8 Find an antiderivative F(a) of the function f(x ) = such that F(1) = - 6. F(a) = Now, find a different antiderivative G(x) of the function f (x) = such that G(1) = 4. G(x) =Consider the function at) whose second derivative is 3" '(ac) = 3m | 4 sin(:1:). If f(0) = 2 and f'(0) = 4, what is f(B)? m: \fAn object moving in a straight line with an initial velocity of 95 m/s undergoes an acceleration of a(t) : 6t + 12 m/s2, t seconds after an experiment begins. [ J m/s The velocity of the object after t seconds is v(t) The position of the object after t seconds is s(t) [ ] m from the starting point. A particle is moving with acceleration a(t) = 36t + 6. its position at time t = 0 is 3(0) : 12 and its velocity at time t : 0 is 17(0) : 7. What is its position at time t : 15? Submit Question Suppose f' '(x) = 18x + 81ex, f' (0) = 1, and f(0) = - 3. Then f(ac) = Question Help: D Video Written Example Submit