y''-3y'-4y=0 has a general solution y=C1e^(4x)+C2e^(-x) find the particular solution if it exists for y(0)=0 & y(1)=2
The general solution to equation y" - 2y - 3y=0 is a. y=1e3! + ce- b. y=ce" + ce-1 C. y = c + c2e- d. none of the above
(27 points) Find the general solution of the associated homogeneous equation for each nonhomogeneous differential equation below. Then determine the form of a particular solution ур of the nonhomogeneous equation. Do not solve for the undetermined coefficients in yp (a) (10 points) y" – 9y' – 22 y = 5xe -2x (b) (10 points) y" – 4y' + 29 y = 8x sin 3x
Q5) Find a general solution. Check your answer by substitution. 4y" – 25y = 0 y" + 36y = 0 y" + 6y' + 8.96y = 0) y" + 2k%y' + k4y = 0 Q6) Solve the IVP. Check that your answer satisfies the ODE as well as the initial conditions. Show the details of your work. y" + 25y = 0, y(0) = 4.6, y'(0) = -1.2 4y" – 4y' – 3y = 0, y(-2) = e, y'(-2) =...
Use undetermined coefficients to find the particular solution to y’’ – 4y' + 3y = e*((22 – 122 )cos(3x) + (58 + 362 )sin(3x)) Yp(x) = Preview
Find the general solution of y(6) – 3y(5) + 4y(4) — 127" = 0.
(4) Find the implicit particular solution of the initial-value problem (e+4y)dx+ (3y +4r)dy 0, y(0) = 1 by using the method from Section 2.4.
Find the general solution of the given second-order differential equation. 27"-3y + 4y = 0 Upload a completed solution of your work as a PDF, JPEG or DOCX file. Upload Choose a File Question 5 Find the general solution for the given second order differential equation. - 64+25 y = 0 Please show all work and upload a file (PDF, JPG, DOCX) of the work and circle your final answer. Upload Choose a File
5. (5 points) a) Find a particular solution of y" +3y+4y 3x+2. b) Determine the appropriate form for a particular solution of y-4y- 2e* (2 points)
(1 point) Find a particular solution for each differential equation y" + 3y = 5t, then yp = y" - y = 3et sin(t), then yp = y" + 4y = cos(2t), then yp =