# Map Range of Numbers to 0 through 100

I have a possibility of numbers between +/- 6 including 0 (ie. 6,5,4,3,2,1,0,-1,-2,-3,-4,-5,-6) that come out of a ranking algorithm I have in PHP.

Instead of returning +/- 6, I would like to return a number between 0 to 100. The correlation would be similar to:

100 = +6
..
75 = +3
..
50 = 0
..
25 = -3
..
0 = -6

Considering the output range of the ranking algorithm, how would I programmatically achieve this in PHP? I've considered the following but am unsure as to the best approach:

``````function score_alg(\$x) {
if (\$x == '6')
return 100;
if (\$x == '3')
return 75;
if (\$x == '0')
return 50;
if (\$x == '-3')
return 25;
if (\$x == '-6')
return 0;
}
``````
-
Add 6, multiply by 100, and divide by 12? –  Peter de Rivaz Jul 19 '13 at 18:58
Do people forget high school algebra when they're programming? –  Barmar Jul 19 '13 at 19:00
or use `array('6'=> '100', '3' => '75', ..)` then return `\$array[\$x]` if there is no linear equation –  user1646111 Jul 19 '13 at 19:01

This would work:

``````function score_alg(\$x) {
return round((\$x+6)*(100/12));
}
``````
-
Thanks! Works perfectly. –  George Ortiz Jul 19 '13 at 19:16

One more variation:

``````// Converts a range of numbers to a percentage scale
// \$n       number to convert
// \$lRange  lowest number of the range  [-6 default]
// \$hRange  highest number in the range [6 default]
// \$scale   percentage scale            [100 default]
function toPct(\$n, \$lRange = -6, \$hRange = 6, \$scale = 100){
// reversed high and low
if (\$lRange > \$hRange){
\$lRange = \$lRange + \$hRange;
\$hRange = \$lRange - \$hRange;
\$lRange = \$lRange - \$hRange;
}

// input validation
if (\$n < \$lRange || \$n > \$hRange) {
trigger_error('\$n does not fall within the supplied range', E_USER_ERROR);
return FALSE;
}

// edge cases
if (\$n == \$lRange) return 0;
if (\$n == \$hRange) return \$scale;

// everything in between
\$range = \$hRange - \$lRange;
if (\$lRange < 0){
\$n += \$lRange;
}
return (\$n + \$range) * (\$scale / \$range);
}
``````

Demonstration:

``````\$lRange = -6; \$hRange = 6;
for (\$i = \$lRange; \$i <= \$hRange; \$i++){
echo \$i . ' = ' . toPct(\$i, \$lRange, \$hRange) . PHP_EOL;
}
``````

Output:

``````-6 = 0
-5 = 8.3333333333333
-4 = 16.666666666667
-3 = 25
-2 = 33.333333333333
-1 = 41.666666666667
0  = 50
1  = 58.333333333333
2  = 66.666666666667
3  = 75
4  = 83.333333333333
5  = 91.666666666667
6  = 100
``````
-
A bit overkill, but this would be helpful for other people with similar problems –  StephenTG Jul 19 '13 at 19:20
@StephenTG: Agreed, overkill. However, it is flexible and I try to keep the answers as "generic" as possible (for future googlers) while also solving the OPs problem at-hand. –  Brad Christie Jul 19 '13 at 19:23
That's an admirable philosophy –  StephenTG Jul 19 '13 at 19:24
+1 This is the kind of answer I like to read on SO. –  Luc M Jul 19 '13 at 19:26

You'd do something like this:

``````function score_alg(\$x) {
\$val = (\$x + 6)*(100/12);
return round(\$val);
}
``````

Output:

``````echo score_alg(6); //100
echo score_alg(3); //75
echo score_alg(0); //50
echo score_alg(-3); //25
echo score_alg(-6); //0
``````
-
I think you mean `(100/12)` –  Willem Ellis Jul 19 '13 at 19:02
@WillemEllis: shouldn't it be 13? including the 0? –  Amal Murali Jul 19 '13 at 19:02
No, your range is from -6 to 6, which equals 12 –  Willem Ellis Jul 19 '13 at 19:03
(0 + 6)*(100/13) != 50 –  StephenTG Jul 19 '13 at 19:04
And `(6 + 6) * (100 / 13) != 100` –  Brad Christie Jul 19 '13 at 19:05

You can "stretch" out the ranges:

``````function score_alg(\$x) {
return round((\$x + 6) * (100 / 12));
}
``````
-

You could do:

``````function score_alg(\$x) {
return round((\$x + 6)*(100/12));
}
``````
-
This is the original and correct answer –  Willem Ellis Jul 19 '13 at 19:02
I upvoted it. I made the comment because someone downvoted –  Willem Ellis Jul 19 '13 at 19:03
@WillemEllis Guessed as much. So why the downvotes, mystery people? –  StephenTG Jul 19 '13 at 19:03
I didn't downvote, but -- without rounding, the answer would always be a float, therefore Tim's answer was the first correct answer. –  Jacob S Jul 19 '13 at 19:05
Will rectify, then –  StephenTG Jul 19 '13 at 19:06