Book contents
- Frontmatter
- Dedication
- Preface
- Contents
- I Limits and Differentiation
- II 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
- III Infinite Series
- IV Additional Topics
- V Appendix: Some Precalculus Topics
- Solutions to the Exercises
- References
- Index
- About the Author
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19 - The world's sneakiest substitution
from II - Integration
Book contents
- Frontmatter
- Dedication
- Preface
- Contents
- I Limits and Differentiation
- II 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
- III Infinite Series
- IV Additional Topics
- V Appendix: Some Precalculus Topics
- Solutions to the Exercises
- References
- Index
- About the Author
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- Cameos for CalculusVisualization in the First-Year Course, pp. 53 - 56Publisher: Mathematical Association of AmericaPrint publication year: 2015