 5.9.1: In Exercises 130, find or evaluate the integral. v9  AI J dx
 5.9.2: In Exercises 130, find or evaluate the integral. /l  4a^
 5.9.3: In Exercises 130, find or evaluate the integral. s 1  9a7 : d.X
 5.9.4: In Exercises 130, find or evaluate the integral. dx 'o V4 
 5.9.5: In Exercises 130, find or evaluate the integral. 7 : d.X 5. ,d\
 5.9.6: In Exercises 130, find or evaluate the integral. 4 1 + 9a,/a
 5.9.7: In Exercises 130, find or evaluate the integral. 1 + 4a
 5.9.8: In Exercises 130, find or evaluate the integral. ,9 + X
 5.9.9: In Exercises 130, find or evaluate the integral. av'4a= 
 5.9.10: In Exercises 130, find or evaluate the integral. 9 + X1 4 + (a  1...
 5.9.11: In Exercises 130, find or evaluate the integral. a' A + 1 dx
 5.9.12: In Exercises 130, find or evaluate the integral. A'  1 T JaA + ...
 5.9.13: In Exercises 130, find or evaluate the integral. I  (A +
 5.9.14: In Exercises 130, find or evaluate the integral. r' + 1(1 1_ A 77^...
 5.9.15: In Exercises 130, find or evaluate the integral. /i^T 1/^ dr
 5.9.16: In Exercises 130, find or evaluate the integral.77^ I/. : dx d! dx...
 5.9.17: In Exercises 130, find or evaluate the integral./^ dr 17. I J^I^^l...
 5.9.18: In Exercises 130, find or evaluate the integral. : dx d! dx '  4 ...
 5.9.19: In Exercises 130, find or evaluate the integral. A dx
 5.9.20: In Exercises 130, find or evaluate the integral. 1 +
 5.9.21: In Exercises 130, find or evaluate the integral. ^dx
 5.9.22: In Exercises 130, find or evaluate the integral. 17^^"'
 5.9.23: In Exercises 130, find or evaluate the integral.^^'^Vj.v
 5.9.24: In Exercises 130, find or evaluate the integral. 1 + sin A
 5.9.25: In Exercises 130, find or evaluate the integral.1 dx
 5.9.26: In Exercises 130, find or evaluate the integral. 2./^(l + a)'
 5.9.27: In Exercises 130, find or evaluate the integral. 1^,.
 5.9.28: In Exercises 130, find or evaluate the integral. 4v + 3 dx
 5.9.29: In Exercises 130, find or evaluate the integral. A + 5 v/9  (a ...
 5.9.30: In Exercises 130, find or evaluate the integral. V  > (a + 1 ) + 4
 5.9.31: In Exercises 31 12, find or evaluate the integral. (Complete the sq...
 5.9.32: In Exercises 31 12, find or evaluate the integral. (Complete the sq...
 5.9.33: In Exercises 31 12, find or evaluate the integral. (Complete the sq...
 5.9.34: In Exercises 31 12, find or evaluate the integral. (Complete the sq...
 5.9.35: In Exercises 31 12, find or evaluate the integral. (Complete the sq...
 5.9.36: In Exercises 31 12, find or evaluate the integral. (Complete the sq...
 5.9.37: In Exercises 31 12, find or evaluate the integral. (Complete the sq...
 5.9.38: In Exercises 31 12, find or evaluate the integral. (Complete the sq...
 5.9.39: In Exercises 31 12, find or evaluate the integral. (Complete the sq...
 5.9.40: In Exercises 31 12, find or evaluate the integral. (Complete the sq...
 5.9.41: In Exercises 31 12, find or evaluate the integral. (Complete the sq...
 5.9.42: In Exercises 31 12, find or evaluate the integral. (Complete the sq...
 5.9.43: In Exercises 43 and 44, use the specified substitution to find the ...
 5.9.44: In Exercises 43 and 44, use the specified substitution to find the ...
 5.9.45: What is a peifect square trinomial''
 5.9.46: What term must be added to a + 3a to complete the square? Explain ...
 5.9.47: In Exercises 4750. determine which of the integrals can be found u...
 5.9.48: In Exercises 4750. determine which of the integrals can be found u...
 5.9.49: In Exercises 4750. determine which of the integrals can be found u...
 5.9.50: In Exercises 4750. determine which of the integrals can be found u...
 5.9.51: Slope Fields In Exercises 51 and 52, a differential equation, a poi...
 5.9.52: Slope Fields In Exercises 51 and 52, a differential equation, a poi...
 5.9.53: In Exercises 53 and 54, use a computer algebra system to graph the ...
 5.9.54: In Exercises 53 and 54, use a computer algebra system to graph the ...
 5.9.55: In Exercises 55 and 56, find the area of the region bounded by the ...
 5.9.56: In Exercises 55 and 56, find the area of the region bounded by the ...
 5.9.57: Approximation Determine which value best approximates the area ol l...
 5.9.58: Approximation Sketch the region whose area is represented bv Ihe in...
 5.9.59: (a I .Show that f .V ^ </.V = (b) ApproMiiiatc the number using Si...
 5.9.60: Innstigation Consider the function F{x) 2 , / + I (a) Write a shor...
 5.9.61: Verily each rule by differentiating (<; > 0). du (a) ../;, arcsin H...
 5.9.62: Consider the integral /6a  .V(a) Find the integral by completing t...
 5.9.63: Vertical Motion An object is projected upward from ground le\el wit...
 5.9.64: Graph \ , Prove that  1 + .V ;, y, = arctan a, ami v, = a on [(), ...
Solutions for Chapter 5.9: Inverse Trigonometric Functions: Integration
Full solutions for Calculus of A Single Variable  7th Edition
ISBN: 9780618149162
Solutions for Chapter 5.9: Inverse Trigonometric Functions: Integration
Get Full SolutionsThis textbook survival guide was created for the textbook: Calculus of A Single Variable, edition: 7. Calculus of A Single Variable was written by and is associated to the ISBN: 9780618149162. Since 64 problems in chapter 5.9: Inverse Trigonometric Functions: Integration have been answered, more than 25256 students have viewed full stepbystep solutions from this chapter. Chapter 5.9: Inverse Trigonometric Functions: Integration includes 64 full stepbystep solutions. This expansive textbook survival guide covers the following chapters and their solutions.

