Old Math 105 Exams
Click on the date of each exam 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 |
functions, graphs, first and second derivatives (graphical, numerical, analytic), limits, antiderivatives, differential equations | (O/Z) 1.1-1.7, 2.1-2.5 | ||
F08 |
Balcomb |
derivative rules (product, quotient, chain, exponential, trigonometric, inverse), implicit differentiation, antiderivatives, limits including L'Hopital's Rule, optimization, Newton's Method | (O/Z) 2.6-2.7, 3.1-3.5, 4.2-4.3, 4.6 | ||
F08 |
Moras |
functions, graphs, first and second derivatives (graphical, numerical, analytic), limits, antiderivatives, differential equations | (O/Z) 1.1-1.7, 2.1-2.5 | ||
F08 |
Moras |
derivative rules (product, quotient, chain, exponential, trigonometric, inverse), implicit differentiation, antiderivatives, limits including L'Hopital's Rule, optimization, Newton's Method | (O/Z) 2.6-2.7, 3.1-3.5, 4.2-4.3, 4.6 | ||
F08 |
Salomone |
functions, graphs, first and second derivatives (graphical, numerical, analytic), limits, antiderivatives, differential equations | (O/Z) 1.1-1.7, 2.1-2.5 | ||
F08 |
Salomone |
derivative rules (product, quotient, chain, exponential, trigonometric, inverse), implicit differentiation, antiderivatives, limits including L'Hopital's Rule, optimization | (O/Z) 2.6-2.7, 3.1-3.5, 4.2-4.3 | ||
F08 |
Towne |
Review problems for Exam 1. | (O/Z) 1.1-1.7, 2.1-2.5 | ||
F08 |
Towne |
Review problems for Exam 2. | (O/Z) 2.6-2.7, 3.1-3.5, 4.2-4.3, 4.6 | ||
W08 |
Shulman |
functions, graphs, first and second derivatives (graphical, numerical, analytic), limits | (O/Z) 1.1-1.7, 2.1-2.4 | ||
W08 |
Shulman |
differential equations, derivative rules (product, quotient, chain, exponential, trigonometric, inverse), implicit differentiation, antiderivatives, optimization | (O/Z) 2.5-2.7, 3.1-3.5, 4.3 | ||
W08 |
Shulman |
Final: all from 02/08 and 03/14 exams plus L'Hopital's Rule, related rates, Intermediate Value Theorm, Extreme Value Theorem, Mean Value Theorem, areas, integrals, Fundamental Theorem, sums | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.2-4.3, 4.5, 4.8-4.9, 5.1-5.3, 5.6-5.7 | ||
W08 |
Towne |
Review problems for Exam 1. | (O/Z) 1.1-1.7, 2.1-2.4 | ||
W08 |
Towne |
Review problems for Exam 2. | (O/Z) 2.5-2.7, 3.1-3.5, 4.3 | ||
W08 |
Towne |
Review problems for Final, Part I. | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.2 | ||
W08 |
Towne |
Review problems for Final, Part II. | (O/Z) 4.3, 4.5, 4.8-4.9, 5.1-5.3, 5.6-5.7 | ||
F07 |
Greer |
functions, graphs, first and second derivatives (graphical, numerical, analytic), limits, antiderivatives, differential equations | (O/Z) 1.1-1.7, 2.1-2.5 | ||
F07 |
Greer |
derivative rules (product, quotient, chain, exponential, trigonometric, inverse), implicit differentiation, antiderivatives, limits including L'Hopital's Rule, optimization, Newton's Method | (O/Z) 2.6-2.7, 3.1-3.5, 4.2-4.3, 4.6 | ||
F07 |
Greer |
