Can we solve this
** T(n) = 2T( n/2 ) + n lg n** recurrence equation master theorem I am coming from a link where he is stating that we can't apply here master theorem because it doesn't satisfied any of the 3ree case condition. On the other hand he has taken a another example

**and find the closed solution**

`T(n) = 27T(n/3) + Θ(n^3 lg n)`

**For solving this he used 2nd case of master theorem**

`theta(n^3logn)`

**Here my confusion arises why not we can apply 2nd case here while it is completely fit in 2nd case.**

`If f(n) = Θ(nlogba (lg n)k ) then T(n) ∈ Θ(nlogba (lg n)k+1) for some k >= 0`

**My thought:**a = 2 , b =2; let k =1 then f(n) = theta(n^log_2 2 logn) for k= 1 so T(n) = theta(nlogn) But he as mentioned on this we can't apply master theorem I m confused why not.

Note: It is due to f(n) bcz in `T(n) = 2T( n/2 ) + n lg n`

`f(n) = nlog n`

and in ** T(n) = 27T(n/3) + Θ(n^3 lg n)** *

** Please Correct me if I am wrong here.*

`f(n) = theta(n^3log n)`