A brute force method should be good enough.

```
for each point to generate "n"
find a random angle
get the x and y from the angle * a random radius up to max radius
for each point already generated "p"
calculate the distance between "n" and "p"
if "n" satisfies the min distance
add new point "n"
```

In PHP, generating a new point is easy

```
$angle = deg2rad(mt_rand(0, 359));
$pointRadius = mt_rand(0, $radius);
$point = array(
'x' => sin($angle) * $pointRadius,
'y' => cos($angle) * $pointRadius
);
```

Then calculating the distance between two points

```
$distance = sqrt(pow($n['x'] - $p['x'], 2) + pow($n['y'] - $p['y'], 2));
```

** **Edit** **

For the sake of clarifying what others have said, and after doing some further research (I'm not a mathematician, but the comments *did* make me wonder), here the most simple definition of a gaussian distribution :

If you were in 1 dimension, then $pointRadius = $x * mt_rand(0,
$radius); would be OK since there is no distinction between
$radius and $x when $x has a gaussian distribution.

In 2 or more dimensions, however, if the coordinates ($x,$y,...) have
gaussian distributions then the radius $radius does not have a
gaussian distribution.

In fact the distribution of $radius^2 in 2 dimensions [or k
dimensions] is what is called the "chi-squared distribution with 2 [or
k] degrees of freedom", provided the ($x,$y,...) are independent and
have zero means and equal variances.

Therefore, to have a normal distribution, you'd have to change the line of the generated radius to

```
$pointRadius = sqrt(mt_rand(0, $radius*$radius));
```

as others have suggested.