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Mathematics 151 (14-16) Home Page Fall 2007
Mathematics 151 (14-16) Fall 2007
Information for 640:151 (14-16) Calculus I (Math/Phys)
Instructor
Name: Jerrold Tunnell
Office: Hill Center 546
Course Web Page: www.math.rutgers.edu/courses/151-152/151-f07/151-14-16-f07
Office hours: Thursday 1:00-3:00
Text
- Calculus; Early Transcendentals, by Jon
Rogawski
Lectures
Time: Tuesday 5:00-6:20 Room: Hill-116
Thursday 5:00-6:20 Room: Hill-116
Recitations
Teaching Assistant: Nan Li (Hill 622. Office Hour : Tuesday 1:30-3pm)
14 M3 12:00 PM - 1:20 PM LSH-B110
15 M4 1:40 PM - 3:00 PM BE-121
16 M5 3:20 PM - 4:40 PM BE-101
Workshops
Sections and peer mentors
Name:
14 M3 LSH-B11 Alice Y. Lee
15 W3 BE-121 Sean Borkowski
16 W1 BE-120 Tim Lebo
Introductory material for Rutgers edition of Text. This includes
a discussion of workshops, a sample workshop and solution, and
commentary
Sample workshop writeup
Guidelines for Workshops
Announcements
Extra help for Mathematics 151: Wednesdays 5:10 to 6:40 at ARC 332, ARC 328
Tuesday 6:40 - 8:40
Thursday 6-7:30
EXAM I: Thursday October 4 in class (no calculators allowed)
Practice Problems for Exam I (Solutions to Practice Problems)
Formula Sheet to be distributed at Exam I
Sample Exams from years past
Review for Exam I on Tues Oct. 2 from 7-9pm in SEC 209.
This exam covers the material of lectures 1 through 8. You
should know the relation of the derivative of a function to
tangent lines to the graph of the function, be able to compute
limits, and understand the derivative as a function and its
connection to rates of change. You should understand what it
means for a function to be continuous or differentiable. You
should understand how new functions are made from simpler
functions by composing, multiplying or taking inverses. You
will need to know how to differentiate functions such as
polynomials, rational functions, trigonometric functions and
sums, products and quotients of these functions.
EXAM II: Thursday November 15 in class (no calculators allowed)
Practice Problems for Exam II (Solutions to Practice Problems)
Sample Exams from years past
Review for Exam II on Tues Nov 13 from 7-9pm in SEC 209
This exam covers the material of lectures 1 through 20. You
should know the topics covered in exam I, as well as the chain
rule and derivatives of inverse functions. The majority of
the exam will consist of applications of the derivative, so
one must be able to differentiate all functions in our catalog
of standard functions. You will need to know how to
differentiate implicitly defined functions and to solve
related rate problems. Linear approximation to functions and
Newton's method will be tested.
You should understand the Mean Value Theorem, critical points,
inflection points and local extrema of functions and how to
find these points. The use of first and second derivatives to
understand the graphs of functions will also be tested. There
will be problems on applied optimization and limits of
indeterminate forms, as well as basic antiderivatives.
FINAL EXAM: MONDAY DECEMBER 17 4-7 PM ARC 103 (calculators not allowed)
Practice Problems for Final Exam (Solutions to Final Practice Problems)
Formula Sheet to be distributed at Final Exam
Sample Exams from years past
Office hours during reading period:
Thursday, December 13 1-3 PM
Friday, December 14 2-3 PM
Monday. December 17 1:30-3:00 PM
MSLC review for 151 exam
Thursday Dec. 13 starting at 1 PM at ARC 103.
Televised review Session for Math 151 Final
Friday, Dec. 14 3-5 PM
TV schedule: 12/14 - 3pm, 12/15 - 9:30am, 5pm and 12/16 - 3pm.
Visit this web page for the TV review problems and the link to watch the program, as
well as the location of the review if you wish to attend in person