Schaum's outline of theory and problems of differential and integral calculus / Frank Ayres, Jr. and Elliott Mendelson
Material type: TextSeries: Schaum's outline seriesPublication details: New York : McGraw-Hill, 1990Edition: 3rd edDescription: 484 p. ill. ; 28 cmISBN:- 0070026629
- 9780071125314
- 515 20 A985
Item type | Current library | Call number | Status | Date due | Barcode | |
---|---|---|---|---|---|---|
Books | UE-Central Library | 515 A985 (Browse shelf(Opens below)) | Available | T3077 |
Cover title: Theory and problems of differential and integral calculus.
Spine title: Calculus.
Includes index.
1. Linear coordinate systems
2. Absolute value
3. Inequalities
4. Rectangular coordinate systems
5. Lines
6. Circles
7. Equations and their graphs
8. Functions
9. Limits
10. Continuity
11. The derivative
12. Rules for differentiating functions
13. Implicit differentiation
14. Tangent and normal lines
15. Law of the mean
16. Increasing and decreasing functions
17. Maximum and minimum values
18. Curve sketching
19. Concavity
20. Symmetry
21. Review of trigonometry
22. Differentiation of trigonometric functions
23. Inverse trigonometric functions
24. Rectilinear and circular motion
25. Related rates
26. Differentials
27. Newton's method
28. Antiderivatives
29. The definite integral
30. Area under a curve
31. The fundamental theorem of calculus
32. The natural logarithm
33. Exponential and logarithmic functions
34. L'hopital's rule
35. Exponential growth and decay
36. Applications of integration i: area and arc length
37. Applications of integration ii: volume
38. Techniques of integration i: integration by parts
39. Techniques of integration ii: trigonometric integrands and trigonometric substitutions
40. Techniques of integration iii: integration by partial fractions
41. Miscellaneous substitutions
42. Improper integrals
43. Applications of integration ii: area of a surface of revolution
44. Parametric representation of curves
45. Curvature
46. Plane vectors
47. Curvilinear motion
48. Polar coordinates
49. Infinite sequences
50. Infinite series
51. Series with positive terms
52. The integral test
53. Comparison tests
54. Alternating series
55. Absolute and conditional convergence
56. The ratio test
57. Power series
58. Taylor and maclaurin series
59. Taylor's formual with remainder
60. Partial derivatives
61. Total differential
62. Differentiability
63. Chain rules
64. Space vectors
65. Surface and curves in space
66. Directional derivatives
67. Maximum and minimum values
68. Vector differentiation and integration
69. Double and iterated integrals
70. Centroids and moments of inertia of plane areas
71. Double integration applied to volume under a surface and the area of a curved surface
72. Triple integrals
73. Masses of variable density
74. Differential equations of first and second order
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