Thomas' Calculus
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14th Edition
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SOLUTIONS
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MANUAL
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Joel Hass, Christopher Heil, Maurice Weir
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Comprehensive Solutions Manual for Instructors
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and Students
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9780134438986
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© Joel Hass, Christopher Heil & Maurice Weir. All rights reserved.
Reproduction or distribution without permission is prohibited.
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© MEDGEEK
, TABLE OF CONTENTS
Solutions Manual – Thomas' Calculus (14th Edition)
Authors: Joel Hass, Christopher Heil, and Maurice Weir
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ISBN: 9780134438986
PART I: FUNCTIONS, LIMITS, AND THE DERIVATIVE
Chapter 1: Functions
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Chapter 2: Limits and Continuity
Chapter 3: Derivatives
Chapter 4: Applications of Derivatives
PART II: INTEGRATION AND DIFFERENTIAL EQUATIONS
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Chapter 5: Integrals
Chapter 6: Applications of Definite Integrals
Chapter 7: Transcendental Functions
Chapter 8: Techniques of Integration
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Chapter 9: First-Order Differential Equations
PART III: SEQUENCES, SERIES, AND CONIC SECTIONS
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Chapter 10: Infinite Sequences and Series
Chapter 11: Parametric Equations and Polar Coordinates
PART IV: MULTIVARIABLE CALCULUS
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Chapter 12: Vectors and the Geometry of Space
Chapter 13: Vector-Valued Functions and Motion in Space
Chapter 14: Partial Derivatives
Chapter 15: Multiple Integrals
Chapter 16: Integrals and Vector Fields
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, CHAPTER 1 FUNCTIONS
1.1 FUNCTIONS AND THEIR GRAPHS
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1. domain (, ); range [1, ) 2. domain [0, ); range (, 1]
3. domain [2, ); y in range and y 5 x 10 0 y can be any nonnegative real number range [0, ).
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4. domain (, 0] [3, ); y in range and y x 2 3 x 0 y can be any nonnegative real number
range [0, ).
5. domain (, 3) (3, ); y in range and y 4 , now if t 3 3 t 0 4 0, or if t 3
3t 3t
3 t 0 3 4 t 0 y can be any nonzero real number range (, 0) (0, ).
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6. domain (, 4) ( 4, 4) (4, ); y in range and y 2 , now if t 4 t 2 16 0 2 0, or if
t 2 16 t 2 16
4 t 4 16 t 2 16 0 16
2 2 2
, or if t 4 t 16 0 2 0 y can be any nonzero
t 2 16 t 2 16
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real number range (, 18 ] (0, ).
7. (a) Not the graph of a function of x since it fails the vertical line test.
(b) Is the graph of a function of x since any vertical line intersects the graph at most once.
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8. (a) Not the graph of a function of x since it fails the vertical line test.
(b) Not the graph of a function of x since it fails the vertical line test.
9. base x; (height)2 2x
2
x 2 height 2
3
x; area is a ( x) 1
2
(base)(height) 12 ( x) x
2
3
4
3 2
x ;
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perimeter is p ( x) x x x 3 x.
10. s side length s 2 s 2 d 2 s d ; and area is a s 2 a 12 d 2
2
11. Let D diagonal length of a face of the cube and the length of an edge. Then 2 D 2 d 2 and
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2 3/2 3
D 2 2 2 3 2 d 2 d . The surface area is 6 2 6d 2 2d 2 and the volume is 3 d3 d .
3 3 3 3
12. The coordinates of P are x, x so the slope of the line joining P to the origin is m xx 1 ( x 0).
x
Thus, x, x 1
m2
, 1
m .
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13. 2 x 4 y 5 y 12 x 54 ; L ( x 0)2 ( y 0)2 x 2 ( 12 x 54 )2 x 2 14 x 2 54 x 16
25
5 x2 5 25 20 x 2 20 x 25 20 x 2 20 x 25
4
4
x 16 16
4
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14. y x 3 y 2 3 x; L ( x 4) 2 ( y 0) 2 ( y 2 3 4)2 y 2 ( y 2 1)2 y 2
y4 2 y2 1 y2 y4 y2 1
Copyright 2018 Pearson Education, Inc.
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, 2 Chapter 1 Functions
15. The domain is (, ). 16. The domain is (, ).
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17. The domain is (, ). 18. The domain is (, 0].
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19. The domain is (, 0) (0, ). 20. The domain is (, 0) (0, ).
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21. The domain is (, 5) (5, 3] [3, 5) (5, ) 22. The range is [2, 3).
23. Neither graph passes the vertical line test
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(a) (b)
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Copyright 2018 Pearson Education, Inc.