Answer to Question #297354 in Differential Equations for Nicolas

Question #297354

{F} Find the solution of

(D^3+3D^2-4)y=0

Expert's answer

The auxiliary equation is "m^3+3m^2-4=0"

Performing synthetic division,

"\\begin{array}{c|rrr}\n1&1&3&0&-4\\\\\n& & 1 & 4&4\\\\\n\\hline\n&1&4&4&\\mid 0\n\n\\end{array}"

We get "m-1" as a factor. Therefore,

"m^3+3m^2-4= (m-1)(m^2+4m+4)=0\\\\\n\\implies m=1~\\&~ m^2+4m+4=0\\\\\ni.e., m=1~\\&~ m=-2(twice)\\\\"

The solution is "y = c_1 e^x + (c_2+c_3x)e^{-2x}"

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