In problems 28-35: SET UP the form of a particular solution, yp, of the following differential...

Differential Equations (a) By inspection, find a particular solution of y'' + 2y = 14. yp(x)...

Differential Equations (a) By inspection, find a particular solution of y'' + 2y = 14. yp(x) = ______ANSWER HERE______. (b) By inspection, find a particular solution of y'' + 2y = −4x. yp(x) = ______ANSWER HERE______ (c) Find a particular solution of y'' + 2y = −4x + 14. yp(x) = _____ANSWER HERE_____ (d) Find a particular solution of y'' + 2y = 8x + 7. yp(x) = ___ANSWER HERE____.

Differential Equations Using the method of undetermined coefficients find the Yp (particular solution) of the differential...

Differential Equations Using the method of undetermined coefficients find the Yp (particular solution) of the differential equation: y’’ - y = 1 + e^x

For the method of undetermined coefficients, the assumed form of the particular solution yp for y''...

For the method of undetermined coefficients, the assumed form of the particular solution yp for y'' − y' = 1 + ex is yp = ? Answers that didn’t work: -x+xe^x -x Please help me find the correct solution to this problem. Show steps.

Non homogeneous eq w constant; undetermined coefficients Find the general solution: 1) y" + 4y' +...

Non homogeneous eq w constant; undetermined coefficients Find the general solution: 1) y" + 4y' + 4y = xe^−x. 2) y" + 2y' + 5y = e^2x cos x. Determine a suitable form for a particular solution z = z(x) of the given equations 1) y" + 2y' = 2x + x^2e^−3x + sin 2x. 2) y" − 5y' + 6y = 2e^2x cos x − 3xe^3x + 5. 3) y" + 5y' + 6y = 2e^2x cos x −...

Find the particular solutions yp of the following EQUATIONS using the Method of Undetermined Coefficients. Primes...

Find the particular solutions yp of the following EQUATIONS using the Method of Undetermined Coefficients. Primes denote the derivatives with respect to x. y''-y'-6y=29sin(3x) y''-5y'+8y=xex Solve for the particular solution of both equations!

DIFFERENTIAL EQUATIONS INDETERMINATE COEFFICIENTS given the function g (x) determine the proposed particular solution Yp if...

DIFFERENTIAL EQUATIONS INDETERMINATE COEFFICIENTS given the function g (x) determine the proposed particular solution Yp if its possible g(x)= -6xe^(2x) g(x)= e^(-x) cos(2x) g(x)= 9x^(2) -17xe^(x/2) sin(x) g(x)= 5x^(-2) +8x^(-1) -(7/3) + 3 sqr(2)x +6x^(2)

For the method of undetermined coefficients, the assumed form of the particular solution: Find Yp= Show...

For the method of undetermined coefficients, the assumed form of the particular solution: Find Yp= Show all work. yp for y'' − y' = 8 + ex is yp =

(1 point) Match the following nonhomogeneous linear equations with the form of the particular solution yp...

(1 point) Match the following nonhomogeneous linear equations with the form of the particular solution yp for the method of undetermined coefficients.   ?    A    B    C    D      1. y′′+y=t(1+sint)   ?    A    B    C    D      2. y′′+4y=t2sin(2t)+(5t−7)cos(2t)   ?    A    B    C    D      3. y′′+2y′+2y=3e−t+2e−tcost+4e−tt2sint   ?    A    B    C    D      4. y′′−4y′+4y=2t2+4te2t+tsin(2t) A. yp=t(A0t2+A1t+A2)sin(2t)+t(B0t2+B1t+B2)cos(2t) B. yp=A0t2+A1t+A2+t2(B0t+B1)e2t+(C0t+C1)sin(2t)+(D0t+D1)cos(2t) C. yp=Ae−t+t(B0t2+B1t+B2)e−tcost+t(C0t2+C1t+C2)e−tsint D. yp=A0t+A1+t(B0t+B1)sint+t(C0t+C1)cost

Using undetermined coefficients, what is the form of yp in the differential equation y''-3y'+2y = x^2...

Using undetermined coefficients, what is the form of yp in the differential equation y''-3y'+2y = x^2 + xsin(x) - e^x. Do not solve for yp, just find the general form.

FIND: The GENERAL FORM of a particular solution to below ODE: y''-2y'+5y = exsin(4x) + xe2x...

FIND: The GENERAL FORM of a particular solution to below ODE: y''-2y'+5y = exsin(4x) + xe2x Use below method: 1. characteristic equation / determine roots 2. complementary function 3. determining duplication 4. trial solutions 5. eliminate duplication 6. Particular solution (DO NOT FIND COEFFICIENTS)