The graph of y=f(x) has a unique tangent of finite non zero slope at (π3, 0). If A = underset x arrow π3 textLim ( ln (1+9 f ( x ))- sin ( f ( x ))/2 f ( x )), then displaystyle∑ n =1∞ A - n is equal to

Question

The graph of y=f(x) has a unique tangent of finite non zero slope at (π3, 0). If A = underset x arrow π3 textLim ( ln (1+9 f ( x ))- sin ( f ( x ))/2 f ( x )), then displaystyle∑ n =1∞ A - n is equal to (A) (1/3) (B) (1/2) (C) (1/4) (D) 4

Tardigrade Admin · Accepted Answer

underset x arrow π3 textLim ( ln (1+9 f(x))- sin (f(x))/2 f(x))((0/0)) = underset x arrow π3 textLim ((9 f prime(x)/1+9 f(x))- cos (f(x)) ⋅ f prime(x)/2 f prime(x))=(9 f prime(π3)-f prime(π3)/2 f prime(π3))=4=A ∴ displaystyle∑ n =1∞ 4- n =((1/4)/1-(1)4)=(1/3)

Q. The graph of $y = f (x)$ has a unique tangent of finite non zero slope at $(π^{3}, 0)$ . If $A = x \to π^{3} Lim \frac{l n ( 1 + 9 f ( x )) - s i n ( f ( x ))}{2 f ( x )}$ , then $n = 1 \sum \infty A^{- n}$ is equal to

$\frac{1}{3}$

$\frac{1}{2}$

$\frac{1}{4}$

4

Q. The graph of y=f(x) has a unique tangent of finite non zero slope at (π3,0). If A=x→π3Lim​2f(x)ln(1+9f(x))−sin(f(x))​, then n=1∑∞​A−n is equal to

31​

21​

41​

4

x→π3Lim​2f(x)ln(1+9f(x))−sin(f(x))​(00​) =x→π3Lim​2f′(x)1+9f(x)9f′(x)​−cos(f(x))⋅f′(x)​=2f′(π3)9f′(π3)−f′(π3)​=4=A ∴n=1∑∞​4−n=1−41​41​​=31​

Q. The graph of $y = f (x)$ has a unique tangent of finite non zero slope at $(π^{3}, 0)$ . If $A = x \to π^{3} Lim \frac{l n ( 1 + 9 f ( x )) - s i n ( f ( x ))}{2 f ( x )}$ , then $n = 1 \sum \infty A^{- n}$ is equal to

$\frac{1}{3}$

$\frac{1}{2}$

$\frac{1}{4}$