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More copies of this ISBNThis title in other editionsUniversity Calculus: Elements With Early Transcendentals  Solution Manual, Part 1 (09 Edition)by Joel Hass
Synopses & ReviewsPlease note that used books may not include additional media (study guides, CDs, DVDs, solutions manuals, etc.) as described in the publisher comments.
Publisher Comments:KEY BENEFIT: The popular and respected Thomas’ Calculus Series has been expanded to include a concise alternative. University Calculus: Elements is the ideal text for instructors who prefer the flexibility of a text that is streamlined without compromising the necessary coverage for a typical threesemester course. As with all of Thomas’ texts, this book delivers the highest quality writing, trusted exercises, and an exceptional art program. Providing the shortest, lightest, and leastexpensive early transcendentals presentation of calculus, University Calculus: Elements is the text that students will carry and use! KEY TOPICS: Functions and Limits ; Differentiation; Applications of Derivatives ; Integration; Techniques of Integration; Applications of Definite Integrals; Infinite Sequences and Series; Polar Coordinates and Conics; Vectors and the Geometry of Space; VectorValued Functions and Motion in Space; Partial Derivatives; Multiple Integrals; Integration in Vector Fields. MARKET: for all readers interested in calculus. About the AuthorJoel Hass received his PhD from the University of California—Berkeley. He is currently a professor of mathematics at the University of California—Davis. He has coauthored six widely used calculus texts as well as two calculus study guides. He is currently on the editorial board of Geometriae Dedicata and MediaEnhanced Mathematics. He has been a member of the Institute for Advanced Study at Princeton University and of the Mathematical Sciences Research Institute, and he was a Sloan Research Fellow. Hass’s current areas of research include the geometry of proteins, three dimensional manifolds, applied math, and computational complexity. In his free time, Hass enjoys kayaking.
Maurice D. Weir holds a DA and MS from CarnegieMellon University and received his BS at Whitman College. He is a Professor Emeritus of the Department of Applied Mathematics at the Naval Postgraduate School in Monterey, California. Weir enjoys teaching Mathematical Modeling and Differential Equations. His current areas of research include modeling and simulation as well as mathematics education. Weir has been awarded the Outstanding Civilian Service Medal, the Superior Civilian Service Award, and the Schieffelin Award for Excellence in Teaching. He has coauthored eight books, including the University Calculus series and the twelfth edition of Thomas’ Calculus. George B. Thomas, Jr. (late) of the Massachusetts Institute of Technology, was a professor of mathematics for thirtyeight years; he served as the executive officer of the department for ten years and as graduate registration officer for five years. Thomas held a spot on the board of governors of the Mathematical Association of America and on the executive committee of the mathematics division of the American Society for Engineering Education. His book, Calculus and Analytic Geometry, was first published in 1951 and has since gone through multiple revisions. The text is now in its twelfth edition and continues to guide students through their calculus courses. He also coauthored monographs on mathematics, including the text Probability and Statistics. Table of Contents1. Functions and Limits 1.1 Functions and Their Graphs 1.2 Combining Functions; Shifting and Scaling Graphs 1.3 Rates of Change and Tangents to Curves 1.4 Limit of a Function and Limit Laws 1.5 Precise Definition of a Limit 1.6 OneSided Limits 1.7 Continuity 1.8 Limits Involving Infinity Questions to Guide Your Review Practice and Additional Exercises
2. Differentiation 2.1 Tangents and Derivatives at a Point 2.2 The Derivative as a Function 2.3 Differentiation Rules 2.4 The Derivative as a Rate of Change 2.5 Derivatives of Trigonometric Functions 2.6 Exponential Functions 2.7 The Chain Rule 2.8 Implicit Differentiation 2.9 Inverse Functions and Their Derivatives 2.10 Logarithmic Functions 2.11 Inverse Trigonometric Functions 2.12 Related Rates 2.13 Linearization and Differentials Questions to Guide Your Review Practice and Additional Exercises
