If f be a continuous function on [0,1], differentiable in (0,1) such that f (1)=0, then their exists some c ∈(0,1) such that

Question

If f be a continuous function on [0,1], differentiable in (0,1) such that f (1)=0, then their exists some c ∈(0,1) such that (A) c f prime( c )- f ( c )=0 (B) f prime( c )+ c f( c )=0 (C) f prime( c )- c f ( c )=0 (D) cf prime( c )+ f ( c )=0

Tardigrade Admin · Accepted Answer

laadsc Consider a function g ( x )= x f ( x ) Obviously g is continuous in [0,1] and differentiable in (0,1) As f (1)=0 ∴ g (0)=0= g (1) Hence Rolle's theorem is applicable for g ∴ ∃ some c ∈(0,1) such that g prime( c )=0 x f prime( x )+ f ( x )=0 c f prime( c )+ f ( c )=0

Q. If $f$ be a continuous function on $[0, 1]$ , differentiable in $(0, 1)$ such that $f (1) = 0$ , then their exists some $c \in (0, 1)$ such that

$c f^{'} (c) - f (c) = 0$

$f^{'} (c) + c f (c) = 0$

$f^{'} (c) - c f (c) = 0$

$c f^{'} (c) + f (c) = 0$

Q. If f be a continuous function on [0,1], differentiable in (0,1) such that f(1)=0, then their exists some c∈(0,1) such that

cf′(c)−f(c)=0

f′(c)+cf(c)=0

f′(c)−cf(c)=0

cf′(c)+f(c)=0

laadsc Consider a function g(x)=xf(x) Obviously g is continuous in [0,1] and differentiable in (0,1) As f(1)=0 ∴g(0)=0=g(1) Hence Rolle's theorem is applicable for g ∴∃ some c∈(0,1) such that g′(c)=0 xf′(x)+f(x)=0 cf′(c)+f(c)=0

Q. If $f$ be a continuous function on $[0, 1]$ , differentiable in $(0, 1)$ such that $f (1) = 0$ , then their exists some $c \in (0, 1)$ such that

$c f^{'} (c) - f (c) = 0$

$f^{'} (c) + c f (c) = 0$

$f^{'} (c) - c f (c) = 0$

$c f^{'} (c) + f (c) = 0$