I have this method:

```
public static int what(String str, char start, char end)
{
int count=0;
for(int i=0;i<str.length(); i++) {
if(str.charAt(i) == start)
{
for(int j=i+1;j<str.length(); j++)
{
if(str.charAt(j) == end)
count++;
}
}
}
return count;
}
```

What I need to find is:

1) What is it doing? Answer: counting the total number of *end* occurrences after **EACH** (or is it? Not specified in the assignment, point 3 depends on this) *start*.

2) What is its complexity? Answer: the first loops iterates over the string completely, so it's at least *O(n)*, the second loop executes only if *start* char is found and even then partially (index at which *start* was found + 1). Although, big O is all about worst case no? So in the worst case, *start* is the 1st char & the inner iteration iterates over the string n-1 times, the -1 is a constant so it's *n*. But, the inner loop won't be executed every outer iteration pass, statistically, but since big O is about worst case, **is it correct to say the complexity of it is O(n^2)**? Ignoring any constants and the fact that in 99.99% of times the inner loop won't execute every outer loop pass.

3) Rewrite it so that complexity is lower.

What I'm not sure of is whether ** start occurs at most once** or more, if once at most, then method can be rewritten using one loop (having a flag indicating whether

*start*has been encountered and from there on incrementing

*count*at each

*end*occurrence), yielding a complexity of

**O(n)**.

In case though, that *start* can appear multiple times, which **most likely it is**, because assignment is of a Java course and I don't think they would make such ambiguity.

Solving, in this case, is not possible using one loop... **WAIT**! Yes it is..!

Just have a variable, say, *inc* to be incremented each time *start* is encountered & used to increment *count* each time *end* is encountered after the 1st *start* was found:

```
inc = 0, count = 0
if (current char == start) inc++
if (inc > 0 && current char == end) count += inc
```

This would also yield a complexity of **O(n)**? Because there is only 1 loop.

Yes I realize I wrote a lot hehe, but what I also realized is that I understand a lot better by forming my thoughts into words...