Evaluate the limit as x approaches infinity of (1 - 2/x)^x.

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Prepare for the DAY 2002A Limits Test with interactive quizzes, detailed explanations, and various study resources. Strengthen your understanding of limits concepts and ace your exam!

Multiple Choice

Evaluate the limit as x approaches infinity of (1 - 2/x)^x.

Think about how expressions of the form (1 + c/x)^x behave as x grows large. They tend to e^c because ln((1 + c/x)^x) = x ln(1 + c/x), and with u = c/x, ln(1 + u) ~ u for small u, so x ln(1 + c/x) ~ x*(c/x) = c. Exponentiating gives the limit e^c. Here the inside is 1 - 2/x, which is 1 + (-2)/x, so c = -2. Therefore the limit is e^{-2}. A quick justification uses ln(1+u) ~ u for small u: with u = -2/x, ln(1 - 2/x) ~ -2/x, so x ln(1 - 2/x) ~ -2, and exponentiating yields e^{-2}.

Evaluate the limit as x approaches infinity of (1 - 2/x)^x.

Prepare for the DAY 2002A Limits Test with interactive quizzes, detailed explanations, and various study resources. Strengthen your understanding of limits concepts and ace your exam!

Evaluate the limit as x approaches infinity of (1 - 2/x)^x.

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