1. Solve (D² + 3D – 4)²(D² − 2D + 1)³(D² + 7)y = 0, Dy = dy dx

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Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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Help me answer number 1 only
dy
1. Solve (D2 + 3D - 4)²(D² - 2D + 1)³(D² + 7)y = 0, Dy
dx
2. Determine the form of the particular solution, yp for the differential equation:
y(4) +9y" = (x² + 1) sin 3x
Note: You may used the concept of annihilator.
3. Determine the form of the particular solution, y, for the differential equation:
(D - 1)³(D² - 4)y = xe + e²x + e-*
Note: You may used the concept of annihilator.
4. By method of undetermined coefficients, solve: y(4) − y(³) — y" — y' – 2y = 8x³.
5. By variation of parameters, solve y" +4y= sin²x. Hint: You will have to apply some trigonometric
identities to determine parameters u₁ and u₂.
Transcribed Image Text:dy 1. Solve (D2 + 3D - 4)²(D² - 2D + 1)³(D² + 7)y = 0, Dy dx 2. Determine the form of the particular solution, yp for the differential equation: y(4) +9y" = (x² + 1) sin 3x Note: You may used the concept of annihilator. 3. Determine the form of the particular solution, y, for the differential equation: (D - 1)³(D² - 4)y = xe + e²x + e-* Note: You may used the concept of annihilator. 4. By method of undetermined coefficients, solve: y(4) − y(³) — y" — y' – 2y = 8x³. 5. By variation of parameters, solve y" +4y= sin²x. Hint: You will have to apply some trigonometric identities to determine parameters u₁ and u₂.
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