Ë Â·-/6.66 points 37.3.001 show that the given functions are solutions of the system x(t) = A(t general solution to the system (remember to check linear independence). If auxillary conditions are given, find particular solution that satisfies these conditions. )x(t) for the given matrix A, and hence, find the t-4 11], x(0)=[-2 First, show that x1(t) is a solution to x'(t) - At)x(). (Enter your answer as a row vector.) A(t)x1(t) Next, show that x2(t) is a solution to x'(t) = A(t)x(t). (Enter your answer as a row vector.) x'2(t) A(t)X2(t) Now check for linear independence. WEx1, x21(t) - #0 Finally, give the general or particular solution. (Enter your answer as a row vector.) x(t) - 2. ã¤ã¼/6.66 points GoodDMEOLinAig 3 7 3 003. My Note