Asked by bill
The sum from 0 to infinity of (-1)^n(3/3^n) is convergent or divergent? If convergent, what is the sum?
I got that it's convergent and the sum is 9/2, but that's wrong.
I got that it's convergent and the sum is 9/2, but that's wrong.
Answers
Answered by
MathMate
It is not clear without sufficient parentheses what the expression really is.
I assume it to be:
Sum((-1)^n * (3/3^n)) for n=0 -> ∞
This is an alternating geometric series.
(9/2) is the correct sum for the geometric series (non-alternating).
Write out the first few terms of the series:
3 - 3/3 + 3/9 - 3/27 + 3/81 - ...
which can be regrouped into two geometric series:
3(1+1/9+1/81+...) - (1+1/9+1/81+...)
=3(9/8) - (9/8)
=2(9/8)
=9/4
Note that if the minus sign becomes a plus sign, we get the geometric sum of 9/2.
I assume it to be:
Sum((-1)^n * (3/3^n)) for n=0 -> ∞
This is an alternating geometric series.
(9/2) is the correct sum for the geometric series (non-alternating).
Write out the first few terms of the series:
3 - 3/3 + 3/9 - 3/27 + 3/81 - ...
which can be regrouped into two geometric series:
3(1+1/9+1/81+...) - (1+1/9+1/81+...)
=3(9/8) - (9/8)
=2(9/8)
=9/4
Note that if the minus sign becomes a plus sign, we get the geometric sum of 9/2.
Answered by
bill
Oh, right . I forgot all about the -1. Thanks.
Answered by
MathMate
You're welcome!
There are no AI answers yet. The ability to request AI answers is coming soon!
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.