Using variation of parameters find the particular solution y" -12y +36y = e^6x
Using variation of parameters find the particular solution y" -12y +36y = e^6x
Question 14 Use the method of variation of parameters to find a particular solution using the given fundamental set of solutions {x1,x2}. x′=(−10−1−1)x+(−25t), x1=e−t(01), x2=e−t(−1t) (Enter the solution as a 2x1 matrix.) xp(t)= Question 14 Use the method of variation of parameters to find a particular solution using the given fundamental set of solutions (xi,x2 (Xi, X2l x'=(-1 0 1-1 (Enter the solution as a 2x1 matrix.) Xp (t) =
2. Use variation of parameters to find the general solution y and the particular solution yp. 6) y" + 2y' +y= .73
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)
using the method of variation if parameters to find the particular solution and the general solution. (4) Exercise 4: given that er 2 are solutions of the corresponding complementary equation.
1. Use the method of variation of parameters to find a particular solution x, using the given fun- damental set of solutions {x1, x2}. *= ( = -1)x+(%) x1=e*(), x=e*(+)
Find A PARTICULAR SOLUTION FOR CHINT: xz yu - 6x y' +4y= 3x"? (TRY ) y= Ax!/3 (6 fino A PARTICULAR SOLUTION FOR: y"-44'-12y = 22% (-3x2+4x+5) Hint : TRY y = 2 e2x THEN 205 € U= AX2+BX+C
find general solution using variation of parameters y" - 2y' + y = e^x/(1 + x^2)
1. Use the method of variation of parameters to find a particular solution to the equation below. Then use your particular solution to find a general solution to the equation. -10et y" – 2y' + y = 72 +4
3. Use the method of variation of parameters to find a particular solution to the equation below. Then use your particular solution to find a general solution to the equation (give an explicit final answer in the form "y = ..."). y" - 9y = 14e3t
Find a particular solution to the following differential equation using the method of variation of parameters. x2y" – 9xy' + 16y = = x?inx