I'm currently taking my first discrete math class and I'm having a bit of trouble. This is my first encounter with big Oh and I'm having a bit of trouble understanding this particular problem.

I understand proofing that `n <= O(n)`

because I can mathematically prove that there is such constant that will hold true for all values of n >= k

if `f`

, `g`

, `h`

are functions such that `f(n) = O(g(n))`

and `g(n) = O(h(n))`

use the definition of big oh given in class to prove that `f(n) = O(h(n))`

My answer was

`|f(n)| <= U1|g(n)| for all n >= k`

`|g(n)| <= U2|h(n)| for all n >= j`

thus

`|f(n)| <= U3|h(n)| for all n >= i`

Hence `f(x)`

= `O(h(x))`

I tried to see the professor in her office hours but she said my proofing was incorrect, but would't really say why. I've spent so long on this I don't even know what to do. Any help would be great...

Okay! Let me try this again!

`|f(n)| <= U1|g(n)| for all n >= k`

`|g(n)| <= U2|h(n)| for all n >= j`

let `i`

equal the largest of either `k ∨ j`

.

let `U3`

equal `U1 * U2`

`f(n) <= U3|h(n)| for all n >= i`

thus

`f(n) = O(h(n))`

Better?

`U3`

and`i`

supposed to be? Do they drop from the sky? – Daniel Fischer Jan 20 '13 at 17:14Transitivity. – Aziz Jan 20 '13 at 17:17