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Solve the Method of variation of Parameters. y" - 3y' + 2y = 4e^3t
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Solve the Method of variation of Parameters. y" - 3y' + 2y = 4e^3t

User Jason Is My Name
by
6.0k points

1 Answer

5 votes

Answer:

CF+PI=
c_1e^(2x)+c_2e^(x)+
2e^(3t)

Explanation:

we have given y"-3y'=2y=
4e^(3t)

this differential equation solution have two part that CF and PI

CALCULATION OF CF :


m^2-3m+2=0


m^2-2m-m+2=0


(m-1)(m-2)=0

m=1 and m=2

so CF=
c_1e^(2x)+c_2e^(x)

CALCULATION OF PI :

PI =
(4e^(3t))/((m-1)(m-2))

at m= 3 in PI


PI=(4e^(3t))/(2)=2e^(3t)

so the complete solution is

CF+PI=
c_1e^(2x)+c_2e^(x)+
2e^(3t)

User Batya
by
6.1k points
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