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Lim x -> infinity ((e^(3x)) - (e^(-3x)))/( (e^(3x)) + (e^(-3x)))
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Lim x -> infinity ((e^(3x)) - (e^(-3x)))/( (e^(3x)) + (e^(-3x)))

User Relaxing In Cyprus
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Answer:When x approaches to +∞ the function e^3x becomes much bigger then e^−3x, which obviously means that e^−3x can be neglected in both numerator and denominator.

Explanation:

I took test

User MatBos
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When x approaches to +∞ the function e^3x becomes much bigger then e^−3x, which obviously means that e^−3x can be neglected in both numerator and denominator.

Here's how I figured this out:

lim x →+∞ = (e^(3x))− (e^(−3x)) / (e^3x)) + (e^(−3x)) = lim x → +∞ e^3x / e^3x = 1
User Eladian
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