Design a function f such that:
f(f(x)) == 1/x
Where x is a 32 bit float
Or how about
Given a function f, find a function g such that
f(x) == g(g(x))
Or how about
See Also 


For the first part: this one is more trivial than f(f(x)) = x, IMO:
The second part is an interesting question and an obvious generalization of the original question that this question was based on. There are two basic approaches:



Well, here's the C quick hack:
However, this breaks down if you do:
In general, if f is a bijection f : D → D, what you need is a function σ that partitions the domain D into A and B such that:
Then, you can define g thusly:
This works b/c
You can see from Miles answer that, if we ignore 0, then the operation σ(x) = x works for f(x) = 1/x. You can check 16 (for D = nonzero reals), with A being the positive numbers, and B being the negative numbers yourself. With the double precision standard, there's a The same method can be applied to the f(x) = 1 problem  the accepted solution there partitions the space by the remainder mod 2, using σ(x) = (x  1), handling the zero case specially. 


I like the javascript/lambda suggestion from the earlier thread:



The other solutions hint at needing extra state. Here's a more mathematical justification of that:
(where ^ denotes exponent, and i is the imaginary constant sqrt(1) )
So a solution exists for complex numbers. I don't know if there is a general solution sticking strictly to Real numbers. 


Again, it's specified as a 32bit number. Make the return have more bits, use them to carry your state information between calls.
for any function g and any 32bit datatype 32bit. 


There is another way to solve this and it uses the concept of fractional linear transformations. These are functions that send x>(ax+b)/(cx+d) where a,b,c,d are real numbers. For example you can prove using some algebra that if f is defined by f(x)=(ax+1)(x+d) where a^2=d^2=1 and a+d<>0 then f(f(x))=1/x for all real x. Choosing a=1,d=1, this give a solution to the problem in C++:
The proof is f(f(x))=f((x+1)/(x+1))=((x+1)/(x+1)+1)/((x+1)/(x+1)+1) = (2/(1x))/(2x/(1x))=1/x on cancelling (1x). This doesn't work for x=1 or x=0 unless we allow an "infinite" value to be defined that satisfies 1/inf = 0, 1/0 = inf. 


a C++ solution for
here is one a bit shorter version (i like this one better :) )



If 


Based on this answer, a solution to the generalized version (as a Perl oneliner):
Should always flip the variable's sign (a.k.a. state) twice, and should always call This solution works as long as
Note: This is tested, and does not work. It always returns a reference to a scalar (and it's always the same reference). I've tried a few things, but this code shows the general idea, and though my implementation is wrong and the approach may even be flawed, it's a step in the right direction. With a few tricks, you could even use a string:



try this