Final: all from 10/05 and 11/09 exams (except optimization) plus related rates, Intermediate Value Theorm, Extreme Value Theorem, Mean Value Theorem, areas, integrals, Fundamental Theorem, sums | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.2, 4.5-4.6, 4.8-4.9, 5.1-5.3, 5.6-5.7 | ||
F07 |
Shor |
functions, graphs, first and second derivatives (graphical, numerical, analytic), limits, antiderivatives, differential equations | (O/Z) 1.1-1.7, 2.1-2.5 | ||
F07 |
Shor |
derivative rules (product, quotient, chain, exponential, trigonometric, inverse), implicit differentiation, antiderivatives, limits including L'Hopital's Rule, optimization, Newton's Method | (O/Z) 2.6-2.7, 3.1-3.5, 4.2-4.3, 4.6 | ||
F07 |
Shor |
Final: all from 10/05 and 11/09 exams plus related rates, Intermediate Value Theorm, Extreme Value Theorem, Mean Value Theorem, areas, integrals, Fundamental Theorem, sums | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.2-4.3, 4.5-4.6, 4.8-4.9, 5.1-5.3, 5.6-5.7 | ||
F07 |
Towne |
Review problems for Exam 1. | (O/Z) 1.1-1.7, 2.1-2.5 | ||
F07 |
Towne |
Review problems for Exam 2. | (O/Z) 2.6-2.7, 3.1-3.5, 4.2-4.3, 4.6 | ||
F07 |
Towne |
Review problems for Final, Part I. | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.2 | ||
F07 |
Towne |
Review problems for Final, Part II. | (O/Z) 4.3, 4.5-4.6, 4.8-4.9, 5.1-5.3, 5.6-5.7 | ||
| W07 |
Jayawant |
functions, graphs, first and second derivatives (graphical, numerical, analytic), limits, antiderivatives, differential equations | (O/Z) 1.1-1.7, 2.1-2.5 | ||
| W07 |
Jayawant |
derivative rules (product, quotient, chain, exponential, trigonometric, inverse), implicit differentiation, limits including L'Hopital's Rule, optimization, Intermediate Value Theorem | (O/Z) 2.6-2.7, 3.1-3.5, 4.2-4.3, 4.8 (IVT only) | ||
| W07 |
Jayawant |
Final: all from 02/09 and 03/16 exams plus related rates, Extreme Value Theorem, Mean Value Theorem, areas, integrals, Fundamental Theorem, sums | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.2-4.3, 4.5, 4.8-4.9, 5.1-5.3, 5.6-5.7 | ||
| W07 |
Towne |
Review problems for Exam 1. | (O/Z) 1.1-1.7, 2.1-2.5 | ||
| W07 |
Towne |
Review problems for Exam 2. | (O/Z) 2.6-2.7, 3.1-3.5, 4.2-4.3, 4.8 (IVT only) | ||
| W07 |
Towne |
Review problems for Final, Part I. | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.2 | ||
| W07 |
Towne |
Review problems for Final, Part II. | (O/Z) 4.3, 4.5, 4.8-4.9, 5.1-5.3, 5.6-5.7 | ||
| F06 |
Dzhelepov |
functions, graphs, first and second derivatives (graphical, numerical, analytic), limits, antiderivatives, differential equations | (O/Z) 1.1-1.7, 2.1-2.5 | ||
| F06 |
Dzhelepov |
derivative rules (product, quotient, chain, exponential, trigonometric, inverse), implicit differentiation, limits including L'Hopital's Rule, optimization, Newton's Method | (O/Z) 2.6-2.7, 3.1-3.5, 4.2-4.3, 4.6 | ||
| F06 |
Dzhelepov |
Final: all from 10/06 and 11/10 exams plus related rates, Extreme Value Theorem, Intermediate Value Theorem, Mean Value Theorem, areas, integrals, Fundamental Theorem, sums | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.2-4.3, 4.5-4.6, 4.8-4.9, 5.1-5.3, 5.6-5.7 | ||
| F06 |
Jayawant |
