Determine whether the given vector functions are linearly dependent or linearly independent on the interval (-0,0). - 4te - 5t -40 e cos (3) - 2t e -31 e - 4te - 5t Let x1 and x2 = cos (3) e - 4t - 2t Select the correct choice below, and fill in the 3t e e answer box to complete your choice.
A. The vector functions are linearly independent since there exists at least one point tin ! where det[xy(t) x2(t)] is not 0. In fact, det[x4 (t) x2(t)] = |
B. The vector functions are linearly dependent since there exists at least one point t in I where det[xy(t) x2(t)] is not 0. In fact, det[x4 (t) x2(t)] = 1.
C. The vector functions are linearly dependent since there exists at least one point t in I where det[xy(t) x2(t)] is 0. In fact, det[xf(t) x2(t)] =
D. The vector functions are linearly independent since there exists at least one point tin ! where det[x2 (t) x2 (t)] is 0. In fact, det[X, (t) x2(0] =.