 7.2.1: Find the inverse of each relation. 1. {(2, 4), (3, 1), (2, 8)}
 7.2.10: Find the inverse of each relation. 10. {(2, 6), (4, 5), (3, 1)}
 7.2.45: Which of the following is the inverse of the function f(x) = _3x  ...
 7.2.2: {(1, 3), (1, 1), (1, 3), (1, 1)}
 7.2.11: {(3, 8), (4, 2), (5, 3)}
 7.2.46: Which expression represents f(g(x)) if f(x) = x2 + 3 and g(x) = x ...
 7.2.3: Find the inverse of each function. Then graph the function and its ...
 7.2.12: {(7, 4), (3, 5), (1, 4), (7, 5)}
 7.2.47: If f(x) = 2x + 4, g(x) = x  1, and h(x) = x2, find each value. (Le...
 7.2.4: g(x) = 3x + 1
 7.2.13: {(1, 2), (3, 2), (1, 4), (0, 6)}
 7.2.48: g [h(1)]
 7.2.5: y = _1 2 x + 5
 7.2.14: {(6, 11), (2, 7), (0, 3), (5, 3)}
 7.2.49: h [f(3)]
 7.2.6: For Exercises 6 and 7, use the following information. The accelerat...
 7.2.15: {(2, 8), (6, 5), (8, 2), (5, 6)}
 7.2.50: List all of the possible rational zeros of each function. (Lesson 6...
 7.2.7: An object is accelerating at 50 feet per second squared. How fast i...
 7.2.16: Find the inverse of each function. Then graph the function and its ...
 7.2.51: h(x) =  4x 3  86 x 2 + 57x + 20
 7.2.8: Determine whether each pair of functions are inverse functions.
 7.2.17: g(x) = 2x
 7.2.52: Perform the indicated operations. (Lesson 42) 52. 3 2 0 4 8 1 + ...
 7.2.9: Determine whether each pair of functions are inverse functions.
 7.2.18: f(x) = x  5
 7.2.53: 3 0 3 2  2 5 1 2
 7.2.19: g(x) = x + 4
 7.2.54: Find the maximum and minimum values of the function f(x, y) = 2x + ...
 7.2.20: f(x) = 3x + 3
 7.2.55: State whether the system of equations shown at the right is consist...
 7.2.21: y = 2x  1
 7.2.56: The amount that a mailorder company charges for shipping and handl...
 7.2.22: y = _1 3 x
 7.2.57: Solve each equation or inequality. Check your solutions. (Lessons 1...
 7.2.23: f(x) = _5 8 x
 7.2.58: 5x + 6 = 4
 7.2.24: f(x) = _1 3 x + 4
 7.2.59: x  1 = 3
 7.2.25: f(x) = _4 5 x  7
 7.2.60: 3x + 2 = 5
 7.2.26: g(x) = _2x + 3 6
 7.2.61: 2x  4 > 8
 7.2.27: f(x) = _7x  4 8
 7.2.62: x  3 4
 7.2.28: The formula for the area of a circle is A = r 2 . 28. Find the inve...
 7.2.63: Graph each inequality. (Lesson 27) 63. y > _2 3 x  3
 7.2.29: Use the inverse to find the radius of the circle whose area is 36 s...
 7.2.64: y 4x + 5
 7.2.30: Determine whether each pair of functions are inverse functions.
 7.2.65: y < x  1
 7.2.31: Determine whether each pair of functions are inverse functions.
 7.2.32: Determine whether each pair of functions are inverse functions.
 7.2.33: Determine whether each pair of functions are inverse functions.
 7.2.34: Determine whether each pair of functions are inverse functions.
 7.2.35: Determine whether each pair of functions are inverse functions.
 7.2.36: For Exercises 3638, use the following information. Damaso asked Emi...
 7.2.37: Find the inverse
 7.2.38: Emilias final number was 9. What was her original number?
 7.2.39: For Exercises 39 and 40, use the following information. A formula f...
 7.2.40: Explain what purpose F 1 (x) serves.
 7.2.41: Determine the values of n for which f(x) = x n has an inverse that ...
 7.2.42: Sketch a graph of a function f that satisfies the following conditi...
 7.2.43: Give an example of a function that is its own inverse.
 7.2.44: Refer to the information on page 391 to explain how inverse functio...
Solutions for Chapter 7.2: Inverse Functions and Relations
Full solutions for College Physics, Volume 1  10th Edition
ISBN: 9781285737034
Solutions for Chapter 7.2: Inverse Functions and Relations
Get Full SolutionsThis textbook survival guide was created for the textbook: College Physics, Volume 1 , edition: 10. Chapter 7.2: Inverse Functions and Relations includes 65 full stepbystep solutions. This expansive textbook survival guide covers the following chapters and their solutions. Since 65 problems in chapter 7.2: Inverse Functions and Relations have been answered, more than 42334 students have viewed full stepbystep solutions from this chapter. College Physics, Volume 1 was written by and is associated to the ISBN: 9781285737034.

//
parallel

any symbol
average (indicated by a bar over a symbol—e.g., v¯ is average velocity)

°C
Celsius degree

°F
Fahrenheit degree