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The value of limx→0(sin(ℓnex))2(etan2x-1) is ______.

The value of `lim_(x→0) (sin(ℓn e^x))^2/((e^(tan^2x) - 1))` is ______.

MCQ

रिक्त स्थान भरें

The value of `lim_(x→0) (sin(ℓn e^x))^2/((e^(tan^2x) - 1))` is 1.00.

Explanation:

`lim_(x→0) (sinx)^2/((e^(tan^2x) - 1))` = `lim_(x→0) (sinx/x)^2 xx (tan^2x)/((e^(tan^2x) - 1)) xx (x/tanx)^2` = 1

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Limits Using L-hospital's Rule

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