# What is the result of % in Python?

What does the `%` in a calculation? I can't seem to work out what it does.

Does it work out a percent of the calculation for example: `4 % 2` is apparently equal to 0. How?

The % (modulo) operator yields the remainder from the division of the first argument by the second. The numeric arguments are first converted to a common type. A zero right argument raises the ZeroDivisionError exception. The arguments may be floating point numbers, e.g., 3.14%0.7 equals 0.34 (since 3.14 equals 4*0.7 + 0.34.) The modulo operator always yields a result with the same sign as its second operand (or zero); the absolute value of the result is strictly smaller than the absolute value of the second operand .

Example 1: `6%2` evaluates to `0` because there's no remainder if 6 is divided by 2 ( 3 times ).

Example 2: `7%2` evaluates to `1` because there's a remainder of `1` when 7 is divided by 2 ( 3 times ).

So to summarise that, it returns the remainder of a division operation, or `0` if there is no remainder. So `6%2` means find the remainder of 6 divided by 2.

• Why do all examples have a bigger number on the right? Can someone explain the outcome of 2%6 which yields 2? – wookie Mar 27 '15 at 6:23
• The first number is the numerator and the second is the denominator. In your example 2 divided by 6 is 0 remainder 2, therefore the result is 2. – David Apr 26 '15 at 22:01
• Please update your answer, there are more accurate answers below. In C / C++ % is for 'rem' whereas in Python % is for 'mod'. e.g. `- 21 % 4` is 3 in Python. – azam Aug 3 '16 at 13:05
• Well, the `recursive substraction` thing is basically the definition of division : `x/y` means `how much time can you fit y in x ?` or in other terms, `how much time can you subtract y to x without falling below 0`... – François M. Mar 15 '18 at 23:10
• @Mentalist It's the remainder of the division; try doing 7/2 in long division, you'll subtract 6 and be left with 1 which is the remainder and the answer to 7%2. – Aryaman Jun 1 '18 at 21:14

Somewhat off topic, the `%` is also used in string formatting operations like `%=` to substitute values into a string:

``````>>> x = 'abc_%(key)s_'
>>> x %= {'key':'value'}
>>> x
'abc_value_'
``````

Again, off topic, but it seems to be a little documented feature which took me awhile to track down, and I thought it was related to Pythons modulo calculation for which this SO page ranks highly.

• Thank you. This is a poorly documented and widely used feature and is what led me to this post. – Bede Constantinides Dec 29 '13 at 21:28
• We love this off-topic answer. – Hao Wang Jul 28 '14 at 11:50
• Is there logic to % also being used as string formatting reference or is it just an accident of history that that symbol was overloaded? Should this be its own question? – WAF Aug 19 '14 at 14:17
• Poorly documented? I don't think so: String Formatting Operations – KurzedMetal Oct 29 '15 at 17:26
• @KurzedMetal - `%=` does not appear at that page – P. Myer Nore Jul 27 '16 at 20:47

An expression like `x % y` evaluates to the remainder of `x ÷ y` - well, technically it is "modulus" instead of "reminder" so results may be different if you are comparing with other languages where `%` is the remainder operator. There are some subtle differences (if you are interested in the practical consequences see also "Why Python's Integer Division Floors" bellow).

Precedence is the same as operators `/` (division) and `*` (multiplication).

``````>>> 9 / 2
4
>>> 9 % 2
1
``````
• 9 divided by 2 is equal to 4.
• 4 times 2 is 8
• 9 minus 8 is 1 - the remainder.

Python gotcha: depending on the Python version you are using, `%` is also the (deprecated) string interpolation operator, so watch out if you are coming from a language with automatic type casting (like PHP or JS) where an expression like `'12' % 2 + 3` is legal: in Python it will result in `TypeError: not all arguments converted during string formatting` which probably will be pretty confusing for you.

[update for Python 3]

9/2 is 4.5 in python. You have to do integer division like so: 9//2 if you want python to tell you how many whole objects is left after division(4).

