» Unbounded sequence that doesnt diverge to -∞ or ∞

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Yosef Bisk

2013-12-15 15:25:53

The sequence sin(n) is bounded within [-1,1] , perhaps you mean n(sin(n)) which does not diverge to + or - infinity but oscillates between positive and negative, and increases in absolute value

Ricky

2007-02-14 03:16:23

Interesting function, kylekatarn. I've never thought of an unbounded sequence that had subsequences which one diverges to infinity and the other to negative infinity.

As for mine, I always stick with trig:

sin(n)

kylekatarn

2007-02-14 02:39:19

a-ha! but what can we say about:

* it's not convergent (oscillates around y=0) * it's not bounded (fully or partially):

* yet it doesn't diverge either to +oo or -oo because:

mathsyperson

2007-02-13 09:23:39

I'd agree with that. If it doesn't diverge to infinity then it has to be bounded by some number, even if it's a million or something.

kylekatarn

2007-02-13 08:24:28

hmm... "Divergent" means "not convergent"... there are "oscillating" sequences that don't converge, like this one:

oscillates: 1, -1, 1, -1, ...

But divergent not for -oo or +oo and unbounded, I am not seeing any example...

woodoo

2007-02-13 07:59:58

I have a question that says find an unbounded sequence that doesn't diverge to -∞ or ∞. I can't figure one out, I don't think it exists. Anyone know of one?