# Interview question: f(f(n)) == -n [closed]

A question I got on my last interview:

Design a function f, such that:

f(f(n)) == -n


Where n is a 32 bit signed integer; you can't use complex numbers arithmetic.

If you can't design such a function for the whole range of numbers, design it for the largest range possible.

Any ideas?

-
+1: Nothing wrong with this question, not sure why it was downvoted or has close votes. –  Juliet Apr 8 '09 at 21:13
Apparently there are people who think that maths is not programming related. –  Tamas Czinege Apr 8 '09 at 21:14
Or offensive? Does that button mean "I can't figure it out" now? –  1800 INFORMATION Apr 8 '09 at 21:14
public int f(int n) { throw new NotImplementException("You get the rest of the code when you give me a job."); } –  Juliet Apr 8 '09 at 21:21
What a terrible interview question. –  Daniel Daranas Apr 9 '09 at 9:40

## closed as unclear what you're asking by dystroy, BNL, woodchips, Richard JP Le Guen, JustinJun 26 '13 at 10:53

Please clarify your specific problem or add additional details to highlight exactly what you need. As it's currently written, it’s hard to tell exactly what you're asking. See the How to Ask page for help clarifying this question.If this question can be reworded to fit the rules in the help center, please edit the question.

Another Javascript solution utilizing short-circuits.

​function f(n) {return n.inv || {inv:-n}}

f(f(1)) => -1
f(f(-1)) => 1

-

Thought I'd try this one without looking at other people's answers first:

#include <stdio.h>
#include <limits.h>
#include <stdlib.h>

int f(int n) {
if(n > 0) {
if(n % 2)
return -(++n);
else {
return (--n);

}
}
else {
if(n % 2)
return -(--n);
else {
return (++n);

}
}
}

int main(int argc, char* argv[]) {
int n;
for(n = INT_MIN; n < INT_MAX; n++) {
int N = f(f(n));

if(N != -n) {
fprintf(stderr, "FAIL! %i != %i\n", N, -n);
}
}
n = INT_MAX;
int N = f(f(n));
if(N != -n) {
fprintf(stderr, "FAIL! n = %i\n", n);
}
return 0;
}


Output: [nothing]

-

A C function:

int f(int n) /* Treats numbers in the range 0XC0000000 to 0X3FFFFFFF as valid to
generate f(f(x)) equal to -x. If n is within this range, it will
project n outside the range. If n is outside the range, it will
return the opposite of the number whose image is n. */
{
return n ? n > 0 ? n <= 0X3FFFFFFF ? 0X3FFFFFFF + n : 0X3FFFFFFF - n :\
n >= 0XC0000000 ? 0XC0000000 + n : 0XC0000000 - n : 0;
}


-

Similar to the functions overload solution, in python:

def f(number):
if type(number) != type([]):
return [].append(number)
else:
return -1*number[0]


Alternative: static datamembers

-

Well, I am neither a math, nor a programming wizz, but isn't this pretty easy?

int f(int i) {
static bool b;
if (b) {
b = !b;
return i;
} else {
b = !b;
return -i;
}
}


Tested with big and small positive and negative values, INT_MIN, INT_MAX, it seems to work... Can be made thread safe if that is a concern, it wasn't a part of the assignment though.

Or maybe I am missing something?

-

def f(n):
m = -n if n % 2 == 0 else n
return m + sign(n)


General Case

A slight tweak to the above can handle the case where we want k self-calls to negate the input -- for example, if k = 3, this would mean g(g(g(n))) = -n:

def g(n):
if n % k: return n + sign(n)
return -n + (k - 1) * sign(n)


This works by leaving 0 in place and creating cycles of length 2 * k so that, within any cycle, n and -n are distance k apart. Specifically, each cycle looks like:

N * k + 1, N * k + 2, ... , N * k + (k - 1), - N * k - 1, ... , - N * k - (k - 1)


or, to make it easier to understand, here are example cycles with k = 3:

1, 2, 3, -1, -2, -3
4, 5, 6, -4, -5, -6


This set of cycles maximizes the ranges of inputs that will work within any machine type centered around zero, such as signed int32 or signed int64 types.

Analysis of compatible ranges

The map x -> f(x) in fact must form cycles of length 2 * k, where x = 0 is a special case 1-length cycle since -0 = 0. So the problem for general k is solvable if and only if the range of the input - 1 (to compensate for 0) is a multiple of 2 * k, and the positive and negative ranges are opposites.

For signed integer representations, we always have a smallest negative number with no positive counterpart in the range, so the problem becomes unsolveable on the complete range. For example, a signed char has range [-128, 127], so it's impossible for f(f(-128)) = 128 within the given range.

-

The problem as stated doesn't require that the function must ONLY accept 32 bit ints, only that n, as given, is a 32-bit int.

