Please help me to describe and solve that why
Θ(p^2 log p^2) = Θ(p^2 log p)
I really got stun on it.
Please help me to describe and solve that why Θ(p^2 log p^2) = Θ(p^2 log p) I really got stun on it. 


log (p^2) = 2 log p (as in general, log (n^m) = m log n) Since 2 is just a constant, we have that Θ(log p^2) = Θ(log p). Therefore, we get Θ(p^2 log p^2) = Θ(p^2 log p). 


If 


It is always good to start with definition! Wiki:
Limiting behavior is same for functions log_{b}x^{y} = y log_{b}x It means that they are different only by constant, which doesn't change limitting behavior. But it is importand to remember that their speed and amount of operations are still different (by constant). 


I presume because log(x^n) = nlog(x). And n is a constant, therefore not relevant in Big O. To put it another way, O(n) = O(2n) because they're both twice as bad when n doubles. 

