Old Math 106 Quizzes
Click on the date of each quiz in order to view it. If a solution set is available, you may click on it at the far right.
Text sections denoted (O/Z) refer to the second edition of Calculus by Ostebee and Zorn.
Text sections denoted (H-H) refer to the third edition of Calculus by Hughes-Hallett, Gleason, et al.
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| Term |
Date |
Instructor |
Topic(s) |
Text Sections |
Solutions |
F08 |
Balcomb |
substitution, numerical integration | (O/Z) 5.4, 6.1 | no |
|
F08 |
Balcomb |
error bounds for numerical integrals, Euler's Method | (O/Z) 6.2, 6.3 | no |
|
F08 |
Balcomb |
area, volume, work | (O/Z) 7.1, 7.2, 7.3 | no |
|
F08 |
Balcomb |
integration by parts, partial fractions, trigonometric antiderivatives | (O/Z) 8.1, 8.2, 8.3 | no |
|
F08 |
Balcomb |
trigonometric antiderivatives | (O/Z) 8.3 | no |
|
F08 |
Balcomb |
Taylor polynomials | (O/Z) 9.1 | no |
|
F08 |
Balcomb |
geometric series, nth term test | (O/Z) 11.2 | no |
|
F08 |
Haines |
substitution | (O/Z) 5.4 | no |
|
F08 |
Haines |
numerical integrals and their error bounds | (O/Z) 6.1, 6.2 | no |
|
F08 |
Haines |
error bounds for numerical integrals | (O/Z) 6.2 | no |
|
F08 |
Haines |
Euler's Method | (O/Z) 6.3 | no |
|
F08 |
Haines |
arc length | (O/Z) 7.1 | no |
|
F08 |
Haines |
volume | (O/Z) 7.2 | no |
|
F08 |
Haines |
volume | (O/Z) 7.2 | no |
|
F08 |
Haines |
work | (O/Z) 7.3 | no |
|
F08 |
Haines |
integration by parts | (O/Z) 8.1 | no |
|
F08 |
Haines |
partial fractions | (O/Z) 8.2 | no |
|
F08 |
Haines |
trigonometric antiderivatives | (O/Z) 8.3 | no |
|
F08 |
Haines |
miscellaneous antiderivatives | (O/Z) 8.4 | no |
|
F08 |
Haines |
Taylor polynomials | (O/Z) 9.1 | no |
|
F08 |
Haines |
Taylor's Theorem | (O/Z) 9.2 | no |
|
F08 |
Haines |
improper integrals | (O/Z) 10.1 | no |
|
F08 |
Haines |
comparisons of improper integrals | (O/Z) 10.2 | no |
|
F08 |
Haines |
estimating values of improper integrals | (O/Z) 10.2 | no |
|
F08 |
Haines |
sequences | (O/Z) 11.1 | no |
|
F08 |
Haines |
geometric series, nth term test | (O/Z) 11.2 | no |
|
F08 |
Haines |
convergence tests for series | (O/Z) 11.3 | no |
|
F08 |
Haines |
convergence tests for series | (O/Z) 11.3 | no |
|
F08 |
Haines |
convergence tests for series, alternating series | (O/Z) 11.4 | no |
|
F08 |
Haines |
alternating series | (O/Z) 11.4 | no |
|
F08 |
Haines |
power series | (O/Z) 11.5 | no |
|
F08 |
Haines |
power series | (O/Z) 11.5 | no |
|
F08 |
Haines |
power series as functions | (O/Z) 11.6 | no |
|
W08 |
Shor |
substitution | (O/Z) 5.4 | ||
W08 |
Shor |
numerical integrals and their error bounds | (O/Z) 6.1, 6.2 | ||
W08 |
Shor |
Euler's Method, area | (O/Z) 6.3, 7.1 | ||
W08 |
Shor |
integration by parts, long division | (O/Z) 8.1, 8.2 | ||
W08 |
Shor |
trigonometric antiderivatives, Taylor polynomials | (O/Z) 8.3, 9.1 | ||
W08 |
Shor |
Taylor's Theorem, improper integrals | (O/Z) 9.2, 10.1 | ||
W08 |
Shor |
sequences, geometric series | (O/Z) 11.1, 11.2 | ||
W08 |
Shor |
