- 240 pages
- English
- PDF
- Available on iOS & Android
Computing for Calculus
About This Book
Computing for Calculus focuses on BASIC as the computer language used for solving calculus problems. This book discusses the input statement for numeric variables, advanced intrinsic functions, numerical estimation of limits, and linear approximations and tangents. The elementary estimation of areas, numerical and string arrays, line drawing algorithms, and bisection and secant method are also elaborated. This text likewise covers the implicit functions and differentiation, upper and lower rectangular estimates, Simpson's rule and parabolic approximation, and interpolating polynomials. Other topics include the Taylor polynomials, estimating the limit of a sequence, infinite series, and level curves and central projection of surfaces. This publication is beneficial to math students and specialists who use computer languages for educational purposes.
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Table of contents
- Front Cover
- Computing for Calculus
- Copyright Page
- Table of Contents
- CHAPTER 1. Basic BASIC
- CHAPTER 2. ESTIMATION OF DERIVATIVES
- CHAPTER 3. THE DEFINITE INTEGRAL
- CHAPTER 4. GRAPHICS
- CHAPTER 5. SOLVING EQUATIONS
- CHAPTER 6. IMPLICIT FUNCTIONS AND DIFFERENTIATION
- CHAPTER 7. ESTIMATION OF AREAS REVISITED
- CHAPTER 8. APPROXIMATION OF FUNCTIONS
- CHAPTER 9. ESTIMATION OF SEQUENCES AND SERIES
- CHAPTER 10. THREE DIMENSIONAL GRAPHICS
- APPENDIX TO SECTION 5.3 NEWTON'S METHOD
- APPENDIX TO SECTION 7.1 UPPER AND LOWER RECTANGULAR ESTIMATES
- APPENDIX TO SECTION 10.2 THE CENTRAL PROJECTION OF SURFACES