Question 1. Solve the following 30d order homogeneous linear ODE which has constant coefficients y" +3y"...
5. Solve the linear, constant coefficient ODE y" – 3y' + 2y = 0; y(0) = 0, y'(0) = 1. 6. Solve the IVP with Cauchy-Euler ODE x2y" - 4xy' + 6y = 0; y(1) = 2, y'(1) = 0. 7. Given that y = Ge3x + cze-5x is a solution of the homogeneous equation, use the Method of Undetermined Coefficients to find the general solution of the non-homogeneous ODE " + 2y' - 15y = 3x 8. A 2...
please help me solve #1,2,3
!!! greatly appreciated
(2.2 Homogeneous linear equations with constant coefficients 1. Find a fifth-order homogeneous linear differential equation with constant coefficients whose general solution is y = (1 + Cze* + czxe* + e-*(C4cos2x + cssin2x). 2. Solve 2y'' – 3y" – 8y' – 3y = 0. 3. Solve y" + y' + y = 0.
(8a) Solve the ODE y" - 3y' = 4y (86) Solve the ODE y" - 3y' = 4y + 3 (9a) Solve the ODE" = - 4y (9b) Solve the ODE y" = -4y - 8x
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2. 124 points Solve the following higher order homogeneous linear differential equatil y®+8y® +16y" =0 1970 h quota 2y" – 3y - 8' – 3y = 0.08. Oda vaba ona bandar bo 500032 TOMTOM (6) + 2y()) – 3 (4) _4y +4Y" =0 y" - 6y" +12y – 7y=0
Given the Homogeneous Linear Differential Equations with
Constant Coefficients, determine the general solution
y(v) + 4y(iv) + 5y“” – 6y' – 4y = 0 y(x) = cte* + c2e-2x + c4e +04e-* + e-* (c4Cos x + C5 Sen x) Answer:
Find the general solution of the following 2nd order linear nonhomogeneous ODEs with constant coefficients. If the initial conditions are given, find the final solution. Apply the Method of Undetermined Coefficients. 7. y" + 5y' + 4y = 10e-3x 8. 10y" + 50y' + 57.6y = cos(x) 9. y" + 3y + 2y = 12x2 10. y" - 9y = 18cos(ix) 11. y" + y' + (? + y = e-x/2sin(1x) 12. y" + 3y = 18x2; y(0) = -3,...
Find the homogeneous equation with constant coefficients of least order that has the following as a solution y-2e4* - 3 sin(x) + 2x a) ,15) + 4y“) – y **+ 4y "=0 b) ,S) + (4) + 4y + 4y "=0 c),(s) +49(4) —*- 4 y "=0 a) O „(5) – 4 y14) –»*+ 2y "=0 e) O y(s) +4y14) + y*+ 4y "=0 1) O None of the above.
You are told that a certain second order, linear, constant
coefficient, homogeneous ode has the solutions
y1(x) = e^γx cos ωx, and y2(x) = e^γx sin ωx,
where γ and ω are real-valued parameters and −∞ < x <
∞.
4. You are told that a certain second order, linear, constant coefficient, homogeneous ODE has the solutions where γ and w are real-valued parameters and-oo < x < oo. (a) Compute the Wronskian for this set of solutions. (b) Using...
3. (10 points) Suppose that an nth-order homogeneous ODE with constant coefficients has the following general solution y = Ge-*+ C2 cos x + C3 sin x + Cex cos x + C5xsin x + C + Cyx. What is n? What are the roots of the characteristic equation of this ODE? What is the characteristic equation? What is the ODE?
II. Determine the general solution of the given 2nd order linear homogeneous equation. 1. y" - 2y' + 3y = 0 (ans. y = ci e' cos V2 x + C2 e* sin V2 x) 2. y" + y' - 2y = 0 (ans. y = C1 ex + C2 e -2x) 3. y" + 6y' + 9y = 0 (ans. y = C1 e 3x + c2x e-3x) 4. Y" + 4y = 0, y(t) = 0, y'(T) =...