What do you think is the best way of writing this method for calculating an ackermann function value? This function incorporates several 'short cuts' to the simplest method of calculating the value that speeds the calculation up considerably by reducing the amount of recursive calls, but you end up with a long expression.

The versions use:

- The line continuation character \
- Bracketed nested functions
- A single outer set of braces

Does any version seem better to you? why? I'm curious.

```
>>> def ack4(M, N):
return (N + 1) if M == 0 else \
(N + 2) if M == 1 else \
(2*N + 3) if M == 2 else \
(8*(2**N - 1) + 5) if M == 3 else \
ack4(M-1, 1) if N == 0 else \
ack4(M-1, ack4(M, N-1))
>>> def ack2(M, N):
return (N + 1) if M == 0 else (
(N + 2) if M == 1 else (
(2*N + 3) if M == 2 else (
(8*(2**N - 1) + 5) if M == 3 else (
ack2(M-1, 1) if N == 0 else
ack2(M-1, ack2(M, N-1))))))
>>> def ack3(M, N):
return ((N + 1) if M == 0 else
(N + 2) if M == 1 else
(2*N + 3) if M == 2 else
(8*(2**N - 1) + 5) if M == 3 else
ack3(M-1, 1) if N == 0 else
ack3(M-1, ack3(M, N-1)))
>>> ack2(4, 2) == ack3(4, 2) == ack4(4, 2)
True
>>>
```