Suppose I already defined `floor`

(from `R`

to `Z`

). Now I want to prove that `n <= x`

implies `n <= floor(x)`

, where `n : Z`

, `x : R`

.

I tried:

```
Lemma l: forall (n:Z) (x:R), (IZR n) <= x -> n <= (floor x).
```

but I'm getting the error `The term n has type Z while it is expected to have type R.`

How should I write this? Is there a way that I can use `<=`

for `Z`

and `R`

simultaneously?