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!
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! 


Does this help
Maybe this



five goes into 2 zero times. 5*0 = 0 20 = 2. the answer is 2 


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


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. 


2 = 0 x 5 + 2 


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


The numerator in the remainder is your modulo answer, no matter what, whether the numerator is bigger or smaller than the denominator.
This may make more sense.



a % b = a if a << b 


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
Try it out for yourself. 

