METU-NCC Math

    Math 119 Calculus With Analytic Geometry (Spring 2013)

This page is for archival purposes only!
Students should use ODTU-Class

There will be 28 lectures given by the instructors, each lasting 2 class hours. The actual timing of the lectures will differ slightly from section to section because of the holidays, but the total number will be the same. Besides these lectures, there will be recitations, 2 hours per week, during which the assistants will solve extra problems and give quizzes.

The table below is a rough guideline for the content of course lectures. Professors may reorder content as necessary/desired. The section and page numbers below are from the textbook, Calculus, by James Stewart, 7th international metric ed., 2012.

Exam dates will be determined by the administration and are currently only approximate guesses.

Week 1:
Feb.18-22
1
Chapter 1. Functions and Limits
§1.4: The Tangent and Velocity Problems.
§1.5: The Limit of a Function.
2 §1.6: Calculating Limits Using the Limit Laws.
§1.8: Continuity.
Week 2:
Feb.25-
Mar.1
3 §1.7: The Precise Definition of a Limit.
4
Chapter 2. Derivatives
§2.1: Derivatives and Rates of Change.
§2.2: The Derivative as a Function.
Week 3:
Mar.4-8
5 §2.3: Differentiation Formulas.
§2.4: Derivatives of Trigonometric Functions.
6 §2.5: The Chain Rule.
§2.6: Implicit Differentiation.
Week 4:
Mar.11-15
7 §2.8: Related Rates.
Short Exam 1: Wed. 13 March at 17:45
8 §2.9: Linear Approximations and Differentials.
Chapter 3. Applications of Differentiation
§3.1: Maximum and Minimum Values.
Week 5:
Mar.18-22
9 §3.2: The Mean Value Theorem.
§3.3: How Derivatives Affect the Shape of a Graph.
10 §3.4: Limits at Infinity; Horizontal Asymptotes.
MIDTERM 1: Saturday, 23 March at 14:40
Rooms SZ-19, SZ-22, SZ-23, SZ-24, SZ-25
Week 6:
Mar.25-Mar.29
11 §3.5: Summary of Curve Sketching.
12 §3.7: Optimization Problems.
Week 7:
Apr.1-5
13 §3.8: Newton's Method (Reading Assignment).
§3.9: Antiderivatives.
14
Chapter 4. Integrals
§4.1: Areas and Distances.
§4.2: The Definite Integral.
Week 8:
Apr.8-13
15 §4.3: The Fundamental Theorem of Calculus.
§4.4: Indefinite Integrals and the Net Change Theorem.
16 §4.5: The Substitution Rule.
Chapter 5. Applications of Integration
§5.1: Areas between Curves.
§5.5: Average Value of a Function.
Week 9:
Apr.15-19
17 §5.2: Volumes (Disks).
§5.3: Volumes by Cylindrical Shells.
Short Exam 2: Mon. 15 April at 17:45
18
Chapter 6. Inverse Functions; Exp, log, and trig
§6.1: Inverse Functions.
§6.2: Exponential Functions and Their Derivatives.
§6.2*: The Natural Logarithmic Function.
Week 10:
Apr.22-26
19 §6.3: Logarithmic Functions.
§6.3*: The Natural Exponential Function.
§6.4: Derivatives of Logarithmic Functions.
§6.4*: General Logarithmic and Exponential Functions.
Holiday: April 23
20 §6.6: Inverse Trigonometric Functions.
§6.7: Hyperbolic Functions (Reading Assignment).
§6.8: Indeterminate Forms and L'Hospital's rule.
MIDTERM 2: Saturday, 27 April at 14:40
Week 11:
Apr.29-
May 3
21
Chapter 7. Techniques of Integration
§7.1: Integration by Parts.
Holiday May 1
22 §7.2: Trigonometric Integrals.
Week 12:
May 6-10
23 §7.3: Trigonometric Substitution.
24 §7.4.1: Integration of Rational Functions by Partial Fractions (I, II).
Week 13:
May 13-17
25 §7.4.2: Integration of Rational Functions by Partial Fractions (III, IV).
§7.5: Strategy for Integration.
26 §7.7: Approximate Integration.
§7.8: Improper Integrals.
Week 14:
May 20-24
27
Chapter 8. Further Applications of Integration
§8.1: Arc Length.
Short Exam 3: Tues. 21 May at 17:45
28 §8.2: Area of a Surface of Revolution.
FINAL EXAM: Tuesday, 4 June at 9:00