functions, graphs, first and second derivatives (graphical, numerical, analytic), limits, antiderivatives, differential equations | (O/Z) 1.1-1.7, 2.1-2.5 | ||
| F06 |
Jayawant |
derivative rules (product, quotient, chain, exponential, trigonometric, inverse), implicit differentiation, limits including L'Hopital's Rule, optimization, Newton's Method | (O/Z) 2.6-2.7, 3.1-3.5, 4.2-4.3, 4.6 | ||
| F06 |
Jayawant |
Final: all from 10/06 and 11/10 exams plus related rates, Extreme Value Theorem, Intermediate Value Theorem, Mean Value Theorem, areas, integrals, Fundamental Theorem, sums | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.2-4.3, 4.5-4.6, 4.8-4.9, 5.1-5.3, 5.6-5.7 | ||
| F06 |
Shor |
functions, graphs, first and second derivatives (graphical, numerical, analytic), limits, antiderivatives, differential equations | (O/Z) 1.1-1.7, 2.1-2.5 | ||
| F06 |
Shor |
derivative rules (product, quotient, chain, exponential, trigonometric, inverse), implicit differentiation, limits including L'Hopital's Rule, optimization, Newton's Method | (O/Z) 2.6-2.7, 3.1-3.5, 4.2-4.3, 4.6 | ||
| F06 |
Shor |
Final: all from 10/06 and 11/10 exams plus related rates, Extreme Value Theorem, Intermediate Value Theorem, Mean Value Theorem, areas, integrals, Fundamental Theorem, sums | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.2-4.3, 4.5-4.6, 4.8-4.9, 5.1-5.3, 5.6-5.7 | ||
| F06 |
Towne |
Review problems for Exam 1. | (O/Z) 1.1-1.7, 2.1-2.5 | ||
| F06 |
Towne |
Review problems for Exam 2. | (O/Z) 2.6-2.7, 3.1-3.5, 4.2-4.3, 4.6 | ||
| F06 |
Towne |
Review problems for Final, Part I. | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.2 | ||
| F06 |
Towne |
Review problems for Final, Part II. | (O/Z) 4.3, 4.5-4.6, 4.8-4.9, 5.1-5.3, 5.6-5.7 | ||
| W06 |
Ross |
Mini-exam: functions, graphs, first and second derivatives (graphical, numerical, analytic) | (O/Z) 1.1-1.7, 2.1-2.2 | ||
| W06 |
Ross |
functions, graphs, first and second derivatives (graphical, numerical, analytic), limits, antiderivatives, product and quotient rules | (O/Z) 1.1-1.7, 2.1-2.4, 2.6-2.7, 3.1 | ||
| W06 |
Ross |
chain rule, implicit differentiation, derivatives of inverses, differential equations, limits including L'Hopital's Rule, optimization, related rates, Newton's Method | (O/Z) 2.5, 3.2-3.5, 4.2-4.3, 4.5-4.6 | ||
| W06 |
Ross |
Final: all from 02/10 and 03/17 exams plus Extreme Value Theorem, Intermediate Value Theorem, Mean Value Theorem, areas, integrals, Fundamental Theorem, sums | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.2-4.3, 4.5-4.6, 4.8-4.9, 5.1-5.3, 5.6-5.7 | no |
|
| W06 |
Towne |
Review problems for Exam 2. | (O/Z) 1.1-1.7, 2.1-2.4, 2.6-2.7, 3.1 | ||
| W06 |
Towne |
Review problems for Exam 3. | (O/Z) 2.5, 3.2-3.5, 4.2-4.3, 4.5-4.6 | ||
| F05 |
Towne |
Review problems for Final Exam, Part I. | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.2 | ||
| F05 |
Towne |
Review problems for Final Exam, Part II. | (O/Z) 4.3, 4.5-4.6, 4.8-4.9, 5.1-5.3, 5.6-5.7 | ||
| F05 |
Greer |
