Finding Complementary Fcn of ODE: (3 + t) x"(t) + (2 + t) x'(t) - x(t) = (3 + t)^2
I've been given a question: Consider the initial value problem
(3 + t) x"(t) + (2 + t) x'(t) - x(t) = (3 + t)^2
subject to x(0) = 0 and x'(0) = 1.
Determine the complementary function for the homogeneous equation which satisfies the given initial conditions.
I know how to find the complementary function on any other problems but this one I cant quite grasp. Can you expand the LHS and remove the t values and then make it equal to 0 or am i wrong?
Any help will be appreciated.
I've been given a question: Consider the initial value problem
(3 + t) x"(t) + (2 + t) x'(t) - x(t) = (3 + t)^2
subject to x(0) = 0 and x'(0) = 1.
Determine the complementary function for the homogeneous equation which satisfies the given initial conditions.
I know how to find the complementary function on any other problems but this one I cant quite grasp. Can you expand the LHS and remove the t values and then make it equal to 0 or am i wrong?
Any help will be appreciated.
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