45.00$
Test Banks & Solution Manual
- Test Banks for Textbooks. Save money on TEST BANKS
- Anticipate the type of the questions that will appear in your exam.
- Delivery is INSTANT. You can download the files IMMEDIATELY once payment is done.
- Our test banks can help! All test banks are Downloads-take them with you to study!
- YOU GET ALL OF THE CHAPTERS. Each Test Bank follows your textbook.
- Ace Your Exams with Us! We are Students Helping Students Pass.
- Customer Service 24/7
Category : Higher Education
1. Functions 1.1 Review of functions 1.2 Representing functions 1.3 Trigonometric functions 1.4 Trigonometric functions 2. Limits 2.1 The idea of limits 2.2 Definitions of limits 2.3 Techniques for computing limits 2.4 Infinite limits 2.5 Limits at infinity 2.6 Continuity 2.7 Precise definitions of limits 3. Derivatives 3.1 Introducing the derivative 3.2 Working with derivatives 3.3 Rules of differentiation 3.4 The product and quotient rules 3.5 Derivatives of trigonometric functions 3.6 Derivatives as rates of change 3.7 The Chain Rule 3.8 Implicit differentiation 3.9 Related rates 4. Applications of the Derivative 4.1 Maxima and minima 4.2 What derivatives tell us 4.3 Graphing functions 4.4 Optimization problems 4.5 Linear approximation and differentials 4.6 Mean Value Theorem 4.7 L’Hôpital’s Rule 4.8 Newton’s Method 4.9 Antiderivatives 5. Integration 5.1 Approximating areas under curves 5.2 Definite integrals 5.3 Fundamental Theorem of Calculus 5.4 Working with integrals 5.5 Substitution rule 6. Applications of Integration 6.1 Velocity and net change 6.2 Regions between curves 6.3 Volume by slicing 6.4 Volume by shells 6.5 Length of curves 6.6 Surface area 6.7 Physical applications 7. Logarithmic and Exponential Functions 7.1 Inverse functions 7.2 The natural logarithmic and exponential functions 7.3 Logarithmic and exponential functions with other bases 7.4 Exponential models 7.5 Inverse trigonometric functions 7.6 L’ Hôpital’s Rule and growth rates of functions 7.7 Hyperbolic functions 8. Integration Techniques 8.1 Basic approaches 8.2 Integration by parts 8.3 Trigonometric integrals 8.4 Trigonometric substitutions 8.5 Partial fractions 8.6 Other integration strategies 8.7 Numerical integration 8.8 Improper integrals 8.9 Introduction to differential equations 9. Sequences and Infinite Series 9.1 An overview 9.2 Sequences 9.3 Infinite series 9.4 The Divergence and Integral Tests 9.5 The Ratio, Root, and Comparison Tests 9.6 Alternating series 10. Power Series 10.1 Approximating functions with polynomials 10.2 Properties of Power series 10.3 Taylor series 10.4 Working with Taylor series 11. Parametric and Polar Curves 11.1 Parametric equations 11.2 Polar coordinates 11.3 Calculus in polar coordinates 11.4 Conic sections 12. Vectors and Vector-Valued Functions 12.1 Vectors in the plane 12.2 Vectors in three dimensions 12.3 Dot products 12.4 Cross products 12.5 Lines and curves in space 12.6 Calculus of vector-valued functions 12.7 Motion in space 12.8 Length of curves 12.9 Curvature and normal vectors 13. Functions of Several Variables 13.1 Planes and surfaces 13.2 Graphs and level curves 13.3 Limits and continuity 13.4 Partial derivatives 13.5 The Chain Rule 13.6 Directional derivatives and the gradient 13.7 Tangent planes and linear approximation 13.8 Maximum/minimum problems 13.9 Lagrange multipliers 14. Multiple Integration 14.1 Double integrals over rectangular regions 14.2 Double integrals over general regions 14.3 Double integrals in polar coordinates 14.4 Triple integrals 14.5 Triple integrals in cylindrical and spherical coordinates 14.6 Integrals for mass calculations 14.7 Change of variables in multiple integrals 15. Vector Calculus 15.1 Vector fields 15.2 Line integrals 15.3 Conservative vector fields 15.4 Green’s theorem 15.5 Divergence and curl 15.6 Surface integrals 15.6 Stokes’ theorem 15.8 Divergence theorem Appendix A. Algebra Review Appendix B. Proofs of Selected Theorems D1 Differential Equations (online) D1.1 Basic Ideas D1.2 Direction Fields and Euler’s Method D1.3 Separable Differential Equations D1.4 Special First-Order Differential Equations D1.5 Modeling with Differential Equations D2 Second-Order Differential Equations (online) D2.1 Basic Ideas D2.2 Linear Homogeneous Equations D2.3 Linear Nonhomogeneous Equations D2.4 Applications D2.5 Complex Forcing Functions Table of Contents
What is Test Bank?
The test bank is a guide for testing and exams. It contains a lot of questions with their correct answers related to an academic textbook. Test banks usually contain true/false questions, multiple choice questions, and essay questions. Authors provide those guides to help instructors and teachers create their exams and tests easily and fast. We recommend all students to download the sample attached to each test bank page and review them deeply..
What is Solutions Manual?
The solutions manual is a guide where you can find all the correct answers (odd and even) to your textbooks’ questions, cases, and problems.
Can I get a sample before buying a Test Bank or Solutions Manual?
Samples are attached to each test bank and solutions manual page at our website. We always recommend students and instructors to download the samples before placing orders. At MANUALS1 we offer a complete sample chapter for each product.
Can I download my files immediately after completing the order?
Yes. Our system will grant you an access to download your files immediately after completing the order.
How will I download my product?
You will receive an email from testbanky that contains the download link.
If you could not download your product for any reason, contact us and we will solve the issue immediately.
No comments:
Post a Comment