The roots of the auxiliary equation, corresponding to a certain homogeneous linear differential equation with constant coefficients contain
0,-1,-1,1,-1, 1 + 21, 1-21, 1+2i, 1-2i.
Choose ALL the corresponding solutions belonging to the general solutions.
The roots of the auxiliary equation, corresponding to a certain homogeneous linear differential equation with constant...
8. (9 points) Suppose the characteristic equation of a certain twentieth order, linear, constant coefficient, homogeneous differential equation has roots: 2,0, a, 2+3i, ti, +4i, ti, 2, 3, a, 2+3i ,2,3,0, and -3. (where a is a real constant) Write the general solution to this differential equation. (Do not attempt to solve for the coefficients).
Two of the solutions of a linear homogeneous differential equation with constant coefficients are yi = -21%e-32 and Y2 = 4sin(31). What is the minimum possible order of the differential equation? 02 3 4 5 O 6 O 7
Find a second order homogeneous linear differential equation whose general equation is Atanx + Bsinx (A, B constant) [Hint use the fact that tanx and sinx are, individually, solutions and solve for the coefficients in standard form}
Name: MAT 214- Diff. Eq. and Series Assi gnment: Section 4.3 Homogeneous Linear Equations With Constant Coefficients. 1. Verity that (e, et) is a fundamental set of solutions of the differential equation ay" + by'+ cy 0 0 is greater than 0. precisely when the discriminant of the auxiliary equation ak2 + bk+ c
Problem 1 (14 points) (a) Find the general solution to a third-order linear homogeneous differential equation for y(1) with real numbers as coefficients if two linearly independent solutions are known to be e-21 and sin(3.c). e (b) Determine that differential equation described in part (a).
Problem 1 (14 points) (a) Find the general solution to a third-order linear homogeneous differential equation for y(1) with real numbers as coefficients if two linearly independent solutions are known to be e-21 and sin(3.c). e (b) Determine that differential equation described in part (a).
Find a second order homogeneous linear differential equation whose general solution is A tan x + B sin x (A, B constant). [Hint: Use the fact that tan x and sin x are, individually, solutions and solve for the coefficients in standard form.]
2. (e) (7 points) Find a homogeneous linear differential equation with constant coefficients whose general solution is y = 4 + ce?* + Gxe7x.
Given that 6e22 and 5e 3T are solutions of a second order linear homogeneous differential equation with constant coefficients, find this differential equation. a) y" – 1ly' + 30y = 0 b) c) d) e) y" + 1ly' + 30y = 0 y" – y' – 6y = 0 y" + 1ly' – 30y = 0 y" + y' - 6y=0 f) None of the above.
(17 points) A 9th order, linear, homogeneous, constant coefficient differential equation has a characteristic equation which factors as follows. (p2 + 6r + 18)ºr(r + 1)2 = 0 Write the nine fundamental solutions to the differential equation. Y1 = = Y2 = Y3 Y4 = Y5 = Y6 = = Y7 = Y8 = Y9 =