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· 제목 : Cameos for Calculus: Visualization in the First-Year Course (Hardcover)
· 분류 : 외국도서 > 과학/수학/생태 > 수학 > 수리분석
· ISBN : 9780883857885
· 쪽수 : 180쪽
· 출판일 : 2018-10-21
· 분류 : 외국도서 > 과학/수학/생태 > 수학 > 수리분석
· ISBN : 9780883857885
· 쪽수 : 180쪽
· 출판일 : 2018-10-21
목차
- Preface
- Part 1. Limits and Differentiation
- 1. The limit of (sin t)/t
- 2. Approximating π with the limit of (sin t)/t
- 3. Visualizing the derivative
- 4. The product rule
- 5. The quotient rule
- 6. The chain rule
- 7. The derivative of the sine
- 8. The derivative of the arctangent
- 9. The derivative of the arcsine
- 10. Means and the mean value theorem
- 11. Tangent line inequalities
- 12. A geometric illustration of the limit for e
- 13. Which is larger, π or πe? ab or ba?
- 14. Derivatives of area and volume
- 15. Means and optimization
- Part 2. Integration
- 16. Combinatorial identities for Riemann sums
- 17. Summation by parts
- 18. Integration by parts
- 19. The world's sneakiest substitution
- 20. Symmetry and integration
- 21. Napier's inequality and the limit for e
- 22. The nth root of n! and another limit for e
- 23. Does shell volume equal disk volume?
- 24. Solids of revolution and the Cauchy-Schwarz inequality
- 25. The midpoint rule is better than the trapezoidal rule
- 26. Can the midpoint rule be improved?
- 27. Why is Simpson's rule exact for cubics?
- 28. Approximating π with integration
- 29. The Hermite-Hadamard inequality
- 30. Polar area and Cartesian area
- 31. Polar area as a source of antiderivatives
- 32. The prismoidal formula
- Part 3. Infinite Series
- 33. The geometry of geometric series
- 34. Geometric differentiation of geometric series
- 35. Illustrating a telescoping series
- 36. Illustrating applications of the monotone sequence theorem
- 37. The harmonic series and the Euler-Mascheroni constant
- 38. The alternating harmonic series
- 39. The alternating series test
- 40. Approximating π with Maclaurin series
- Part 4. Additional Topics
- 41. The hyperbolic functions I: Definitions
- 42. The hyperbolic functions II: Are they circular?
- 43. The conic sections
- 44. The conic sections revisited
- 45. The AM-GM inequality for n positive numbers
- Part 5. Appendix: Some Precalculus Topics
- 46. Are all parabolas similar?
- 47. Basic trigonometric identities
- 48. The additional formulas for the sine and cosine
- 49. The double angle formulas
- 50. Completing the square
- Solutions to the Exercises
- References
- Index
- About the Author
