These notes are based on the book Calculus, 10th Edition, by Ron Larson and Bruce Edwards.

1.2: Finding limits graphically and numerically (Tuesday, September 5 and Thursday, September 7)
1.3: Evaluating limits analytically (Thursday, September 7 and Tuesday, September 12)
1.4: One-sided limits and continuity (Tuesday, September 12, Thursday, September 14 and Tuesday, September 19)
1.5: Infinite limits (Tuesday, September 19 and Thursday, September 21)
3.5: Limits at infinity (Thursday, September 21 and Tuesday, September 26)

2,1: The derivative and the tangent line problem (Tuesday, September 26 and Tuesday, October 3)
2.2: Basic differentiation rules and rates of change (Tuesday, October 3, Thursday, October 5, and Tuesday, October 10)
2.3: Product and quotient rules and higher order derivatives (Thursday, October 5 and continued on Tuesday, October 10)
2.4: The Chain Rule (Tuesday, October 10 and Thursday, October 12)
2.5: Implicit differentiation (Thursday, October 12 and Tuesday, October 17)

2.6: Related rates (Tuesday, October 17 and Tuesday, October 24)
3.1: Extrema on an interval (Tuesday, October 24)
3.2: Rolle’s Theorem and the Mean Value Theorem (Thursday, October 26)
3.3: Increasing and decreasing functions and the First Derivative Test (Thursday, October 26)
3.4: Concavity and the Second Derivative Test (Tuesday, October 31)
3.6: Curve sketching (Tuesday, October 31 and Thursday, November 2)

3.7: Optimization (Tuesday, November 6 and Tuesday, November 14)
4.1: Antiderivatives and indefinite integration (Tuesday, November 14 and Thursday, November 16)
4.2: Area (Thursday, November 16)
4.3: Riemann sums and definite integrals (Thursday, November 16)
4.4: The Fundamental Theorem of Calculus (Thursday, November 16 and Tuesday, November 21)
4.5: Integration by substitution (Tuesday, November 21 and Tuesday, November 28)
5.1: The natural logarithm function: Differentiation (Tuesday, November 28 and Thursday, November 30))
5.2: The natural logarithm function: Integration (Thursday, November 30)
5.4: Exponential functions: Differentiation and integration (Thursday, November 30)

Omit Section 4.2 homework. On 4.3 homework, start at #13 and skip the assigned problems prior to #13 (these referred to material from 4.2, which we skipped).

Section 3.2 is not required. You can turn it in for bonus points (equivalent to one bonus assignment). See archive notes for more examples from 3.2. We are also omitting Section 3.9 (at least for now).