Interview question: f(f(n)) == -n

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

In PHP

``````function f(\$n) {
if(is_int(\$n)) {
return (string)\$n;
}
else {
return (int)\$n * (-1);
}
}``````

I'm sure you can understand the spirit of this method for other languages. I explicitly casted back to int to make it more clear for people who don't use weakly typed languages. You'd have to overload the function for some languages.

The neat thing about this solution is it works whether you start with a string or an integer, and doesn't visibly change anything when returning f(n).

In my opinion, the interviewer is asking, "does this candidate know how to flag data to be operated on later," and, "does this candidate know how to flag data while least altering it?" You can do this with doubles, strings, or any other data type you feel like casting.

-

That's easy!

Every number is mapped to another in cycles of 4, where the needed condition holds.

Example:

The rules are:

• 0 → 0

• ±2³¹ → ±2³¹

• odd → even, even → -odd:

forall k, 0 < k < 2³⁰: (2k-1) → (2k) → (-2k+1) → (-2k) → (2k-1)

The only not matching values are ±(2³¹-1), because there are only two. There have to be two that cannot match, because there are only a multiple of four of numbers in a two's-complement system where 0 and ±2³¹ are already reserved.

In a one's complement system, there exist +0 and -0. There we go:

forall k, 0 < k < 2³⁰: (+2k) → (+2k+1) → (-2k) → (-2k-1) → (+2k)

-

I have another solution that works half of the time:

``````def f(x):
if random.randrange(0, 2):
return -x
return x
``````
-

Easy Python solution made possible by the fact that there were no restrictions on what f(x) was supposed to output, only f(f(x)):

``````def f(x):
return (isinstance(x, tuple) and -x[0]) or (x,)
``````
-
`(x)` returns `x`. I think you mean `(x,)` –  seppo0010 Jun 25 '13 at 16:47
``````int f( int n ){
return n==0?0:(n&1?n:-n)+(n<0?-1:1);
}
``````
-
n&1 is used like a bool but yields an int –  Dinah Aug 26 '09 at 16:06
@Dinah assuming this is C or C++, that is just fine –  Kip Aug 27 '09 at 2:49

``````int nasty(int input)
{
return input + INT_MAX/2;
}
``````
-

Although the question said n had to be a 32 bit int, it did not say the parameter or return type had to be a 32 bit int. This should compile in java--in c you could get rid of the != 0

``````private final long MAGIC_BIT=1<<38;
long f(long n) {
return n & MAGIC_BIT != 0 ? -(n & !MAGIC_BIT) : n | MAGIC_BIT;
}
``````

edit:

This actually makes for a really good interview question. The best ones are ones difficult or impossible to answer because it forces people to think it through and you can watch and look for:

• Do they just give up?
• Do they say it's stupid?
• Do they try unique approaches?
• Do they communicate with you while they are working on the problem?
• Do they ask for further refinements of the requirements?

etc.

Never just answer behavioral questions unless you have a VERY GOOD answer. Always be pleasant and try to involve the questioner. Don't get frustrated and don't give up early! If you really aren't getting anywhere, try something totally illegal that could work, you'll get nearly full credit.

-

This is also a solution (but we are bending the rules a little bit):

``````def f(n):
if isinstance(n,int):
return str(n)
else:
return -int(n)
``````
-

I think the answer to these kind of questions are best explained visually by using diagrams. When we disregard zero, then we can partition the integers in small sets of 4 numbers:

`````` 1  → 2    3  → 4    5  → 6
↑    ↓    ↑    ↓    ↑    ↓   ...
-2 ← -1   -4 ← -3   -6 ← -5
``````

This is pretty easy to translate to code. Note that even numbers change sign, and the odd numbers are increased or decreased by 1. In C# it would look like this:

``````public static int f(int x)
{
if(x == 0)
return 0;

if(x > 0)
return (x % 2 == 0) ? -x+1 : x+1;

// we know x is negative at this point
return (x % 2 == 0) ? -x-1 : x-1;
}
``````

Of course you can shorten this method by using clever tricks, but I think this code explains itself best.

Then about the range. The 32-bit integers range from -2^31 upto 2^31-1. The numbers 2^31-1, -2^31-1 and -2^31 fall outside of the range of f(x) because the number 2^31 is missing.

-
1. Convert n to Sign-and-magnitude representation;
2. Add 1/4 of a range;
3. Convert back.
``````
#define STYPE int
STYPE sign_bit = (unsigned STYPE) 1 << ( sizeof ( STYPE ) * 8  - 1 );
STYPE f ( STYPE f )
{
unsigned STYPE smf = f > 0 ? f : -f | sign_bit;
smf += sign_bit >> 1;
return smf & sign_bit ? -( smf & ~sign_bit ) : smf;
}
``````
-

Mine gives the right answer...50% of the time, all the time.

