# Wrongly asked or am I stupid?

There's a blog post comment on codinghorror.com by Paul Jungwirth which includes a little programming task:

You have the numbers 123456789, in that order. Between each number, you must insert either nothing, a plus sign, or a multiplication sign, so that the resulting expression equals 2001. Write a program that prints all solutions. (There are two.)

Bored, I thought, I'd have a go, but I'll be damned if I can get a result for 2001. I think the code below is sound and I reckon that there are zero solutions that result in 2001. According to my code, there are two solutions for 2002. Am I right or am I wrong?

``````/**
* Take the numbers 123456789 and form expressions by inserting one of ''
* (empty string), '+' or '*' between each number.
* Find (2) solutions such that the expression evaluates to the number 2001
*/

\$input = array(1,2,3,4,5,6,7,8,9);

// an array of strings representing 8 digit, base 3 numbers
\$ops = array();
\$numOps = sizeof(\$input)-1; // always 8

// generate the ops array
\$limit = pow(3, \$numOps) -1;
for (\$i = 0; \$i <= \$limit; \$i++) {
\$s = (string) \$i;
\$s = base_convert(\$s, 10, 3);
\$ops[] = substr(\$mask, 0, \$numOps - strlen(\$s)) . \$s;
}

// for each element in the ops array, generate an expression by inserting
// '', '*' or '+' between the numbers in \$input.  e.g. element 11111111 will
// result in 1+2+3+4+5+6+7+8+9
\$limit = sizeof(\$ops);
\$stringResult = null;
\$numericResult = null;
for (\$i = 0; \$i < \$limit; \$i++) {
\$l = \$numOps;
\$stringResult = '';
\$numericResult = 0;
for (\$j = 0; \$j <= \$l; \$j++) {
\$stringResult .= (string) \$input[\$j];
switch (substr(\$ops[\$i], \$j, 1)) {
case '0':
break;
case '1':
\$stringResult .= '+';
break;
case '2':
\$stringResult .= '*';
break;
default :
}
}

// evaluate the expression

// split the expression into smaller ones to be added together
\$temp = explode('+', \$stringResult);
foreach (\$temp as \$subExpressions)
{
// split each of those into ones to be multiplied together
\$multplicationElems = explode('*', \$subExpressions);
\$working = 1;
foreach (\$multplicationElems as \$operand) {
\$working *= \$operand;
}
}
\$numericResult = 0;
{
\$numericResult += \$operand;
}

if (\$numericResult == 2001) {
echo "{\$stringResult}\n";
}
}
``````

Further down the same page you linked to.... =)

"Paul Jungwirth wrote:

You have the numbers 123456789, in that order. Between each number, you must insert either nothing, a plus sign, or a multiplication sign, so that the resulting expression equals 2001. Write a program that prints all solutions. (There are two.)

I think you meant 2002, not 2001. :)

(Just correcting for anyone else like me who obsessively tries to solve little "practice" problems like this one, and then hit Google when their result doesn't match the stated answer. ;) Damn, some of those Perl examples are ugly.)"

• And Jungwirth confirms he meant 2002 a few comments down from that. – Brock Batsell Mar 4 '10 at 23:22

The number is 2002.

Recursive solution takes eleven lines of JavaScript (excluding string expression evaluation, which is a standard JavaScript function, however it would probably take another ten or so lines of code to roll your own for this specific scenario):

``````function combine (digit,exp) {
if (digit > 9) {