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Let $$f(x) = (1 - x)^2 \sin^2 x + x^2$$ for all $$x \in IR$$ and let $$g(x) = \int_{1}^{x}\left(\frac{2(t - 1)}{t + 1} - \ln t\right)f(t) dt$$ for all $$x \in (1, \infty)$$.
Which of the following is true ?
g is increasing on $$(1, \infty)$$
g is decreasing on $$(1, \infty)$$
g is increasing on (1, 2) and decreasing on $$(2, \infty)$$
g is decreasing on (1, 2) and increasing on $$(2, \infty)$$
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