We can prove that set of all one argument functions cannot be countable using the cantor's diagonal. for example

```
1 2 3 4 5 6 7 ......
f1 10 12 23 1 3 12 3 ......
f2 15 6 7 8 9 11 4 ......
f3 14 2 4 3 3 4 5 ......
f4 12 2 3 5 1 20 56 .....
.
.
.
```

for all functions f1 to fn we can pass all the arguments and 1 to n for some n. then by taking the diagonal values and add 1 to diagonal values and we can prove that we can't count all the one argument functions.(since change the diagonal values will produce a row unique which haven't listed)

Wonder is there a particular method to count two argument functions also??..

Thanks..