Let x' = x, x(t) = [e₁ e + ], x (t) = [sinh(t) cosh(t)] [cosh(t) sinh(t) Recall the definitions of the hyperbolic functions: sinh(t) = 1½-½ (et − e−t) and cosh(t) = ½ ½ (e² + e¯²). - е Verify that the matrix ✗(t) is a fundamental matrix of the given linear system. Determine a constant matrix C such that the given matrix Ŷ(t) can be represented as Ŷ(t) = X(t)C. C = 188 help (matrices) The determinant of the matrix C is help (numbers) which is nonzero. Therefore, the matrix ✗(t) is also a fundamental matrix Book: Section 3.3 of Notes on Diffy Qs
Let x' = x, x(t) = [e₁ e + ], x (t) = [sinh(t) cosh(t)] [cosh(t) sinh(t) Recall the definitions of the hyperbolic functions: sinh(t) = 1½-½ (et − e−t) and cosh(t) = ½ ½ (e² + e¯²). - е Verify that the matrix ✗(t) is a fundamental matrix of the given linear system. Determine a constant matrix C such that the given matrix Ŷ(t) can be represented as Ŷ(t) = X(t)C. C = 188 help (matrices) The determinant of the matrix C is help (numbers) which is nonzero. Therefore, the matrix ✗(t) is also a fundamental matrix Book: Section 3.3 of Notes on Diffy Qs
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
Related questions
Question
![Let
x'
=
x,
x(t)
= [e₁ e + ], x (t) =
[sinh(t) cosh(t)]
[cosh(t) sinh(t)
Recall the definitions of the hyperbolic functions: sinh(t) = 1½-½ (et − e−t) and cosh(t) = ½ ½ (e² + e¯²).
-
е
Verify that the matrix ✗(t) is a fundamental matrix of the given linear system.
Determine a constant matrix C such that the given matrix Ŷ(t) can be represented as Ŷ(t) = X(t)C.
C =
188
help (matrices)
The determinant of the matrix C is help (numbers)
which is nonzero. Therefore, the matrix ✗(t) is also a fundamental matrix
Book: Section 3.3 of Notes on Diffy Qs](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F92927d35-c8d4-4d26-a361-d4932ab03fa8%2F2aa4b876-41b4-4043-8461-5c185981912d%2Fuj5pm4l_processed.jpeg&w=3840&q=75)
Transcribed Image Text:Let
x'
=
x,
x(t)
= [e₁ e + ], x (t) =
[sinh(t) cosh(t)]
[cosh(t) sinh(t)
Recall the definitions of the hyperbolic functions: sinh(t) = 1½-½ (et − e−t) and cosh(t) = ½ ½ (e² + e¯²).
-
е
Verify that the matrix ✗(t) is a fundamental matrix of the given linear system.
Determine a constant matrix C such that the given matrix Ŷ(t) can be represented as Ŷ(t) = X(t)C.
C =
188
help (matrices)
The determinant of the matrix C is help (numbers)
which is nonzero. Therefore, the matrix ✗(t) is also a fundamental matrix
Book: Section 3.3 of Notes on Diffy Qs
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