Solve e^(sin x)-e^(-sin x) - 4 = 0....

Solve `e^(sin x)-e^(-sin x) - 4 = 0`.

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The solution of the equation e^(sin x)-e^(-sin x)-4=0

Find the number of solution of the equation e^(sin x)-e^(-sin x)-4=0

no.of solutions of the equation e^(sin x)-e^(-sin x)-4=0

Show that there is no real x for which e^(sin x) - e^(-sin x) = 4 .

The equation e^(sin x)-e^(-sin x)-4=0 has

The equation e^(sin x) -e^(-sin x)-4=0 has

The equation e^(sin x)-e^(-sin x)-4=0 has

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