# Method to solve the stated recurrence? [closed]

Need help finding a method for solving the following:
Given `f(n)` to be `9f(n/3)+(n2)*(log3n)` for all `n > 1`.
And given `f(1)=1`.
Solve for `f(n)`
I tried the master theorem, but all the 3 cases did not fit here, my guess would be using the substitution method, but I am not sure how to apply it

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## closed as off topic by Saeed Amiri, amit, Adam Liss, Niklas B., rob mayoffMar 4 '12 at 19:15

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Is this homework? –  cha0site Mar 4 '12 at 12:46
All these questions about solving recurrences which are currently in play. Methinks someone in a class somewhere has suggested to classmates that SO is a good place to go for help with homework. Sometimes it is. –  High Performance Mark Mar 4 '12 at 12:49
Because number of this questions increased I suggest to vote close all of them. –  Saeed Amiri Mar 4 '12 at 13:05
You can think about your problem yourself and talk with your classmates and finally check your solution with Wolframalpha, your current problem is simply solvable with Master theorem. –  Saeed Amiri Mar 4 '12 at 13:12

Use the substitution `f(n) = n2g(n)`.
This gives us `g(n) = g(n/3) + log n`.
And so `g(n) = Θ(log2n)` and `f(n) = Θ(n2log2n)`