Contemporary Abstract Algebra 8th Edition - Solutions by Chapter

Parentheses can be removed to leave ABC.

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.

Independent vectors VI, ... , v d whose linear combinations give each vector in V as v = CIVI + ... + CdVd. V has many bases, each basis gives unique c's. A vector space has many bases!

A matrix can be partitioned into matrix blocks, by cuts between rows and/or between columns. Block multiplication ofAB is allowed if the block shapes permit.

The old basis vectors v j are combinations L mij Wi of the new basis vectors. The coordinates of CI VI + ... + cnvn = dl wI + ... + dn Wn are related by d = M c. (For n = 2 set VI = mll WI +m21 W2, V2 = m12WI +m22w2.)

Remove row i and column j; multiply the determinant by (-I)i + j •

Entries Fjk = e21Cijk/n give orthogonal columns FT F = nI. Then y = Fe is the (inverse) Discrete Fourier Transform Y j = L cke21Cijk/n.

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

Invert A by row operations on [A I] to reach [I A-I].

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

Diagonal entries = 1, off-diagonal entries = 0.

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 .

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

MATLAB creates a matrix with random entries, uniformly distributed on [0 1] for rand and standard normal distribution for randn.

= number of pivots = dimension of column space = dimension of row space.

Those extremes are reached at the eigenvectors x for Amin(A) and Amax(A).

Appears in block elimination on [~ g ].

Iv·wl < IIvll IIwll.Then IvTAwl2 < (vT Av)(wT Aw) for pos def A.

The transpose is AT = A, and aU = a ji. A-I is also symmetric.

Set of vectors such that all combinations cv + d w remain within V. Eight required rules are given in Section 3.1 for scalars c, d and vectors v, w.