To be precise, integer division used to be the default in Python 2 (mind you, this answer is older than my boy who is already in school and at the time 2.x were mainstream):

``````\$ python2.7
Python 2.7.10 (default, Oct  6 2017, 22:29:07)
[GCC 4.2.1 Compatible Apple LLVM 9.0.0 (clang-900.0.31)] on darwin
>>> 9 / 2
4
>>> 9 // 2
4
>>> 9 % 2
1
``````

In modern Python `9 / 2` results `4.5` indeed:

``````\$ python3.6
Python 3.6.1 (default, Apr 27 2017, 00:15:59)
[GCC 4.2.1 Compatible Apple LLVM 8.1.0 (clang-802.0.42)] on darwin
>>> 9 / 2
4.5
>>> 9 // 2
4
>>> 9 % 2
1
``````

[update]

User dahiya_boy asked in the comment session:

Q. Can you please explain why `-11 % 5 = 4` - dahiya_boy

This is weird, right? If you try this in JavaScript:

``````> -11 % 5
-1
``````

This is because in JavaScript `%` is the "remainder" operator while in Python it is the "modulus" (clock math) operator.

You can get the explanation directly from GvR:

Edit - dahiya_boy

In Java and iOS `-11 % 5 = -1` whereas in python and ruby `-11 % 5 = 4`.

Well half of the reason is explained by the Paulo Scardine, and rest of the explanation is below here

In Java and iOS, `%` gives the remainder that means if you divide 11 % 5 gives `Quotient = 2 and remainder = 1` and -11 % 5 gives `Quotient = -2 and remainder = -1`.

Sample code in swift iOS. But when we talk about in python its gives clock modulus. And its work with below formula

`mod(a,n) = a - {n * Floor(a/n)}`

Thats means,

`mod(11,5) = 11 - {5 * Floor(11/5)} => 11 - {5 * 2}`

So, `mod(11,5) = 1`

And

`mod(-11,5) = -11 - 5 * Floor(11/5) => -11 - {5 * (-3)}`

So, `mod(-11,5) = 4`

Sample code in python 3.0. # Why Python's Integer Division Floors

I was asked (again) today to explain why integer division in Python returns the floor of the result instead of truncating towards zero like C.

For positive numbers, there's no surprise:

``````>>> 5//2
2
``````

But if one of the operands is negative, the result is floored, i.e., rounded away from zero (towards negative infinity):

``````>>> -5//2
-3
>>> 5//-2
-3
``````

This disturbs some people, but there is a good mathematical reason. The integer division operation (//) and its sibling, the modulo operation (%), go together and satisfy a nice mathematical relationship (all variables are integers):

``````a/b = q with remainder r
``````

such that

``````b*q + r = a and 0 <= r < b
``````

(assuming a and b are >= 0).

If you want the relationship to extend for negative a (keeping b positive), you have two choices: if you truncate q towards zero, r will become negative, so that the invariant changes to 0 <= abs(r) < otherwise, you can floor q towards negative infinity, and the invariant remains 0 <= r < b. [update: fixed this para]

In mathematical number theory, mathematicians always prefer the latter choice (see e.g. Wikipedia). For Python, I made the same choice because there are some interesting applications of the modulo operation where the sign of a is uninteresting. Consider taking a POSIX timestamp (seconds since the start of 1970) and turning it into the time of day. Since there are 24*3600 = 86400 seconds in a day, this calculation is simply t % 86400. But if we were to express times before 1970 using negative numbers, the "truncate towards zero" rule would give a meaningless result! Using the floor rule it all works out fine.

Other applications I've thought of are computations of pixel positions in computer graphics. I'm sure there are more.

For negative b, by the way, everything just flips, and the invariant becomes:

``````0 >= r > b.
``````

So why doesn't C do it this way? Probably the hardware didn't do this at the time C was designed. And the hardware probably didn't do it this way because in the oldest hardware, negative numbers were represented as "sign + magnitude" rather than the two's complement representation used these days (at least for integers). My first computer was a Control Data mainframe and it used one's complement for integers as well as floats. A pattern of 60 ones meant negative zero!

Tim Peters, who knows where all Python's floating point skeletons are buried, has expressed some worry about my desire to extend these rules to floating point modulo. He's probably right; the truncate-towards-negative-infinity rule can cause precision loss for x%1.0 when x is a very small negative number. But that's not enough for me to break integer modulo, and // is tightly coupled to that.

PS. Note that I am using // instead of / -- this is Python 3 syntax, and also allowed in Python 2 to emphasize that you know you are invoking integer division. The / operator in Python 2 is ambiguous, since it returns a different result for two integer operands than for an int and a float or two floats. But that's a totally separate story; see PEP 238.