convergence tests for series | (O/Z) 11.2, 11.3 | ||
W08 |
Shor |
alternating series, power seres | (O/Z) 11.4, 11.5 | ||
W08 |
Wong |
substitution | (O/Z) 5.4 | ||
W08 |
Wong |
numerical integrals and their error bounds | (O/Z) 6.1, 6.2 | ||
W08 |
Wong |
Euler's Method, area, volume | (O/Z) 6.3, 7.1, 7.2 | ||
W08 |
Wong |
integration by parts, partial fractions | (O/Z) 8.1, 8.2 | ||
W08 |
Wong |
trigonometric substitution | (O/Z) 8.3 | ||
W08 |
Wong |
Taylor polynomials | (O/Z) 9.1 | ||
W08 |
Wong |
improper integrals and their comparisons, probability | (O/Z) 10.1, 10.2, 10.3 | ||
W08 |
Wong |
sequences, geometric series | (O/Z) 11.1, 11.2 | ||
W08 |
Wong |
convergence tests for series, alternating series | (O/Z) 11.3, 11.4 | ||
W08 |
Wong |
power series, Taylor series | (O/Z) 11.5, 11.6, 11.7 | ||
F07 |
Haines |
substitution | (O/Z) 5.4 | ||
F07 |
Haines |
numerical integrals | (O/Z) 6.1 | ||
F07 |
Haines |
numerical integrals and their error bounds | (O/Z) 6.1, 6.2 | ||
F07 |
Haines |
Euler's Method | (O/Z) 6.3 | ||
F07 |
Haines |
arc length | (O/Z) 7.1 | ||
F07 |
Haines |
volume | (O/Z) 7.2 | ||
F07 |
Haines |
work | (O/Z) 7.3 | ||
F07 |
Haines |
separation of variables | (O/Z) 7.4 | ||
F07 |
Haines |
integration by parts | (O/Z) 8.1 | ||
F07 |
Haines |
partial fractions | (O/Z) 8.2 | ||
F07 |
Haines |
trigonometric antiderivatives | (O/Z) 8.3 | ||
F07 |
Haines |
trigonometric antiderivatives | (O/Z) 8.3 | ||
F07 |
Haines |
miscellaneous antiderivatives | (O/Z) 8.4 | ||
F07 |
Haines |
Taylor polynomials | (O/Z) 9.1 | ||
F07 |
Haines |
the error in Taylor polynomial approximations | (O/Z) 9.2 | ||
F07 |
Haines |
improper integrals | (O/Z) 10.1 | ||
F07 |
Haines |
comparisons of improper integrals | (O/Z) 10.2 | ||
F07 |
Haines |
comparisons of improper integrals | (O/Z) 10.2 | ||
F07 |
Haines |
sequences | (O/Z) 11.1 | ||
F07 |
Haines |
geometric series | (O/Z) 11.2 | ||
F07 |
Haines |
integral test | (O/Z) 11.3 | ||
F07 |
Haines |
ratio test | (O/Z) 11.3 | ||
F07 |
Haines |
alternating series test | (O/Z) 11.4 | ||
F07 |
Haines |
alternating series error bound | (O/Z) 11.4 | ||
F07 |
Haines |
radius and interval of convergence | (O/Z) 11.5 | ||
F07 |
Haines |
power series as functions | (O/Z) 11.6 | ||
F07 |
Haines |
power series as functions, interval of convergence | (O/Z) 11.6 | ||
| W07 |
Shor |
substitution | (O/Z) 5.4 | ||
| W07 |
Shor |
numerical integrals and their error bounds | (O/Z) 6.1, 6.2 | ||
| W07 |
Shor |
Euler's Method, area | (O/Z) 6.3, 7.1 | ||
| W07 |
Shor |
separation of variables, integration by parts | (O/Z) 7.4, 8.1 | ||
| W07 |
Shor |
trigonometric antiderivatives, Taylor polynomials | (O/Z) 8.3, 9.1 | ||
| W07 |
Shor |
sequences, geometric series | (O/Z) 10.1, 10.2 | ||
| W07 |
Wong |
the area function, substitution | (O/Z) 5.2, 5.4 | ||
| W07 |
Wong |
numerical integrals and their error bounds | (O/Z) 6.1, 6.2 | ||
| W07 |
Wong |
Euler's Method, area, volume | (O/Z) 6.3, 7.1, 7.2 | ||
| W07 |
Wong |
separation of variables, integration by parts | (O/Z) 7.4, 8.1 | ||
| W07 |
Wong |
