 3.2.1: Explain why f _1x2 could be positive or negative at a point where f...
 3.2.2: Explain why f 1x2 could be positive or negative at a point where f ...
 3.2.3: If f is differentiable at a, must f be continuous at a?
 3.2.4: If f is continuous at a, must f be differentiable at a?
 3.2.5: 56. Derivatives from graphs Use the graph of f to sketch a graph of...
 3.2.6: 56. Derivatives from graphs Use the graph of f to sketch a graph of...
 3.2.7: Matching functions with derivatives Match graphs ad of functions wi...
 3.2.8: Matching derivatives with functions Match graphs ad of derivative f...
 3.2.9: Matching functions with derivatives Match the functions ad in the f...
 3.2.10: 1012. Sketching derivatives Reproduce the graph of f and then plot ...
 3.2.11: 1012. Sketching derivatives Reproduce the graph of f and then plot ...
 3.2.12: 1012. Sketching derivatives Reproduce the graph of f and then plot ...
 3.2.13: 1314. Graphing the derivative with asymptotes Sketch a graph of the...
 3.2.14: 1314. Graphing the derivative with asymptotes Sketch a graph of the...
 3.2.15: Where is the function continuous? Differentiable? Use the graph of ...
 3.2.16: Where is the function continuous? Differentiable? Use the graph of ...
 3.2.17: Explain why or why not Determine whether the following statements a...
 3.2.18: Finding f from f_ Sketch the graph of f _1x2 = 2. Then sketch three...
 3.2.19: Finding f from f_ Sketch the graph of f _1x2 = x. Then sketch
 3.2.20: Finding f from f_ Create the graph of a continuous function f such ...
 3.2.21: 2124. Normal lines A line perpendicular to another line or to a tan...
 3.2.22: 2124. Normal lines A line perpendicular to another line or to a tan...
 3.2.23: 2124. Normal lines A line perpendicular to another line or to a tan...
 3.2.24: 2124. Normal lines A line perpendicular to another line or to a tan...
 3.2.25: 2528. Aiming a tangent line Given the function f and the point Q, f...
 3.2.26: 2528. Aiming a tangent line Given the function f and the point Q, f...
 3.2.27: 2528. Aiming a tangent line Given the function f and the point Q, f...
 3.2.28: 2528. Aiming a tangent line Given the function f and the point Q, f...
 3.2.29: Voltage on a capacitor A capacitor is a device in an electrical cir...
 3.2.30: Logistic growth A common model for population growth uses the logis...
 3.2.31: 3132. Onesided derivatives The rightsided and leftsided derivati...
 3.2.32: 3132. Onesided derivatives The rightsided and leftsided derivati...
 3.2.33: 3336. Vertical tangent lines If a function f is continuous at a and...
 3.2.34: 3336. Vertical tangent lines If a function f is continuous at a and...
 3.2.35: 3336. Vertical tangent lines If a function f is continuous at a and...
 3.2.36: 3336. Vertical tangent lines If a function f is continuous at a and...
 3.2.37: Continuity is necessary for differentiability a. Graph the function...
Solutions for Chapter 3.2: Calculus: Early Transcendentals 2nd Edition
Full solutions for Calculus: Early Transcendentals  2nd Edition
ISBN: 9780321947345
Solutions for Chapter 3.2
Get Full SolutionsCalculus: Early Transcendentals was written by and is associated to the ISBN: 9780321947345. Chapter 3.2 includes 37 full stepbystep solutions. Since 37 problems in chapter 3.2 have been answered, more than 61154 students have viewed full stepbystep solutions from this chapter. This textbook survival guide was created for the textbook: Calculus: Early Transcendentals, edition: 2. This expansive textbook survival guide covers the following chapters and their solutions.

Acute triangle
A triangle in which all angles measure less than 90°

Commutative properties
a + b = b + a ab = ba

Complex number
An expression a + bi, where a (the real part) and b (the imaginary part) are real numbers

Cosine
The function y = cos x

Equilibrium point
A point where the supply curve and demand curve intersect. The corresponding price is the equilibrium price.

Exponential decay function
Decay modeled by ƒ(x) = a ? bx, a > 0 with 0 < b < 1.

Histogram
A graph that visually represents the information in a frequency table using rectangular areas proportional to the frequencies.

Integrable over [a, b] Lba
ƒ1x2 dx exists.

Linear programming problem
A method of solving certain problems involving maximizing or minimizing a function of two variables (called an objective function) subject to restrictions (called constraints)

Linear regression equation
Equation of a linear regression line

Logarithm
An expression of the form logb x (see Logarithmic function)

Modified boxplot
A boxplot with the outliers removed.

Open interval
An interval that does not include its endpoints.

Principle of mathematical induction
A principle related to mathematical induction.

Reduced row echelon form
A matrix in row echelon form with every column that has a leading 1 having 0’s in all other positions.

Slopeintercept form (of a line)
y = mx + b

Standard form of a polar equation of a conic
r = ke 1 e cos ? or r = ke 1 e sin ? ,

Sum of an infinite geometric series
Sn = a 1  r , r 6 1

Variance
The square of the standard deviation.

Vector
An ordered pair <a, b> of real numbers in the plane, or an ordered triple <a, b, c> of real numbers in space. A vector has both magnitude and direction.