(1 point) Suppose that a fourth order differential equation has a solution y = 5e3*x cos(x)....
(1 point) Find the particular solution of the differential equation + y cos(x) = 8 cos(x) dx satisfying the initial condition y(0) = 10. Answer: Y= Your answer should be a function of x.
0 of the differential equation (1 point) Find the indicated coefficients of the power series solution about x = У' — (sin x)y У(0) %3D —9, У (0) 3 —3 =COS X x2+ у%3 —9 — 3х+ x4O(x5) 0 of the differential equation (1 point) Find the indicated coefficients of the power series solution about x = У' — (sin x)y У(0) %3D —9, У (0) 3 —3 =COS X x2+ у%3 —9 — 3х+ x4O(x5)
6. [0/2 points) DETAILS PREVIOUS ANSWERS Find the general (real) solution of the differential equation: y"- 2y'- 15y=-51 sin(3 x) -3x | Ae 5x + Be 34 y(x) = 8.5 + -cos(3x) * 17 51 14 sin(3x) - - Find the unique solution that satisfies the initial conditions: Y(0) = 2.5 and y'(o)=37 y(x) = 7. [-12 Points) DETAILS Find the general (real) solution of the differential equation: y" + 4y' + 4y=64 cos(2x) y(x) = Find the unique solution...
(1 point) The general solution to the second-order differential equation – form y(x) = 60 (C1 cos x + cosin ßx). Find the values of aand, where +10y = 0 is in the > 0. Answer: a = and =
o2: 16 Marks] Find the general solution of the differential equation (sin x)y" +(cos x)y' cos x by reduction to first order DE. o2: 16 Marks] Find the general solution of the differential equation (sin x)y" +(cos x)y' cos x by reduction to first order DE.
8. Find a solution to the differential equation dy 6x + sinx - 2 cos x that satisfies y (0) = 1 dx
Consider the differential equation, L[y] = y'' + p(t)y' + q(t)y = 0, (1) whose coefficients p and q are continuous on some open interval I. Choose some point t0 in I. Let y1 be the solution of equation (1) that also satisfies the initial conditions y(t0) = 1, y'(t0) = 0, and let y2 be the solution of equation (1) that satisfies the initial conditions y(t0) = 0, y'(t0) = 1. Then y1 and y2 form a fundamental set...
3. Consider the following third order linear differential equation: y3y-4 y'-0 (a) Find the general solution. (b) Find the solution that satisfies the following initial conditions: y(0)=4, y'(0)-6, y(0)=-14 (c) Find the dominant eigenvalue, and use it to determine the long-term behavior of the solution.
a. Find a particular solution to the nonhomogeneous differential equation y" + 4y = cos(2x) + sin(2x) b. Find the most general solution to the associated homogeneous differential equation. Use cand in your answer to denote arbitrary constants. c. Find the solution to the original nonhomogeneous differential equation satisfying the initial conditions y(0) = 8 and y'(0) = 4
(1 point) Consider the differential equation 2x(x )y"3 - 1)y -y0 which has a regular singular point atx 0. The indicial equation for x 0 is 2+ 0 r+ with roots (in increasing order) r and r2 Find the indicated terms of the following series solutions of the differential equation: x4. (a) y =x (9+ x+ (b) y x(7+ The closed form of solution (a) is y (1 point) Consider the differential equation 2x(x )y"3 - 1)y -y0 which has...