Posted by Guido van Rossum at 9:49 AM

• Can you please explain using an example. Sorry. :( – orange Dec 13 '10 at 18:34
• 9/2 is 4.5 in python. You have to do integer division like so: 9//2 if you want python to tell you how many whole objects is left after division(4). – n00p Aug 24 '18 at 7:35
• Can you please explain why `-11%5 = 4` ?? – dahiya_boy Jul 17 at 9:03
• Also, `help(divmod)` documents the invariant `q, r = divmod(x y) <==> q*y + r == x`. – chepner Aug 22 at 18:04

The modulus is a mathematical operation, sometimes described as "clock arithmetic." I find that describing it as simply a remainder is misleading and confusing because it masks the real reason it is used so much in computer science. It really is used to wrap around cycles.

Think of a clock: Suppose you look at a clock in "military" time, where the range of times goes from 0:00 - 23.59. Now if you wanted something to happen every day at midnight, you would want the current time mod 24 to be zero:

if (hour % 24 == 0):

You can think of all hours in history wrapping around a circle of 24 hours over and over and the current hour of the day is that infinitely long number mod 24. It is a much more profound concept than just a remainder, it is a mathematical way to deal with cycles and it is very important in computer science. It is also used to wrap around arrays, allowing you to increase the index and use the modulus to wrap back to the beginning after you reach the end of the array.

• This is the correct answer, and it must've been marked as so. – Aiman Al-Eryani Jan 25 '16 at 6:46
• This is how it's implemented in Python: `a % b = a - b * floor(a/b)` – Aiman Al-Eryani Jan 27 '16 at 12:17

Python - Basic Operators
http://www.tutorialspoint.com/python/python_basic_operators.htm

Modulus - Divides left hand operand by right hand operand and returns remainder

a = 10 and b = 20

b % a = 0

In most languages % is used for modulus. Python is no exception.

• As far as I can see, Python is unusual in that it uses % for modulus; Fortran, C/C++, and Java use % to mean remainder. (See stackoverflow.com/questions/13683563/… , the differences are in how negative and fractional values are handled.) The languages that make a distinction (e.g. Ada, Haskell, and Scheme) use the words "rem" and "mod" (or "remainder" and "modulo") rather than %. – Jim Pivarski May 23 '14 at 5:49
• Update: I found this great table of modulo/remainder operations by language en.wikipedia.org/wiki/Modulo_operation . Python is unusual but not unique (for instance, TCL and Lua share Python's convention.) – Jim Pivarski May 23 '14 at 6:00

% Modulo operator can be also used for printing strings (Just like in C) as defined on Google https://developers.google.com/edu/python/strings.

``````      # % operator
text = "%d little pigs come out or I'll %s and %s and %s" % (3, 'huff', 'puff', 'blow down')
``````

This seems to bit off topic but It will certainly help someone.

Also, there is a useful built-in function called `divmod`:

divmod(a, b)

Take two (non complex) numbers as arguments and return a pair of numbers consisting of their quotient and remainder when using long division.

`x % y` calculates the remainder of the division `x` divided by `y` where the quotient is an integer. The remainder has the sign of `y`.

On Python 3 the calculation yields `6.75`; this is because the `/` does a true division, not integer division like (by default) on Python 2. On Python 2 `1 / 4` gives 0, as the result is rounded down.

The integer division can be done on Python 3 too, with `//` operator, thus to get the 7 as a result, you can execute:

``````3 + 2 + 1 - 5 + 4 % 2 - 1 // 4 + 6
``````

Also, you can get the Python style division on Python 2, by just adding the line

``````from __future__ import division
``````

as the first source code line in each source file.

• Remember kids `#` is for comments and `//` is an operator. – Mike Causer May 6 '16 at 8:16

Modulus operator, it is used for remainder division on integers, typically, but in Python can be used for floating point numbers.

http://docs.python.org/reference/expressions.html

The % (modulo) operator yields the remainder from the division of the first argument by the second. The numeric arguments are first converted to a common type. A zero right argument raises the ZeroDivisionError exception. The arguments may be floating point numbers, e.g., 3.14%0.7 equals 0.34 (since 3.14 equals 4*0.7 + 0.34.) The modulo operator always yields a result with the same sign as its second operand (or zero); the absolute value of the result is strictly smaller than the absolute value of the second operand .

