Let f:(0,\ pi)->R be a twice different...

Let `f:(0,\ pi)->R` be a twice differentiable function such that `(lim)_(t->x)(f(t)sinx-f(x)sint)/(t-x)=-sin^2x` for all `x in (0,\ pi)` . If `f(pi/6)=-pi/(12)` , then which of the following statement(s) is (are) TRUE? `f(pi/4)=pi/(4sqrt(2))` (b) `f(x)<(x^4)/6-x^2` for all `x in (0,\ pi)` (c) There exists `alpha in (0,\ pi)` such that `f^(prime)(alpha)=0` (d) `f''(pi/2)+f(pi/2)=0`

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Let f:(0, pi)->R be a twice differentiable function such that (lim)_(t->x)(f(x)sint-f(x)sinx)/(t-x)=sin^2x for all x in (0, pi) . If f(pi/6)=-pi/(12) , then which of the following statement(s) is (are) TRUE? f(pi/4)=pi/(4sqrt(2)) (b) f(x)<(x^4)/6-x^2 for all x in (0, pi) (c) There exists alpha in (0, pi) such that f^(prime)(alpha)=0 (d) f"(pi/2)+f(pi/2)=0

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