I found the provided solutions really complicated, and honestly couldn't understand any of them, so i thought out a simpler solution myself (I'm sure it's already known, but here goes my thinking process):

So you're making a factorial function

```
x => x < 2 ? x : x * (???)
```

the (???) is where the function is supposed to call itself, but since you can't name it, the obvious solution is to *pass it as an argument to itself*

```
f => x => x < 2 ? x : x * f(x-1)
```

This won't work though. because when we call `f(x-1)`

we're calling this function itself, and we just defined it's arguments as 1) `f`

: the function itself, again and 2) `x`

the value. Well we do have the function itself, `f`

remember? so just pass it first:

```
f => x => x < 2 ? x : x * f(f)(x-1)
^ the new bit
```

And that's it. We just made a function that takes itself as the first argument, producing the Factorial function! Just literally pass it to itself:

```
(f => x => x < 2 ? x : x * f(f)(x-1))(f => x => x < 2 ? x : x * f(f)(x-1))(5)
>120
```

Instead of writing it twice, you can make another function that passes it's argument to itself:

```
y => y(y)
```

and pass your factorial making function to it:

```
(y => y(y))(f => x => x < 2 ? x : x * f(f)(x-1))(5)
>120
```

Boom. Here's a little formula:

```
(y => y(y))(f => x => endCondition(x) ? default(x) : operation(x)(f(f)(nextStep(x))))
```

For a basic function that adds numbers from 0 to `x`

, `endCondition`

is when you need to stop recurring, so `x => x == 0`

. `default`

is the last value you give once `endCondition`

is met, so `x => x`

. `operation`

is simply the operation you're doing on every recursion, like multiplying in Factorial or adding in Fibonacci: `x1 => x2 => x1 + x2`

. and lastly `nextStep`

is the next value to pass to the function, which is usually the current value minus one: `x => x - 1`

. Apply:

```
(y => y(y))(f => x => x == 0 ? x : x + f(f)(x - 1))(5)
>15
```

can'tbe re-assigned. Seems perfectly robust, and indeed, is now widely used. – Dtipson Feb 9 '16 at 1:35