It's a modulo operation, except when it's an old-fashioned C-style string formatting operator, not a modulo operation. See here for details. You'll see a lot of this in existing code.

Be aware that

``````(3+2+1-5) + (4%2) - (1/4) + 6
``````

even with the brackets results in 6.75 instead of 7 if calculated in Python 3.4.

And the '/' operator is not that easy to understand, too (python2.7): try...

``````- 1/4

1 - 1/4
``````

This is a bit off-topic here, but should be considered when evaluating the above expression :)

• How would this ever be 7? It simplifies to `(1)+(0)-(0.25)+(6)`. – J.Steve Jun 13 '16 at 13:41

It is, as in many C-like languages, the remainder or modulo operation. See the documentation for numeric types — int, float, long, complex.

Modulus - Divides left hand operand by right hand operand and returns remainder.

If it helps:

``````1:0> 2%6
=> 2
2:0> 8%6
=> 2
3:0> 2%6 == 8%6
=> true
``````

... and so on.

It was hard for me to readily find specific use cases for the use of % online ,e.g. why does doing fractional modulus division or negative modulus division result in the answer that it does. Hope this helps clarify questions like this:

Modulus Division In General:

Modulus division returns the remainder of a mathematical division operation. It is does it as follows:

Say we have a dividend of 5 and divisor of 2, the following division operation would be (equated to x):

``````dividend = 5
divisor = 2

x = 5/2
``````
1. The first step in the modulus calculation is to conduct integer division:

x_int = 5 // 2 ( integer division in python uses double slash)

x_int = 2

2. Next, the output of x_int is multiplied by the divisor:

x_mult = x_int * divisor x_mult = 4

3. Lastly, the dividend is subtracted from the x_mult

dividend - x_mult = 1

4. The modulus operation ,therefore, returns 1:

5 % 2 = 1

Application to apply the modulus to a fraction

``````Example: 2 % 5
``````

The calculation of the modulus when applied to a fraction is the same as above; however, it is important to note that the integer division will result in a value of zero when the divisor is larger than the dividend:

``````dividend = 2
divisor = 5
``````

The integer division results in 0 whereas the; therefore, when step 3 above is performed, the value of the dividend is carried through (subtracted from zero):

``````dividend - 0 = 2  —> 2 % 5 = 2
``````

Application to apply the modulus to a negative

Floor division occurs in which the value of the integer division is rounded down to the lowest integer value:

``````import math

x = -1.1
math.floor(-1.1) = -2

y = 1.1
math.floor = 1
``````

Therefore, when you do integer division you may get a different outcome than you expect!

Applying the steps above on the following dividend and divisor illustrates the modulus concept:

``````dividend: -5
divisor: 2
``````

Step 1: Apply integer division

``````x_int = -5 // 2  = -3
``````

Step 2: Multiply the result of the integer division by the divisor

``````x_mult = x_int * 2 = -6
``````

Step 3: Subtract the dividend from the multiplied variable, notice the double negative.

``````dividend - x_mult = -5 -(-6) = 1
``````

Therefore:

``````-5 % 2 = 1
``````

The % (modulo) operator yields the remainder from the division of the first argument by the second. The numeric arguments are first converted to a common type.

3 + 2 + 1 - 5 + 4 % 2 - 1 / 4 + 6 = 7

This is based on operator precedence.

`%` is modulo. `3 % 2 = 1`, `4 % 2 = 0`

`/` is (an integer in this case) division, so:

``````3 + 2 + 1 - 5 + 4 % 2 - 1 / 4 + 6
1 + 4%2 - 1/4 + 6
1 + 0 - 0 + 6
7
``````

It's a modulo operation http://en.wikipedia.org/wiki/Modulo_operation

http://docs.python.org/reference/expressions.html

So with order of operations, that works out to

(3+2+1-5) + (4%2) - (1/4) + 6

(1) + (0) - (0) + 6

7

The 1/4=0 because we're doing integer math here.

I have found that the easiest way to grasp the modulus operator (%) is through long division. It is the remainder and can be useful in determining a number to be even or odd:

``````4%2 = 0

2
2|4
-4
0

11%3 = 2

3
3|11
-9
2
``````
• gives the remainder of a division not much to take in – DeafaltCoder Aug 30 at 7:21