Dismiss
Announcing Stack Overflow Documentation

We started with Q&A. Technical documentation is next, and we need your help.

Whether you're a beginner or an experienced developer, you can contribute.

# How do you multiply two fixed point numbers?

I am currently trying to figure out how to multiply two numbers in fixed point representation.

Say my number representation is as follows:

[SIGN][2^0].[2^-1][2^-2]..[2^-14]

In my case, the number 10.01000000000000 = -0.25.

How would I for example do 0.25x0.25 or -0.25x0.25 etc?

Hope you can help!

-
On a piece of paper or are you using a programming language of some form? If so you should add it to the tags. – PeterJ Dec 23 '12 at 3:19
a calculator seems appropriate ... – mcalex Dec 23 '12 at 3:21
Haha, I'm fairly new to the website so I dont know how to accept questions posted!? – fouadalnoor Dec 23 '12 at 16:33
You click the checkbox outline next to the up/down buttons next to your favorite answer. It will turn green, and you'll get 2 points when you do if you did not write the answer yourself. – Randall Cook Jan 30 '13 at 20:16
use array of unsigned integer types instead of separate bits representation and use build in arithmetics, take a look here stackoverflow.com/q/18465326/2521214 or search for bigint multiplication. Its way much faster than bit approach – Spektre Oct 14 '13 at 10:04

Multiply into a larger sized variable, and then right shift by the number of bits of fixed point precision.

-
You didn't even specify a programming language so I don't know what kind of example to give. – StilesCrisis Dec 23 '12 at 20:35

Here's a simple example in C:

``````int a =  0.25 * (1 << 16);
int b = -0.25 * (1 << 16);
int c = (a * b) >> 16;
printf("%.2f * %.2f = %.2f\n", a / 65536.0, b / 65536.0 , c / 65536.0);
``````

You basically multiply everything by a constant to bring the fractional parts up into the integer range, then multiply the two factors, then (optionally) divide by one of the constants to return the product to the standard range for use in future calculations. It's like multiplying prices expressed in fractional dollars by 100 and then working in cents (i.e. \$1.95 * 100 cents/dollar = 195 cents).

Be careful not to overflow the range of the variable you are multiplying into. Your constant might need to be smaller to avoid overflow, like using `1 << 8` instead of `1 << 16` in the example above.

-

You should use 2's complement representation instead of a seperate sign bit. It's much easier to do maths on that, and the range is improved because you don't need to waste double the code for -0 and 0. To multiply, just do as normal fixed-point unsigned multiplication.

2 bits can represent the value -2, -1, 0, 1. So using Q2.14 format, -0.25 would be represented by `11.11000000000000`. Using 1 sign bit you can only represent -1, 0, 1, and it makes calculations more complex.

-
well but if you have big-enough bit count (so you do not have big enough integer type variable at your disposal and need to write arithmetics your self) then separate sign is much better option. – Spektre Oct 14 '13 at 9:58
@Spektre: using a seperate sign would only increase complexity. Addition, subtraction, multiplication and division all would need the programmer to take care about sign. Whereas 2's complement they'll only need one straitforward version for both signed and unsigned numbers – Lưu Vĩnh Phúc Oct 15 '13 at 7:48
Try to do it on numbers (128*32)bit wide and then you will start to see the benefits. If you use already present data types arithmetics then you are correct. btw. few ifs in bignum +,- operations are not as much bad thing as the horriblnes of *,/,%,log,pow on 2's complement – Spektre Oct 15 '13 at 8:38
yeah maybe in large arbitrary precision types that format may be useful but the type in the question is only 16 bits – Lưu Vĩnh Phúc Apr 19 '14 at 9:27