 62.Q1: Integrate: x0.3 dx
 62.Q2: Integrate: x2 dx
 62.Q3: Differentiate: f(x) = cos2 x
 62.Q4: cos x = cos 100, so cos is ? at x = 100.
 62.Q5: If f(x) = x3, then f ' (2) = 12. Thus f is ? at x = 2.
 62.Q6: Find : y = sin1 x
 62.Q7: Find : y = csc x
 62.Q8: f(x) x is called a(n) ?.
 62.Q9: f(x) dx is called a(n) ?.
 62.Q10: log 3 + log 4 = log ?.
 62.1: For 126, find the derivative.y = ln 7x
 62.2: For 126, find the derivative. y = ln 4x
 62.3: For 126, find the derivative. f(x) = ln x5
 62.4: For 126, find the derivative.f(x) = ln x3
 62.5: For 126, find the derivative. h(x) = 6 ln x2
 62.6: For 126, find the derivative.g(x) = 13 ln x5
 62.7: For 126, find the derivative.r(t) = ln 3t + ln 4t + ln 5t
 62.8: For 126, find the derivative.v(z) = ln 6z + ln 7z + ln 8z
 62.9: For 126, find the derivative. y = (ln 6x)(ln 4x)
 62.10: For 126, find the derivative.z = (ln 2x)(ln 9x)
 62.11: For 126, find the derivative.
 62.12: For 126, find the derivative.
 62.13: For 126, find the derivative.p = (sin x)(ln x)
 62.14: For 126, find the derivative.m = (cos x)(ln x)
 62.15: For 126, find the derivative. y = cos (ln x)
 62.16: For 126, find the derivative. y = sin (ln x)
 62.17: For 126, find the derivative. y = ln (cos x) (Surprise?)
 62.18: For 126, find the derivative. y = ln (sin x) (Surprise?)
 62.19: For 126, find the derivative.T(x) = tan (ln x)
 62.20: For 126, find the derivative.S(x) = sec (ln x)
 62.21: For 126, find the derivative. y = (3x + 5)1
 62.22: For 126, find the derivative.y = (x3 2)1
 62.23: For 126, find the derivative.y = x4 ln 3x
 62.24: For 126, find the derivative.y = x7 ln 5x
 62.25: For 126, find the derivative. y = ln (1/x)
 62.26: For 126, find the derivative.y = ln (1/x)4
 62.27: For 2746, integrate.
 62.28: For 2746, integrate.
 62.29: For 2746, integrate.
 62.30: For 2746, integrate.
 62.31: For 2746, integrate.
 62.32: For 2746, integrate.
 62.33: For 2746, integrate.
 62.34: For 2746, integrate.
 62.35: For 2746, integrate.
 62.36: For 2746, integrate.
 62.37: For 2746, integrate.
 62.38: For 2746, integrate.
 62.39: For 2746, integrate. (1/w ) dw
 62.40: For 2746, integrate. (1/v ) dv
 62.41: For 2746, integrate. (1/x) dx
 62.42: For 2746, integrate. (1/x) dx
 62.43: For 2746, integrate.
 62.44: For 2746, integrate.
 62.45: For 2746, integrate. (Be clever!)
 62.46: For 2746, integrate. (Be very clever!)
 62.47: For 4754, find the derivative. f(x) = cos 3t dt
 62.48: For 4754, find the derivative.f(x) = (t2 + 10t 17)dt
 62.49: For 4754, find the derivative.
 62.50: For 4754, find the derivative.
 62.51: For 4754, find the derivative.f(x) = 3t dt
 62.52: For 4754, find the derivative. g(x) =
 62.53: For 4754, find the derivative. h(x) =
 62.54: For 4754, find the derivative. p(x) =
 62.55: Evaluate (5/x) dx by using the fundamental 39. (1/w ) dw 44. 45. (B...
 62.56: Look Ahead FollowUp: In 0, you were asked to look at 66 and indic...
 62.57: Figure 62j shows the graph of function f .Figure 62ja. Let g(x) =...
 62.58: Figure 62k shows the graph of function f . Figure 62k a. Let g(x)...
 62.59: Population Problem: In the population problem of 61, you evaluated...
 62.60: Tire Pump Work Problem: Figure 62l shows a bicycle tire pump. To c...
 62.61: Radio Dial Derivative Problem: Figure 62m shows an old AM radio di...
 62.62: Properties of ln Problem: In this problem you will explore some pro...
 62.63: Journal Problem: Update your journal with what youve learned since ...
Solutions for Chapter 62: Antiderivative of the Reciprocal Function and Another Form of the Fundamental Theorem
Full solutions for Calculus: Concepts and Applications  2nd Edition
ISBN: 9781559536547
Solutions for Chapter 62: Antiderivative of the Reciprocal Function and Another Form of the Fundamental Theorem
Get Full SolutionsCalculus: Concepts and Applications was written by and is associated to the ISBN: 9781559536547. Chapter 62: Antiderivative of the Reciprocal Function and Another Form of the Fundamental Theorem includes 73 full stepbystep solutions. This textbook survival guide was created for the textbook: Calculus: Concepts and Applications, edition: 2. This expansive textbook survival guide covers the following chapters and their solutions. Since 73 problems in chapter 62: Antiderivative of the Reciprocal Function and Another Form of the Fundamental Theorem have been answered, more than 23255 students have viewed full stepbystep solutions from this chapter.

Additive inverse of a complex number
The opposite of a + bi, or a  bi

Angle of depression
The acute angle formed by the line of sight (downward) and the horizontal

Annuity
A sequence of equal periodic payments.

Arcsine function
See Inverse sine function.

Augmented matrix
A matrix that represents a system of equations.

Constant
A letter or symbol that stands for a specific number,

Factoring (a polynomial)
Writing a polynomial as a product of two or more polynomial factors.

Horizontal Line Test
A test for determining whether the inverse of a relation is a function.

Lemniscate
A graph of a polar equation of the form r2 = a2 sin 2u or r 2 = a2 cos 2u.

Mapping
A function viewed as a mapping of the elements of the domain onto the elements of the range

Parameter interval
See Parametric equations.

Period
See Periodic function.

Phase shift
See Sinusoid.

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)

Powerreducing identity
A trigonometric identity that reduces the power to which the trigonometric functions are raised.

Principal nth root
If bn = a, then b is an nth root of a. If bn = a and a and b have the same sign, b is the principal nth root of a (see Radical), p. 508.

Quotient of complex numbers
a + bi c + di = ac + bd c2 + d2 + bc  ad c2 + d2 i

Rose curve
A graph of a polar equation or r = a cos nu.

symmetric about the xaxis
A graph in which (x, y) is on the graph whenever (x, y) is; or a graph in which (r, ?) or (r, ?, ?) is on the graph whenever (r, ?) is

Zoom out
A procedure of a graphing utility used to view more of the coordinate plane (used, for example, to find theend behavior of a function).