Ruby:

def f( n )
return 0 unless n != 0
( n == n.to_i ) ? 1.0 / n : -(n**-1).to_i
end

-

Seems easy enough.

<script type="text/javascript">
function f(n){
if (typeof n === "string") {
return parseInt(n, 10)
}
return (-n).toString(10);
}

</script>

-
It specifically states "where n is a signed 32 bit int", not a string –  joshcomley May 30 '09 at 15:32
show 1 more comment

Perhaps cheating? (python)

def f(n):
if isinstance(n, list):
return -n[0]
else:
return [n,0]
n = 4
print f(f(n))

--output--
-4

-

easy:

function f($n) { if ($n%2 == 0) return ($n+1)*-1; else return ($n-1);
}

-
show 1 more comment

Clojure solution:

(defmacro f [n]
(if (list? n) (- ~n) n))

Works on positive and negative integers of any size, doubles, and ratios too!

-

In C,

int
f(int n) {
static int r = 0;
if (r == 1) {r--; return -1 * n; };
r++;
return n;
}


It would have helped to know what language this was for. Am I missing something? Many "solutions" seem overly complex, and quite frankly, don't work (as I read the problem).

-
show 1 more comment

Here's a C implementation of rossfabricant's answer. Note that since I stick with 32-bit integers at all times, f( f( 2147483647 ) ) == 2147483647, not -2147483647.

int32_t f( int32_t n )
{
if( n == 0 ) return 0;
switch( n & 0x80000001 ) {
case 0x00000000:
return -1 * ( n - 1 );
case 0x00000001:
return n + 1;
case 0x80000000:
return -1 * ( n + 1 );
default:
return n - 1;
}
}


If you define the problem to allow f() to accept and return int64_t, then 2147483647 is covered. Of course, the literals used in the switch statement would have to be changed.

-
show 1 more comment

Here's a variant I haven't seen people use. Since this is ruby, the 32-bit integer stuff sort of goes out the window (checks for that can of course be added).

def f(n)
case n
when Integer
proc { n * -1 }
when Proc
n.call
else
raise "Invalid input #{n.class} #{n.inspect}"
end
end

(-10..10).each { |num|
puts "#{num}: #{f(f(num))}"
}

-

Easy, just make f return something that appears to equal any integer, and is convertable from an integer.

public class Agreeable
{
public static bool operator==(Agreeable c, int n)
{ return true; }

public static bool operator!=(Agreeable c, int n)
{ return false; }

public static implicit operator Agreeable(int n)
{ return new Agreeable(); }
}

class Program
{
public static Agreeable f(Agreeable c)
{ return c; }

static void Main(string[] args)
{
Debug.Assert(f(f(0)) == 0);
Debug.Assert(f(f(5)) == -5);
Debug.Assert(f(f(-5)) == 5);
Debug.Assert(f(f(int.MaxValue)) == -int.MaxValue);
}
}

-

Really, these questions are more about seeing the interviewer wrestle with the spec, and the design, error handling, boundary cases and the choice of suitable environment for the solution, etc, more than they are about the actual solution. However: :)

The function here is written around the closed 4 cycle idea. If the function f is only permitted to land only on signed 32bit integers, then the various solutions above will all work except for three of the input range numbers as others have pointed out. minint will never satisfy the functional equation, so we'll raise an exception if that is an input.

Here I am permitting my Python function to operate on and return either tuples or integers. The task spec admits this, it only specifies that two applications of the function should return an object equal to the original object if it is an int32. (I would be asking for more detail about the spec.)

This allows my orbits to be nice and symmetrical, and to cover all of the input integers (except minint). I originally envisaged the cycle to visit half integer values, but I didn't want to get tangled up with rounding errors. Hence the tuple representation. Which is a way of sneaking complex rotations in as tuples, without using the complex arithmetic machinery.

Note that no state needs to be preserved between invocations, but the caller does need to allow the return value to be either a tuple or an int.

def f(x) :
if isinstance(x, tuple) :
# return a number.
if x[0] != 0 :
raise ValueError  # make sure the tuple is well formed.
else :
return ( -x[1] )

elif isinstance(x, int ) :
if x == int(-2**31 ):
# This value won't satisfy the functional relation in
# signed 2s complement 32 bit integers.
raise ValueError
else :
# send this integer to a tuple (representing ix)
return( (0,x) )
else :
# not an int or a tuple
raise TypeError


So applying f to 37 twice gives -37, and vice versa:

>>> x = 37
>>> x = f(x)
>>> x
(0, 37)
>>> x = f(x)
>>> x
-37
>>> x = f(x)
>>> x
(0, -37)
>>> x = f(x)
>>> x
37


Applying f twice to zero gives zero:

>>> x=0
>>> x = f(x)
>>> x
(0, 0)
>>> x = f(x)
>>> x
0


And we handle the one case for which the problem has no solution (in int32):