functions, graphs, first and second derivatives (graphical, numerical, analytic), limits, antiderivatives, product and quotient rules | (O/Z) 1.1-1.7, 2.1-2.7, 3.1 | ||
| F05 |
Greer |
chain rule, implicit differentiation, inverses, slope fields, limits including L'Hopital's Rule, optimization, Newton's Method, Taylor polynomials | (O/Z) 3.2-3.5, 4.1-4.3, 4.6-4.7 | ||
| F05 |
Greer |
Final: all from 10/07 and 11/11 exams plus Extreme Value Theorem, Intermediate Value Theorem, Mean Value Theorem, areas, integrals, Fundamental Theorem, sums | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.1-4.3, 4.6-4.9, 5.1-5.3, 5.6-5.7 | ||
| F05 |
Shor |
functions, graphs, first and second derivatives (graphical, numerical, analytic), limits, antiderivatives, product and quotient rules | (O/Z) 1.1-1.7, 2.1-2.7, 3.1 | ||
| F05 |
Shor |
chain rule, implicit differentiation, inverses, slope fields, limits including L'Hopital's Rule, optimization, Newton's Method | (O/Z) 3.2-3.5, 4.1-4.3, 4.6 | ||
| F05 |
Shor |
Final: all from 10/07 and 11/11 exams plus Extreme Value Theorem, Intermediate Value Theorem, Mean Value Theorem, areas, integrals, Fundamental Theorem, sums | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.1-4.3, 4.6-4.9, 5.1-5.3, 5.6-5.7 | ||
| F05 |
Towne |
Review problems for Exam 1. | (O/Z) 1.1-1.7, 2.1-2.7, 3.1 | ||
| F05 |
Towne |
Review problems for Exam 2. | (O/Z) 3.2-3.5, 4.1-4.3, 4.6-4.7 | ||
| F05 |
Towne |
Review problems for Final Exam, Part I. | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.1-4.2 | ||
| F05 |
Towne |
Review problems for Final Exam, Part II. | (O/Z) 4.3, 4.6-4.9, 5.1-5.3, 5.6-5.7 | ||
| W05 |
Rhodes |
functions, graphs, first and second derivatives (graphical, numerical, analytic), limits, antiderivatives | (O/Z) 1.1-1.7, 2.1-2.7 | ||
| W05 |
Rhodes |
product, quotient, and chain rules, implicit differentiation, slope fields, limits, L'Hopital's Rule, optimization, related rates, Newton's method | (O/Z) 3.1-3.5, 4.1-4.3, 4.5-4.6 | ||
| W05 |
Rhodes |
Final: all from 02/11 and 03/18 exams plus Taylor polynomials, IVT, EVT, MVT, areas, integrals, the Fundamental Theorem, numerical integration | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.1-4.3, 4.5-4.9, 5.1-5.3, 5.6-5.7 | no |
|
| W05 |
Towne |
Review problems for Exam 1. | (O/Z) 1.1-1.7, 2.1-2.7 | ||
| W05 |
Towne |
Review problems for Exam 2. | (O/Z) 3.1-3.5, 4.1-4.3, 4.5-4.6 | ||
| W05 |
Towne |
Review problems for Final Exam, Part I. | (O/Z) 1.1-1.7, 2.1-2.7, 3.1-3.5, 4.1-4.2 | ||
| W05 |
Towne |
Review problems for Final Exam, Part II. | (O/Z) 4.3, 4.5-4.9, 5.1-5.7 | ||
| F04 |
Greer |
continuity; limits; derivatives: definition, interpretation, sketching and reading graphs, rules for powers, exponentials, quotients, products | (H-H) 1.7, 2.1-2.7, 3.1-3.3 | ||
| F04 |
Greer |
chain rule, implicit differentiation, local linearization, L'Hopital's Rule, finding maxima, minina and inflection points, optimization, theorems about differentiable and continuous functions | (H-H) 3.4-3.7, 3.9, 3.10, 4.1, 4.3, 4.5, 4.7 | ||
| F04 |
Greer |
