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I'm confused with the logic of 1% 2 will be 1. Because from what I know 1/2 is 0 so there is no remainder for this.

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closed as off-topic by Erika Sawajiri, Bhavin, Rubens, JoseK, Roman C Jun 26 '13 at 6:51

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Do you know what the modulus operator returns? –  squiguy Jun 26 '13 at 2:43
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3/2 is 1 remainder 1. 2/2 is 1 remainder 0. 1/2 is 0 remainder 1. 0/2 is 0 remainder 0. –  Patashu Jun 26 '13 at 2:44
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7 Answers 7

1/2 is 0 with a remainder of 1. The % operator returns that remainder.

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what is a lizard doing on this site –  jamylak Jun 26 '13 at 5:41
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@jamylak Making us all feel like noobs –  Haidro Jun 26 '13 at 5:44

% returns the remainder of a / b:

>>> 1 % 2
1
>>> 1/2
0
>>> 1 - 0
1

Also, the modulo expression can be expressed as:

r = a - nq

Where q is floor(a/n). So:

>>> import math
>>> 1 - 2 * math.floor(1/2)
1.0
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Ahh yeah~~ thanks for being patience explaining this stupid question ~ –  Erika Sawajiri Jun 26 '13 at 2:45
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@ErikaSawajiri Haha, we all have that moment :p –  Haidro Jun 26 '13 at 2:47

% is the modulo operator. It returns the remainder after dividing the left hand side by the right hand side. Since 2 divides zero times into 1, the remainder is one.

In general, if a and b are positive integers, and a < b, then a % b == a.

The arguments do not need to be integers, though. More detail is available from the python reference documentation (http://docs.python.org/2/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 [2].

The integer division and modulo operators are connected by the following identity: x == (x/y)*y + (x%y). Integer division and modulo are also connected with the built-in function divmod(): divmod(x, y) == (x/y, x%y). These identities don’t hold for floating point numbers; there similar identities hold approximately where x/y is replaced by floor(x/y) or floor(x/y) - 1 [3].

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"In general, if a and b are integers, and a < b, then a % b == a"... Not if a is negative. –  arshajii Jun 26 '13 at 2:49
    
Good catch. I corrected the comment on the general case to restrict it to positive integers--given the question's simple example, I wanted to provide something similar. –  James Jun 26 '13 at 2:57

Certainly there is a remainder. How many 2s can you get out of 1? 0 of them, with 1 left over.

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Ok, the answer has been posted like 6 times already, just adding this for completeness, If there's one way to understand modulo (%), it's converting from base 10 to base 2, 1 can't be divided by 2 so we leave it alone (get a remainder of 1). You can imagine the binary numbers in the third column to be the results of a modulo operation.

eg. 9 (base 10) to (base 2)..

2 | 9 | 1  
2 | 4 | 0  
2 | 2 | 0  
2 | 1 | 1 
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2*0 is 0 hence the remainder is 1

if the question is to find m%n

we find smallest or equal q such that n*(some whole number) = q and q<=m we then find (m-q) which is the remainder..

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What the % operator is doing:

a % b equals a value c such as 0 <= c < b and there exists a number k so that b * k + c = a.

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