I'm going to explain Perlin noise using working code, and without relying on other explanations. First you need a way to generate a pseudo-random float at a 2D point. Each point should look random relative to the others, but the trick is that the same coordinates should always produce the same float. We can use any hash function to do that - not just the one that Ken Perlin used in his code. Here's one:

```
static float noise2(int x, int y) {
int n = x + y * 57;
n = (n << 13) ^ n;
return (float) (1.0-((n*(n*n*15731+789221)+1376312589)&0x7fffffff)/1073741824.0);
}
```

I use this to generate a "landscape" `landscape[i][j] = noise2(i,j);`

(which I then convert to an image) and it always produces the same thing:

...

But that looks *too* random - like the hills and valleys are too densely packed. We need a way of "stretching" each random point over, say, 5 points. And for the values between those "key" points, you want a smooth gradient:

```
static float stretchedNoise2(float x_float, float y_float, float stretch) {
// stretch
x_float /= stretch;
y_float /= stretch;
// the whole part of the coordinates
int x = (int) Math.floor(x_float);
int y = (int) Math.floor(y_float);
// the decimal part - how far between the two points yours is
float fractional_X = x_float - x;
float fractional_Y = y_float - y;
// we need to grab the 4x4 nearest points to do cubic interpolation
double[] p = new double[4];
for (int j = 0; j < 4; j++) {
double[] p2 = new double[4];
for (int i = 0; i < 4; i++) {
p2[i] = noise2(x + i - 1, y + j - 1);
}
// interpolate each row
p[j] = cubicInterp(p2, fractional_X);
}
// and interpolate the results each row's interpolation
return (float) cubicInterp(p, fractional_Y);
}
public static double cubicInterp(double[] p, double x) {
return cubicInterp(p[0],p[1],p[2],p[3], x);
}
public static double cubicInterp(double v0, double v1, double v2, double v3, double x) {
double P = (v3 - v2) - (v0 - v1);
double Q = (v0 - v1) - P;
double R = v2 - v0;
double S = v1;
return P * x * x * x + Q * x * x + R * x + S;
}
```

If you don't understand the details, that's ok - I don't know how `Math.cos()`

is implemented, but I still know what it does. And this function gives us stretched, smooth noise.

`->`

The `stretchedNoise2`

function generates a "landscape" at a certain scale (big or small) - a landscape of random points with smooth slopes between them. Now we can generate a sequence of landscapes on top of each other:

```
public static double perlin2(float xx, float yy) {
double noise = 0;
noise += stretchedNoise2(xx, yy, 5) * 1; // sample 1
noise += stretchedNoise2(xx, yy, 13) * 2; // twice as influential
// you can keep repeating different variants of the above lines
// some interesting variants are included below.
return noise / (1+2); // make sure you sum the multipliers above
}
```

To put it more accurately, we get the weighed average of the points from each sample.

( + 2 * ) / 3 =

When you stack a bunch of smooth noise together, usually about 5 samples of increasing "stretch", you get Perlin noise. (If you understand the last sentence, you understand Perlin noise.)

There are other implementations that are faster because they do the same thing in different ways, but because it is no longer 1983 and because you are getting started with writing a landscape generator, you don't need to know about all the special tricks and terminology they use to understand Perlin noise or do fun things with it. For example:

1) 2) 3)

```
// 1
float smearX = interpolatedNoise2(xx, yy, 99) * 99;
float smearY = interpolatedNoise2(xx, yy, 99) * 99;
ret += interpolatedNoise2(xx + smearX, yy + smearY, 13)*1;
// 2
float smearX2 = interpolatedNoise2(xx, yy, 9) * 19;
float smearY2 = interpolatedNoise2(xx, yy, 9) * 19;
ret += interpolatedNoise2(xx + smearX2, yy + smearY2, 13)*1;
// 3
ret += Math.cos( interpolatedNoise2(xx , yy , 5)*4) *1;
```