The homogeneous equation with constant coefficients that has y = C1e−2x + C2 xe−2x + C3 cos 2x + C4 sin 2x + C5 as its general solution is ?
The homogeneous equation with constant coefficients that has y = C1e−2x + C2 xe−2x + C3...
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?
Given: y''+2y'=2x+5-e^-2x General solution is: y=c1e^-2x+c2 +1/2(x^2)+2x+1/2(xe^-2x) Solve using the method of undetermined coefficients and show all steps please! I have the form of yp is Ax^2+Bx+Cxe^-2x, and the issue that plagues me is in solving for A B C. I get A=1/2 and I get B=2, but the terms involving C fall off the face of the earth when I substitute y' and y'' of the solution form into the equation, so how can I solve for C? Help...
The general solution of y(1) – 5y" – 36y = 0) is: (a) y = Cicos 3x + C2 sin 3x + C3e2x + C4e-20 (b) y=Ci cos 3x + C2 sin 3x + C3 cos 2x + C4 sin 2.0 (e) y=Cicos 2x + C2 sin 2x + C3e3x + Cae-31 (d) y=Cicos 2x + C2 sin 2x + C3e3x + Caxe3r (e) None of the above.
Find a general solution to the given homogeneous equation. (D+1)?(0-9)º(D+3)(D+ 1) (D? + 49) [y] = 0 Choose the correct answer below. - 3x OA y(x) = C, e ** + C2 e 9x + Cze + C4 COS X + Cs sin x + Cocos 7x + C7 sin 7x OB. y(x) = C, e* + Cze - 9x + C3 e 3x + Ce cos x+Cs sin x+Cg cos 7x+ Cy sin 7x Oc. y(x) = C, e...
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) =...
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
Chapter 4, Section 4.4, Additional Question 01 Use the method of variation of parameters to determine the general solution of the given differential equation. y4 +2y y 11sin (t) Use C1, C2, C3, for the constants of integration. Enclose arguments of functions in parentheses. For example, sin (2x)
Chapter 4, Section 4.4, Additional Question 01 Use the method of variation of parameters to determine the general solution of the given differential equation. y4 +2y y 11sin (t) Use C1, C2,...
Use the method of variation of parameters to determine the general solution of the given differential equation. y(4)+2y′′+y=3sin(t) Use C1, C2, C3, ... for the constants of integration. Enclose arguments of functions in parentheses. For example, sin(2x). y(t)=
Give a linear constant-coefficient differential equation that
has general solution y(t) = e 2t + sin(2t) + c1e t + c2tet + c3e
−t
7. Give a linear constant-coefficient differential equation that has general solution y(t) = {2+ + sin(2t) + let + Catet + cze-t
please help
The general solution of the equation y4y 0 is y = ccos(2x)c2sin(2x) Find values of ci and c2 so that y(0) and y (0) 8 -3 C1 = C2= Plug these values into the general solution to obtain the unique solution y =
The general solution of the equation y4y 0 is y = ccos(2x)c2sin(2x) Find values of ci and c2 so that y(0) and y (0) 8 -3 C1 = C2= Plug these values into the general...