Answer to Question #311030 in Differential Equations for kxngToooch

Solution;

The homogeneous solution of the equation is;

"(D+4)^2x=0"

From which the characteristic equation is;

"(m+4)^2=0"

"m=-4,-4"

We obtain the complementary solution;

"C_1e^{-4t}+C_2e^{-4t}"

The particular integral if the equation is;

"P.I=\\frac{sin4t}{(D+4)^2}"

We know that;

"sinh(an)=\\frac{e^{an}-e^{-an}}{2}"

Substitute into the P.I;

"P.I=\\frac{e^{4t}-e^{-4t}}{2(D+4)^2}"

Hence;

"P.I=\\frac{e^{4t}}{128}-\\frac{t^2e^{-4t}}{4}"

The solution is;

"f(t)=C_1e^{-4t}+tC_2e^{-4t}-\\frac{t^2e^{-4t}}{4}+\\frac{e^{4t}}{128}"