Solve 5 please 5.7 Exercises In Exercises 1-6 use variation of parameters to find a particular...
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) =
In Problems 1-6, use the method of variation of parameters to determine a particular solution to the given equation 1. y" - 3y" 4y
In Problems 1-6, use the method of variation of parameters to determine a particular solution to the given equation 1. y" - 3y" 4y
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
10. In solving by variation of parameters, you must find the Wronskian, W. Find W for the differential equation y*-y-2y=e' lx You do not have to solve the differential equation. (a) W = 4 (b) w=1621 12 2 (c)w= (d) w =-6e (e) W = 4* +6xe (f) w = (g) w =-3e (h) w -2,1 8 2 te-2 11. Use the method of variation of parameters to find the solution to y"+3y' + 2 y = 4e (a) y,...
In Exercises 5-14, use the addition method to solve each system of equations. (Exercises 5-8 are the same as Exercises 1-4.) 2x+y+z=7 x+y+5z =-10 2x 3y +3z9 118.txx y y 552:1 i3 11(2xx+ 23y +42c:17 1 13.?s- x-2y + z=-4 x+2y + 3z = 4 4x+2y + 2z = 0 16x-4y-3z = 3 6x+3y + 12z = 6 Solve Exercises 15-22 15. Electronics Kirchhoff's law for current states 13 (Note that electu
#16 Please.
Step By Step explanation would help me understand. Thank
you.
In Exercises 1-17 find the general solution, given that yı satisfies the complementary equation. As a byproduct, find a fundamental set of solutions of the complementary equation. 1. (2x + 1)y" – 2y' - (2x + 3)y = (2x + 1)2; yı = e-* 2. x?y" + xy' - y = 3. x2y" – xy' + y = x; y1= x 4 22 y = x 1 4....
Solve by the Method of Undetermined Coefficients. 1. " - 3y' - 4y = 3e2x (ans. y = C1e4x + cze* - e2x) 2. " - 4y = 4e3x (ans. y = C1 e - 2x + C2 e 2x + 4/5 e3x) 3. 2y" + 3y' + y = x2 + 3 sin x (ans. y = ci e-* + C2 e-x/2 + x2 - 6x + 14 - 3/10 sin x- 9/10 cos x) 4. Y" + y'...
Use variation of parameters to solve the given nonhomogeneous system. = 4x - - 4y + 7 dx dt dy dt = 3x - 3y - 1 (x(t), y(t)) =
Please answer questions 51,52 & 53
And include all work. Thanks.
3-58, solve the system by using the elimination method. 33. 4x + 3y = 7 35. 3x-2y=1 ad 34. x 2y x+2y = 3 36, 2x-2y = 1 -2x tys3 38. y=2x-4 y=4-2x 40. 2x-5y = 7 2x + 2y = 5 42, 3x-4y = 7 - 3y3 3x y3 37, y = 3x + 5 y=5-3x 39. 3x+2y=10 41, 2x-3y = 5 3x-3y = 1 43, 3x+5y =...
In each of Problems 1 through 3, 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 undetermined coefficients. 1. y" - 5y + 6y - 2 ANSWER O Y(A) = 2. y - y - 2y - 2e? ANSWER WORKED SOLUTION 2.4" - 4y + y - 16/2