Does the geometric series ∑_{n=0}^∞ (1/3)^n converge, and if so, what is its sum?

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Multiple Choice

Does the geometric series ∑_{n=0}^∞ (1/3)^n converge, and if so, what is its sum?

When a geometric series has a ratio with absolute value less than 1, it converges to a finite sum. Here the first term is 1 and the common ratio is 1/3, which indeed satisfies |r| < 1, so the series converges. The sum of a geometric series is S = a / (1 − r), where a is the first term. Substituting a = 1 and r = 1/3 gives S = 1 / (1 − 1/3) = 1 / (2/3) = 3/2. So the series converges and its sum is 3/2.

Does the geometric series ∑_{n=0}^∞ (1/3)^n converge, and if so, what is its sum?

Get ready for your Honors Mathematics 3 exam with our engaging quizzes. Use flashcards and multiple choice questions with explanations to enhance your study. Prepare effectively for the test!

Does the geometric series ∑_{n=0}^∞ (1/3)^n converge, and if so, what is its sum?

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