# Calculating Total Number of Times of Loops

I'm trying to calculate the total number of times the innermost statement is executed.

``````count = 0;
for i = 1 to n
for j = 1 to n - i
count = count + 1
``````

I figured that the most the loop can execute is O(n*n-i) = O(n^2). I wanted to prove this by using double summation but I'm getting lost since the I'm having trouble starting the equation since j = 1 is thrown into there.

Can someone help me explain this to me?

Thanks

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For each `i`, the inner loop executes `n - i` times (`n` is constant). Therefore (since `i` ranges from `1` to `n`), to determine the total number of times the innermost statement is executed, we must evaluate the sum

```(n - 1) + (n - 2) + (n - 3) + ... + (n - n)
```

By rearranging the terms (grouping all the `n`s that appear first), we can see that this is equal to

```n*n - (1 + 2 + 3 + ... + n) = n*n - n(n+1)/2 = n*(n-1)/2 = n*n/2 - n/2
```

Here's a simple implementation in Python to verify this:

``````def f(n):
count = 0;
for i in range(1, n + 1):
for _ in range(1, n - i + 1):
count = count + 1
return count

for n in range(1,11):
print n, '\t', f(n), '\t', n*n/2 - n/2
``````

Output:

```1   0   0
2   1   1
3   3   3
4   6   6
5   10  10
6   15  15
7   21  21
8   28  28
9   36  36
10  45  45
```

The first column is `n`, the second is the number of times that inner statement is executed, and the third is `n*n/2 - n/2`.

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