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Math
Calculus
Pearson eText for Thomas' Calculus -- Instant Access (Pearson+)
Find the value of x when ln ( 1 − x 2 ) = x − 1 .
Find the value of x when ln ( 1 − x 2 ) = x − 1 .
BUY
Pearson eText for Thomas' Calculus -- Instant Access (Pearson+)
14th Edition
ISBN:
9780137442997
Author: Joel Hass, Christopher Heil
Publisher:
PEARSON+
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1 Functions
2 Limits And Continuity
3 Derivatives
4 Application Of Derivatives
5 Integrals
6 Applications Of Definite Integrals
7 Integrals And Trascendental Functions
8 Techniques Of Integration
9 First-order Differential Equations
10 Infinite Sequences And Series
11 Parametric Equations And Polar Coordinates
12 Vectors And The Geometry Of Space
13 Vector-valued Functions And Motion In Space
14 Partial Derivatives
15 Multiple Integrals
16 Integrals And Vector Fields
17 Second-order Differential Equations
A.1 Real Numbers And The Real Line
A.2 Mathematical Induction
A.3 Lines, Circles, And Parabolas
A.4 Proofs Of Limit Theorems
A.5 Commonly Occurring Limits
A.6 Theory Of The Real Numbers
A.7 Complex Numbers
A.8 The Distributive Law For Vector Cross Products
A.9 The Mixed Derivative Theorem And The Increment Theorem
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4.1 Extreme Values Of Functions On Closed Intervals
4.2 The Mean Value Theorem
4.3 Monotonic Functions And The First Derivative Test
4.4 Concavity And Curve Sketching
4.5 Indeterminate Forms And L'hopital's Rule
4.6 Applied Optimization
4.7 Newton's Method
4.8 Antiderivatives
Chapter Questions
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Problem 1E: Use Newton’s method to estimate the solutions of the equation x2 + x − 1 = 0. Start with x0 = −1 for...
Problem 2E: Use Newton’s method to estimate the one real solution of x3 + 3x + 1 = 0. Start with x0 = 0 and then...
Problem 3E
Problem 4E
Problem 5E
Problem 6E
Problem 7E: Use Newton’s method to find an approximate solution of 3 − x = ln x. Start with x0 = 2 and find...
Problem 8E
Problem 9E: Use Newton’s method to find an approximate solution of xex = 1. Start with x0 = 0 and find x2.
Problem 10E
Problem 11E
Problem 12E
Problem 13E
Problem 14E
Problem 15E
Problem 16E
Problem 17E
Problem 18E
Problem 19E
Problem 20E
Problem 21E
Problem 22E
Problem 23E: Intersection of curves At what value(s) of x does cos x = 2x?
Problem 24E
Problem 25E: The graphs of y = x2(x + 1) and y = 1/x (x > 0) intersect at one point x = r. Use Newton’s method to...
Problem 26E
Problem 27E: Intersection of curves At what value(s) of x does = x2 − x + 1?
Problem 28E
Problem 29E
Problem 30E
Problem 31E
Problem 32E
Problem 33E
Problem 34E
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Question
Chapter 4.7, Problem 28E
To determine
Find the value of
x
when
ln
(
1
−
x
2
)
=
x
−
1
.
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