3. Applications of Derivatives 3.1 Extreme Values of Functions 3.2 The Mean Value Theorem 3.3 Monotonic Functions and the First Derivative Test 3.4 Concavity and Curve Sketching 3.5 Parametrizations of Plane Curves 3.6 Applied Optimization 3.7 Indeterminate Forms and L'Hopital's Rule 3.8 Newton's Method 3.9 Hyperbolic Functions Questions to Guide Your Review Practice and Additional Exercises
4. Integration 4.1 Antiderivatives 4.2 Estimating with Finite Sums 4.3 Sigma Notation and Limits of Finite Sums 4.4 The Definite Integral 4.5 The Fundamental Theorem of Calculus 4.6 Indefinite Integrals and the Substitution Rule 4.7 Substitution and Area Between Curves Questions to Guide Your Review Practice and Additional Exercises
5. Techniques of Integration 5.1 Integration by Parts 5.2 Trigonometric Integrals 5.3 Trigonometric Substitutions 5.4 Integration of Rational Functions by Partial Fractions 5.5 Integral Tables and Computer Algebra Systems 5.6 Numerical Integration 5.7 Improper Integrals Questions to Guide Your Review Practice and Additional Exercises
6. Applications of Definite Integrals 6.1 Volumes by Slicing and Rotation About an Axis 6.2 Volumes by Cylindrical Shells 6.3 Lengths of Plane Curves 6.4 Exponential Change and Separable Differential Equations 6.5 Work and Fluid Forces 6.6 Moments and Centers of Mass Questions to Guide Your Review Practice and Additional Exercises
7. Infinite Sequences and Series 7.1 Sequences 7.2 Infinite Series 7.3 The Integral Test 7.4 Comparison Tests 7.5 The Ratio and Root Tests 7.6 Alternating Series, Absolute and Conditional Convergence 7.7 Power Series 7.8 Taylor and Maclaurin Series 7.9 Convergence of Taylor Series 7.10 The Binomial Series Questions to Guide Your Review Practice and Additional Exercises
8. Polar Coordinates and Conics 8.1 Polar Coordinates 8.2 Graphing in Polar Coordinates 8.3 Areas and Lengths in Polar Coordinates 8.4 Conics in Polar Coordinates 8.5 Conics and Parametric Equations; The Cycloid Questions to Guide Your Review Practice and Additional Exercises
9. Vectors and the Geometry of Space 9.1 ThreeDimensional Coordinate Systems 9.2 Vectors 9.3 The Dot Product 9.4 The Cross Product 9.5 Lines and Planes in Space 9.6 Cylinders and Quadric Surfaces Questions to Guide Your Review Practice and Additional Exercises
10. VectorValued Functions and Motion in Space 10.1 Vector Functions and Their Derivatives 10.2 Integrals of Vector Functions 10.3 Arc Length and the Unit Tangent Vector T 10.4 Curvature and the Unit Normal Vector N 10.5 Torsion and the Unit Binormal Vector B 10.6 Planetary Motion Questions to Guide Your Review Practice and Additional Exercises
11. Partial Derivatives 11.1 Functions of Several Variables 11.2 Limits and Continuity in Higher Dimensions 11.3 Partial Derivatives 11.4 The Chain Rule 11.5 Directional Derivatives and Gradient Vectors 11.6 Tangent Planes and Differentials 11.7 Extreme Values and Saddle Points 11.8 Lagrange Multipliers Questions to Guide Your Review Practice and Additional Exercises
12. Multiple Integrals 12.1 Double and Iterated Integrals over Rectangles 12.2 Double Integrals over General Regions 12.3 Area by Double Integration 12.4 Double Integrals in Polar Form 12.5 Triple Integrals in Rectangular Coordinates 12.6 Moments and Centers of Mass 12.7 Triple Integrals in Cylindrical and Spherical Coordinates 12.8 Substitutions in Multiple Integrals Questions to Guide Your Review Practice and Additional Exercises
13. Integration in Vector Fields 13.1 Line Integrals 13.2 Vector Fields, Work, Circulation, and Flux 13.3 Path Independence, Potential Functions, and Conservative Fields 13.4 Green's Theorem in the Plane 13.5 Surface Area and Surface Integrals 13.6 Parametrized Surfaces 13.7 Stokes' Theorem 13.8 The Divergence Theorem and a Unified Theory Questions to Guide Your Review Practice and Additional Exercises
Appendices 1. Real Numbers and the Real Line 2. Mathematical Induction 3. Lines, Circles, and Parabolas 4. Trigonometric Functions 5. Basic Algebra and Geometry Formulas 6. Proofs of Limit Theorems and L'Hopital's Rule 7. Commonly Occurring Limits 8. Theory of the Real Numbers 9. Convergence of Power Series and Taylor's Theorem 10. The Distributive Law for Vector Cross Products 11. The Mixed Derivative Theorem and the Increment Theorem 12. Taylor's Formula for Two Variables What Our Readers Are SayingBe the first to add a comment for a chance to win!Product Details
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