# Why does 2 mod 4 = 2?

I'm embarrassed to ask such a simple question. My term does not start for two more weeks so I can't ask a professor, and the suspense would kill me.

2/4 = .5 so why does 2 mod 4 = 2?

Sorry if I'm missing something obvious.

Thanks!

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Because `2 = 0 * 4 + 2`. –  p4bl0 Aug 29 '09 at 17:19
I'm quite disgusted by the downvotes and close votes on this question. You show me any question that is more programming related and perfect for this site that this one! It's polite, clear, has examples!!! Why downvote!?! –  Robin Day Aug 29 '09 at 22:01
@RobinDay - Because some SO users are pretentious, arrogant, and disparaging. –  MatBailie Jan 7 '12 at 2:45
This question is funny unless the OP thought that "mod" is a division operator. I think OP should have googled "mod operator". And it is more funny that the question got 16 upvotes –  Abhay Jan 9 '12 at 17:49

Mod just means you take the remainder after performing the division. Since 4 goes into 2 zero times, you end up with a remainder of 2.

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Thanks! I just needed to hear it talked all the way through. –  NewToThis Aug 29 '09 at 17:28

Modulo (mod, %) is the Remainder operator.

``````2%2 = 0 (2/2 = 1 remainder 0)
1%2 = 1 (1/2 = 0 remainder 1)
4%2 = 0 (4/2 = 2 remainder 0)
5%2 = 1 (5/2 = 2 remainder 1)
``````
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And "verbose" explanation: 2 = 4·0 + 2 ;-) –  Michael Krelin - hacker Aug 29 '09 at 17:18

mod means the reaminder when divided by. So 2 divided by 4 is 0 with 2 remaining. Therefore 2 mod 4 is 2.

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Modulo is the remainder, not division.

``````2 / 4 = 0R2
2 % 4 = 2
``````

The sign `%` is often used for the modulo operator, in lieu of the word `mod`.

For `x % 4`, you get the following table (for 1-10)

`````` x x%4
------
1  1
2  2
3  3
4  0
5  1
6  2
7  3
8  0
9  1
10  2
``````
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Link + definition + example == +1 –  tvanfosson Aug 29 '09 at 17:25
That was easily my favorite downvote ever, whoever you are. –  Eric Aug 29 '09 at 18:35

2 / 4 = 0 with a remainder of 2

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For a visual way to think about it, picture a clock face that, in your particular example, only goes to 4 instead of 12. If you start at 4 on the clock (which is like starting at zero) and go around it clockwise for 2 "hours", you land on 2, just like going around it clockwise for 6 "hours" would also land you on 2 (6 mod 4 == 2 just like 2 mod 4 == 2).

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That's actually pretty confusing. –  Joe Philllips Aug 29 '09 at 17:40
@do3boy: the idea of the clock face is a very simple and easy method to describe exactly the fact of the modulo. except that it would have been easier to use 24h format for explaining it instead of modifying the number of available positions. –  Atmocreations Aug 29 '09 at 18:04

As all the above comments have mentioned is the fact that its the remainder.

i just wanted to put my 2 pence on where i use the "mod" keyword alot in xsl

To get a html table with rows that have alternative colours (Red, Blue, Red, Blue, Red etc...)

i use

``````<!-- if the rows position is a even number then give it a class of red -->

<xsl:if test="position() mod 2 = 0">
<xsl:attribute name="class">
red
</xsl:attribute>
</xsl:if>

.....

<tr>
<tr class="red">
<tr>
<tr class="red">
<tr>
<tr class="red">
``````
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When you divide 2 by 4, you get 0 with 2 left over or remaining. Modulo is just the remainder after dividing the number.

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Someone contacted me and asked me to explain in more details my answer in the comment of the question. So here is what I replied to that person in case it can help anyone else:

The modulo operation gives you the remainder of the euclidian disivion (which only works with integer, not real numbers). If you have A such that A = B * C + D, then the quotient of the euclidian division of A by B is C, and the remainder is D. If you divide 2 by 4, the quotient is 0 and the remainder is 2.

Suppose you have A objects (that you can't cut). And you want to distribute the same amount of those objects to B people. As long as you have more than B objects, you give each of then 1, and repeat. When you have less than B objects left you stop and keep the remaining objects. The number of time you have repeated the operation, let's call that number C, is the quotient. The number of objects you keep at the end, let's call it D, is the remainder.

If you have 2 objects and 4 people. You already have less than 4 objects. So each person get 0 objects, and you keep 2.

That's why 2 modulo 4 is 2.

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The modulo operator evaluates to the remainder of the division of the two integer operands. Here are a few examples:

``````23 % 10 evaluates to 3 (because 23/10 is 2 with a remainder of 3)
50 % 50 evaluates to 0 (50/50 is 1 with a remainder of 0)
9 % 100 evaluates to 9 (9/100 is 0 with a remainder of 9)
``````
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When we write a division equation such as `2/4` we are dividing 2 by 4.
When a modulo equation is wrote such as `2 % 4` we are dividing `2 by 4` (think 2 over 4) and returning the remainder.