Let f be a function defined on R (the set of all real numbers) such that f(x)=2010(x-2009)(x-2010)2 (x-2011)3(x-2012)4, for all x ∈ R. If g is a function defined on R with values in the interval (0, ∞) such that f(x)= ln (g(x)), for all x ∈ R, then the number of points in R at which g has a local maximum is

Question

Let f be a function defined on R (the set of all real numbers) such that f(x)=2010(x-2009)(x-2010)2 (x-2011)3(x-2012)4, for all x ∈ R. If g is a function defined on R with values in the interval (0, ∞) such that f(x)= ln (g(x)), for all x ∈ R, then the number of points in R at which g has a local maximum is (A)  (B)  (C)  (D)

Tardigrade Admin · Accepted Answer

f ( x )= ln g ( x ) g ( x )= e f (x) g '( x )= e f ( s ) ⋅ f '( x ) g '( x )=0 ⇒ f '( x )=0 as e f ( s ) ≠ 0 ⇒ 2010( x -2009)( x -2010)2( x -2011)3( x -2012)4=0 so there is only one point of local maxima.

f(x)=ln{g(x)} g(x)=ef(x) g′(x)=ef(s)⋅f′(x) g′(x)=0 ⇒f′(x)=0 as ef(s)=0 ⇒2010(x−2009)(x−2010)2(x−2011)3(x−2012)4=0 so there is only one point of local maxima.

$f (x) = ln {g (x)}$
$g (x) = e^{f (x)}$
$g^{'} (x) = e^{f (s)} \cdot f^{'} (x)$
$g^{'} (x) = 0$
$\Rightarrow f^{'} (x) = 0$ as $e^{f (s)} \neq = 0$
$\Rightarrow 2010 (x - 2009) (x - 2010)^{2} (x - 2011)^{3} (x - 2012)^{4} = 0$
so there is only one point of local maxima.