partial fractions, trigonometric substitution | (O/Z) 8.2-8.3 | ||
| W07 |
Wong |
Taylor polynomials | (O/Z) 9.1 | ||
| W07 |
Wong |
sequences, geometric series | (O/Z) 11.1, 11.2 | ||
| W07 |
Wong |
integral test, ratio test | (O/Z) 11.3 | ||
| W07 |
Wong |
absolute and conditional convergence, power series | (O/Z) 11.4, 11.5 | ||
| W07 |
Wong |
power series as functions, Taylor series | (O/Z) 11.6, 11.7 | ||
| F06 |
Shor |
area, arc length, and volume | (O/Z) 7.1, 7.2 | ||
| F06 |
Shor |
error bounds on numerical integrals, Euler's Method | (O/Z) 6.2, 6.3 | ||
| F06 |
Shor |
substitution, numerical integrals | (O/Z) 5.4, 6.1 | ||
| F06 |
Shor |
separation of variables, integration by parts, partial fractions | (O/Z) 7.4, 8.1-8.2 | ||
| F06 |
Shor |
polynomial division, trig substitution | (O/Z) 8.2-8.4 | ||
| F06 |
Shor |
Taylor polynomials and Taylor's Theorem | (O/Z) 9.1-9.2 | ||
| F06 |
Shor |
sequences, geometric series | (O/Z) 11.1-11.2 | ||
| W06 |
Jayawant |
substitution, numerical integrals and their error bounds, Euler's Method | (O/Z) 5.4, 6.1-6.3 | ||
| W06 |
Jayawant |
integration by parts, partial fractions, trigonometric antiderivatives | (O/Z) 8.1-8.3 | ||
| W06 |
Jayawant |
Taylor polynomials and Taylor's Theorem | (O/Z) 9.1-9.2 | ||
| W06 |
Jayawant |
series, convergence tests | (O/Z) 11.1-11.4 | ||
| W06 |
Wong |
substitution, numerical integration | (O/Z) 5.4, 6.1 | ||
| W06 |
Wong |
error bounds on numerical integrals, Euler's Method | (O/Z) 6.2, 6.3 | ||
| W06 |
Wong |
areas and volumes by integration | (O/Z) 7.1, 7.2 | ||
| W06 |
Wong |
separation of variables, integration by parts | (O/Z) 7.4, 8.1 | ||
| W06 |
Wong |
trigonometric antiderivatives | (O/Z) 8.3 | ||
| W06 |
Wong |
Taylor polynomials | (O/Z) 9.1 | ||
| W06 |
Wong |
computing and comparing improper integrals | (O/Z) 10.1, 10.2 | ||
| W06 |
Wong |
sequences, geometric series | (O/Z) 11.1, 11.2 | ||
| W06 |
Wong |
power series | (O/Z) 11.5, 11.6 | ||
| F05 |
Wong |
Fundamental Theorem of Calculus, substitution | (O/Z) 5.3, 5.4 | ||
| F05 |
Wong |
numerical integrals and their error bounds | (O/Z) 6.1, 6.2 | ||
| F05 |
Wong |
areas and volumes by integration | (O/Z) 7.1, 7.2 | ||
| F05 |
Wong |
present value, integration by parts | (O/Z) 7.5, 8.1 | ||
| F05 |
Wong |
partial fractions, trigonometric antiderivatives | (O/Z) 8.2, 8.3, 8.4 | ||
| F05 |
Wong |
Taylor polynomials, Taylor's theorem | (O/Z) 9.1, 9.2 | ||
| F05 |
Wong |
computing and comparing improper integrals | (O/Z) 10.1, 10.2 | ||
| F05 |
Wong |
sequences and series | (O/Z) 11.1, 11.2 | ||
| F05 |
Wong |
ratio test, alternating series test | (O/Z) 11.3, 11.4 | ||
| F05 |
Wong |
power series | (O/Z) 11.5, 11.6 | ||
| W05 |
Haines |
integration by substitution | (H-H) 7.1 | no |
|
| W05 |
Haines |
integration by parts | (H-H) 7.2 | no |
|
| W05 |
Haines |
partial fractions | (H-H) 7.4 | no |
|
| W05 |
Haines |
partial fractions | (H-H) 7.4 | no |
|
| W05 |
Haines |
approximating definite integrals | (H-H) 7.5 | no |
|
| W05 |
Haines |