Final: all from 10/08 and 11/12 exams, plus the definite integral, its interpretations, and antiderivatives (numerical, graphical and analytical) | (H-H) 1.7, 2.1-2.7, 3.1-3.7, 3.9, 3.10, 4.1, 4.3, 4.5, 4.7, 5.1-5.4, 6.1-6.4 | ||
| F04 |
Shulman |
continuity; limits; derivatives: definition, interpretation, sketching and reading graphs, rules for powers, exponentials, quotients, products | (H-H) 1.7, 2.1-2.7, 3.1-3.3 | no |
|
| F04 |
Shulman |
chain rule, implicit differentiation, local linearization, L'Hopital's Rule, finding maxima, minina and inflection points, optimization, theorems about differentiable and continuous functions | (H-H) 3.4-3.7, 3.9, 3.10, 4.1, 4.3, 4.5, 4.7 | no |
|
| F04 |
Shulman |
Final: all from 10/08 and 11/12 exams, plus the definite integral, its interpretations, and antiderivatives (numerical, graphical and analytical) | (H-H) 1.7, 2.1-2.7, 3.1-3.7, 3.9, 3.10, 4.1, 4.3, 4.5, 4.7, 5.1-5.4, 6.1-6.4 | ||
| F04 |
Wong |
continuity; limits; derivatives: definition, interpretation, sketching and reading graphs, rules for powers, exponentials, quotients, products | (H-H) 1.7, 2.1-2.7, 3.1-3.3 | ||
| F04 |
Wong |
chain rule, implicit differentiation, local linearization, L'Hopital's Rule, finding maxima, minina and inflection points, optimization, theorems about differentiable and continuous functions | (H-H) 3.4-3.7, 3.9, 3.10, 4.1, 4.3, 4.5, 4.7 | ||
| F04 |
Wong |
Final: all from 10/08 and 11/12 exams, plus the definite integral, its interpretations, and antiderivatives (numerical, graphical and analytical) | (H-H) 1.7, 2.1-2.7, 3.1-3.7, 3.9, 3.10, 4.1, 4.3, 4.5, 4.7, 5.1-5.4, 6.1-6.4 | no |
|
| F04 |
Towne |
Review problems for 10/08/04 exam. | (H-H) 1.7, 2.1-2.7, 3.1-3.3 | ||
| F04 |
Towne |
Review problems for 11/12/04 exam. | (H-H) 3.4-3.7, 3.9, 3.10, 4.1, 4.3, 4.5, 4.7 | ||
| F04 |
Towne |
Review problems for final exam, part I. | (H-H) 1.7, 2.1-2.7, 3.1-3.10, 6.1 | ||
| F04 |
Towne |
Review problems for final exam, part II. | (H-H) 4.1, 4.3, 4.5, 4.7, 5.1-5.4, 6.1-6.4 | ||
| W04 |
Coulombe |
Review problems for 02/13/04 exam. | (H-H) 1.7, 2.1-2.7, 3.1-3.4 | ||
| W04 |
Coulombe |
continuity; limits; derivatives: definition, interpretation, sketching and reading graphs, rules for powers, exponentials, quotients, products, and composites (Chain Rule) | (H-H) 1.7, 2.1-2.7, 3.1-3.4 | ||
| W04 |
Coulombe |
Review problems for 03/19/04 exam. | (H-H) 3.5-3.7, 3.9, 3.10, 4.1, 4.3, 4.5, 4.7 | ||
| W04 |
Coulombe |
all derivative rules, implicit differentiation, related rates, linear approximation, L'Hopital's Rule, local and global extrema, inflection points, optimization, theorems about differentiable and continuous functions | (H-H) 3.5-3.7, 3.9, 3.10, 4.1, 4.3, 4.5, 4.7 | ||
| W04 |
Coulombe |
Review problems for 04/13/04 exam. Note: these cover only Chapters 5 and 6, but exam will be comprehensive. | (H-H) 5.1-5.4, 6.1-6.4 | ||
| W04 |
Coulombe |
Final: all from 02/13 and 03/19 plus Riemann sums, meaning and use of the integral, graphical antiderivatives, differential equations, the second Fundamental Theorem | (H-H) 1.7, 2.1-2.7, 3.1-3.4,3.5-3.7, 3.9, 3.10, 4.1, 4.3, 4.5, 4.7, 5.1-5.4, 6.1-6.4 | ||
