OK, our professor explained (kinda) this problem, but it still doesn't make much sense.

Question: Implement the function `knice(f,a,b,k)`

that will return 1 if for some integer `a <= x <= b`

and some integer `n <= k`

, n applications of `f`

on x will be x, (e.g. `f(f(f...(f(x)))) = x`

) and 0 if not.

What the professor provided was:

```
def knice(f,a,b,k):
f(f(f(...(f(x)))) = x
for i = a to b:
y = f(i)
if y = i break
for j = z to k:
y = f(y)
if y = i break
```

Personally, that example makes no sense to me, so looking to see if I can get clarification.

**OP EDIT 1/19/2012 3:03pm CST**

This is the final function that was figured out with the help of the GTA:

```
def f(x):
return 2*x-3
def knice(f,a,b,k):
x = a
while x <= b:
n = 1
y = f(x)
if y == x:
return 1
while n <= k:
y = f(y)
n=n+1
if y == x:
return 1
x=x+1
return 0
```

`for`

loop should probably be inside the first. Also, what is`z`

? Finally, there is no`return`

at all from this function. Is this example just a starting point or is it intended to be a working function? – Greg Hewgill Jan 18 '12 at 22:46`z`

should be a`2`

though. – Platinum Azure Jan 18 '12 at 22:59