Common ratio
See Geometric sequence.

Correlation coefficient
A measure of the strength of the linear relationship between two variables, pp. 146, 162.

Explanatory variable
A variable that affects a response variable.

Exponential form
An equation written with exponents instead of logarithms.

Identity matrix
A square matrix with 1’s in the main diagonal and 0’s elsewhere, p. 534.

Integers
The numbers . . ., 3, 2, 1, 0,1,2,...2

Inverse of a matrix
The inverse of a square matrix A, if it exists, is a matrix B, such that AB = BA = I , where I is an identity matrix.

Leastsquares line
See Linear regression line.

Multiplication property of inequality
If u < v and c > 0, then uc < vc. If u < and c < 0, then uc > vc

Objective function
See Linear programming problem.

Proportional
See Power function

Quadratic function
A function that can be written in the form ƒ(x) = ax 2 + bx + c, where a, b, and c are real numbers, and a ? 0.

Quadratic regression
A procedure for fitting a quadratic function to a set of data.

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

Real axis
See Complex plane.

Reflection across the xaxis
x, y and (x,y) are reflections of each other across the xaxis.

Slant line
A line that is neither horizontal nor vertical

Solve by substitution
Method for solving systems of linear equations.

Standard form of a complex number
a + bi, where a and b are real numbers

Upper bound test for real zeros
A test for finding an upper bound for the real zeros of a polynomial.