I am running into an issue coming up with the post-condition and showing partial correctness of this piece of code.

```
{ m = A ≥ 0 }
x:=0; odd:=1; sum:=1;
while sum<=m do
x:=x+1; odd:=odd+2; sum:=sum+odd
end while
{ Postcondition }
```

I'm not looking for an answer, as this is an assignment for school, just insight and perhaps some pointing in the right direction. I have constructed the table of values, and cannot come up with the loop invariant.

```
x odd sum m (x + 1)^2 odd - x (odd - x)^2
0 1 1 30 1 1 1
1 3 4 30 4 2 4
2 5 9 30 9 3 9
3 7 16 30 16 4 16
4 9 25 30 25 5 25
5 11 36 30 36 6 36
sum = (odd - x)^2
```

I have that the outcome of the loop is the perfect square following m, but I'm not sure how to write that.

As always, all help is appreciated.

`sum = (odd - x)^2`

. I took that out though because I wasn't sure if that should instead be part of the loop invariant. I do need help proving it, but I don't want the answer outright. I think what I'm having the most trouble with is just finding the loop invariant. – Ross Verry Apr 20 '13 at 3:05`sum = (x+1)^2`

, but they're equivalent. The loop invariant is, I'd assume, the inductive step in the proof that the postcondition is true: in other words, given that`sum[n] = (x[n]+1)^2`

for some`n`

, the loop invariant is that`sum[n+1] = (x[n+1]+1)^2`

. – Kyle Strand Apr 20 '13 at 3:22