Let f be a twice differentiable function defined in [-
4,4] such that f'(4) = 10, f'(4) = -14 and F"(x)^3 - 3
xL-4,4]. If g(x) = f(t)dt and f(0) = 0, then
0
А
g(x) increases in (4,0)
B
g(x) decreases in (0,4)
с C
graph of g(x) is concave down in (0,4)
D
f(x) has maximum value at x = 2
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