numerical integration including Simpson's Rule | (H-H) 7.6 | no |
|
| W05 |
Haines |
improper integrals | (H-H) 7.7 | no |
|
| W05 |
Haines |
comparisons of improper integrals | (H-H) 7.8 | no |
|
| W05 |
Haines |
area | (H-H) 8.1 | no |
|
| W05 |
Haines |
volumes of revolution | (H-H) 8.2 | no |
|
| W05 |
Haines |
distribution functions | (H-H) 8.6 | no |
|
| W05 |
Haines |
probability, mean, median | (H-H) 8.7 | no |
|
| W05 |
Haines |
geometric sums and series | (H-H) 9.1 | no |
|
| W05 |
Haines |
the nth term test, the integral test | (H-H) 9.2 | no |
|
| W05 |
Haines |
the comparison test | (H-H) 9.3 | no |
|
| W05 |
Haines |
the ratio test, the alternating series test | (H-H) 9.3 | no |
|
| W05 |
Haines |
power series | (H-H) 9.4 | no |
|
| W05 |
Haines |
power series | (H-H) 9.4 | no |
|
| W05 |
Haines |
Taylor polynomials | (H-H) 10.1 | no |
|
| W05 |
Haines |
Taylor polynomials | (H-H) 10.1 | no |
|
| W05 |
Haines |
Taylor series | (H-H) 10.2 | no |
|
| W05 |
Haines |
Taylor series | (H-H) 10.2 | no |
|
| W05 |
Haines |
new Taylor series from old ones | (H-H) 10.3 | no |
|
| W05 |
Haines |
what it means to solve a differential equation | (H-H) 11.1 | no |
|
| W05 |
Haines |
slope fields | (H-H) 11.2 | no |
|
| W05 |
Haines |
Euler's Method | (H-H) 11.3 | no |
|
| W05 |
Haines |
separation of variables | (H-H) 11.4 | no |
|
| W05 |
Haines |
separation of variables | (H-H) 11.4 | no |
|
| W05 |
Haines |
growth and decay | (H-H) 11.5 | no |
|
| W05 |
Haines |
applications and modeling | (H-H) 11.6 | no |
|
| W05 |
Haines |
models of population growth | (H-H) 11.7 | no |
|
| W05 |
Wong |
integration by substitution, integration by parts | (H-H) 7.1, 7.2 | ||
| W05 |
Wong |
partial fractions, numerical integration | (H-H) 7.4, 7.5 | ||
| W05 |
Wong |
improper integrals, volumes of revolution | (H-H) 7.7, 8.1, 8.2 | ||
| W05 |
Wong |
geometric series, the nth term test, the integral test | (H-H) 9.1, 9.2 | ||
| W05 |
Wong |
convergence tests, power series | (H-H) 9.3, 9.4 | ||
| W05 |
Wong |
Taylor polynomials, Taylor series | (H-H) 10.1, 10.2 | ||
| W05 |
Wong |
what it means to solve a differential equation, slope fields | (H-H) 11.1, 11.2 | ||
| W05 |
Wong |
Euler's Method, separation of variables | (H-H) 11.3, 11.4 | ||
| W05 |
Wong |
applications of DEs | (H-H) 11.5, 11.6 | ||
| W05 |
Wong |
models of population growth, systems of DEs | (H-H) 11.7-11.9 | ||
| W04 |
Johnson |
integration by substitution | (H-H) 7.1 | ||
| W04 |
Johnson |
integration by substitution | (H-H) 7.1 | ||
| W04 |
Johnson |
integration by parts | (H-H) 7.2 | ||
| W04 |
Johnson |
integration by parts | (H-H) 7.2 | ||
| W04 |
Johnson |
table of integrals, partial fractions | (H-H) 7.3, 7.4 | ||
| W04 |
Johnson |
table of integrals, partial fractions | (H-H) 7.3, 7.4 | ||
| W04 |
Johnson |
geometric series | (H-H) 9.1 | ||
| W04 |
Johnson |
geometric series | (H-H) 9.1 | ||
| W04 |
Johnson |
series convergence tests | (H-H) 9.2, 9.3 | ||
| W04 |
Johnson |
series convergence tests | (H-H) 9.2, 9.3 | ||
| W04 |
Johnson |
