So, the problem is to find all pairs of integers `(x, m)`

such that:

```
sqrt(x^2 - 4n) = m
```

We have:

```
x^2 - 4n = m^2
```

or

```
x^2 - mˆ2 = 4n
```

so

```
(x + m)(x - m) = 4n
```

Now, `2`

divides `4n`

and so it must divide `(x+m)`

or `(x-m)`

. But if it divides any of them it will divide the other too. Thus `a := (x+m)/2`

and `b := (x-m)/2`

are both integers. Therefore

```
a*b = n
```

So, it is just a matter of factoring `n`

as `a*b`

in all possible ways and recover `x`

and `m`

from the equations above:

```
x = a + b.
m = a - b.
```

Your solution `x = n+1`

corresponds to the trivial factorization `n = n*1`

where `a=n`

and `b=1`

.

**UPDATE**

Here is an algorithm that prints all pairs `(x, m)`

**[Initialize]** a := n.
**[Check]** if `n % a = 0`

then
`b := n / a`

.
`print(a + b), print(a - b)`

**[Decrement]** a := a - 1.
**[End?]** if `a * a > n`

go to Step 2.