| W04 |
Towne |
Review for final, Part 1. Click here for .pdf without graphs. | (H-H) 1.7, 2.1-2.7, 3.1-3.7, 3.9, 3.10 | ||
| W04 |
Towne |
Review for final, Part 2. | (H-H) 4.1, 4.3, 4.5, 4.7, 5.1-5.4, 6.1-6.4 | ||
| F03 |
Greer |
all derivative rules, implicit differentiation, linear approximation, L'Hopital's Rule, local and global extrema, inflection points | (H-H) 3.3-3.7, 3.9-3.10, 4.1, 4.3 | ||
| F03 |
Greer |
optimization, theorems about differentiable and continuous functions, Riemann sums, the definite integral: its applications and theorems about it, antiderivatives numerically and graphically | (H-H) 4.5, 4.7, 5.1-6.1 | ||
| F03 |
Greer |
Final: all from 09/26, 10/24, and 11/14 plus finding antiderivatives analytically and solving differential equations | (H-H) 1.7, 2.1-2.7, 3.1-3.7, 3.9, 3.10, 4.1, 4.3, 4.5, 4.7, 5.1-5.4, 6.1-6.4 | ||
| F03 |
Haines |
continuity; limits; derivatives: definition, interpretation, sketching and reading graphs, rules for powers and exponentials, numerical approximation | (H-H) 1.7, 2.1-2.7, 3.1-3.2 | no |
|
| F03 |
Haines |
all derivative rules, implicit differentiation, parametric equations, linear approximation, L'Hopital's Rule, local and global extrema, inflection points | (H-H) 3.3-3.10, 4.1, 4.3 | no |
|
| F03 |
Haines |
optimization, hyperbolic functions, theorems about differentiable and continuous functions, Riemann sums, the definite integral: its applications and theorems about it, antiderivatives numerically and graphically | (H-H) 4.5-4.7, 5.1-6.1 | no |
|
| F03 |
Haines |
Final: all from 09/26, 10/24, and 11/14 plus finding antiderivatives analytically and solving differential equations | (H-H) 1.7, 2.1-2.7, 3.1-3.10, 4.1, 4.3, 4.5-4.7, 5.1-6.4 | no |
|
| F03 |
Hildebrand |
Final: continuity, limits, derivative rules and graphs, local linearization, extreme values and inflection points of graphs, optimization, Riemann sums, the definite integral and its applications, finding antiderivatives analytically and graphically, solving differential equations | (H-H) 1.7, 2.1-2.7, 3.1-3.7, 3.9, 3.10, 4.1, 4.3, 4.5, 4.7, 5.1-5.4, 6.1-6.4 | no |
|
| F03 |
Rhodes |
continuity; limits; derivatives: definition, interpretation, sketching and reading graphs, rules for powers and exponentials, numerical approximation | (H-H) 1.7, 2.1-2.7, 3.1-3.2 | no |
|
| F03 |
Rhodes |
all derivative rules, implicit differentiation, linear approximation, L'Hopital's Rule, local extrema, inflection points | (H-H) 3.3-3.7, 3.9-3.10, 4.1 | no |
|
| F03 |
Rhodes |
optimization, theorems about differentiable and continuous functions, Riemann sums, the definite integral: its applications and theorems about it | (H-H) 4.5, 4.7, 5.1-5.4 | no |
|
| F03 |
Rhodes |
Final: all from 09/26, 10/24, and 11/14 plus finding antiderivatives analytically and solving differential equations | (H-H) 1.7, 2.1-2.7, 3.1-3.7, 3.9, 3.10, 4.1, 4.3, 4.5, 4.7, 5.1-5.4, 6.1-6.4 | no |
|
| W03 |
Greer |
