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L'Hospital Rule to Remove Indeterminate Form

Let f : ℝ→ 0,...

Question

Let $f : R \to (0, \infty)$ and $g : R \to R$ be twice differentiable functions such that $f^{''}$ and $g^{''}$ are continuous functions on $R$ . Suppose $f^{'} (2) = g (2) = 0, f^{''} (2) \neq 0$ and $g^{'} (2) \neq 0$ . If $lim x \to 2 \frac{f (x) g (x)}{f^{'} (x) g^{'} (x)} = 1,$ then

A

f

has a local minimum at

x = 2

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B

f

has a local maximum at

x = 2

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C

f^{''} (2) > f (2)

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D

f (x) - f^{''} (x) = 0

for at least one

x \in R

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Solution

The correct option is D $f (x) - f^{''} (x) = 0$ for at least one $x \in R$
$f^{'} (2) = g (2) = 0, f^{''} (2) \neq 0$ and $g^{'} (2) \neq 0$
$lim x \to 2 \frac{f (x) g (x)}{f^{'} (x) g^{'} (x)} = 1$

Applying L'Hospital Rule, we get
$lim x \to 2 \frac{f^{'} (x) g (x) + f (x) g^{'} (x)}{f^{''} (x) g^{'} (x) + f^{'} (x) g^{''} (x)} = 1 \Rightarrow \frac{f (2)}{f^{''} (2)} = 1 \Rightarrow f^{''} (2) = f (2)$
$∵ f^{'} (2) = 0$ and the co domain of $f$ is $(0, \infty)$
$∴ f^{''} (2) > 0$
Hence, $f (2)$ will be local minima.

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Similar questions

f : R \to (0, \infty)

g : R \to R

be twice differential such that

f^{''}

g^{''}

are continuous on

R

f^{'} (2) = g (2) = 0, f^{''} (2) \neq 0

g^{'} (2) \neq 0

lim x \to 2 \frac{f (x) g (x)}{f^{'} (x) g^{'} (x)} = 1

f

be a twice differentiable function in

(- \infty, \infty)

f^{''} (x) \leq 0 \forall x \in R .

g (x) = f (x) + f (1 - x)

g^{'} (\frac{1}{4}) = 0,

f : R \to R

g : R \to R

be two non-constant differentiable functions. If

f^{'} (x) = (e^{(f (x) - g (x))}) g^{'} (x)

x \in R

f (1) = g (2) = 1

, then which of the following statement(s) is (are) TRUE?

f : R \to R

be twice continuously differentiable. Let

f (0) = f (1) = f^{'} (0) = 0

: R \to R

g : R \to R

be two non-constant differentiable functions. If

f^{'} (x) = (e^{(f (x) - g (x))}) g^{'} (x)

x ϵ R

f (1) = g (2) = 1

, then which of the following statement(s) is (are) TRUE?

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L'Hospital Rule to Remove Indeterminate Form

Standard XII Mathematics

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