 1.5.1: (a) What is a onetoone function? (b) How can you tell from the gr...
 1.5.2: (a) Suppose f is a onetoone function with domain A and range B. H...
 1.5.3: A function is given by a table of values, a graph, a formula, or a ...
 1.5.4: A function is given by a table of values, a graph, a formula, or a ...
 1.5.5: A function is given by a table of values, a graph, a formula, or a ...
 1.5.6: A function is given by a table of values, a graph, a formula, or a ...
 1.5.7: A function is given by a table of values, a graph, a formula, or a ...
 1.5.8: A function is given by a table of values, a graph, a formula, or a ...
 1.5.9: A function is given by a table of values, a graph, a formula, or a ...
 1.5.10: A function is given by a table of values, a graph, a formula, or a ...
 1.5.11: A function is given by a table of values, a graph, a formula, or a ...
 1.5.12: A function is given by a table of values, a graph, a formula, or a ...
 1.5.13: A function is given by a table of values, a graph, a formula, or a ...
 1.5.14: A function is given by a table of values, a graph, a formula, or a ...
 1.5.15: Assume that f is a onetoone function. (a) If fs6d 17, what is f 2...
 1.5.16: If f sxd x 5 1 x 3 1 x, find f 21 s3d and fs f 21 s2dd.
 1.5.17: If tsxd 3 1 x 1 ex , find t21 s4d.
 1.5.18: The graph of f is given. (a) Why is f onetoone? (b) What are the ...
 1.5.19: The formula C 5 9 sF 2 32d, where F > 2459.67, expresses the Celsiu...
 1.5.20: In the theory of relativity, the mass of a particle with speed is m...
 1.5.21: Find a formula for the inverse of the function. fsxd 1 1 s2 1 3x
 1.5.22: Find a formula for the inverse of the function. fsxd 4x 2 1 2x 1 3
 1.5.23: Find a formula for the inverse of the function. fsxd e 2x21
 1.5.24: Find a formula for the inverse of the function. y x 2 2 x, x > 1 2
 1.5.25: Find a formula for the inverse of the function.y lnsx 1 3d
 1.5.26: Find a formula for the inverse of the function.y 1 2 e2x 1 1 e2x
 1.5.27: Find an explicit formula for f 21 and use it to graph f 21 , f, and...
 1.5.28: Find an explicit formula for f 21 and use it to graph f 21 , f, and...
 1.5.29: Use the given graph of f to sketch the graph of f 21 .
 1.5.30: Use the given graph of f to sketch the graph of f 21 .
 1.5.31: Let f sxd s1 2 x 2 , 0 < x < 1. (a) Find f 21 . How is it related t...
 1.5.32: Let tsxd s 3 1 2 x 3 . (a) Find t21 . How is it related to t? (b) G...
 1.5.33: (a) How is the logarithmic function y logb x defined? (b) What is t...
 1.5.34: (a) What is the natural logarithm? (b) What is the common logarithm...
 1.5.35: Find the exact value of each expression. (a) log2 32 (b) log8 2
 1.5.36: Find the exact value of each expression. (a) log5 1 125 (b) lns1ye 2 d
 1.5.37: Find the exact value of each expression. (a) log10 40 1 log10 2.5 (...
 1.5.38: Find the exact value of each expression.(a) e2ln 2 (b) elnsln e3 d
 1.5.39: Express the given quantity as a single logarithm. ln 10 1 2 ln 5
 1.5.40: Express the given quantity as a single logarithm. ln b 1 2 ln c 2 3...
 1.5.41: Express the given quantity as a single logarithm. 3 lnsx 1 2d 3 1 1...
 1.5.42: Use Formula 10 to evaluate each logarithm correct to six decimal pl...
 1.5.43: Use Formula 10 to graph the given functions on a common screen. How...
 1.5.44: Use Formula 10 to graph the given functions on a common screen. How...
 1.5.45: Suppose that the graph of y log2 x is drawn on a coordinate grid wh...
 1.5.46: Compare the functions f sxd x 0.1 and tsxd ln x by graphing both f ...
 1.5.47: Make a rough sketch of the graph of each function. Do not use a cal...
 1.5.48: Make a rough sketch of the graph of each function. Do not use a cal...
 1.5.49: (a) What are the domain and range of f ? (b) What is the xintercep...
 1.5.50: (a) What are the domain and range of f ? (b) What is the xintercep...
 1.5.51: Solve each equation for x. (a) e724x 6 (b) lns3x 2 10d 2
 1.5.52: Solve each equation for x. (a) lnsx 2 2 1d 3 (b) e 2x 2 3ex 1 2 0
 1.5.53: Solve each equation for x. (a) 2x25 3 (b) ln x 1 lnsx 2 1d 1
 1.5.54: Solve each equation for x. (a) lnsln xd 1 (b) e ax Ce bx, where a b
 1.5.55: Solve each inequality for x. (a) ln x , 0 (b) ex . 5
 1.5.56: Solve each inequality for x. (a) 1 , e 3x21 , 2 (b) 1 2 2 ln x , 3
 1.5.57: (a) Find the domain of fsxd lnsex 2 3d. (b) Find f 21 and its domain.
 1.5.58: a) What are the values of eln 300 and lnse 300d? (b) Use your calcu...
 1.5.59: Graph the function fsxd sx 3 1 x 2 1 x 1 1 and explain why it is on...
 1.5.60: (a) If tsxd x 6 1 x 4 , x > 0, use a computer algebra system to fin...
 1.5.61: If a bacteria population starts with 100 bacteria and doubles every...
 1.5.62: When a camera flash goes off, the batteries immediately begin to re...
 1.5.63: Find the exact value of each expression. . (a) cos21 s21d (b) sin21...
 1.5.64: Find the exact value of each expression. (a) tan21 s3 (b) arctans21d
 1.5.65: Find the exact value of each expression.(a) csc21 s2 (b) arcsin 1
 1.5.66: Find the exact value of each expression. (a) sin21 (21ys2 ) (b) cos...
 1.5.67: Find the exact value of each expression. . (a) cot21 (2s3 ) (b) sec...
 1.5.68: Find the exact value of each expression. (a) arcsinssins5y4dd (b) c...
 1.5.69: Prove that cosssin21 xd s1 2 x 2 .
 1.5.70: Simplify the expression. tanssin21 xd
 1.5.71: Simplify the expression. sinstan21 xd
 1.5.72: Simplify the expression. sins2 arccos xd
 1.5.73: Graph the given functions on the same screen. How are these graphs ...
 1.5.74: Graph the given functions on the same screen. How are these graphs ...
 1.5.75: Find the domain and range of the function tsxd sin21 s3x 1 1d
 1.5.76: (a) Graph the function fsxd sinssin21 xd and explain the appearance...
 1.5.77: (a) If we shift a curve to the left, what happens to its reflection...
Solutions for Chapter 1.5: Inverse Functions and Logarithms
Full solutions for Single Variable Calculus: Early Transcendentals  8th Edition
ISBN: 9781305270336
Solutions for Chapter 1.5: Inverse Functions and Logarithms
Get Full SolutionsThis textbook survival guide was created for the textbook: Single Variable Calculus: Early Transcendentals, edition: 8. Chapter 1.5: Inverse Functions and Logarithms includes 77 full stepbystep solutions. Since 77 problems in chapter 1.5: Inverse Functions and Logarithms have been answered, more than 98788 students have viewed full stepbystep solutions from this chapter. Single Variable Calculus: Early Transcendentals was written by and is associated to the ISBN: 9781305270336. This expansive textbook survival guide covers the following chapters and their solutions.

