January
Monday, Jan 08: Syllabus, What is a function? (Notes)
Wednesday, Jan 10: Linear functions. (Notes)
Friday, Jan 12: Average Rate of Change and Relative Change. (Notes)(Quiz 1)
Wednesday, Jan 17: Exponential functions. (Notes)
Friday, Jan 19: The Natural Logarithm. (Notes)
Monday, Jan 22: New functions from old. (Notes)
Wednesday, Jan 24: Exponential Growth and Decay, Proportionality. (Notes)
Friday, Jan 26: Power Functions. (Notes) (Quiz 2)
Monday, Jan 29: Instantaneous Rate of Change. (Notes)
Wednesday, Jan 31: The Derivative Function. (Notes)
February
Friday, Feb 02: Examples. (Notes) (Quiz 3)
Problem set for Midterm I.
Monday, Feb 05: Review. (Solutions to the Problem Set)
Wednesday, Feb 07: No class.
Friday, Feb 09: Midterm I. (Solutions)
Monday, Feb 12: The Second Derivative, Differentiation of Polynomials. (Notes)
Wednesday, Feb 14: Applications, Marginal Cost and Revenue. (Notes)
Monday, Feb 19: Examples, Exponential and Logarithm Functions. (Notes)
Wednesday, Feb 21: Examples, The Chain Rule. (Notes)
Friday, Feb 23: Review, Quiz 4. (Solutions)
Monday, Feb 26: Examples, Product Rule. (Notes)
Wednesday, Feb 28: Quotient rule, Examples. (Notes)
March
Friday, Mar 01: Local maxima and minima, Quiz 5. (Notes)(Quiz 5)
Problem set I for Midterm 2.
Monday, Mar 11: Solutions.
Problem set II for Midterm 2.
Wednesday, Mar 13: Solutions.
Friday, Mar 15: Midterm 2 (Solutions).
Wednesday, Mar 20: Review, Inflection points. (Notes)
Friday, Mar 22: Examples. (Notes)
Monday, Mar 25: Problems on Global maximum or minimum. (Notes)
Wednesday, Mar 27: Problems. (Solutions)
Friday, Mar 29: Summary of Chapter 4, Quiz 6. (Notes)
Monday, Apr 01: Distance and accumulated change. (Notes)
Wednesday, Apr 03: The definite integral. (Notes)
Friday, Apr 05: Antiderivatives and the fundamental theorem of calculus. (Notes)
Monday, Apr 08: Problems I.
Wednesday, Apr 10: Problems II. (Notes)
Friday, Apr 12: Exam II.