 2.1: The graph of f is given. (a) Find each limit, or explain why it doe...
 2.2: Sketch the graph of a function f that satisfies all of the followin...
 2.3: Find the limit. lim xl1 e x32x
 2.4: Find the limit. lim xl3 x 2 2 9 x 2 1 2x 2 3
 2.5: Find the limit. lim xl23 x 2 2 9 x 2 1 2x 2 3
 2.6: Find the limit. lim xl11 x 2 2 9 x 2 1 2x 2 3
 2.7: Find the limit. lim hl0 sh 2 1d 3 1 1 h
 2.8: Find the limit. lim tl2 t 2 2 4 t 3 2 8
 2.9: Find the limit. lim rl9 sr sr 2 9d 4
 2.10: Find the limit. lim v l 41 4 2 v  4 2 v
 2.11: Find the limit. lim ul1 u4 2 1 u3 1 5u2 2 6u
 2.12: Find the limit. lim xl3 sx 1 6 2 x x 3 2 3x 2
 2.13: Find the limit. lim x l` sx 2 2 9 2x 2 6
 2.14: Find the limit. lim xl2` sx 2 2 9 2x 2 6
 2.15: Find the limit. lim xl2 lnssin xd
 2.16: Find the limit. lim xl2` 1 2 2x 2 2 x 4 5 1 x 2 3x 4
 2.17: Find the limit. lim xl` (sx 2 1 4x 1 1 2 x)
 2.18: Find the limit. limxl` ex2x2
 2.19: Find the limit. lim xl01 tan21 s1yxd
 2.20: Find the limit. lim xl1 S 1 x 2 1 1 1 x 2 2 3x 1 2D
 2.21: Use graphs to discover the asymptotes of the curve. Then prove what...
 2.22: Use graphs to discover the asymptotes of the curve. Then prove what...
 2.23: If 2x 2 1 < fsxd < x 2 for 0 , x , 3, find limxl1 fsxd.
 2.24: Prove that limxl0 x 2 coss1yx 2 d 0.
 2.25: Prove the statement using the precise definition of a limit. lim xl...
 2.26: Prove the statement using the precise definition of a limit. lim x ...
 2.27: Prove the statement using the precise definition of a limit. lim xl...
 2.28: Prove the statement using the precise definition of a limit. lim xl...
 2.29: Let fsxd H s2x 3 2 x sx 2 3d 2 if x , 0 if 0 < x , 3 if x . 3 (a) E...
 2.30: Let tsxd 2x 2 x 2 2 2 x x 2 4 if 0 < x < 2 if 2 , x < 3 if 3 , x , ...
 2.31: Show that the function is continuous on its domain. State the domai...
 2.32: Show that the function is continuous on its domain. State the domai...
 2.33: Use the Intermediate Value Theorem to show that there is a root of ...
 2.34: Use the Intermediate Value Theorem to show that there is a root of ...
 2.35: (a) Find the slope of the tangent line to the curve y 9 2 2x 2 at t...
 2.36: Find equations of the tangent lines to the curve y 2 1 2 3x at the ...
 2.37: The displacement (in meters) of an object moving in a straight line...
 2.38: According to Boyles Law, if the temperature of a confined gas is he...
 2.39: (a) Use the definition of a derivative to find f9s2d, where fsxd x ...
 2.40: Find a function f and a number a such that lim hl0 s2 1 hd 6 2 64 h...
 2.41: The total cost of repaying a student loan at an interest rate of r%...
 2.42: Trace or copy the graph of the function. Then sketch a graph of its...
 2.43: Trace or copy the graph of the function. Then sketch a graph of its...
 2.44: Trace or copy the graph of the function. Then sketch a graph of its...
 2.45: (a) If fsxd s3 2 5x , use the definition of a derivative to find f9...
 2.46: (a) Find the asymptotes of the graph of fsxd 4 2 x 3 1 x and use th...
 2.47: The graph of f is shown. State, with reasons, the numbers at which ...
 2.48: The figure shows the graphs of f, f9, and f 0. Identify each curve,...
 2.49: Sketch the graph of a function f that satisfies all of the followin...
 2.50: Let Pstd be the percentage of Americans under the age of 18 at time...
 2.51: Let Bstd be the number of US $20 bills in circulation at time t. Th...
 2.52: The total fertility rate at time t, denoted by Fstd, is an estimate...
 2.53: Suppose that  fsxd  < tsxd for all x, where limx l a tsxd 0. Find...
 2.54: Let fsxd v x b 1 v2x b. (a) For what values of a does limx l a fsxd...
Solutions for Chapter 2: Limits and Derivatives
Full solutions for Single Variable Calculus: Early Transcendentals  8th Edition
ISBN: 9781305270336
Solutions for Chapter 2: Limits and Derivatives
Get Full SolutionsThis expansive textbook survival guide covers the following chapters and their solutions. Chapter 2: Limits and Derivatives includes 54 full stepbystep solutions. Single Variable Calculus: Early Transcendentals was written by and is associated to the ISBN: 9781305270336. This textbook survival guide was created for the textbook: Single Variable Calculus: Early Transcendentals, edition: 8. Since 54 problems in chapter 2: Limits and Derivatives have been answered, more than 96515 students have viewed full stepbystep solutions from this chapter.

Branches
The two separate curves that make up a hyperbola

Coefficient matrix
A matrix whose elements are the coefficients in a system of linear equations

Complex plane
A coordinate plane used to represent the complex numbers. The xaxis of the complex plane is called the real axis and the yaxis is the imaginary axis

Coordinate(s) of a point
The number associated with a point on a number line, or the ordered pair associated with a point in the Cartesian coordinate plane, or the ordered triple associated with a point in the Cartesian threedimensional space

Cube root
nth root, where n = 3 (see Principal nth root),

Elimination method
A method of solving a system of linear equations

equation of a parabola
(x  h)2 = 4p(y  k) or (y  k)2 = 4p(x  h)

Focal length of a parabola
The directed distance from the vertex to the focus.

Identity function
The function ƒ(x) = x.

Interquartile range
The difference between the third quartile and the first quartile.

Inverse properties
a + 1a2 = 0, a # 1a

Inverse tangent function
The function y = tan1 x

Onetoone rule of exponents
x = y if and only if bx = by.

Opposite
See Additive inverse of a real number and Additive inverse of a complex number.

Parabola
The graph of a quadratic function, or the set of points in a plane that are equidistant from a fixed point (the focus) and a fixed line (the directrix).

Parametric curve
The graph of parametric equations.

Probability simulation
A numerical simulation of a probability experiment in which assigned numbers appear with the same probabilities as the outcomes of the experiment.

Terminal side of an angle
See Angle.

Window dimensions
The restrictions on x and y that specify a viewing window. See Viewing window.

Wrapping function
The function that associates points on the unit circle with points on the real number line