# Mathematical problem: loop or recursive

I´m trying to break a number into an array of numbers (in php) in the way that for example:

• 25 becomes (16, 8, 1)
• 8 becomes (8)
• 11 becomes (8, 2, 1)

I don´t know what the correct term is, but I think the idea is clear.

My solution with a loop is pretty straightforward:

``````   \$number = rand(0, 128);
\$number_array_loop = array();

\$temp_number = \$number;
while (\$temp_number > 0) {
\$found_number = pow(2, floor(log(\$temp_number, 2)));
\$temp_number -= \$found_number;

\$number_array_loop[] = \$found_number;
}
``````

I also have a recursive solution but I can´t get that to work without using a global variable (don´t want that), the following comes close but results in arrays in arrays:

``````   function get_numbers(\$rest_number) {

\$found_number = pow(2, floor(log(\$rest_number, 2)));

if (\$found_number > 0) {
\$temp_array[] = get_numbers(\$rest_number - \$found_number);
\$temp_array[] = \$found_number;
}

return \$temp_array;
}

\$number_array_recursive = array();
\$number_array_recursive = get_numbers(\$number);
``````

However, using something like pow(floor(log())) seems a bit much for a simple problem like this.

It seems to me that the problem calls for a recursive solution with some very simple maths, but I just don´t see it.

Any help would be apreciated.

Edit: Binary is the key, thanks a lot all!

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## 6 Answers

You can check each bit of the input number with the following (untested) function.

``````function checkBit(\$var, \$pos)
{
return (\$var & (1 << \$pos));
}
``````

It checks the bit at position \$pos in the variable \$var by using a bitwise AND function. I'll show you with 4-bit numbers for brevity.

• 1 = 0001
• 2 = 0010
• 4 = 0100
• 8 = 1000

If I want to check position 0 (the rightmost bit) of the number 3, I'd call the function like this:

``````\$number = 3;
checkBit(\$number, 0);
``````

Internally, checkBit is going to shift the constant 1 to the left 0 times because I passed in a 0. It's then going to bitwise AND (&) the result with the number I passed in, 3. Since 3 = 0011 and 1 = 0001 the result is true, since the 0th bit is set in both arguments to the bitwise AND operator.

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This works and is neater than my cludgy for loop contents –  Brendan Feb 17 '09 at 18:16
Thanks for testing it. It would have been a few more hours before I was able to. –  Bill the Lizard Feb 17 '09 at 18:24
Really nice, now I just have to check how and why it works exactly... –  jeroen Feb 17 '09 at 18:47
I tried clarifying how it works a little bit. Hope that helps. –  Bill the Lizard Feb 17 '09 at 19:02
Amazing, so simple, thanks a lot for your explanation. –  jeroen Feb 17 '09 at 20:19
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You could just get the binary representation of the number - a 1 means include that power of 2, a zero means don't

i.e.

``````
\$binary_number = decbin(\$test_number);
\$binary_string = "\${binary_number}";
for (\$i = 0; \$i < strlen(\$binary_string); \$i++) {
if (\$binary_string[strlen(\$binary_string) - \$i - 1] == "1") {
\$num_out = pow(2, \$i);
print "\${num_out} ";
}
}
``````

This is tested and work ok but there are probably better ways of doing syntactically in PHP.

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to add to this: us3.php.net/decbin and iterate the string. –  hometoast Feb 17 '09 at 17:45
heh, I was just writing that - will test it now –  Brendan Feb 17 '09 at 17:50
I knew it was supposed to be easy! Thanks a lot. –  jeroen Feb 17 '09 at 17:51
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It's been my experience that recursion has more overhead than looping, so I would suggest to stick with your looping solution.

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Thanks, that´s good to know for the future (it seems I can do without either here...) –  jeroen Feb 17 '09 at 18:06
Only in poor languages. :) –  ShreevatsaR Feb 18 '09 at 1:18
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If you just do a bit-wise and (like "num & 0x0001" for example), and check the value of that operation for zeroness, it should be trivial to trip thru the bits, like so: (I know this is in java, but I don't know php, and it's not really a php-specific problem anyway)

``````    int number=25;
for (int i = 0; i < 16; i++)
{
if ((number & 0x0001) != 0)
{
System.out.println("" + Math.pow(2, i));
}
number = number >> 1;
}
``````

Something like this should be trivial to do in any language.

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Another way to break an integer into powers of 2 would be to keep dividing by 2 and finding the remainder.

For example: 25/2 = 12 R 1, power = 2^0 = 1

12/2 = 6 R 0, power = 2^1 = 2

6/2 = 3 R 0, power = 2^2 = 4

3/2 = 1 R 1, power = 2^3 = 8

1/2 = 0 R 1, power = 2^4 = 16

So, here 25 = 1 + 8 + 16 because these are the only places where the remainder was 1.

``````function powers_of_2(\$n)
{
\$powers = array();
\$base = 1;
while (\$n > 0)
{
if (\$n % 2 == 1)
{
\$powers[] = \$base;
}
\$n = (int)\$n/2;
\$base *= 2;
}
return \$powers;
}
``````
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Thanks, that was the kind of mathematical solution I was initially looking for, but it turned out it can be done even simpler than that. –  jeroen Feb 18 '09 at 14:13
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Unless your numbers are very sparse (i.e. number_array will be small), it's probably quicker to work through all powers. Staying with base 2:

``````function get_powers_of_2(\$n) {

// \$max_pow = 31;       // faster if you know the range of \$n
\$max_pow = log(\$n, 2);  // safe
\$powers = array();

for(\$i = 0; i <= \$max_pow; \$i++) {
\$pow = 1 << \$i;
if(\$n & \$pow) \$powers[] = \$pow;
}
return \$powers;
}
``````
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