| A double-square number is an integer <b>X</b> which can be expressed as the | |
| sum of two perfect squares. For example, 10 is a double-square because 10 = | |
| 3<sup>2</sup> + 1<sup>2</sup>. Your task in this problem is, given <b>X</b>, | |
| determine the number of ways in which it can be written as the sum of two | |
| squares. For example, 10 can only be written as 3<sup>2</sup> + 1<sup>2</sup> | |
| (we don't count 1<sup>2</sup> + 3<sup>2</sup> as being different). On the | |
| other hand, 25 can be written as 5<sup>2</sup> + 0<sup>2</sup> or as | |
| 4<sup>2</sup> + 3<sup>2</sup>.<br/><br/> | |
| <h3>Input</h3> | |
| You should first read an integer <b>N</b>, the number of test cases. The next | |
| <b>N</b> lines will contain <b>N</b> values of <b>X</b>. | |
| <h3>Constraints</h3> | |
| 0 ≤ <b>X</b> ≤ 2147483647<br> | |
| 1 ≤ <b>N</b> ≤ 100 | |
| <h3>Output</h3> | |
| For each value of <b>X</b>, you should output the number of ways to write | |
| <b>X</b> as the sum of two squares. | |