Arithmetic sequence
A sequence {an} in which an = an1 + d for every integer n ? 2 . The number d is the common difference.

Coefficient of determination
The number r2 or R2 that measures how well a regression curve fits the data

Cubic
A degree 3 polynomial function

Data
Facts collected for statistical purposes (singular form is datum)

De Moivre’s theorem
(r(cos ? + i sin ?))n = r n (cos n? + i sin n?)

Exponent
See nth power of a.

Geometric sequence
A sequence {an}in which an = an1.r for every positive integer n ? 2. The nonzero number r is called the common ratio.

Graph of an inequality in x and y
The set of all points in the coordinate plane corresponding to the solutions x, y of the inequality.

Infinite limit
A special case of a limit that does not exist.

Linear system
A system of linear equations

Octants
The eight regions of space determined by the coordinate planes.

Orthogonal vectors
Two vectors u and v with u x v = 0.

Polynomial in x
An expression that can be written in the form an x n + an1x n1 + Á + a1x + a0, where n is a nonnegative integer, the coefficients are real numbers, and an ? 0. The degree of the polynomial is n, the leading coefficient is an, the leading term is anxn, and the constant term is a0. (The number 0 is the zero polynomial)

Quotient identities
tan ?= sin ?cos ?and cot ?= cos ? sin ?

Range (in statistics)
The difference between the greatest and least values in a data set.

Square matrix
A matrix whose number of rows equals the number of columns.

Standard form of a polynomial function
ƒ(x) = an x n + an1x n1 + Á + a1x + a0

Sum of a finite geometric series
Sn = a111  r n 2 1  r

Unit circle
A circle with radius 1 centered at the origin.

Xscl
The scale of the tick marks on the xaxis in a viewing window.