 45.Q1: x = ?
 45.Q2: x = ?
 45.Q3: x = ?
 45.Q4: x = ?
 45.Q5: x = ?
 45.Q6: x = ?
 45.Q7: (1) = ?
 45.Q8: (3) = ?
 45.Q9: (4) = ?
 45.Q10: (6) = ?
 45.1: For 14, duplicate the graphs in Figure 45d on your grapher. For 3 ...
 45.2: For 14, duplicate the graphs in Figure 45d on your grapher. For 3 ...
 45.3: For 14, duplicate the graphs in Figure 45d on your grapher. For 3 ...
 45.4: For 14, duplicate the graphs in Figure 45d on your grapher. For 3 ...
 45.5: Explain why the principal branch of the inversecotangent function g...
 45.6: Explain why the principal branch of the inverse secant function can...
 45.7: Evaluate: sin (sin1 0.3)
 45.8: Evaluate: cos1 (cos 0.8)
 45.9: For 912, derive the formula. (sin1 x) =
 45.10: For 912, derive the formula. (cos1 x) =
 45.11: For 912, derive the formula. (csc1 x) =
 45.12: For 912, derive the formula.(cot1 x) =
 45.13: For 1324, find the derivative algebraically. y = sin1 4x
 45.14: For 1324, find the derivative algebraically.y = cos1 10x
 45.15: For 1324, find the derivative algebraically.y = cot1 e0.5x
 45.16: For 1324, find the derivative algebraically.y = tan1 (ln x)
 45.17: For 1324, find the derivative algebraically. y = sec1
 45.18: For 1324, find the derivative algebraically.y = csc1
 45.19: For 1324, find the derivative algebraically.y = cos1 5x2
 45.20: For 1324, find the derivative algebraically.f(x) = tan1 x
 45.21: For 1324, find the derivative algebraically.g(x) = (sin1 x)2
 45.22: For 1324, find the derivative algebraically.u = (sec1 x)2
 45.23: For 1324, find the derivative algebraically. v = x sin1 x + (1 x2)...
 45.24: For 1324, find the derivative algebraically.I(x) = cot1 (cot x) (S...
 45.25: Radar Problem: An officer in a patrol car sitting 100 ft from the h...
 45.26: Exit Sign Problem: The base of a 20fttall exit sign is 30 ft abov...
 45.27: Numerical Answer Check Problem: For f(x) = cos1 x, make a table of ...
 45.28: Graphical Analysis Problem: Figure 45j shows the graph of y = sec1...
 45.29: General Derivative of the Inverse of a Function: In this problem yo...
 45.30: Quick! Which of the inverse trigonometric derivatives are preceded ...
Solutions for Chapter 45: Derivatives of Inverse Trigonometric Functions
Full solutions for Calculus: Concepts and Applications  2nd Edition
ISBN: 9781559536547
Solutions for Chapter 45: Derivatives of Inverse Trigonometric Functions
Get Full SolutionsSince 40 problems in chapter 45: Derivatives of Inverse Trigonometric Functions have been answered, more than 23215 students have viewed full stepbystep solutions from this chapter. Calculus: Concepts and Applications was written by and is associated to the ISBN: 9781559536547. Chapter 45: Derivatives of Inverse Trigonometric Functions includes 40 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.

Absolute value of a complex number
The absolute value of the complex number z = a + b is given by ?a2+b2; also, the length of the segment from the origin to z in the complex plane.

Associative properties
a + (b + c) = (a + b) + c, a(bc) = (ab)c.

Common ratio
See Geometric sequence.

Complex fraction
See Compound fraction.

Continuous function
A function that is continuous on its entire domain

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

Halfangle identity
Identity involving a trigonometric function of u/2.

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

Initial side of an angle
See Angle.

Linear factorization theorem
A polynomial ƒ(x) of degree n > 0 has the factorization ƒ(x) = a(x1  z1) 1x  i z 22 Á 1x  z n where the z1 are the zeros of ƒ

Lower bound test for real zeros
A test for finding a lower bound for the real zeros of a polynomial

Odd function
A function whose graph is symmetric about the origin (ƒ(x) = ƒ(x) for all x in the domain of f).

Radicand
See Radical.

Reference angle
See Reference triangle

Resolving a vector
Finding the horizontal and vertical components of a vector.

Secant
The function y = sec x.

Sine
The function y = sin x.

Vertices of a hyperbola
The points where a hyperbola intersects the line containing its foci.

Viewing window
The rectangular portion of the coordinate plane specified by the dimensions [Xmin, Xmax] by [Ymin, Ymax].

xyplane
The points x, y, 0 in Cartesian space.