# simple question: How does a modulo operation work when the first number is smaller?

I'm messing with the modulo operation in python and I understand that it will spit back what the remainder is.

But what if the first number is smaller than the second?

for instance

2 % 5 the answer is 2.

How does that work?

2/5 = .4!

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You've asserted that "2/5 = .4", but that's wrong. Try typing "2/5" into the REPL. –  Chris Martin Jun 15 '13 at 1:28

Does this help

``````22  % 5 = 2
17  % 5 = 2
12  % 5 = 2
7   % 5 = 2
2   % 5 = 2
``````

Maybe this

``````22 / 5 = 4 + 2/5
17 / 5 = 3 + 2/5
12 / 5 = 2 + 2/5
7  / 5 = 1 + 2/5
2  / 5 = 0 + 2/5
``````
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five goes into 2 zero times.

5*0 = 0

2-0 = 2.

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2 divided by 5 (integer division) is 0 with a remainder of 2.

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for instance 2 % 5 the answer is 2. How does that work? 2/5 = .4!

Modulo inherently produces an integer result, whereas division can be an integer or floating point operation. Your observation that 2/5 equals 0.4 indicates you're thinking in terms of floating point. In that case, the .4 itself is the remainder, expressed differently. The integral portion of "0.4" is the "0" and the remainder portion is ".4". The remainder of an integer division operation is exactly the same thing as the fractional (or "decimal", in colloquial terms) portion of a floating point operation, just expressed differently.

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No, the .4 is the quotient, and there is no remainder, in real division. The rest of this doesn't make sense either, as it implies that the correct modulus value is 0.4 rounded or truncated to zero. –  EJP Jun 15 '13 at 1:06
@EJP - I'm sorry my answer didn't make sense to you. In "real" division, the dividend divided by the divisor results in the quotient. The quotient can be expressed in different ways: It can be expressed as single quantity (in various forms) or as an integer representing the integral number of times the dividend can be evenly divided by the divisor, and if there is any amount "left over" that can't be evenly divided by the divisor, that's the "remainder". The remainder is exactly that portion of the quotient that would fall to the right of the "decimal point", only expressed differently. –  phonetagger Jun 17 '13 at 0:40

You can think of it as 2 / 5 = 0 with a remainder of 2 of 5.

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2 = 0 x 5 + 2

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a % b = a if a << b

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I think you mean if `0 < a < b` ... if `a` is negative then you're in trouble. –  Matthew Scharley Oct 8 '09 at 4:54
nice catch I should have been more precise. –  RC. Oct 8 '09 at 18:09

It's really supper easy to figure out the results of modulo when the first number is smaller. The result is always equal the the first (smaller) number

``````3 % 5 = 3
5 % 10 = 5
78 % 112 = 78
``````

Try it out for yourself.

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