MATH 311 Sec 501 Spring 2013: Homework
Text: Mathematics-Topics on Applied Math I,
by S. Leon & S. Colley
Homework 1
Due Wed 1/30
- Section 1.1 -- p. 10:
# 6e, 6h, 7, 8(Use reduced row echelon form from Sec 1.2 instead of back substitution.), 9
- Section 1.2 -- p. 23:
# 5a, 5e, 5f, 5i, 5j, 6b, 7, 8, 10
- Section 1.3 -- p. 42:
# 1d, 1e, 1f, 1g, 1h, 2, 3, 4b, 8, 9, 10ab,
Homework 2
Due Fri 2/1
- Section 1.4 -- p. 56:
# 1, 4, 5, 6, 11acd, 13c, 16, 17, 20, 23, 24c, 27
- Section 1.5 -- p. 66:
(See the bottom of p 62 through the top of p 64.) #10b, 10c, 10f, 10g, 9, 12a, 12d,
- Section 1.2 -- p. 23:
# 15, 19, 22c
Homework 3
Due Fri 2/8 (Underlined are the most important.)
- Section 2.1 -- p. 94:
# 3b, 3f, 3h, 4bcd, 6, 9, 11
- Section 2.2 -- p. 101:
# 2, 4, 6, 7, 10, 12
- Section 2.3 -- p. 109:
# 1c, 2b, 5, 9
Homework 4
Due Wed 2/13 (Underlined are the most important.)
- Section 3.1 -- p. 122:
# 5, 8, 9, 11, 12, 14
- Section 3.2 -- p. 131:
# 1, 3bcdef, 4ab, 5bc, 6abc, 6de, 8, 13, 14, 16, 19, 22
- Section 3.3 -- p. 143:
# 2bce, 3bce, 5, 7, 8ac, 16, 17
Homework 5
Due Mon 2/18 (Underlined are the most important.)
- Section 3.4 -- p. 149:
# 2bce, 5, 9, 11, 12, 13, 16
- Section 3.5 -- p. 159:
# 1ab, 3ab, 5, 9(and express \(3x + 2\) in the \([2x - 1, 2x + 1]\) basis.)
- Section 3.6 -- p. 165:
# 1b, 3, 4ad, 8, 13, 18, 22a, 26
Homework 6
Due Fri 3/8 (Underlined are the most important.)
- Section 4.1 -- p. 182:
# 1, 4(HINT: Write \((7,5)\) as a linear combination of \((1,2)\) and \((1,-1)\).), 5, 8, 11,
13, 17, 19, 21, 22, 23, 25
- Section 4.2 -- p. 195:
# 4, 6, 8, 13, 14, 18(HINT: First find the matrix relative to the standard bases for \(\mathbb{R}^3\) and \(\mathbb{R}^2\). Then multiply on the left and right by appropriate change of basis matrices.), 20
- Section 4.3 -- p. 202:
# 2ab, 3, 5abc, 6, 7, 9, 11, 13, 15(HINT: Use the formulas:
\(\displaystyle tr(A) = \sum_{i=1}^{n} A_{ii}\)
and
\(\displaystyle (AB)_{ij} = \sum_{k=1}^{n} A_{ik} B_{kj}\).)
Homework 7
Due Fri 3/22 (Underlined are the most important.)
- Section 5.1 -- p. 224:
# 1bd, 2bd, 3bd, 13, 17, 18
- Section 5.2 -- p. 233:
# 2, 4, 6
- Section 5.4 -- p. 251:
# 3, 7ac, 8, 10, 11, 16, 26, 9(HINT: There is a trig identity for \(\sin A \cos B\) in terms of \(\sin(A+B)\) and \(\sin(A-B)\).)
- Section 5.5 -- p. 269:
# 2, 3, 4, 6, 9, 12, 14, 33, 34
- Section 5.6 -- p. 280:
# 3, 4, Extra: Find an orthonormal basis for \(P_3\) with the inner product \( \langle p,q\rangle = \int_0^1 x\, p(x) q(x) dx\) by applying the Gram-Schmidt procedure to \(1, x, x^2\).
Homework 8
Due Fri 4/5 (Underlined are the most important.)
- Section 6.1 -- p. 308:
# 1acdghijl(Please list your eigenvalues in ascending order.), 3, 4, 7, 9, 10, 14, 28, 33
- Section 6.3 -- p. 336:
# 1abcde(Please list your eigenvalues in ascending order.), 2abcde, 3abcde(if invertible), 4(Do b before a.), 5, 18(Also: How are the eigenvalues and eigenvectors of B expressed in terms of those for A?), 29
Last modified by pby on Apr 1,2013.