# Lambda reductions prove S K = K I

Hello I am having trouble proving these combinators S K = K I

The steps with the brackets [] are just telling you the step i am doing. For example [λxy.x / x] in λyz.x z(y z) means I am about to substitute (λxy.x) for every x in the expression λyz.x z(y z)

what I have tried so far is reducing S K and I got this:

``````S K
(λxyz.x z(y z)) (λxy.x)
[λxy.x / x] in λyz.x z(y z)
(λyz. (λxy.x) z(y z))
[z/x] in λy.x
(λyz. (λy.z) (y z))
[y/y] in λy.z
(λyz. z z)
``````

and then reducing K I and I got this:

``````K I
(λxy.x) (λx.x)
[λx.x / x] in λy.x
λy. λx.x
``````

though the two answers do not seem to be equal to me (λyz. z z) and λy. λx.x can someone please explain to me what I did wrong? Thank you.

-
`(λy.z) (y z)` reduces to just `z`, not `z z`, so `(λyz. (λy.z) (y z))` is `λyz. z`, which is the same as `λy. λx. x`.
In `(λy. z) (y z)`, the `(λy. z)` lambda is applied to the whole of `(y z)` (because it has parentheses around it), so it becomes `z[(y z)/y]`, but as there is no `y` in `z`, it remains just `z`. –  jwodder Apr 3 '13 at 4:11