Evaluate- x- 2lim-1-cos 2x-2-x-2

Explanation for correct option:Find the value of x→ 2lim((√(1 cos 2(x 2)))/(x 2))Consider the given Equation asI=x→ 2lim((√(1 cos 2(x 2)))/(x 2))We know thatcos ...

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Standard XII

Mathematics

Napier’s Analogy

Evaluate: x→ ...

Question

Evaluate: $\lim_{x \to 2} (\frac{(\sqrt{1 - \cos 2 (x - 2)})}{(x - 2)})$

$\sqrt{2}$

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$- \sqrt{2}$

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$\frac{1}{\sqrt{2}}$

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does not exist

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Solution

The correct option is D
does not exist

Explanation for correct option:
Find the value of $\lim_{x \to 2} (\frac{(\sqrt{1 - \cos 2 (x - 2)})}{(x - 2)})$
Consider the given Equation as
$I = \lim_{x \to 2} (\frac{(\sqrt{1 - \cos 2 (x - 2)})}{(x - 2)})$
We know that
$\cos 2 θ = 1 - 2 \sin^{2} θ$
Then, on substituting we have,
$I = \lim_{x \to 2} (\frac{(\sqrt{1 - (1 - 2 \sin^{2} (x - 2))})}{(x - 2)}) \Rightarrow I = \lim_{x \to 2} (\frac{(\sqrt{2 \sin^{2} (x - 2)})}{(x - 2)}) \Rightarrow I = \lim_{x \to 2} \sqrt{2} (\frac{|\sin (x - 2)|}{(x - 2)}) \Rightarrow I = \lim_{x \to 2^{+}} \sqrt{2} \frac{\sin (x - 2)}{(x - 2)} \Rightarrow I = \lim_{x - 2 \to 0^{+}} \sqrt{2} \frac{\sin (x - 2)}{(x - 2)}$
We know that
$\lim_{x \to 0} \frac{\sin x}{x} = 1$
Then, Right hand limt is
$I = \sqrt{2}$
Similarly, left limitis is,
$I = \lim_{x \to 2^{_}} - \sqrt{2} \frac{\sin (x - 2)}{(x - 2)} I = - \sqrt{2}$
Since, $LHS \neq RHS$ , the limit doesn't exist.
Hence, the correct answer is Option D

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