product iamge

Instructor' solutions manual, multivariable for Thomas' calculus & Thomas' calculus early transcendental a, 12/E

This document was uploaded by one of our users. The uploader already confirmed that they had the permission to publish it. If you are author/publisher or own the copyright of this documents, please report to us by using this DMCA report form.

Download
Search on Amazon

Simply click on the Download Book button.

Yes, Book downloads on Ebookily are 100% Free.

Sometimes the book is free on Amazon As well, so go ahead and hit "Search on Amazon"

This manual contains detailed, worked-out solutions to all exercises in the text, covering Chapters 11—16. - See more at: http://www.pearsonhighered.com/educator/product/Instructors-Solutions-Manual-Multivariable-for-Thomas-Calculus-Thomasapos-Calculus-Early-Transcendentals

Author(s): Weir-Hass
Edition: 12th
Publisher: Pearson
Year: 2010

Language: English
Commentary: Excluding Chapter 17 - Differential Equations
Pages: C, vi, 361

CHAPTER 11 PARAMETRIC EQUATIONS AND POLAR COORDINATES
11.1 PARAMETRIZATIONS OF PLANE CURVES
11.2 CALCULUS WITH PARAMETRIC CURVES
11.3 POLAR COORDINATES
11.4 GRAPHING IN POLAR COORDINATES
11.5 AREA AND LENGTHS IN POLAR COORDINATES
11.6 CONIC SECTIONS
11.7 CONICS IN POLAR COORDINATES
CHAPTER 11 PRACTICE EXERCISES
CHAPTER 11 ADDITIONAL AND ADVANCED EXERCISES
CHAPTER 12 VECTORS AND THE GEOMETRY OF SPACE
12.1 THREE-DIMENSIONAL COORDINATE SYSTEMS
12.2 VECTORS
12.3 THE DOT PRODUCT
12.4 THE CROSS PRODUCT
12.5 LINES AND PLANES IN SPACE
12.6 CYLINDERS AND QUADRIC SURFACES
CHAPTER 12 PRACTICE EXERCISES
CHAPTER 12 ADDITIONAL AND ADVANCED EXERCISES
CHAPTER 13 VECTOR-VALUED FUNCTIONS AND MOTION IN SPACE
CHAPTER 13 ADDITIONAL AND ADVANCED EXERCISES
CHAPTER 14 PARTIAL DERIVATIVES
14.1 FUNCTIONS OF SEVERAL VARIABLES
14.2 LIMITS AND CONTINUITY IN HIGHER DIMENSIONS
14.3 PARTIAL DERIVATIVES
14.4 THE CHAIN RULE
14.5 DIRECTIONAL DERIVATIVES AND GRADIENT VECTORS
14.6 TANGENT PLANES AND DIFFERENTIALS
14.7 EXTREME VALUES AND SADDLE POINTS
14.8 LAGRANGE MULTIPLIERS
14.9 TAYLOR'S FORMULA FOR TWO VARIABLES
14.10 PARTIAL DERIVATIVES WITH CONSTRAINED VARIABLES
CHAPTER 14 PRACTICE EXERCISES
CHAPTER 14 ADDITIONAL AND ADVANCED EXERCISES
CHAPTER 15 MULTIPLE INTEGRALS
15.1 DOUBLE AND ITERATED INTEGRALS OVER RECTANGLES
15.2 DOUBLE INTEGRALS OVER GENERAL REGIONS
15.3 AREA BY DOUBLE INTEGRATION
15.4 DOUBLE INTEGRALS IN POLAR FORM
15.5 TRIPLE INTEGRALS IN RECTANGULAR COORDINATES
15.6 MOMENTS AND CENTERS OF MASS
15.7 TRIPLE INTEGRALS IN CYLINDRICAL AND SPHERICAL COORDINATES
15.8 SUBSTITUTIONS IN MULTIPLE INTEGRALS
CHAPTER 15 ADDITIONAL AND ADVANCED EXERCISES
CHAPTER 16 INTEGRATION IN VECTOR FIELDS
16.1 LINE INTEGRALS
16.2 VECTOR FIELDS, WORK; CIRCULATION; AND FLUX
16.3 PATH INDEPENDENCE, POTENTIAL FUNCTIONS; AND CONSERVATIVE FIELDS
16.4 GREEN'S THEOREM IN THE PLANE
16.5 SURFACES AND AREA
16.6 SURFACE INTEGRALS
16.7 STOKES' THEOREM
16.8 THE DIVERGENCE THEOREM AND A UNIFIED THEORY
CHAPTER 16 PRACTICE EXERCISES
CHAPTER 16 ADDITIONAL AND ADVANCED EXERCISES