Calculus for engineers and scientists, volume 1
Langue : Anglais
Auteurs : WEIR Maurice, GIORDANO Frank, FINNEY Ross
(Each chapter ends with Practice Exercises and Additional Exercises Theory, Examples, Applications.)VOLUME ONE
1. Limits and Continuity.
Limits and Rates of Change.Rules for Finding Limits.Continuity.Tangent Lines.Writing for Your Review.
2. Derivatives.
The Derivative as a Function.The Derivative as a Rate of Change.Products, Quotients, and Negative Powers.Derivatives of Trigonometric Functions.The Chain Rule.Implicit Differentiation and Rational Exponents Related Rates.Writing for Your Review.
3. Extreme Values and Differential Equations.
Extreme Values of Functions.The Mean Value Theorem and Differential Equations.The Shape of a Graph.Graphical Solutions to Differential Equations.Exponential Functions and the Derivative of ex.Writing for Your Review.
4. Initial Value Problems.
Indefinite Integrals, Differential Equations, and Modeling.Integral Rules Integration by Substitution.First Order Differential Equations.Vectors in the Plane.Modeling Projectile Motion.Questions to Guide Your Review.
5. Definite Integrals.
Estimating with Finite Sums.Riemann Sums and Definite Integrals.The Fundamental Theorem.The Natural Logarithm.Area.Substitution in Definite Integrals Properties.The Mean Value Theorem and Proof of the Fundamental Theorem.Numerical Integration.Questions to Guide Your Review.
6. Applications of Derivatives and Integrals.
Optimization.Linearization and Differentials.Newton's Method.Volume.Springs, Pumping, and Lifting.Fluid Forces.Questions to Guide Your Review.
7. Applications of Differential Equations.
Growth and Decay Linear First Order Differential Equations.Euler's Numerical Method.Models for Springs and Pendulums.Constant-Coefficient Homogeneous Second Order Linear Equations.Unforced Oscillatory Motion.Writing for Your Review.
8. Inverse Trigonometric Functions.
Inverse Functions and Their Derivatives.Inverse Trigonometric Functions.Derivatives of Inverse Trigonometric Functions Integrals.Writing for Your Review.
9. Techniques of Integration.
Basic Integration Formulas.Integration by Parts Running the Product Rule Backwards.Partial Fractions.Integration with a Computer Algebra System (CAS).Numerical Integration: The Monte Carlo Method.Questions to Guide Your Review.(Each chapter ends with Writing for Your Review, Practice Exercises, and Additional Exercises Theory, Examples, Applications.)VOLUME TWO
10. Vectors in Space.
Vectors in Space.Dot Products.Cross Products.Lines and Planes in Space.Space Curves.Arc Length and the Unit Tangent Vector T.The TNB Frame Tangential and Normal Components of Acceleration.
11. Partial Derivatives.
1. Limits and Continuity.
Limits and Rates of Change.Rules for Finding Limits.Continuity.Tangent Lines.Writing for Your Review.
2. Derivatives.
The Derivative as a Function.The Derivative as a Rate of Change.Products, Quotients, and Negative Powers.Derivatives of Trigonometric Functions.The Chain Rule.Implicit Differentiation and Rational Exponents Related Rates.Writing for Your Review.
3. Extreme Values and Differential Equations.
Extreme Values of Functions.The Mean Value Theorem and Differential Equations.The Shape of a Graph.Graphical Solutions to Differential Equations.Exponential Functions and the Derivative of ex.Writing for Your Review.
4. Initial Value Problems.
Indefinite Integrals, Differential Equations, and Modeling.Integral Rules Integration by Substitution.First Order Differential Equations.Vectors in the Plane.Modeling Projectile Motion.Questions to Guide Your Review.
5. Definite Integrals.
Estimating with Finite Sums.Riemann Sums and Definite Integrals.The Fundamental Theorem.The Natural Logarithm.Area.Substitution in Definite Integrals Properties.The Mean Value Theorem and Proof of the Fundamental Theorem.Numerical Integration.Questions to Guide Your Review.
6. Applications of Derivatives and Integrals.
Optimization.Linearization and Differentials.Newton's Method.Volume.Springs, Pumping, and Lifting.Fluid Forces.Questions to Guide Your Review.
7. Applications of Differential Equations.
Growth and Decay Linear First Order Differential Equations.Euler's Numerical Method.Models for Springs and Pendulums.Constant-Coefficient Homogeneous Second Order Linear Equations.Unforced Oscillatory Motion.Writing for Your Review.
8. Inverse Trigonometric Functions.
Inverse Functions and Their Derivatives.Inverse Trigonometric Functions.Derivatives of Inverse Trigonometric Functions Integrals.Writing for Your Review.
9. Techniques of Integration.
Basic Integration Formulas.Integration by Parts Running the Product Rule Backwards.Partial Fractions.Integration with a Computer Algebra System (CAS).Numerical Integration: The Monte Carlo Method.Questions to Guide Your Review.(Each chapter ends with Writing for Your Review, Practice Exercises, and Additional Exercises Theory, Examples, Applications.)VOLUME TWO
10. Vectors in Space.
Vectors in Space.Dot Products.Cross Products.Lines and Planes in Space.Space Curves.Arc Length and the Unit Tangent Vector T.The TNB Frame Tangential and Normal Components of Acceleration.
11. Partial Derivatives.
Date de parution : 05-2000
Ouvrage de 372 p.
28.6x22.2 cm
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