>>> x = int( -2**31 )
>>> x = f(x)

Traceback (most recent call last):
File "<pyshell#110>", line 1, in <module>
x = f(x)
File "<pyshell#33>", line 13, in f
raise ValueError
ValueError


If you think the function breaks the "no complex arithmetic" rule by mimicking the 90 degree rotations of multiplying by i, we can change that by distorting the rotations. Here the tuples represent half integers, not complex numbers. If you trace the orbits on a number line, you will get nonintersecting loops that satisfy the given functional relation.

f2: n -> (2 abs(n) +1, 2 sign( n) ) if n is int32, and not minint.
f2: (x, y) -> sign(y) * (x-1) /2  (provided y is \pm 2 and x is not more than 2maxint+1


Exercise: implement this f2 by modifying f. And there are other solutions, e.g. have the intermediate landing points be rational numbers other than half integers. There's a fraction module that might prove useful. You'll need a sign function.

This exercise has really nailed for me the delights of a dynamically typed language. I can't see a solution like this in C.

-
const unsigned long Magic = 0x8000000;

unsigned long f(unsigned long n)
{
if(n > Magic )
{
return Magic - n;
}

return n + Magic;
}


0~2^31

-
show 1 more comment

This will work for the range -1073741823 to 1073741822:

int F(int n)
{
if(n < 0)
{
if(n > -1073741824)
n = -1073741824 + n;
else n = -(n + 1073741824);
}
else
{
if(n < 1073741823)
n = 1073741823 + n;
else n = -(n - 1073741823);
}
return n;
}


It works by taking the available range of a 32 bit signed int and dividing it in two. The first iteration of the function places n outside of that range by itself. The second iteration checks if it is outside this range - if so then it puts it back within the range but makes it negative.

It is effectively a way of keeping an extra "bit" of info about the value n.

-
show 1 more comment

C++ solution;

long long f(int n){return static_cast <long long> (n);}
int f(long long n){return -static_cast <int> (n);}

int n = 777;
assert(f(f(n)) == -n);

-

Another cheating solution. We use a language that allows operator overloading. Then we have f(x) return something that has overloaded == to always return true. This seems compatible with the problem description, but obviously goes against the spirit of the puzzle.

Ruby example:

class Cheat
def ==(n)
true
end
end

def f(n)
Cheat.new
end


Which gives us:

>> f(f(1)) == -1
=> true


but also (not too surprising)

>> f(f(1)) == "hello world"
=> true

-

JavaScript one-liner:

function f(n) { return ((f.f = !f.f) * 2 - 1) * n; }

-

Another way is to keep the state in one bit and flip it with care about binary representation in case of negative numbers... Limit is 2^29

int ffn(int n) {

    n = n ^ (1 << 30); //flip the bit
if (n>0)// if negative then there's a two's complement
{
if (n & (1<<30))
{
return n;
}
else
{
return -n;
}
}
else
{
if (n & (1<<30))
{
return -n;
}
else
{
return n;
}
}

}

-
number f( number n)
{
static count(0);
if(count > 0) return -n;
return n;
}

f(n) = n

f(f(n)) = f(n) = -n

-
I think you somewhere miss a count++ –  sth Aug 24 '09 at 10:14
show 1 more comment
int f(const int n)  {
static int last_n;

if (n == 0)
return 0;
else if (n == last_n)
return -n;
else
{
last_n = n;
return n;
}
}


Hackish, but correct.

-
show 1 more comment
int f(int n) {
return ((n>0)? -1 : 1) * abs(n);
}

-
surely this just returns f(n)=-n ? then f(f(n)) = n, not -n as the question asks –  Sanjay Manohar Sep 24 '09 at 23:42
show 1 more comment
int j = 0;

void int f(int n)
{
j++;

if(j==2)
{
j = 0;
return -n;
}

return n;
}


:D

-

Python 2.6:

f = lambda n: (n % 2 * n or -n) + (n > 0) - (n < 0)


I realize this adds nothing to the discussion, but I can't resist.

-

In Python

f=lambda n:n[0]if type(n)is list else[-n]

-

I believe this meets all the requirements. Nothing says that the parameters have to be 32 bit signed integers, only that the value 'n' you pass in is.

long long f(long long n)
{
int high_int = n >> 32;
int low_int  = n & 0xFFFFFFFF;

if (high_int == 0) {
return 0x100000000LL + low_int;
} else {
return -low_int;
}
}

-

string f(int i) {
return i.ToString();
}

int f(string s) {
return Int32.Parse(s) * -1;
}


Or

object f(object o) {
if (o.ToString.StartsWith("s"))
return Int32.Parse(s.Substring(1)) * -1;
return "s" + i.ToString();
}
`
-