x1(t) Let x(1) be a solution to the system of differential equations: x2(1) x{ (1) x3(1) 2 x1(t) + x2(t) X2(t) --- 1 If x(0) = find x(t). 5 Put the eigenvalues in ascending order when you enter x1(t), x2(t) below. exp( 1 t)+ exp( -5 1) = (1) 'x x2(t) = exp( 1 t)+ exp( t)

x1(t) Let x(1) be a solution to the system of differential equations: x2(1) x{ (1) x3(1) 2 x1(t) + x2(t) X2(t) --- 1 If x(0) = find x(t). 5 Put the eigenvalues in ascending order when you enter x1(t), x2(t) below. exp( 1 t)+ exp( -5 1) = (1) 'x x2(t) = exp( 1 t)+ exp( t)

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

plz solve it within 30-40 mins I'll give you multiple upvote

x1(t)
Let x(1)
be a solution to the system of differential equations:
x2(1)
x{ (1)
x3(1)
2 x1(t) +
x2(t)
X2(t)
1
If x(0) =
find x(t).
5
Put the eigenvalues in ascending order when you enter x1(t), x2(t) below.
exp( 1
t)+
exp( -5
1)
= (1) 'x
x2(t) =
exp( 1
t)+
exp(
t)

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