of Linear Transformations
      6. 6
        The Rank-Nullity Theorem in Terms of Linear Transformations
    2. 2.4.2. Linear Maps and Their Matrix Representations
      1. 1
        The Matrix of a Linear Transformation Relative to a Basis
      2. 2
        Connections Between Matrix Representations of a Linear Transformation
      3. 3
        Linear Maps Between Two Different Vector Spaces
      4. 4
        The Matrix of a Linear Map Relative to Two Bases
  5. 5.Diagonalization of Matrices
    1. 1.5.1. Eigenvectors and Eigenvalues
      1. 1
        The Eigenvalues and Eigenvectors of a 2x2 Matrix
      2. 2
        Calculating the Eigenvalues of a 2x2 Matrix
      3. 3
        Calculating the Eigenvectors of a 2x2 Matrix
      4. 4
        The Characteristic Equation of a Matrix
      5. 5
        The Cayley-Hamilton Theorem and Its Applications
      6. 6
        Calculating the Eigenvectors of a 3x3 Matrix With Distinct Eigenvalues
      7. 7
        Calculating the Eigenvectors of a 3x3 Matrix in the General Case
      8. 8
        The Invertible Matrix Theorem in Terms of Eigenvalues
    2. 2.5.2. Diagonalization
      1. 1
        Diagonalizing a 2x2 Matrix
      2. 2
        Properties of Diagonalization
      3. 3
        Diagonalizing a 3x3 Matrix With Distinct Eigenvalues
      4. 4
        Diagonalizing a 3x3 Matrix in the General Case
    3. 3.5.3. Real Matrices With Complex Eigenvalues
      1. 1
        Vectors Over the Complex Numbers
      2. 2
        Matrices Over the Complex Numbers
      3. 3
        Finding Complex Eigenvalues of Real 2x2 Matrices
      4. 4
        Finding Complex Eigenvectors of Real 2x2 Matrices
      5. 5
        Rotation-Scaling Matrices
      6. 6
        Reducing Real 2x2 Matrices to Rotation-Scaling Form
      7. 7
        Block Diagonalization of NxN Matrices
    4. 4.5.4. Generalized Eigenvectors
      1. 1
        Nilpotent and Idempotent Matrices
      2. 2
        Generalized Eigenvectors
      3. 3
        Ranks of Generalized Eigenvectors
      4. 4
        Finding Generalized Eigenvectors of Specific Ranks
    5. 5.5.5. Jordan Canonical Decomposition
      1. 1
        Jordan Blocks and Jordan Matrices
      2. 2
        Jordan Canonical Form of a 2x2 Matrix
      3. 3
        Jordan Canonical Decomposition of a 2x2 Matrix
      4. 4
        Jordan Canonical Form of a 3x3 Matrix
      5. 5
        Jordan Canonical Decomposition of a 3x3 Matrix
  6. 6.Projections
    1. 1.6.1. Inner Products
      1. 1
        The Dot Product in N-Dimensional Euclidean Space
      2. 2
        The Norm of a Vector in N-Dimensional Euclidean Space
      3. 3
        Inner Product Spaces
      4. 4
        The Inner Product in Vector Spaces Over the Complex Numbers
      5. 5
        The Norm of a Vector in Inner Product Spaces
    2. 2.6.2. Orthogonality
      1. 1
        Orthogonal Vectors in Euclidean Spaces
      2. 2
        Orthogonal Vectors in Inner Product Spaces
      3. 3
        The Cauchy-Schwarz Inequality and the Angle Between Two Vectors
      4. 4
        The Pythagorean Theorem and the Triangle Inequality
      5. 5
        Orthogonal Complements
      6. 6
        Orthogonal Sets in Euclidean Spaces
      7. 7
        Orthogonal Sets in Inner Product Spaces
      8. 8
        Orthogonal Matrices
      9. 9
        Orthogonal Linear Transformations
      10. 10
        The Four Fundamental Subspaces of a Matrix
    3. 3.6.3. Orthogonal Projections
      1. 1
        Projecting Vectors Onto One-Dimensional Subspaces
      2. 2
        The Components of a Vector with Respect to an Orthogonal or Orthonormal Basis
      3. 3
        Projecting Vectors Onto Subspaces in Euclidean Spaces (Orthogonal Bases)
      4. 4
        Projecting Vectors Onto Subspaces in Euclidean Spaces (Arbitrary Bases)
      5. 5
        Projecting Vectors Onto Subspaces in Euclidean Spaces (Arbitrary Bases): Applications
      6. 6
        Projection Matrices, Linear Transformations and Their Properties
      7. 7
        Projecting Vectors Onto Subspaces in Inner Product Spaces
    4. 4.6.4. Orthogonalization Processes
      1. 1
        The Gram-Schmidt Process for Two Vectors
      2. 2
        The Gram-Schmidt Process in the General Case
      3. 3
        QR Factorization
  7. 7.Quadratic Forms
    1. 1.7.1. Diagonalization of Symmetric Matrices
      1. 1
        Symmetric Matrices
      2. 2
        Diagonalization of 2x2 Symmetric Matrices
      3. 3
        Diagonalization of 3x3 Symmetric Matrices
      4. 4
        The Spectral Theorem
    2. 2.7.2. Quadratic Forms
      1. 1
        Bilinear Forms
      2. 2
        Quadratic Forms
      3. 3
        Change of Variables in Quadratic Forms
      4. 4
        Finding the Canonical Form of a Quadratic Form Using Lagrange's Method
      5. 5
        Finding the Canonical Form of a Quadratic Form Using Orthogonal Transformations
      6. 6
        Positive-Definite and Negative-Definite Quadratic Forms
    3. 3.7.3. Quadratic Forms in Euclidian Space
      1. 1
        Reducing a Quadratic Curve to Its Principal Axes
      2. 2
        Classifying Quadratic Curves
    4. 4.7.4. Singular Value Decomposition
      1. 1
        Constrained Optimization of Quadratic Forms
      2. 2
        Constrained Optimization of Quadratic Forms: Determining Where Extrema are Attained
      3. 3
        The Singular Values of a Matrix
      4. 4
        Computing the Singular Values of a Matrix
      5. 5
        Singular Value Decomposition of 2x2 Matrices
      6. 6
        Singular Value Decomposition of 2x2 Matrices With Zero or Repeated Eigenvalues
      7. 7
        Singular Value Decomposition of Larger Matrices
      8. 8
        Singular Value Decomposition and the Pseudoinverse Matrix
  8. 8.Applications of Linear Algebra
    1. 1.8.1. Linear Least-Squares Problems
      1. 1
        The Least-Squares Solution of a Linear System (Without Collinearity)
      2. 2
        The Least-Squares Solution of a Linear System (With Collinearity)
      3. 3
        Finding a Least-Squares Solution Using QR Factorization
      4. 4
        Weighted Least-Squares
    2. 2.8.2. Markov Chains
      1. 1
        Markov Chains
      2. 2
        Steady-State Vectors
    3. 3.8.3. Linear Regression
      1. 1
        Linear Regression With Matrices
      2. 2
        Polynomial Regression With Matrices
      3. 3
        Multiple Linear Regression With Matrices