Calculus AB (AP) Assignments: Chapter 2-5 Review |
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| HW# | Date | Date | Book | First Page | Comments |
| 222 | 2.2 | 97 | 4, 6, 19. More practice and review: limits, graphical and numerical. | ||
| 232 | 2.3 | 107 | 12, 14. More practice and review: limits, algebraic. | ||
| 273 | 2.7 | 152 | 47, 48, 50. More practice and review: Derivative at a point. | ||
| 284 | 2.8 | 162 | 6, 8, 22, 38, 42. More practice and review: Derivative functions. | ||
| 295 | 2.R | 167 | Additional Chapter 2 Review. Exercises 2, 10, 30, 40, 44. | ||
| 344 | 3.4 | 203 | 8, 10, 54. More practice and review: Chain rule. | ||
| 362 | 3.6 | 220 | 4, 30, 32, 36. More practice and review: Logarithms. | ||
| 369 | 3.R | 262 | Additional Chapter 3 Review. Exercises 6, 10, 32, 70(again), 72, 73, 76, 78, 85, 89. | ||
| 495 | 4.R | 347 | Review. Concept Check 1, 2, 3, 5, 6, 10. True-False 1, 2, 5, 7, 8[F], 9. | ||
| 496 | 4.R | 348 | Exercises 1, 3, 5, 17, 18, 37, 39, 41[41:Don't use algebra]. Max/min/P.I. | ||
| 497 | 4.R | 349 | Exercises 67, 69, 71; 73[Hint: an anti-derivative of 1/(1+t^2) is arctan(t), the inverse of tan(t)], 74[Ans=−sint−3cost+3t+3]. Antiderivatives; Position. | ||
| 535 | 5.3 | 387 | 2, 4, 64. More practice and review: Integral functions from graphs, including concavity. | ||
| 561 | 5.R | 408 | Review. Concept Check 1, 3, 4, 5. True-False 1, 3, 4[F], 6[T], 9, 13, 14[T]. | ||
| 562 | 5.R | 409 | Exercises 1, 5, 7, 8[Ans=epi/4−1,0,earctanx]. | ||
| 563 | 5.R | 410 | Exercises 9, 11, 23, 37, 41. | ||
| 564 | 5.R | 411 | Exercises 43, 45, 56[Ans=29.167m,29.5m], 57, 71. | ||
| 565 | 5.R | 411 | Additional Chapter 5 Review. Exercises 58, 65 [Hint: differentiate], 66, 69. | ||
Final Exam Review Questions:
Set 2A: Circled Chapter 2 Homework questions
Set 3A: Circled Chapter 3 Homework questions
Set 4A: Circled Chapter 4 Homework questions
Set 5A: Circled Chapter 5 Homework questions. Circle 2, 64 on HW#535.
Set 2B, 3B, 4B, and 5B. Not circled HW questions. Recommended. Choose what you need to review. Do as much as you can.
I put full solutions on my website.
Topics:
30% - Material for Test 1 (Ch. 2 and 3.1) and question(s) from Test 1
30% - Material for Test 2 (Ch 3, 4.1 and 4.3) and question(s) from Test 2
40% - Material since Test 2 (Ch. 4.9 and Ch. 5) and question(s) from quizzes since Test 2.
Format:
120 minutes. Not fully twice as long as Test 2. Most of you won't need the full time. Short Answer and Free Response, as usual. Calculator allowed. Some questions will ask you to show algebra. You can always cross check with the calculator. No notes. There will be no test corrections. Grading scale will take this into account. You can expect, approximately, that a 75 percent raw score will earn a 90% grade and a 50 percent raw score will earn a 70% grade. This means that there will be challenging questions on the final exam. Calculator keystrokes for TI-83/84 will be given.
To memorize:
Both limit definitions of the derivative. See Textbook p. 146-147, p.154, p.157.
Formulas from Sheet #620 (blue sheet):
Derivatives: 1,2,4,5,6,3,13,7,8,B1,C,D,E,9,11,14.
Anti-derivatives: I, J, I1,I2,L,I3,I4,[M not needed],I5,I6,I9,I11,I15,T.
Know Fundamental Theorem of Calculus, both parts.