Produktbild: Kilty, J: Mathematical Modeling and Applied Calculus

Kilty, J: Mathematical Modeling and Applied Calculus

Fr. 89.90

inkl. gesetzl. MwSt., Versandkostenfrei


Beschreibung

Produktdetails

Einband

Taschenbuch

Erscheinungsdatum

20.11.2018

Verlag

Oxford University Press

Seitenzahl

816

Maße (L/B/H)

24.4/18.8/3.8 cm

Gewicht

1624 g

Sprache

Englisch

ISBN

978-0-19-882473-2

Beschreibung

Rezension

There is an excellent balance of theory and application. Furthermore, most of the theoretical concepts covered in the textbook are essential for gaining facility in basic mathematical modelling. The book contains a high number of practice exercises. These extensive exercise sets give diverse opportunities to practice and deepen comprehension. The reviewer warmly recommends this book for consideration as a textbook for a course on calculus and/or mathematical modeling. Teodora-Liliana Radulescu, Zentralblatt MATH

Produktdetails

Einband

Taschenbuch

Erscheinungsdatum

20.11.2018

Verlag

Oxford University Press

Seitenzahl

816

Maße (L/B/H)

24.4/18.8/3.8 cm

Gewicht

1624 g

Sprache

Englisch

ISBN

978-0-19-882473-2

Noch keine Bewertungen vorhanden

Verfassen Sie die erste Bewertung zu diesem Artikel

Helfen Sie anderen Kundinnen und Kunden durch Ihre Meinung.

Kundinnen und Kunden meinen

Bewertungen (0)

  • Produktbild: Kilty, J: Mathematical Modeling and Applied Calculus
    • 1: Functions for Modeling Data

    • 1.1: Functions

    • 1.2: Multivariable Functions

    • 1.3: Linear Functions

    • 1.4: Exponential Functions

    • 1.5: Inverse Functions

    • 1.6: Logarithmic Functions

    • 1.7: Trigonometric Functions

    • 2: Mathematical Modeling

    • 2.1: Modeling with Linear Functions

    • 2.2: Modeling with Exponential Functions

    • 2.3: Modeling with Power Functions

    • 2.4: Modeling with Sine Functions

    • 2.5: Modeling with Sigmoidal Functions

    • 2.6: Single Variable Modeling

    • 2.7: Dimensional Analysis

    • 3: The Method of Least Squares

    • 3.1: Vectors and Vector Operations

    • 3.2: Linear Combinations of Vectors

    • 3.3: Existence of Linear Combinations

    • 3.4: Vector Projection

    • 3.5: The Method of Least Squares

    • 4: Derivatives

    • 4.1: Rates of Change

    • 4.2: The Derivative as a Function

    • 4.3: Derivatives of Modeling Functions

    • 4.4: Product and Quotient Rules

    • 4.5: The Chain Rule

    • 4.6: Partial Derivatives

    • 4.7: Limits and the Derivative

    • 5: Optimization

    • 5.1: Global Extreme Values

    • 5.2: Local Extreme Values

    • 5.3: Concavity and Extreme Values

    • 5.4: Newton's Method and Optimization

    • 5.5: Multivariable Optimization

    • 5.6: Constrained Optimization

    • 6: Accumulation and Integration

    • 6.1: Accumulation

    • 6.2: The Definite Integral

    • 6.3: First Fundamental Theorem

    • 6.4: Second Fundamental Theorem

    • 6.5: The Method of Substitution

    • 6.6: Integration by Parts