Posted by **sarah** on Tuesday, February 26, 2008 at 1:43am.

determine whether the series converges of diverges

the sum from n=1 to infinity of

1/(the square root of (n^3+1))

I said that through the comparision test (comparing to 1/the square root of (n^3) the series converges

## Answer This Question

## Related Questions

- calculus - determine whether the series converges of diverges the sum from n=1 ...
- calculus - determine whether the series converges of diverges the sum from k=2 ...
- calculus - determine whether the series converges of diverges the sum from k=2 ...
- Calc - Does 1/ln(x+1) converge or diverge? I've tried the nth term test, limit ...
- calculus - determine whether the series converges of diverges the sum from k=1 ...
- calculus - determine whether the series converges of diverges the sum from k=1 ...
- calculus - determine whether the series converges of diverges the sum from k=1 ...
- calculus - determine whether the series converges of diverges the sum from n=1 ...
- Calculus - The problem with these two questions is that I cannot determine the a...
- calculus - true or false: if the sum from n=1 to infinity of a(n) converges, and...

More Related Questions