Intermediate Algebra 6th Edition - Solutions by Chapter

Upper triangular systems are solved in reverse order Xn to Xl.

peA) = det(A - AI) has peA) = zero matrix.

Defined by det I = 1, sign reversal for row exchange, and linearity in each row. Then IAI = 0 when A is singular. Also IABI = IAIIBI and

A must be positive definite; the axes of the ellipse are eigenvectors of A, with lengths 1/.JI. (For IIx II = 1 the vectors y = Ax lie on the ellipse IIA-1 yll2 = Y T(AAT)-1 Y = 1 displayed by eigshow; axis lengths ad

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!).

Complex analog a j i = aU of a symmetric matrix.

A symmetric matrix with eigenvalues of both signs (+ and - ).

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

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.

If N NT = NT N, then N has orthonormal (complex) eigenvectors.

The columns of N are the n - r special solutions to As = O.

= All solutions to Ax = O. Dimension n - r = (# columns) - rank.

Vectors x with aT x = O. Plane is perpendicular to a =1= O.

P = aaT laTa has rank l.

A square matrix that has no inverse: det(A) = o.

(SVD) A = U:E VT = (orthogonal) ( diag)( orthogonal) First r columns of U and V are orthonormal bases of C (A) and C (AT), AVi = O'iUi with singular value O'i > O. Last columns are orthonormal bases of nullspaces.

Space of all (v in V) + (w in W). Direct sum: V n W = to}.

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

For matrix norms II A + B II < II A II + II B II·

v + w = (VI + WI, ... , Vn + Wn ) = diagonal of parallelogram.