Let f: R arrow R be a continuous odd function, which vanishes exactly at one point and f(1)=(1/2). Suppose that F(x)=∫ limits-1x f(t) d t for all x ∈[-1,2] and G(x)=∫ limits-1x t|f(f(t))| dt for all x ∈[-1,2]. If displaystyle lim x arrow 1 (F(x)/G(x))=(1/14), then the value of f((1/2)) is.

Question

Let f: R arrow R be a continuous odd function, which vanishes exactly at one point and f(1)=(1/2). Suppose that F(x)=∫ limits-1x f(t) d t for all x ∈[-1,2] and G(x)=∫ limits-1x t|f(f(t))| dt for all x ∈[-1,2]. If displaystyle lim x arrow 1 (F(x)/G(x))=(1/14), then the value of f((1/2)) is. (A) 2 (B) 5 (C) 6 (D) 7

Tardigrade Admin · Accepted Answer

F(x)=∫ limits-1x f(t) d t=∫ limits1x f(t) d t G(x)=∫ limits-1x t|f(f(t))| d t=∫ limits-1x t|f(f(t))| d t displaystyle lim x arrow 1 (F(x)/G(x)) L prime hospitals displaystyle lim x arrow 1 (f(x)/x|f(f(x))|)=(1/14) ((1/2)/1|f((1)2)|)=(1/14) f((1/2))=7

Q. Let f:R→R be a continuous odd function, which vanishes exactly at one point and f(1)=21​. 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 x→1lim​G(x)F(x)​=141​, then the value of f(21​) is.

2

5

6

7

F(x)=−1∫x​f(t)dt=1∫x​f(t)dt G(x)=−1∫x​t∣f(f(t))∣dt=−1∫x​t∣f(f(t))∣dt x→1lim​G(x)F(x)​ L′ hospitals x→1lim​x∣f(f(x))∣f(x)​=141​ 1∣f(21​)∣21​​=141​ f(21​)=7