# What is the time-complexity of the following code segment?

For the code segment below estimate the time-complexity in the big-oh notation.

``````for (int i=0; i< n; i++)

for (int j=0; j*j <n;j++)

for (int k=0; k < n/2;k++)
System.out.println (i+j+k);
``````

I think that they are nested loops but I am not 100% sure. From what I can figure, the worst time for the first loop is O(n), the second is O(sqrt(n)), and the third is O(log n). Is that correct? And would I just multiply these values to get the time complexity for the whole loop?

-
it's O(n) * O(n^(1/2)) * O(n) = O(n^(5/2)) –  Krypton Oct 2 at 5:27

To expand upon Krypton's comment, the loops are as follows:

• Loop 1: O(n), as you mentioned
• Loop 2: O(sqrt(n)) == O(n^(1/2)), as you mentioned.
• Loop 3: O(n/2), which, removing the constant factor, is O(n).

Multiplying, loops 1 and 3 together are O(n^2), and the three together are O(n^(5/2)) or O(n^(2.5)). This is in some odd grey area between quadratic and polynomial time.

-
``````for (int i=0; i< n; i++)  ------------------------------------
|
for (int j=0; j*j <n;j++) ----------------------         |
|         | O(n)
for (int k=0; k < n/2;k++)  -------        |         |
|O(n/2)  |O(n^1/2) |
System.out.println (i+j+k); ---        |         |
|         |
----------------------         |
|
------------------------------------
``````

Hence runtime

``````O(n)*O(n^1/2)*O(n/2) = O(n^(5/2))
``````
-

I think that O(n*(n^(1/2))*(n/2)). But I am not sure.

-
``````for (int i=0; i< n; i++) {               // O(n)
for (int j=0; j*j <n;j++) {          // O(n^0.5)
for (int k=0; k < n/2;k++) {     // O(0.5*n)
System.out.println (i+j+k);  // O(1)
}}}
``````

Same scope statements are added, nested statements are multiplied

`O((n)*(n^0.5)*(0.5*n)*(1))` = `O(0.5*(n^2)*(n^0.5))` = `O(0.5n^2.5)` = `O(n^2.5)`

-