10. In solving by variation of parameters, you must find the Wronskian, W. Find W for...
Use the method of variation of parameters to find a particular solution of the following differential equation. y" - by' +9y = 2e 3x What is the Wronskian of the independent solutions to the homogeneous equation? W(11.72) = 0 The particular solution is yp(x) =
Solve 5 please 5.7 Exercises In Exercises 1-6 use variation of parameters to find a particular solution. 1. y" +9y = tan 3x 2. y' + 4y = sin 2x sec2 2x 3. y" – 3y' + 2y = 4 4. j" – 2y + 2y = 3e* sec x 1+e-x 4e-x 5. y" – 2y' + y = 14x3/2e* 6. y" - y = 1-e-2x
(graded) Section 3.6: Variation of Parameters ITEMS SUMMARY Try again You have answered 1 out of 2 parts correctly. Consider the differential equation: 9ty' - 2t(t +9)y +2(t+9) y = -26, t>0. You can verify that yı = 3t and y2 = 2texp(2t/9) satisfy the corresponding homogeneous equation. a. Compute the Wronskian W between yı and 32- W(t) = b. Apply variation of parameters to find a particular solution. Bre,+2te (*),+22
1. Compute the Wronskian for the following functions. Then use the Wronskian to determine whether the functions are linearly independant or linearly dependant. a) {(tan2x - sec2 x),3 (b) le,e,e) 2. Use variation of parameters to find a general solution to 2y" -4ry 6y3 1 given that y 2 and y2- 3 are linearly independant solutions of the associated homogeneous equation. (Hint: be careful the equations are in the right form.) Find a particular solution for each of the following...
1. Solve the following Differential Equations. 2. Use the variation of parameters method to find the general solution to the given differential equation. 3. a) y" - y’ – 2y = 5e2x b) y" +16 y = 4 cos x c) y" – 4y'+3y=9x² +4, y(0) =6, y'(0)=8 y" + y = tan?(x) Determine the general solution to the system x' = Ax for the given matrix A. -1 2 А 2 2
Question 12,15, and 18 Solve differential equation by variation of parameters er 12. y"-2y' + y = 1 + x? 13. y" + 3y' + 2y = sin ex 14. y" 2y 15. y" + 2y, + y = e-t In t
In this problem you will use variation of parameters to solve the nonhomogeneous equation fy" + 4ty' + 2y = 1 + 12 A. Plug y = p into the associated homogeneous equation (with "0" instead of "13 + 12") to get an equation with only t and n. (Note: Do not cancel out the t, or webwork won't accept your answer!) B. Solve the equation above for n (uset # 0 to cancel out the t). You should get...
1. Solve differential equation by variation of parameters 4y" – 4y' + y = ež V1 – 12 2. Solve differential equation by variation of parameters 2x y" – 34" + 2y = 1+ er
10. Use the Method of Variation of Parameters to find a particular solution for the differential equation y" +y= ex (You may use the integral formulas Íe' sin xax= ex (sin x-cos x) + c and「' cos xdr= e"(sin x + cos x) + c. )
Use the method of variation of parameters to find a particular solution of the given differential equation. Then check your answer by using the method of indetermined codents V 2'y e ! YTE)