There are three values of type `Bool`

: `True`

, `False`

and bottom (expressions for which the evaluation doesn't finish or expressions for which the evaluation turns into errors).

Then, there are an exponential number of functions from `A`

to `B`

. More exactly `|B| ^ |A|`

.

Thus, there are `3^3 = 27`

functions of type `Bool -> Bool`

.

Now, for the second part of the question: function starting from bottom can be only 2: the one constantly returning `True`

and the one constantly returning `False`

. Then you have to add the number of functions from `{True, False}`

to `{True, False, bottom}`

which is `3^2`

. So, in total you'll have `9+2=11`

functions.

**Edit**: Here are the 11 possible functions:

`B`

is bottom, `T`

is `True`

, `F`

is `False`

. The last row represents the `const True`

and the `const False`

functions while the first three rows represent functions testing the value of the argument. That is why the first three rows map `B`

to `B`

: testing the value of bottom cannot result in anything else but bottom.

I hope it is clearer now.

`Bool->Bool`

values"? Do you mean functions with the type signature`Bool -> Bool`

? – mhwombat Sep 10 '13 at 10:47