Let f - R - R be a continuous odd function- which vanishes exactly at one point and f 1-1-2 - Suppose that F x -1 x f t dt for all x -1-2- and G x -1 x t - f f t - dt for all x -1-2- - If lim x - 1 F x - G x -1-14- then the value of f 1-2 is

F(1)=∫^1_ 1f(t)dt=0 (∵ f(x) is an odd function) Similarly, G(1)=0 x→ 1limF(x)/G(x)=x→ 1limF'(x)/G'(x) (∵ nbsp;F(1)=G(1)=0, L Hospital Rule ) x→ 1limf(x ...

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Standard XII

Mathematics

Continuity of a Function

Let f : R → R...

Question

Let $f : R \to R$ be a continuous odd function, which vanishes exactly at one point and $f (1) = \frac{1}{2} .$ Suppose that $F (x) = x \int - 1 f (t) d t$ for all $x \in [- 1, 2]$ and $G (x) = x \int - 1 t | f (f (t)) | d t$ for all $x \in [- 1, 2]$ . If $lim x \to 1 \frac{F (x)}{G (x)} = \frac{1}{14}$ , then the value of $f (\frac{1}{2})$ is

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Solution

$F (1) = 1 \int - 1 f (t) d t = 0 (∵ f (x) is an odd function)$
Similarly, $G (1) = 0$

$lim x \to 1 \frac{F (x)}{G (x)} = lim x \to 1 \frac{F^{'} (x)}{G^{'} (x)} (∵ F (1) = G (1) = 0, L-Hospital Rule)$
$lim x \to 1 \frac{f (x)}{x | f (f (x)) |} = \frac{\frac{1}{2}}{| f (\frac{1}{2}) |} = \frac{1}{14}$
$f (\frac{1}{2}) = 7$

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Let f:R→R be a continuous odd function, which vanishes exactly at one point and f(1)=12. Suppose that F(x)=x∫−1f(t)dt for all x∈[−1,2] and G(x)=x∫−1t|f(f(t))|dt for all x∈[−1,2]. If limx→1F(x)G(x)=114, then the value of f(12) is

F(1)=1∫−1f(t)dt=0 (∵f(x) is an odd function) Similarly, G(1)=0 limx→1F(x)G(x)=limx→1F′(x)G′(x) (∵F(1)=G(1)=0,L-Hospital Rule) limx→1f(x)x|f(f(x))|=12|f(12)|=114 f(12)=7