Consider the system of differential equations Verify that x' x, x(0) = x(t) = c1e5t H + Cze³t [] is a solution to the system of differential equations for any choice of the constants C1 and C2. Find values of C1 and C2 that solve the given initial value problem. (According to the uniqueness theorem, you have found the unique solution of ' = Px, x(0) = 0). H e³t (t) = ( \ ) · e³ {}] + () ·³ [1] Book: Section 3.3 of Notes on Diffy Qs help (numbers)
Consider the system of differential equations Verify that x' x, x(0) = x(t) = c1e5t H + Cze³t [] is a solution to the system of differential equations for any choice of the constants C1 and C2. Find values of C1 and C2 that solve the given initial value problem. (According to the uniqueness theorem, you have found the unique solution of ' = Px, x(0) = 0). H e³t (t) = ( \ ) · e³ {}] + () ·³ [1] Book: Section 3.3 of Notes on Diffy Qs help (numbers)
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
![Consider the system of differential equations
Verify that
x'
x,
x(0)
=
x(t) = c1e5t
H
+ Cze³t
[]
is a solution to the system of differential equations for any choice of the constants C1 and C2. Find values of C1 and
C2 that solve the given initial value problem. (According to the uniqueness theorem, you have found the unique
solution of ' = Px, x(0) = 0).
H
e³t
(t) = ( \ ) · e³ {}] + () ·³ [1]
Book: Section 3.3 of Notes on Diffy Qs
help (numbers)](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F92927d35-c8d4-4d26-a361-d4932ab03fa8%2Fd18678d7-102f-444f-a2c2-415a059cf5e4%2Fhib87r_processed.jpeg&w=3840&q=75)
Transcribed Image Text:Consider the system of differential equations
Verify that
x'
x,
x(0)
=
x(t) = c1e5t
H
+ Cze³t
[]
is a solution to the system of differential equations for any choice of the constants C1 and C2. Find values of C1 and
C2 that solve the given initial value problem. (According to the uniqueness theorem, you have found the unique
solution of ' = Px, x(0) = 0).
H
e³t
(t) = ( \ ) · e³ {}] + () ·³ [1]
Book: Section 3.3 of Notes on Diffy Qs
help (numbers)
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