power series, Taylor series | (H-H) 9.4, 10.1, 10.2 | ||
| W04 |
Johnson |
power series, Taylor series | (H-H) 9.4, 10.1, 10.2 | ||
| W04 |
Johnson |
volumes | (H-H) 8.1, 8.2 | ||
| W04 |
Johnson |
volumes | (H-H) 8.1, 8.2 | ||
| W04 |
Johnson |
density, what it means to solve a differential equation | (H-H) 8.3, 11.1 | ||
| W04 |
Johnson |
density, what it means to solve a differential equation | (H-H) 8.3, 11.1 | ||
| W04 |
Johnson |
separation of variables, equilibrium solutions | (H-H) 11.4, 11.5 | ||
| W04 |
Johnson |
separation of variables, equilibrium solutions | (H-H) 11.4, 11.5 | ||
| F03 |
Johnson |
integration by substitution | (H-H) 7.1 | ||
| F03 |
Johnson |
integration by substitution | (H-H) 7.1 | ||
| F03 |
Johnson |
integration by parts | (H-H) 7.2 | ||
| F03 |
Johnson |
integration by parts | (H-H) 7.2 | ||
| F03 |
Johnson |
improper integrals | (H-H) 7.3 | ||
| F03 |
Johnson |
improper integrals | (H-H) 7.3 | ||
| F03 |
Johnson |
tests for convergence of series | (H-H) 9.2, 9.3 | ||
| F03 |
Johnson |
tests for convergence of series | (H-H) 9.2, 9.3 | ||
| F03 |
Johnson |
interval of convergence of power series, finding Taylor series | (H-H) 9.4, 10.2 | ||
| F03 |
Johnson |
interval of convergence of power series, finding Taylor series | (H-H) 9.4, 10.2 | ||
| F03 |
Johnson |
differential equations, separation of variables | (H-H) 11.1, 11.4 | ||
| F03 |
Johnson |
differential equations, separation of variables | (H-H) 11.1, 11.4 | ||
| W03 |
Haines |
substitution | (H-H) 7.1 | no |
|
| W03 |
Haines |
integration by parts | (H-H) 7.2 | no |
|
| W03 |
Haines |
partial fractions | (H-H) 7.4 | no |
|
| W03 |
Haines |
numerical integration | (H-H) 7.5 | no |
|
| W03 |
Haines |
Simpson's Rule | (H-H) 7.6 | no |
|
| W03 |
Haines |
Riemann sums and finding areas | (H-H) 8.1 | no |
|
| W03 |
Haines |
volumes of revolution | (H-H) 8.2 | no |
|
| W03 |
Haines |
density functions | (H-H) 8.3 | no |
|
| W03 |
Haines |
work | (H-H) 8.4 | no |
|
| W03 |
Haines |
economics (present and future value) | (H-H) 8.5 | no |
|
| W03 |
Haines |
probability density functions | (H-H) 8.6 | no |
|
| W03 |
Haines |
geometric series | (H-H) 9.1 | no |
|
| W03 |
Haines |
convergence tests for series | (H-H) 9.2, 9.3 | no |
|
| W03 |
Haines |
convergence tests for series | (H-H) 9.3 | no |
|
| W03 |
Haines |
power series | (H-H) 9.4 | no |
|
| W03 |
Haines |
computing Taylor polynomials | (H-H) 10.1 | no |
|
| W03 |
Haines |
computing Taylor series | (H-H) 10.2 | no |
|
| W03 |
Haines |
computing Taylor series | (H-H) 10.2 | no |
|
| W03 |
Haines |
what it means to solve a differential equation | (H-H) 11.1 | no |
|
| W03 |
Haines |
slope fields | (H-H) 11.2 | no |
|
| W03 |
Haines |
Euler's Method | (H-H) 11.3 | no |
|
| W03 |
Haines |
separation of variables | (H-H) 11.4 | no |
|
| W03 |
Johnson |
integration by substitution | (H-H) 7.1 | ||
| W03 |
Johnson |
integration by parts, tables of integrals | (H-H) 7.2, 7.3 | ||
| W03 |
Johnson |
improper integrals, geometric series | (H-H) 7.7, 9.1 | ||
| W03 |
Johnson < |