Say you have an algorithm that completes in a polynomial number of steps for the input of size `n`

, like, for example, `P(n)=2n^2+4n+3`

. The asymptotic tight bound for this algorithm `Θ(n^2)`

.

Is it true to say that the Big-Theta notation for any algorithm is `n`

to the power of the degree of the polynomial `P(n)`

, or are there any cases where that is not true?