# Perl: understanding modulo operation on negative numbers (e.g. -10%3)

I'm learning Perl (5.14) and I'm a bit stuck on modulo with negative numbers. As an example, let's take a look at variations on 10%3.

To begin,

``````perl -le 'print -10%-3'
``````

yields `-1`, as expected.

But,

``````perl -le 'print -10%3'
``````

yields `2`.

And,

``````perl -le 'print 10%-3'
``````

yields `-2`.

I do not understand the last two results. I would expect only 1 or -1 as a result for any variation on 10%3. Why should 2, either positive or negative, be returned as a result?

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–  Ilmari Karonen Dec 19 '13 at 22:21

Perl usually uses arithmetic modulo operator that is machine-independent.

This is taken from the Perl Documentation: Multiplicative Operators

Binary `%` is the modulo operator, which computes the division remainder of its first argument with respect to its second argument.

Given integer operands `\$a` and `\$b`:

• If `\$b` is positive, then `\$a % \$b` is `\$a` minus the largest multiple of `\$b` less than or equal to `\$a`.
• If `\$b` is negative, then `\$a % \$b` is `\$a` minus the smallest multiple of `\$b` that is not less than `\$a` (that is, the result will be less than or equal to zero).
• If the operands `\$a` and `\$b` are floating point values and the absolute value of `\$b` (that is `abs(\$b)`) is less than `(UV_MAX + 1)`, only the integer portion of `\$a` and `\$b` will be used in the operation (Note: here `UV_MAX` means the maximum of the unsigned integer type).
• If the absolute value of the right operand (`abs(\$b)`) is greater than or equal to `(UV_MAX + 1)`, `%` computes the floating-point remainder `\$r` in the equation (`\$r = \$a - \$i*\$b`) where `\$i` is a certain integer that makes `\$r` have the same sign as the right operand `\$b` (not as the left operand `\$a` like C function `fmod()`) and the absolute value less than that of `\$b`.

Note that when `use integer` is in scope, `%` gives you direct access to the modulo operator as implemented by your C compiler. This operator is not as well defined for negative operands, but it will execute faster.

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That is an unintuitive definition to me, but it does explain the observed behaviour. I wonder if many other languages define modulo in the same way. –  John Dec 19 '13 at 21:54