Θ(2^n) vs Ο(2^n)

I have one thing that's the same size as an elephant[*], and another thing that's no bigger than an elephant. Compare their sizes.

Θ(n^0.6) vs Θ(n^logn)

`n^log n`

is bigger than `n^0.6`

, because `log n`

is bigger than a constant. But I can't be bothered thinking of animals for them.

O(n) vs Ω(nlogn)

I have one thing that's no bigger than a mouse, and another thing that's no smaller than a cat. Compare their sizes.

[*] erm... as the thing and the elephant tend to infinity they're the same size, anyway. The analogy isn't perfect, but the point is that big-O means "is no bigger than", big-Omega means "is no smaller than", and big-Theta means, "is both no bigger than and no smaller than". "Bigger" and "smaller" are both judged by the same standard, actually meaning "`f(n)`

no bigger/smaller in magnitude than a constant multiple times `g(n)`

, for sufficiently large `n`

"

`Θ`

,`O`

, and`Ω`

are? – AakashM Sep 21 '12 at 10:11