Functions: linear, exponential, inverse, power, log, and trig; Limits; Derivatives: definition, sketching | (H-H) 1.1-1.7, 2.1-2.7 | ||
| W03 |
Greer |
Derivative rules, limits, local linearization, implicit differentiation, parametric curves | (H-H) 3.1-3.10 | ||
| W03 |
Greer |
Maxima/minima/inflection points, optimization, derivative theorems, Riemann sums, the definite integral | (H-H) 4.1, 4.3, 4.5, 4.7, 5.1-5.4 | ||
| W03 |
Greer |
Final: all from 01/31, 03/05, and 03/28 exams plus finding and using antiderivatives | (H-H) Chapters 1-6 (except 4.2, 4.4, 4.6) | ||
| W03 |
Greer |
Final: all from 01/31, 03/05, and 03/28 examsplus finding and using antiderivatives | (H-H) Chapters 1-6 (except 4.2, 4.4, 4.6) | ||
| F02 |
Greer |
Derivative rules, limits, local linearization, implicit differentiation, parametric curves, the second derivative | (H-H) 2.6, 3.1-3.10 | ||
| F02 |
Greer |
Maxima/minima/inflection points, optimization, derivative theorems, Riemann sums, the definite integral | (H-H) 4.1, 4.3, 4.5, 4.7, 5.1-5.4 | ||
| F02 |
Greer |
Final: all from 10/28 and 11/18 exams plus finding and using anitderivatives | (H-H) Chapters 1-6 (except 4.2, 4.4, 4.6) | ||
| F02 |
Johnson |
derivative rules, especially power, product and chain; continuity and differentiability; graph of a function vs. graphs of its derivatives | (H-H) 2.1-2.7, 3.1-3.4 | ||
| F02 |
Johnson |
derivative rules, especially power, product and chain; continuity and differentiability; graph of a function vs. graphs of its derivatives | (H-H) 2.1-2.7, 3.1-3.4 | ||
| F02 |
Johnson |
limits, by L'Hopital's rule or otherwise;
implicit differentiation; parametric curves; optimization |
(H-H) 3.5-3.8, 3.10, 4.3, 4.5 | ||
| F02 |
Johnson |
Final Exam: all from 10/11 and 11/13 exams, plus the definite integral and finding antiderivatives | (H-H) 2.1-2.7, 3.1-3.8, 3.10, 4.3, 4.5, 6.1-6.2 | no |
|
| W02 |
Towne |
Functions: linear, exponential, inverse, power, log, and trig; Derivatives: limit definition, sketching, interpreting; Derivative Rules: power, exponential, product, quotient | (H-H) 1.1-1.7, 2.1-2.6, 3.1-3.3 | ||
| W02 |
Towne |
all derivative rules, implicit and logarithmic differentiation, local linearization, limits, maxima/minima/inflection points, families of curves, related rates, optimization | (H-H) 3.4-3.7, 3.9, 3.10, 4.1-4.3, 4.5 | ||
| W02 |
Towne |
Final Exam: all from 2/11 and 3/18 exams plus Riemann sums, integration, applications of the integral with rates of change and equations of motion | (H-H) Chapters 1-6 (except 2.7, 3.8, 4.4, 4.6, 4.7) | ||
| F01 |
Johnson |
derivative rules, especially power, product and chain; continuity and differentiability; graph of a function vs. graphs of its derivatives | (H-H) 2.1-2.7, 3.1-3.4 | ||
| F01 |
Johnson |
limits, by L'Hopital's rule or otherwise;
implicit differentiation; parametric curves; maxima, minima, inflection points |
(H-H) 3.5-3.8, 3.10, 4.1, 4.3 | ||
| F01 |
Johnson |
Final: all from 10/10 and 11/14 exams plus the definite integral and finding antiderivatives | (H-H) 2.1-2.7, 3.1-3.8, 3.10. 4.1, 4.3, 6.1-6.2 | no |