(eBook PDF) Calculus 10th Edition by Larson – Digital Ebook – Instant Delivery Download

Product details:

• ISBN-10 ‏ : ‎ 1285057090
• ISBN-13 ‏ : ‎ 978-1285057095
• Author: Dr. Ron Larson

The Larson CALCULUS program has a long history of innovation in the calculus market. It has been widely praised by a generation of students and professors for its solid and effective pedagogy that addresses the needs of a broad range of teaching and learning styles and environments. Each title is just one component in a comprehensive calculus course program that carefully integrates and coordinates print, media, and technology products for successful teaching and learning.

Table contents:

• Chapter 1: Limits and Their Properties
  • 1.1: A Preview of Calculus (22)
  • 1.2: Finding Limits Graphically and Numerically (61)
  • 1.3: Evaluating Limits Analytically (71)
  • 1.4: Continuity and One-Sided Limits (59)
  • 1.5: Infinite Limits (55)
  • 1: Review Exercises
  • 1: Problem Solving
• Chapter 2: Differentiation
  • 2.1: The Derivative and the Tangent Line Problem (63)
  • 2.2: Basic Differentiation Rules and Rates of Change (74)
  • 2.3: Product and Quotient Rules and Higher-Order Derivatives (77)
  • 2.4: The Chain Rule (72)
  • 2.5: Implicit Differentiation (57)
  • 2.6: Related Rates (56)
  • 2: Review Exercises
  • 2: Problem Solving
• Chapter 3: Applications of Differentiation
  • 3.1: Extrema on an Interval (56)
  • 3.2: Rolle’s Theorem and the Mean Value Theorem (61)
  • 3.3: Increasing and Decreasing Functions and the First Derivative Test (56)
  • 3.4: Concavity and the Second Derivative Test (59)
  • 3.5: Limits at Infinity (69)
  • 3.6: A Summary of Curve Sketching (53)
  • 3.7: Optimization Problems (63)
  • 3.8: Newton’s Method (46)
  • 3.9: Differentials (50)
  • 3: Review Exercises
  • 3: Problem Solving
• Chapter 4: Integration
  • 4.1: Antiderivatives and Indefinite Integration (80)
  • 4.2: Area (71)
  • 4.3: Riemann Sums and Definite Integrals (62)
  • 4.4: The Fundamental Theorem of Calculus (99)
  • 4.5: Integration by Substitution (75)
  • 4.6: Numerical Integration (60)
  • 4: Review Exercises
  • 4: Problem Solving
• Chapter 5: Logarithmic, Exponential, and Other Transcendental Functions
  • 5.1: The Natural Logarithmic Function: Differentiation (70)
  • 5.2: The Natural Logarithmic Function: Integration (87)
  • 5.3: Inverse Functions (66)
  • 5.4: Exponential Functions: Differentiation and Integration (83)
  • 5.5: Bases Other than e and Applications (79)
  • 5.6: Inverse Trigonometric Functions: Differentiation (68)
  • 5.7: Inverse Trigonometric Functions: Integration (86)
  • 5.8: Hyperbolic Functions (90)
  • 5: Review Exercises
  • 5: Problem Solving
• Chapter 6: Differential Equations
  • 6.1: Slope Fields and Euler’s Method (69)
  • 6.2: Differential Equations: Growth and Decay (72)
  • 6.3: Separation of Variables and the Logistic Equation (84)
  • 6.4: First-Order Linear Differential Equations (69)
  • 6: Review Exercises
  • 6: Problem Solving
• Chapter 7: Applications of Integration
  • 7.1: Area of a Region Between Two Curves (77)
  • 7.2: Volume: The Disk Method (67)
  • 7.3: Volume: The Shell Method (56)
  • 7.4: Arc Length and Surfaces of Revolution (63)
  • 7.5: Work (41)
  • 7.6: Moments, Centers of Mass, and Centroids (55)
  • 7.7: Fluid Pressure and Fluid Force (26)
  • 7: Review Exercises
  • 7: Problem Solving
• Chapter 8: Integration Techniques, L’Hopital’s Rule, and Improper Integrals
  • 8.1: Basic Integration Rules (66)
  • 8.2: Integration by Parts (75)
  • 8.3: Trigonometric Integrals (57)
