The idea behind calculating time complexity is how many time your loop/function is executing each step inside of it ?

for example: `for`

loop

```
for ( int i=0; i < n; i++ ) {
cout << "hello" << endl;
}
```

the code in curly braces will print `n`

times `hello`

so the time complexity of this for loop will be `O(n)`

```
for ( int i=0; i < n; i++ ) {
cout << "hello" << endl;
}
for ( int i=0; i < n; i++ ) {
cout << "hello" << endl;
}
```

this will print `hello`

2 time more than the previous as it have two for loop. time complexity is O(2n). We ignore the constants while computing time complexity so the time complexity will be `O(n)`

```
for ( int i=0; i < n; i++ ) {
for ( int j=0; j < n; j++ ) {
cout << "hello" << endl;
}
}
```

this will print `hello`

`n^2`

time, why ? because for each outer `for loop (i)`

you execute inner `for loop(j)`

`O(n)`

time. so `O(n^2)`

will be time complexity

read further http://www.geeksforgeeks.org/analysis-of-algorithms-set-4-analysis-of-loops/

`n = 5`

units. What do you expect the total running time to be, 10 units (`2*n`

) or 25 units (`n^2`

)?`O( n * worst_runtime_of_both{......})`