# Talk:Quadrat special primes

## task clarification

I think the word **quadrat** needs to be defined in this context.

If it means integers raised to the 2^{nd} power, then:

- the prime
**2**+**1**^{2}**=****3**.

- the prime

Thus:

**3** would be the **2 ^{nd}**

*quadrat special prime*.

**7**would be the

**3**

^{rd}*quadrat special prime*,

**11**would be the

**4**

^{th}*quadrat special prime*,

**47**would be the

**5**

^{th}*quadrat special prime*, ··· -- Gerard Schildberger (talk) 17:25, 28 March 2021 (UTC)

## better choice of words?

Instead (or in addition to), how about using the phrase *smallest squares of positive integers*? -- Gerard Schildberger (talk) 18:53, 28 March 2021 (UTC)

Possibly also list *for example*: 1, 4, 9, 16, 25, 36, 49, 64, 81, ··· -- Gerard Schildberger (talk) 18:53, 28 March 2021 (UTC)

## Correction in Ring

I corrected code and output in Ring Programming Language as you suggested.--CalmoSoft (talk) 18:37, 28 March 2021 (UTC)