I am new to the concept of Big Theta ( Θ )run-time complexity,
I have the following recurrence relations to analyze,
T(n) = 2T(n/3) + 5n2 and I got Θ(2)
T(n) = T(n/4) + n4 and I got Θ(n4)
Please verify my answers.
Your answers are correct. You can solve these kind of problems by applying Master Theorem.
The Link is to Master Theorem,
If T(n) = a T(n/b) + f(n) where a >= 1 and b > 1
We need to consider case 3 of Master Theorem,
Case 3: if f(n) = Θ(nc) where c > logba
Then T(n) = Θ(nc)
T(n) = 2T(n/3) + 5n2
a = 2, b = 3 and f(n) = 5 n2
There for, f(n) = Θ(nc), where c = 2.
Now c > logba since 2 > log32.
Thus T(n) = Θ(n2) as mentioned by you.
T(n) = T(n/4) + n4
a = 1, b = 4 and f(n) = n4
There for, f(n) = Θ(nc), where c = 4.
Now c > logba since 4 > log41.
Thus T(n) = Θ(n4) as mentioned by you.
These are both correct. Because the second term of each recurrence equation is of a much higher order than the first, it will dominate the first term (in layman's terms).