# Math - mapping numbers

How do I map numbers, linearly, between a and b to go between c and d.

That is, I want numbers between 2 and 6 to map to numbers between 10 and 20... but I need the generalized case.

My brain is fried.

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Two-point form. en.wikipedia.org/wiki/Linear_equation#Two-point_form – kennytm Mar 6 '10 at 18:53

If your number X falls between A and B, and you would like Y to fall between C and D, you can apply the following linear transform:

Y = (X-A)/(B-A) * (D-C) + C

That should give you what you want, although your question is a little ambiguous, since you could also map the interval in the reverse direction. Just watch out for division by zero and you should be OK.

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Thanks. Exactly what I was looking for. – Sam Dec 5 '08 at 21:59
Then maybe mark this answer as “accepted” by clicking on the tick mark next to it. – Konrad Rudolph Dec 6 '08 at 21:18
Thanks Peter, you're fantastic! – Adi Aug 9 '12 at 13:36
For clarity, I like new_value = (old_value - old_bottom) / (old_top - old_bottom) * (new_top - new_bottom) + new_bottom; – ftrotter Jun 2 '14 at 4:25

Divide to get the ratio between the sizes of the two ranges, then subtract the starting value of your inital range, multiply by the ratio and add the starting value of your second range. In other words,

``````R = (20 - 10) / (6 - 2)
y = (x - 2) * R + 10
``````

This evenly spreads the numbers from the first range in the second range.

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This doesn't work. My range is 1000000000 to 9999999999 and the numbers could be from 1 to 999999999. – Dejell Feb 19 '13 at 9:39
@Odelya Of course it works. It’s a simple enough mathematical transformation. You just need to use a big enough number type (bignum or similar). Your numbers are simply too big for 32 bit integers – but 64 bit integers for instance will work. – Konrad Rudolph Feb 19 '13 at 11:40
They are of type double. double R = (20 - 10) / (6 - 2); double y = (X - 2) * R + 10; – Dejell Feb 19 '13 at 11:43
@Odelya Same problem though. You should read up on floating-point precision. In fact, this is required reading: What Every Computer Scientist Should Know About Floating-Point Arithmetic – if you need a floating-point type with such big numbers you might have to use an arbitrary-precision number type. – Konrad Rudolph Feb 19 '13 at 11:52
Can you recommend of a java type that I can do it? – Dejell Feb 20 '13 at 10:02

As an aside, this is the same problem as the classic convert celcius to farenheit where you want to map a number range that equates 0 - 100 (C) to 32 - 212 (F).

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``````int srcMin = 2, srcMax = 6;
int tgtMin = 10, tgtMax = 20;

int nb = srcMax - srcMin;
int range = tgtMax - tgtMin;
float rate = (float) range / (float) nb;

println(srcMin + " > " + tgtMin);
float stepF = tgtMin;
for (int i = 1; i < nb; i++)
{
stepF += rate;
println((srcMin + i) + " > " + (int) (stepF + 0.5) + " (" + stepF + ")");
}
println(srcMax + " > " + tgtMax);
``````

With checks on divide by zero, of course.

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Each unit interval on the first range takes up (d-c)/(b-a) "space" on the second range.

Pseudo:

``````var interval = (d-c)/(b-a)
for n = 0 to (b - a)
print c + n*interval
``````

How you handle the rounding is up to you.

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In addition to @PeterAllenWebb answer, if you would like to reverse back the result use the following:

``````reverseX = (B-A)*(Y-C)/(D-C) + A
``````
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