Elementary Linear Algebra: A Matrix Approach 2nd Edition - Solutions by Chapter

B j has b replacing column j of A; x j = det B j I det A

Vector perpendicular to u and v, length Ilullllvlll sin el = area of parallelogram, u x v = "determinant" of [i j k; UI U2 U3; VI V2 V3].

dim(V) = number of vectors in any basis for V.

A(B + C) = AB + AC. Add then multiply, or mUltiply then add.

The first nonzero entry (the pivot) in each row comes in a later column than the pivot in the previous row. All zero rows come last.

Independent columns, N(A) = {O}, no free variables.

The m by n edge-node incidence matrix has a row for each edge (node i to node j), with entries -1 and 1 in columns i and j .

The subspace spanned by b, Ab, ... , Aj-Ib. Numerical methods approximate A -I b by x j with residual b - Ax j in this subspace. A good basis for K j requires only multiplication by A at each step.

The big formula for det(A) has a sum of n! terms, the cofactor formula uses determinants of size n - 1, volume of box = I det( A) I.

= Xl (column 1) + ... + xn(column n) = combination of columns.

Some power of N is the zero matrix, N k = o. The only eigenvalue is A = 0 (repeated n times). Examples: triangular matrices with zero diagonal.

Ps = pascal(n) = the symmetric matrix with binomial entries (i1~;2). Ps = PL Pu all contain Pascal's triangle with det = 1 (see Pascal in the index).

Orthogonal Q times positive (semi)definite H.

Projection p = P b is the closest point to b in S, error e = b - Pb is perpendicularto S. p 2 = P = pT, eigenvalues are 1 or 0, eigenvectors are in S or S...L. If columns of A = basis for S then P = A (AT A) -1 AT.

Column and row spaces = lines cu and cv.

A point where the first derivatives of I are zero and the second derivative matrix (a2 II aXi ax j = Hessian matrix) is indefinite.

Appears in block elimination on [~ g ].

Every B = M-I AM has the same eigenvalues as A.

Constant down each diagonal = time-invariant (shift-invariant) filter.

Stretch and shift the time axis to create Wjk(t) = woo(2j t - k).