Variation of parameters
y'' - 10y' + 30y = 2e3x + 3e2x
3 3) Solve with variation of parameters. y" - 10y' + 30y = 2e3x + 3e2x
Solve with variation of parameters. y'' - 10y' + 21y = 2e3x + 3e2x
Solve the following differential equation using variation of parameters. d yt) 2 dy() +7- + 10y() u(t) dt dt2 y(0) 0, y'(0) = 3 d yt) 2 dy() +7- + 10y() u(t) dt dt2 y(0) 0, y'(0) = 3
Find a general solution to the differential equation using the method of variation of parameters. y'' +10y' + 25y = 3 e -50 The general solution is y(t) = D.
Consider the differential equation 2y"' + 167" + 30y' = tan(x) Note that y = 1, y = e-3x, and y = e-5x are solutions of the complementary equation. Now consider using variation of parameters. Set up the expression for u,' in determinant form.
5. Find a general solution to the differential equation using the method of variation of parameters y"' + 10y' + 25y 5e-50
Combine the nullifier and parameter variation methods to solve the PVI: 3y'' − 6y' + 30y = 15 sin(x) + e^x tan(3x) y(0) = 0 y' (0) = 1
Solve the differential equation by variation of parameters: 2y + y - y = xt1
Find the using variation general solution of parameters y"^y'-2y=2et Y
6. Solve the differential equation by variation of parameters. y" – 2y' + y = fiz