Let me illustrate not only a fast solution, but also how to derive it. Start with a fast way of listing all squares and work from there (pseudocode):

```
max = n*n
i = 1
d = 3
while i < max:
print i
i += d
d += 2
```

So, starting from 4 and listing only even squares:

```
max = n*n
i = 4
d = 5
while i < max:
print i
i += d
d += 2
i += d
d += 2
```

Now we can shorten that mess on the end of the while loop:

```
max = n*n
i = 4
d = 5
while i < max:
print i
i += 2 + 2*d
d += 4
```

Note that we are constantly using `2*d`

, so it's better to just keep calculating that:

```
max = n*n
i = 4
d = 10
while i < max:
print i
i += 2 + d
d += 8
```

Now note that we are constantly adding `2 + d`

, so we can do better by incorporating this into `d`

:

```
max = n*n
i = 4
d = 12
while i < max:
print i
i += d
d += 8
```

Blazing fast. It only takes two additions to calculate each square.

i)%2==0 if and only if i%2==0, since eveneven=even and oddodd=odd. therefore, you can remove the (ii)%2==0 from the if, and save the computition time of i*i. – LeeNeverGup Sep 9 '12 at 14:51