Suppose I have a recursive function T
, and I want to calculate the upper bound timer complexity of this function.
T(1) = 3
T(n) = 3T(n/3) + 3.
How can I find the upper bound of the time complexity of T(n)?
Suppose I have a recursive function T(1) = 3 T(n) = 3T(n/3) + 3. How can I find the upper bound of the time complexity of T(n)? 


Use the master theorem case where a=3, b=3, c=0. I highly recommend the MIT lectures on Algorithms. You can learn more about the Master theorem in lecture 2 


assume that, n = 3^k F(0) = 3 F(k) = 3 * F(k1) + 3
T(n = 3^k) = F(k) = (9 * n  3) / 2 = O(n) 

