The equation $e^{sin x} - e^{- sin x} - 4 = 0$ has

infinite number of real roots.

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no real roots.

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exactly one real root.

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exactly four real roots.

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Solution

The correct option is B no real roots.
Let $e^{sin x} = t$
Then equation would be
$t - \frac{1}{t} - 4 = 0 \dots (1)$
$t - \frac{1}{t}$ is an increasing function because its derivative is always positive except for zero where it is not defined. Now for equation $(1)$ to have real roots, $t - \frac{1}{t}$ must be equal to $4$ .
Since $t$ is periodic, the domain of $t - \frac{1}{t}$ will be $[\frac{1}{e}, e]$ .
Hence, its range will be $[\frac{1}{e} - e, e - \frac{1}{e}]$ .
Clearly, the range of $t - \frac{1}{t}$ does not contain $4$ .
Hence, equation $(1)$ will have no real roots.

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