AB Calculus Homework
1.2 – Finding Limits Graphically and Numerically page 54 (1-18)
1.3 – Evaulating Limits Analysically page 65 (5-43 odd, 51-60, 67-70,83)
1.4 – Continuity and One-sided Limits page 76 (1-18, 25-26, 33-47 odd)
1.5 Infinite Limits page 85 (9-25 odd, 33-43 odd)
Chapter 1 Review page 88 (11-21, 27, 31-35, 38, 41)
2.1 – The Derivative and Tangent Line page 102 (5-33 odd)
2.2 – Differentiation Rules page 113 (3-65 odd, 81-89 odd)
2.3 – Product and Quotient Rules page 124 (1-53 odd, 63, 65, 69)
2.4 – Chain Rule page 133 (7-33 odd, 47-69 odd, 79, 81)
2.5 – Implicit Differentiation page 142 (1-15 odd, 21-27 odd, 37, 43, 47)
2.6 – Related Rates page 149 (1, 3, 5, 7, 15, 19, 20, 22)
Chapter 2 Review page 153 (1, 3, 8, 11, 17-29 odd, 41-49 odd, 59, 62, 63, 65-69 odd, 97, 99, 103, 105
3.1 – Extrema on an Interval page 165 (1-10, 11, 13, 17-29 odd, 33, 51, 53, 61, 63)
3.2 – Mean Value Theorem page 172 (3, 5, 29, 31-34)
3.3 – First Derivative Test page 181 (1-31 odd)
3.4 – Concavity page 189 (5, 11-21 odd, 27-33 odd, 53, 61)
3.5 – Limits at Infinity page 199 (1-6 all, 13-31 odd)
3.7 – Optimization page 216 (2-10, 17, 18)
4.1 – Antiderivatives page 249 (15-42 all, 55-61 odd)
4.3 – Definite Integrals page 273 (13-43, 45)
4.4 – Fundamental Theorem of Calculus page 284 (5-23 all, 35-51 odd, 69-91 odd)
4.5 – Integration by substitution page 297 (7-33 odd, 41-49 odd, 65-71 odd)
5.1 – Natural Log Differentiation page 322 (45-73 all)
5.2 – Natural Log Integration page 330 (1-23 odd)
5.3 – Inverse Functions page 338 (9-16, 29-35 odd, 47-49, 71-73, 81-84)
5.4 – Exponential Functions page 348 (39-79 odd, 87-107 odd)
5.5 – Bases other than e page 352 (41-68)
5.6 – Differential Equations page 366 (2-9, 11-13, 21-22, 33, 37, 43-44, 63)
5.7 – Separation of Variables page 377 (1-17 odd, 31-59 odd)
5.8 – Inverse Trig Functions: Derivatives page 386 (41-59 odd)
5.9 – Inverse Trig Functions: Integration page 393 (1-31 odd)
6.1 – Area between Two Curves page 418 (1-7 odd, 15-35 odd, 41, 47, 53)
6.2 – Volume page 428 (1-35 odd)