# Circular buffer without modulo operation

In Wikipedia it states that a modulo operation is required to check the available space in a circular buffer. However in my implementation I simply do:

static size_t bytes_used(const ringbuffer* rb)
{
int d = rb->writer - rb->reader;

if (d >= 0) return d;

return rb->size - abs(d);
}

static size_t bytes_free(const ringbuffer* rb)
{
return rb->size - (bytes_used(rb) + 1);
}

Is there something I'm overlooking, or how come its not required in this case?

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You are not overlooking anything: the conditional subtraction at the end of bytes_used is a "poor man's modulo" operation. It works for numbers not exceeding 2x the divisor; the "real" modulo can be implemented by repeated subtraction.

An easier way to get the remaining size is as follows:

(rb->writer - rb->reader + rb->size) % rb->size

It uses the modulo operator, and avoids conditional execution.

P.S. Your implementation can be simplified, too: observe that on the last line d is negative, so abs(d) is the same as-d`. Therefore, you can write

return rb->size + d;
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Im trying to understand what your saying. Can you give me a number for which the above code wouldn't work, or how do you mean 'for numbers not exceeding 2x the divisor' exactly? –  Muis Jan 23 at 3:38
@Joshua Consider computing A mod D. If you know that A is strictly less than 2*D, you can compare A to D, and if it happens to be greater, subtract D once to get the result; when A < D, A equals A mod D without further computations. In your case you know for sure that the difference d is going to be in the range {-size+1 .. size-1}, so d + size is less than 2*size, making it possible to replace modulo with a conditional subtraction. –  dasblinkenlight Jan 23 at 3:44