- Chapter 1: Linear Equations
- Chapter 1.1: Introduction to Linear Systems
- Chapter 1.2: Matrices, Vectors, and Gauss-Jordan Elimination
- Chapter 1.3: On the Solutions of Linear Systems; Matrix Algebra
- Chapter 2: Linear Transformations
- Chapter 2.1: Introduction to Linear Transformations and Their Inverses
- Chapter 2.2: Linear Transformations in Geometry
- Chapter 2.3: Matrix Products
- Chapter 2.4: The Inverse of a Linear Transformation
- Chapter 3.1: Image and Kernel of a Linear Transformation
- Chapter 3.2: Subspaces of R"; Bases and Linear Independence
- Chapter 3.3: The Dimension of a Subspace of R"
- Chapter 3.4: Coordinates
- Chapter 4: Linear Spaces
- Chapter 4.1: Introduction to Linear Spaces
- Chapter 4.2: Linear Transformations and Isomorphisms
- Chapter 4.3: Th e Matrix of a Linear Transformation
- Chapter 5: Orthogonality and Least Squares
- Chapter 5.1: Orthogonal Projections and Orthonormal Bases
- Chapter 5.2: Gram-Schmidt Process and QR Factorization
- Chapter 5.3: Orthogonal Transformations and Orthogonal Matrices
- Chapter 5.4: Least Squares and Data Fitting
- Chapter 5.5: Inner Product Spaces
- Chapter 6: Determinants
- Chapter 6.1: Introduction to Determinants
- Chapter 6.2: Properties of the Determinant
- Chapter 6.3: Geometrical Interpretations of the Determinant; Cramers Rule
- Chapter 7: Eigenvalues and Eigenvectors
- Chapter 7.1: Dynamical Systems and Eigenvectors: An Introductory Example
- Chapter 7.2: Finding the Eigenvalues of a Matrix
- Chapter 7.3: Finding the Eigenvectors of a Matrix
- Chapter 7.4: Diagonalization
- Chapter 7.5: Complex Eigenvalues
- Chapter 7.6: Stability
- Chapter 8: Symmetric Matrices and Quadratic Forms
- Chapter 8.1: Symmetric Matrices
- Chapter 8.2: Quadratic Forms
- Chapter 8.3: Singular Values
- Chapter 9.1: An Introduction to Continuous Dynamical Systems
- Chapter 9.2: The Complex Case: Eulers Formula
- Chapter 9.3: Linear Differential Operators and Linear Differential Equations
Linear Algebra with Applications 4th Edition - Solutions by Chapter
Full solutions for Linear Algebra with Applications | 4th Edition
ISBN: 9780136009269
Linear Algebra with Applications | 4th Edition - Solutions by Chapter
Get Full Solutions
Solutions by Chapter
The full step-by-step solution to problem in Linear Algebra with Applications were answered by , our top Math solution expert on 03/15/18, 05:20PM. Since problems from 41 chapters in Linear Algebra with Applications have been answered, more than 10055 students have viewed full step-by-step answer. This textbook survival guide was created for the textbook: Linear Algebra with Applications, edition: 4. This expansive textbook survival guide covers the following chapters: 41. Linear Algebra with Applications was written by and is associated to the ISBN: 9780136009269.
Key Math Terms and definitions covered in this textbook
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Adjacency matrix of a graph.
Square matrix with aij = 1 when there is an edge from node i to node j; otherwise aij = O. A = AT when edges go both ways (undirected). Adjacency matrix of a graph. Square matrix with aij = 1 when there is an edge from node i to node j; otherwise aij = O. A = AT when edges go both ways (undirected).
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Augmented matrix [A b].
Ax = b is solvable when b is in the column space of A; then [A b] has the same rank as A. Elimination on [A b] keeps equations correct.
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Column picture of Ax = b.
The vector b becomes a combination of the columns of A. The system is solvable only when b is in the column space C (A).
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Cramer's Rule for Ax = b.
B j has b replacing column j of A; x j = det B j I det A
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Elimination.
A sequence of row operations that reduces A to an upper triangular U or to the reduced form R = rref(A). Then A = LU with multipliers eO in L, or P A = L U with row exchanges in P, or E A = R with an invertible E.
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Fibonacci numbers
0,1,1,2,3,5, ... satisfy Fn = Fn-l + Fn- 2 = (A7 -A~)I()q -A2). Growth rate Al = (1 + .J5) 12 is the largest eigenvalue of the Fibonacci matrix [ } A].
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Free variable Xi.
Column i has no pivot in elimination. We can give the n - r free variables any values, then Ax = b determines the r pivot variables (if solvable!).
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Gauss-Jordan method.
Invert A by row operations on [A I] to reach [I A-I].
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Left inverse A+.
If A has full column rank n, then A+ = (AT A)-I AT has A+ A = In.
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Left nullspace N (AT).
Nullspace of AT = "left nullspace" of A because y T A = OT.
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Network.
A directed graph that has constants Cl, ... , Cm associated with the edges.
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Norm
IIA II. The ".e 2 norm" of A is the maximum ratio II Ax II/l1x II = O"max· Then II Ax II < IIAllllxll and IIABII < IIAIIIIBII and IIA + BII < IIAII + IIBII. Frobenius norm IIAII} = L La~. The.e 1 and.e oo norms are largest column and row sums of laij I.
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Normal matrix.
If N NT = NT N, then N has orthonormal (complex) eigenvectors.
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Partial pivoting.
In each column, choose the largest available pivot to control roundoff; all multipliers have leij I < 1. See condition number.
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Polar decomposition A = Q H.
Orthogonal Q times positive (semi)definite H.
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Row picture of Ax = b.
Each equation gives a plane in Rn; the planes intersect at x.
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Schwarz inequality
Iv·wl < IIvll IIwll.Then IvTAwl2 < (vT Av)(wT Aw) for pos def A.
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Simplex method for linear programming.
The minimum cost vector x * is found by moving from comer to lower cost comer along the edges of the feasible set (where the constraints Ax = b and x > 0 are satisfied). Minimum cost at a comer!
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Skew-symmetric matrix K.
The transpose is -K, since Kij = -Kji. Eigenvalues are pure imaginary, eigenvectors are orthogonal, eKt is an orthogonal matrix.
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Spectrum of A = the set of eigenvalues {A I, ... , An}.
Spectral radius = max of IAi I.