Do this question using variation of parameter. Show all work Y"- y = ex
3) Using the Method of Variation of Parameter, solve the following linear differential equation y' (1/t) y 3cos (2t), t > 0, and show that y (t) 2 for large t
Solve Using Variation of Parameters, Show All Steps!!
11. y" +9ysin(36) sin(3t)
Find the general solution to the following differentiel
equations USING VARIATION OF PARAMETER METHOD.
. y'"' + 4y' = t y(0) = y'(0) = 0 et y'(0) = 1 3 y'" – 3y" + 2y' = t +et ; y(0) = 1; y'(0) = -et y" (0) = 2 yiv + 2y" + y = 3t +4 ; y(0) = y'(0) = 0 et y'(0) = y''(0) = 1
USING THE PARAMETER VARIATION METHOD,
Find the general solution of the differential equations taking
into account the initial conditions.
Note: only determine all the matrices W in relation to the
particular answer Yp without calculating them
yiv + 2y" + y = 3t + 4 ; y(0) = y'(0) = 0 et y"(0) = y''(0) = 1
Please show all work with clear handwriting
et Solve the differential equation by variation of parameters. y" – 2y' + y = 1+x2
3. Using undetermined coefficients / annihilator or variation of parameter and Cauchy to solve the following: (40 pts) a) 3y"- y"+ 2y'-9y = 130e2+ - 18x² +5 (10 pts)
4. Solve the differential equation by parameter variation. 2y" + y - y = x + 1 Please try to write as clear as possible I will be very grateful
of Parameter & Save the differential equation by variation of Param y" - 4y + 4y = een tan" (n)
2) y = c. ex + cac" is a two-parameter solution of the second-order DE y"-y = 0. god the ntants c, and c. Given the initial condition y(O) - 1 and y'CO)2
5. Find a general solution using Solution by Variation of Parameter x2y"x(2 +
5. Find a general solution using Solution by Variation of Parameter x2y"x(2 +