algebra II

posted by jaz

Determine whether the geometric series converges or diverges.

27 + 18 + 12 + 8 + . . .

  1. rockstar

    it diverges i think

Respond to this Question

First Name

Your Answer

Similar Questions

  1. calculus

    determine whether the series converges of diverges the sum from k=2 to infinity of (the square root of (ln(k)))/k I said that because you can't integrate the series (goes to infinity) it diverges
  2. calculus

    determine whether the series converges of diverges the sum from k=2 to infinity of (the square root of (ln(k)))/k I said that because you can't integrate the series (goes to infinity) it diverges is this true?
  3. algebra need help

    Determine whether the geometric series converges or diverges. 27 + 18 + 12 + 8 + . . .
  4. calculus

    I'm having trouble with a geometric series problem. Determine if the infinite summation of (-3)^(n-1)/4^n converges or diverges. If it converges, find the sum. So the answer says that sigma -3^(n-1)/4^n = 1/4 * sigma (-3/4)^(n-1) How …
  5. calculus

    Determine whether the given series converges or diverges, and find the sum if it converges. I don't understand, help!! Thnx! 1) 20+5+(5/4)+(5/16)+...
  6. Calculus 2

    I need help in solving an initial-value problem and a few series problems (Especially on #45 & #46). I don't really understand how to do the series problems...majority of the time. An explanation would be great as well. Thank you for …
  7. Math

    Does the following infinite geometric series diverge or converge?
  8. Mathematics

    State whether this infinite series converges or diverges?
  9. Calculus

    Use the ratio test to find whether the series diverges or converges. 1/5^n (1 to infinity) I think the limit converges to 1/5, so the series converges.
  10. Calculus

    Determine whether the series from 0 to infinity of cos(nπ)/(n + 3) converges conditionally or absolutely. A. The series diverges. B. The series converges conditionally but not absolutely. C. The series converges absolutely but not …

More Similar Questions