Which of the following represents the form of the particular solution (yp) of
Which of the following represents the form of the particular solution (yp) of
Which of the following represents the form of the particular solution y, of the differential equation? y" + 2y' - 24y = 372 +2cos(51) Ovp = Ar? + Bcos(5t) + C O yp= Ar? +8sin(58) Yp - Al? + B+ + C + Dcos(5t) + Esin(58) Ovo - Ar+ Bcos(5t) + Csin(51)
1. Set up the appropriate form of a particular solution yp, but do not determine the values of the coefficients y" +9y' = x2 + cos 2x
Which of the following functions is the FORM of a particular solution of the differential equation D(D2 + 2)(D - 1)y = 3+ 4x + e* - 5e21 Select one: O A. yp(x) = Ax + Bx2 + Cell + Dxe21 O B. Yp(x) = A + Bx + Cxe+ Dxe20 O C. yp(x) = Ax2 + Bx3 + Cell + Dxe21 O D. Yp(x) = Ax2 + Bx3 + Cxe + De22 O E. yp(x) = Ax + Bx2...
1. Set up the appropriate form of a particular solution yp, but do not determine the values of the coefficients V" +y = r? + cos2.c 2. Transform the following differential equation into an equivalent system of first order differential equations - 312) - 4x + 2x2 - 2 cost
D Question 29 Use Undetermined Coefficient method to determine a trial form of particular solution Yp of y" - 3y" + 3y'- y = x - 4eX Oyp = Ax +B+Cx3ex Oyp = AX + B + Cex yp = Ax +B+Cxex yp = AX + B + Cxex None of them
Find a particular solution yp of the following equation. Primes denote the derivatives with respect to X. y (5) + 7y(4) - y = 15 The particular solution is yp(x) = 0
please give the correct answer with explanations, thank you Find a particular solution, yp(), of the non-homogeneous differential equation d2 y (2) +6 (de y(x)) +9y (x) = -12 , d22 given that yn (r) = A e-31+B 1 e 30 is the general solution of the corresponding homogeneous ODE. The form of yp() that you would try is Yp = ax + 6 yp = 2040 O yp=0x2-32 Enter your answer in Maple syntax only the function defining yp()...
Yp = A2² is a particular solution of y'” + y = 1 for A-
Find a particular solution, yp(x), of the non-homogeneous differential equation d2 +y(x) = 6 ((x)) +9 y(x) = 6 x+2, d x2 given that yh(x) = A e3x +B x @3x is the general solution of the corresponding homogeneous ODE. The form of yp(x) that you would try is Oyp = ax + b Oyp = a 2x Oyp = ax2 3x Enter your answer in Maple syntax only the function defining yp(x) in the box below. For example, if...
2. Use variation of parameters to find the general solution y and the particular solution yp. 6) y" + 2y' +y= .73