# Trouble understanding little-o notation example

I'm having trouble with this one problem

``````9n <= cn^3
``````

basically I can get down to

``````9/c <= n^2
``````

But how do I solve the rest?

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@nabla, It's actually 9n <= o(n^3) – Frightlin Feb 7 '14 at 11:01
@Frghtlin Yes reading it again I understand. – Nabla Feb 7 '14 at 11:02

definition of `little o` is

we say `f(x)=o(g(x))`.

let f(x)=9*x and g(x)=c*x^3 where c is a positive constant. when x tends to infinity, f(x)/g(x) tends to 0.so we can say `f(x)=o(g(x))`.

asyptotic notations are applicable for sufficiently large value of n.so for large value of n

``````9n << cn^3
``````

for all c>0.

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see in case of your equation, when n=3 it becomes 9*3=23=3^3 so for n<3 9n > n^3. so if you choose c as any number to make 9n<=n^3 for n<3 then it can be in O(n).

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This is not what the OP tries to proof. – Nabla Feb 7 '14 at 11:03
do you mean that it can be in little o(n)? – Frightlin Feb 7 '14 at 11:04
@Frigthlin It is O(n), but not o(n). – Nabla Feb 7 '14 at 11:05
@nabla, ah, I'm looking for the little oh, not big oh :( – Frightlin Feb 7 '14 at 11:06

You just need to show that for every `c` there is a `n0` such that for all `n > n0`: `9n <= n^3`. By just solving this equation to `n` you get (assuming `n` positive):

``````n >= 3/sqrt(c)
``````

Now take `n0 = 3/sqrt(c)`, which exists and is positive for all `c > 0`, then for all `n > n_0` with the reverse calculation:

``````cn^3-9n = n*(cn^2-9)
= n*c*(n^2-9/c)
= n*c*(n-3/sqrt(c))*(n+3/sqrt(c))
= n*c*(n-n0)*(n+n0)
> 0
``````

(because `n>n0>0`, `c>0`, `n>n0` and `n>n0>-n0`)

and therefore

``````9n < cn^3
``````

which means that `9n in o(n^3)`.

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