Compute the limit lim_{x->0} ln(1+x) / x.

Unlock all questions

This demo includes only 20 questions. Upgrade to access hundreds of questions, flashcards, exam simulations, and disable ads.

Full question bankExam simulationsFlashcards
From $9.99Unlock all

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

Compute the limit lim_{x->0} ln(1+x) / x.

Explanation:
Think about how ln(1+x) behaves when x is very small. It behaves almost like a straight line with slope 1 at the point x = 0, so the ratio ln(1+x)/x approaches that slope. A direct way to see this is by L’Hôpital’s rule: as x → 0, both numerator and denominator go to 0, so differentiate top and bottom to get lim x→0 (1/(1+x)) / 1 = 1/(1+0) = 1. Another view is the Taylor expansion: ln(1+x) = x − x^2/2 + …, so ln(1+x)/x = 1 − x/2 + … → 1 as x → 0. This limit exists from both sides (within the domain x > −1) and equals 1.

Think about how ln(1+x) behaves when x is very small. It behaves almost like a straight line with slope 1 at the point x = 0, so the ratio ln(1+x)/x approaches that slope.

A direct way to see this is by L’Hôpital’s rule: as x → 0, both numerator and denominator go to 0, so differentiate top and bottom to get lim x→0 (1/(1+x)) / 1 = 1/(1+0) = 1.

Another view is the Taylor expansion: ln(1+x) = x − x^2/2 + …, so ln(1+x)/x = 1 − x/2 + … → 1 as x → 0.

This limit exists from both sides (within the domain x > −1) and equals 1.

More Multiple Choice Questions
Subscribe

Get the latest from Examzify

You can unsubscribe at any time. Read our privacy policy