Question: Let F(x) = integration x to x^2 +pai/6 2 cos^2 tdt for all x R and : 0, [0] if F'(a) + 2 is

Let F(x) = integration x to x^2 +pai/6 2 cos^2 tdt for

Let F(x) = integration x to x^2 +pai/6 2 cos^2 tdt for all x R and : 0, [0] if F'(a) + 2 is the area of the region bounded by x = 0, y = 0, y = f(x) and x = a, then f (0) is [0, ) be a continuous function. For a 0, [0, 1].

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