If $\underset{x \to 0}{l i m} \frac{2 a \sin x - \sin 2 x}{\tan^{3} x}$ exists and is equal to $1$ , then the value of $a$ is:

$2$

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$1$

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$0$

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$- 1$

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Solution

The correct option is B
$1$

Explanation for the correct option.
Step 1: Apply limit.
We have $\underset{x \to 0}{l i m} \frac{2 a \sin x - \sin 2 x}{\tan^{3} x}$ . By applying limit we get,
$\frac{2 a \sin 0 - \sin (0)}{\tan^{3} 0} = \frac{0}{0}$ .
As it is in $\frac{0}{0}$ form, so we will apply L' Hospital's Rule.
Step 2: Apply L' Hospital's Rule.
$\begin{array}{rcl} \underset{x \to 0}{l i m} \frac{2 a \sin x - \sin 2 x}{\tan^{3} x} & = & \underset{x \to 0}{l i m} \frac{\frac{d (2 a \sin x)}{d x} - \frac{d (\sin 2 x)}{d x}}{\frac{d (\tan^{3} x)}{d x}} \\ = & \underset{x \to 0}{l i m} \frac{2 a \cos x - 2 \cos 2 x}{3 \tan^{2} x \cdot \sec^{2} x} \\ = & \frac{2 a \cos 0 - 2 \cos 0}{3 \tan^{2} 0 \cdot \sec^{2} 0} \\ = & \frac{2 a - 2}{0} \end{array}$
Step 3: Find the value of $a$ .
Its is given that $\underset{x \to 0}{l i m} \frac{2 a \sin x - \sin 2 x}{\tan^{3} x} = 1$
$\begin{array}{rcl} \Rightarrow & \frac{2 a - 2}{0} = 1 \\ \Rightarrow 2 a & = & 2 \\ \Rightarrow a & = & 1 \end{array}$
Hence, option B is correct.

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