``````int f (int num) {
if (rand () / (double) RAND_MAX > 0.5)
return ~num + 1;
return num;
}
``````
-
Actually, you're wrong. ~7=-8, ergo ~7+1=-7. –  Dan Jun 7 '11 at 2:52
``````f(n) { return -1 * abs(n) }
``````

How can I handle overflow problems with this? Or am I missing the point?

-
Given the requirements of the question, that's probably an adequate response. It doesn't say that f(n) has to return a different value. The question is a puzzle, so you look for the exploits (loopholes) that would make a feasible solution. –  JasonTrue Apr 8 '09 at 22:14
In your case, f(f(-1)) = f(1) = -1. Therefore f(f(n)) = n, for n<0. –  Steven Aug 25 '09 at 19:07
Works for nearly 50% of the inputs. Is reproducable and threadsafe. :) There are inferior solutions which got more upvotes. :) –  user unknown May 30 '11 at 4:21

Great question!

This took me about 35 secs to think about and write:

``````int f(int n){
static int originalN=0;
if (n!=0)
originalN=n;
return n-originalN;
}
``````
-

Lua:

``````function f(n)
if type(n) == "number" then
return (-number) .. ""
else
return number + 0
end
end
``````
-

A bizarre and only slightly-clever solution in Scala using implicit conversions:

``````sealed trait IntWrapper {
val n: Int
}

case class First(n: Int) extends IntWrapper
case class Second(n: Int) extends IntWrapper
case class Last(n: Int) extends IntWrapper

implicit def int2wrapper(n: Int) = First(n)
implicit def wrapper2int(w: IntWrapper) = w.n

def f(n: IntWrapper) = n match {
case First(x) => Second(x)
case Second(x) => Last(-x)
}
``````

I don't think that's quite the right idea though.

-

Golfing it in coffeescript:

``````f = (n)-> -n[0] or [n]
``````
-

Using the information given in the question, you can

1. Convert from 2-complement to sign bit representation
2. If the last bit is set, flip the sign bit and the last bit; otherwise, flip just the last bit
3. Convert back to 2-complement.

So you basically go odd -> even -> odd or even -> odd -> even, and change the sign only for even numbers. The only number this does not work for is -2^31

Code:

``````function f(x) {
var neg = x < 0;
x = Math.abs(x) ^ 1;
if (x & 1) {
neg = !neg;
}
return neg ? -x : x;
}
``````
-

Here's a short Python answer:

``````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.

-

Doesn't fail on MIN_INT:

``````int f(n) { return n < 0 ? -abs(n + 1) : -(abs(n) + 1); }
``````
-

This will work in a very broad range of numbers:

``````    static int f(int n)
{
int lastBit = int.MaxValue;
lastBit++;
int secondLastBit = lastBit >> 1;
int tuple = lastBit | secondLastBit;
if ((n & tuple) == tuple)
return n + lastBit;
if ((n & tuple) == 0)
return n + lastBit;
return -(n + lastBit);
}
``````

My initial approach was to use the last bit as a check bit to know where we'd be in the first or the second call. Basically, I'd place this bit to 1 after the first call to signal the second call the first had already passed. But, this approach was defeated by negative numbers whose last bit already arrives at 1 during the first call.

The same theory applies to the second last bit for most negative numbers. But, what usually happens is that most of the times, the last and second last bits are the same. Either they are both 1 for negative numbers or they are both 0 for positive numbers.

So my final approach is to check whether they are either both 1 or both 0, meaning that for most cases this is the first call. If the last bit is different from the second last bit, then I assume we are at the second call, and simply re-invert the last bit. Obviously this doesn't work for very big numbers that use those two last bits. But, once again, it works for a very wide range of numbers.

-

``````int f(int n)
{
static int t = 1;
return (t = t ? 0 : 1) ? -n : n;
}
``````

just tried it, and

``````f(f(1000))
``````

returns -1000

``````f(f(-1000))
``````

returns 1000

is that correct or am i missing the point?

-
This is not thread-safe and won't work when called multiple times. –  Tarnay Kálmán Sep 26 '09 at 2:03

This one's in Python. Works for all negative values of n:

``````f = abs
``````
-

One way to create many solutions is to notice that if we have a partition of the integers into two sets S and R s.t -S=S, -R=R, and a function g s.t g(R) = S

then we can create f as follows:

if x is in R then f(x) = g(x)

if x is in S then f(x) = -invg(x)

where invg(g(x))=x so invg is the inverse function for g.

The first solution mentioned above is the partition R=even numbers, R= odd numbers, g(x)=x+1.

We could take any two infinite sets T,P s.t T+U= the set of integers and take S=T+(-T), R=U+(-U).

Then -S=S and -R=R by their definitions and we can take g to be any 1-1 correspondence from S to R, which must exist since both sets are infinite and countable, will work.

So this will give us many solutions however not all of course could be programmed as they would not be finitely defined.

An example of one that can be is:

R= numbers divisible by 3 and S= numbers not divisible by 3.

Then we take g(6r) = 3r+1, g(6r+3) = 3r+2.

-

``````int f (int n)
{
static bool pass = false;
pass = !pass;
return pass? n : -n;
}
``````
-
Not thread safe :P –  Jem Jun 11 '09 at 16:09
``````void f(int x)
{
Console.WriteLine(string.Format("f(f({0})) == -{0}",x));
}
``````

Sorry guys... it was too tempting ;)

-

Some were similar but just thought I would write down my first idea (in C++)

``````#include <vector>

vector<int>* f(int n)
{
returnVector = new vector<int>();
returnVector->push_back(n);
return returnVector;
}

int f(vector<int>* n) { return -(n->at(0)); }
``````

Just using overloading to cause f(f(n)) to actually call two different functions

-

``````do
local function makeFunc()
local var
return function(x)
if x == true then
return -var
else
var = x
return true
end
end

end
f = makeFunc()
end
print(f(f(20000)))
``````
-
``````f(n) { return IsWholeNumber(n)? 1/n : -1/n }
``````
-

C++

``````struct Value
{
int value;
Value(int v) : value(v) {}
operator int () { return -value; }
};

Value f(Value input)
{
return input;
}
``````
-
```int f(int n)
{
static int x = 0;
result = -x;
x = n;
return result;
}
```

This is a one entry FIFO with negation. Of course it doesn't work for the max negative number.

-

protected by NullPoiиteяJun 10 '13 at 5:16

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