Let f(x)=(1-x)^2 sin ^2 x+x^2 for all x in ma | vedclass

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(B) $1.$ Given $f(x)=(1-x)^2 \sin^2 x+x^2$ and $g(x)=\int_1^x \left(\frac{2(t-1)}{t+1}-\ln t\right) f(t) dt$.By the Fundamental Theorem of Calculus,$g

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$(B, C)$

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(B) $1.$ Given $f(x)=(1-x)^2 \sin^2 x+x^2$ and $g(x)=\int_1^x \left(\frac{2(t-1)}{t+1}-\ln t\right) f(t) dt$.By the Fundamental Theorem of Calculus,$g'(x) = \left(\frac{2(x-1)}{x+1}-\ln x\right) f(x)$.Let $\phi(x) = \frac{2(x-1)}{x+1}-\ln x$. Then $\phi'(x) = \frac{2(x+1)-2(x-1)}{(x+1)^2} - \frac{1}{x} = \frac{4}{(x+1)^2} - \frac{1}{x} = \frac{4x - (x^2+2x+1)}{x(x+1)^2} = \frac{-(x-1)^2}{x(x+1)^2}$.Since $\phi'(x) \leq 0$ for $x > 1$,$\phi(x)$ is decreasing. Since $\phi(1) = 0$,$\phi(x)  1$. Also $f(x) = (1-x)^2 \sin^2 x + x^2 > 0$ for $x > 1$. Thus $g'(x) $2.$ For $P$: $f(x)+2x = (1-x)^2 \sin^2 x + x^2 + 2x = 2(1+x^2) = 2+2x^2$.$(1-x)^2 \sin^2 x = x^2 - 2x + 2 = (x-1)^2 + 1$.Since $\sin^2 x \leq 1$,$(1-x)^2 \sin^2 x \leq (1-x)^2$,but $(1-x)^2 + 1 > (1-x)^2$. Thus $P$ is false.For $Q$: Let $H(x) = 2f(x) + 1 - 2x(1+x)$. $H(0) = 2(1)^2(0) + 0 + 1 - 0 = 1$. $H(1) = 2(0+1) + 1 - 2(1)(2) = 3 - 4 = -1$. Since $H(x)$ is continuous and changes sign,there exists $x$ such that $H(x)=0$. Thus $Q$ is true.

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