Theorem 2.5.1: Consider the 1st-order Linear IVPSy' + p(t)y = g(t)(3)y(to)= yoAssume p(t), g(t) are continuous on an interval /: a 2. Consider the initial value problem (IVP)了(t+ 1)(t-1)(t-2)+egy(.5)cos t?1Use Theorem 2.5.1 to determine the interval in which this IVP hasunique solution. (Do not try to solve).

Furst we rewrite the equation as in the theorem, then Use the given theorem

2. Consider the initial value problem (IVP) { (t +1)(t – 1)(t- 2) t e"y y(.5) - cos t? %3D 1 Use Theorem 2.5.1 to determine the interval in which this IVP has unique solution. (Do not try to solve).

2. Consider the initial value problem (IVP) { (t +1)(t – 1)(t- 2) t e"y y(.5) - cos t? %3D 1 Use Theorem 2.5.1 to determine the interval in which this IVP has unique solution. (Do not try to solve).

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Question

Theorem 2.5.1: Consider the 1st-order Linear IVP
Sy' + p(t)y = g(t)
(3)
y(to)
= yo
Assume p(t), g(t) are continuous on an interval /: a <t < B
and to is in 1. Then,
• The IVP (3) has a solution y = p(t).
• The domain of y = y(t) is I.
• The solution y = p(t) is unique, on /.
%3D
%3D

2. Consider the initial value problem (IVP)
了(t+ 1)(t-1)(t-2)+eg
y(.5)
cos t?
1
Use Theorem 2.5.1 to determine the interval in which this IVP has
unique solution. (Do not try to solve).

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