Q8E In Problems 1鈥�19, use the meth... [FREE SOLUTION]

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Fundamentals Of Differential Equations And Boundary Value Problems

R. Kent Nagle, Edward B. Saff, Arthur David Snider

$Math Studyset 91影视 Explanations$ Math

9th Edition 路 616 pages

ISBN: 9780321977069

Chapter 7: Q8E (page 413)

In Problems 1鈥�19, use the method of Laplace transforms to solve the given initial value problem. Here x鈥�, y鈥�, etc., denotes differentiation with respect to t; so does the symbol D.
$\begin{array}{l} D [x] + y = 0; 鈥夆赌夆赌� x (0) = 7 / 4, \\ 4 x + D [y] = 3; 鈥夆赌夆赌� y (0) = 4 \end{array}$

Short Answer

Expert verified

The solution is $\begin{array}{l} x (t) = \frac{3}{4} + \frac{3 e^{- 2 t}}{2} - \frac{1 e^{2 t}}{2}, y (t) = 3 e^{- 2 t} + e^{2 t} \end{array}$

Step by step solution

Given information

The differential equations are given as:

$\begin{array}{l} D [x] + y = 0; 鈥夆赌夆赌� x (0) = 7 / 4, \\ 4 x + D [y] = 3; 鈥夆赌夆赌� y (0) = 4 \end{array}$

Apply the Laplace transform

Given initial value equations are,

$\begin{array}{l} D [x] + y = 0; 鈥夆赌夆赌� x (0) = 7 / 4, \\ 鈭� x^{'} + y = 0.... (1) \\ 4 x + D [y] = 3; 鈥夆赌夆赌� y (0) = 4 \\ 鈭� 4 x + y^{'} = 3..... (2) \end{array}$

Taking Laplace transform of equation first we get

$\begin{array}{l} s x (s) - x (0) + y (s) = 0 \\ s x (s) - \frac{7}{4} + y (s) = 0 \\ y (s) = \frac{7}{4} - s x (s) ..... (3) \end{array}$

Taking Laplace transform of equation second we get

$\begin{array}{r} 4 x (s) + s y (s) - y (0) = \frac{3}{s} \\ 4 x (s) + s y (s) - 4 = \frac{3}{s} ... (4) \end{array}$

Putting equation third into fourth we get

$\begin{array}{l} 4 x (s) + s [\frac{7}{4} - s x (s)] - 4 = \frac{3}{s} \\ [4 - s^{2}] x (s) = \frac{12 + 16 s - 7 s^{2}}{4 s} \\ x (s) = \frac{7 s^{2} - 16 s - 12}{4 s (s^{2} - 4)} \end{array}$

Using partial fraction we can write as

$= \frac{3}{4 s} + \frac{3}{2 (s + 2)} - \frac{1}{2 (s - 2)}$

Taking inverse Laplace transform we get

$x (t) = \frac{3}{4} + \frac{3 e^{- 2 t}}{2} - \frac{1 e^{2 t}}{2}$

Since equation first is,

$\begin{array}{l} x^{'} + y = 0 \\ - 3 e^{- 2 t} - e^{2 t} + y (t) = 0 \\ y (t) = 3 e^{- 2 t} + e^{2 t} \end{array}$

Hence

$\begin{array}{l} x (t) = \frac{3}{4} + \frac{3 e^{- 2 t}}{2} - \frac{1 e^{2 t}}{2}, y (t) = 3 e^{- 2 t} + e^{2 t} \end{array}$

Conclusion

The final solution is

$\begin{array}{l} x (t) = \frac{3}{4} + \frac{3 e^{- 2 t}}{2} - \frac{1 e^{2 t}}{2}, y (t) = 3 e^{- 2 t} + e^{2 t} \end{array}$

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91影视

Short Answer

Step by step solution

Given information

Apply the Laplace transform

Conclusion

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91影视

In Problems 1鈥�19, use the method of Laplace transforms to solve the given initial value problem. Here x鈥�, y鈥�, etc., denotes differentiation with respect to t; so does the symbol D.D[x]+y=0;鈥夆赌夆赌�x(0)=7/4,4x+D[y]=3;鈥夆赌夆赌�y(0)=4

Short Answer

Step by step solution

Given information

Apply the Laplace transform

Conclusion

One App. One Place for Learning.

Most popular questions from this chapter

Recommended explanations on Math Textbooks

Applied Mathematics

Calculus

Geometry

Discrete Mathematics

Statistics

Logic and Functions

Study anywhere. Anytime. Across all devices.