Elementary Differential Equations
10th Edition
ST
SOLUTIONS
UV
MANUAL
IA
_A
William Boyce
PP
Richard DiPrima
RO
Comprehensive Solutions Manual for
VE
Instructors and Students
D?
© William Boyce & Richard DiPrima. All rights reserved. Reproduction or distribution
without permission is prohibited.
©MedConnoisseur
, Solutions Manual for
Elementary
ST
Differential
UV
Equations, 10e
William Boyce,
IA
_A
Richard DiPrima (All
Chapters)
PP
RO
VE
D?
Downloaded by: tutorsection | Want to earn $1.236
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, CHAPTER
1
Introduction
ST
UV
IA
_A
1.1
1.
PP
RO
VE
For y > 3/2, the slopes are negative, therefore the solutions are decreasing. For
y < 3/2, the slopes are positive, hence the solutions are increasing. The equilibrium
solution appears to be y(t) = 3/2, to which all other solutions converge.
D?
1
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, 2 Chapter 1. Introduction
3.
ST
UV
For y > −3/2, the slopes are positive, therefore the solutions increase. For y <
−3/2, the slopes are negative, and hence the solutions decrease. All solutions
appear to diverge away from the equilibrium solution y(t) = −3/2.
IA
5.
_A
PP
For y > −1/2, the slopes are positive, and hence the solutions increase. For y <
−1/2, the slopes are negative, and hence the solutions decrease. All solutions
diverge away from the equilibrium solution y(t) = −1/2.
RO
6.
VE
D?
For y > −2, the slopes are positive, and hence the solutions increase. For y < −2,
the slopes are negative, and hence the solutions decrease. All solutions diverge
away from the equilibrium solution y(t) = −2.
Downloaded by: tutorsection | Want to earn $1.236
Distribution of this document is illegal extra per year?
10th Edition
ST
SOLUTIONS
UV
MANUAL
IA
_A
William Boyce
PP
Richard DiPrima
RO
Comprehensive Solutions Manual for
VE
Instructors and Students
D?
© William Boyce & Richard DiPrima. All rights reserved. Reproduction or distribution
without permission is prohibited.
©MedConnoisseur
, Solutions Manual for
Elementary
ST
Differential
UV
Equations, 10e
William Boyce,
IA
_A
Richard DiPrima (All
Chapters)
PP
RO
VE
D?
Downloaded by: tutorsection | Want to earn $1.236
Distribution of this document is illegal extra per year?
, CHAPTER
1
Introduction
ST
UV
IA
_A
1.1
1.
PP
RO
VE
For y > 3/2, the slopes are negative, therefore the solutions are decreasing. For
y < 3/2, the slopes are positive, hence the solutions are increasing. The equilibrium
solution appears to be y(t) = 3/2, to which all other solutions converge.
D?
1
Downloaded by: tutorsection | Want to earn $1.236
Distribution of this document is illegal extra per year?
, 2 Chapter 1. Introduction
3.
ST
UV
For y > −3/2, the slopes are positive, therefore the solutions increase. For y <
−3/2, the slopes are negative, and hence the solutions decrease. All solutions
appear to diverge away from the equilibrium solution y(t) = −3/2.
IA
5.
_A
PP
For y > −1/2, the slopes are positive, and hence the solutions increase. For y <
−1/2, the slopes are negative, and hence the solutions decrease. All solutions
diverge away from the equilibrium solution y(t) = −1/2.
RO
6.
VE
D?
For y > −2, the slopes are positive, and hence the solutions increase. For y < −2,
the slopes are negative, and hence the solutions decrease. All solutions diverge
away from the equilibrium solution y(t) = −2.
Downloaded by: tutorsection | Want to earn $1.236
Distribution of this document is illegal extra per year?