  • 8.4: Trigonometric Substitution (68)
  • 8.5: Partial Fractions (55)
  • 8.6: Integration by Tables and Other Integration Techniques (65)
  • 8.7: Indeterminate Forms and L’Hopital’s Rule (78)
  • 8.8: Improper Integrals (75)
  • 8: Review Exercises
  • 8: Problem Solving
• Chapter 9: Infinite Series
  • 9.1: Sequences (50)
  • 9.2: Series and Convergence (48)
  • 9.3: The Integral Test and p-Series (41)
  • 9.4: Comparisons of Series (35)
  • 9.5: Alternating Series (46)
  • 9.6: The Ratio and Root Tests (47)
  • 9.7: Taylor Polynomials and Approximations (35)
  • 9.8: Power Series (40)
  • 9.9: Representation of Functions by Power Series (37)
  • 9.10: Taylor and Maclaurin Series (43)
  • 9: Review Exercises
  • 9: Problem Solving
• Chapter 10: Conics, Parametric Equations, and Polar Coordinates
  • 10.1: Conics and Calculus (56)
  • 10.2: Plane Curves and Parametric Equations (43)
  • 10.3: Parametric Equations and Calculus (57)
  • 10.4: Polar Coordinates and Polar Graphs (60)
  • 10.5: Area and Arc Length in Polar Coordinates (55)
  • 10.6: Polar Equations of Conics and Kepler’s Laws (42)
  • 10: Review Exercises
  • 10: Problem Solving
• Chapter 11: Vectors and the Geometry of Space
  • 11.1: Vectors in the Plane (53)
  • 11.2: Space Coordinates and Vectors in Space (64)
  • 11.3: The Dot Product of Two Vectors (53)
  • 11.4: The Cross Product of Two Vectors in Space (43)
  • 11.5: Lines and Planes in Space (65)
  • 11.6: Surfaces in Space (44)
  • 11.7: Cylindrical and Spherical Coordinates (62)
  • 11: Review Exercises
  • 11: Problem Solving
• Chapter 12: Vector-Valued Functions
  • 12.1: Vector-Valued Functions (48)
  • 12.2: Differentiation and Integration of Vector-Valued Functions (51)
  • 12.3: Velocity and Acceleration (48)
  • 12.4: Tangent Vectors and Normal Vectors (53)
  • 12.5: Arc Length and Curvature (54)
  • 12: Review Exercises
  • 12: Problem Solving
• Chapter 13: Functions of Several Variables
  • 13.1: Introduction to Functions of Several Variables (42)
  • 13.2: Limits and Continuity (47)
  • 13.3: Partial Derivatives (56)
  • 13.4: Differentials (43)
  • 13.5: Chain Rules for Functions of Several Variables (41)
  • 13.6: Directional Derivatives and Gradients (46)
  • 13.7: Tangent Planes and Normal Lines (42)
  • 13.8: Extrema of Functions of Two Variables (49)
  • 13.9: Applications of Extrema (48)
  • 13.10: Lagrange Multipliers (40)
  • 13: Review Exercises
  • 13: Problem Solving
• Chapter 14: Multiple Integration
  • 14.1: Iterated Integrals and Area in the Plane (60)
  • 14.2: Double Integrals and Volume (54)
  • 14.3: Change of Variables: Polar Coordinates (47)
  • 14.4: Center of Mass and Moments of Inertia (45)
  • 14.5: Surface Area (40)
  • 14.6: Triple Integrals and Applications (47)
  • 14.7: Triple Integrals in Other Coordinates (43)
  • 14.8: Change of Variables: Jacobians (42)
  • 14: Review Exercises
  • 14: Problem Solving
• Chapter 15: Vector Analysis
  • 15.1: Vector Fields (48)
  • 15.2: Line Integrals (47)
  • 15.3: Conservative Vector Fields and Independence of Path (40)
  • 15.4: Green’s Theorem (42)
  • 15.5: Parametric Surfaces (43)
  • 15.6: Surface Integrals (43)
  • 15.7: Divergence Theorem (31)
  • 15.8: Stokes’s Theorem (34)
  • 15: Review Exercises
  • 15: Problem Solving
• Chapter 16: Additional Topics in Differential Equations (online only)
  • 16.1: Exact First-Order Equations (42)
  • 16.2: Second-Order Homogeneous Linear Equations (47)
  • 16.3: Second-Order Nonhomogeneous Linear Equations (43)
  • 16.4: Series Solutions of Differential Equations (26)

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