**Modular Arithmetic**

Prepared by:

*
*Joseph Malkevitch

Department of Mathematics and Computing

York College (CUNY)

Jamaica, New York 11451-0001

email: joeyc@cunyvm.cuny.edu

web page: www.york.cuny.edu/~malk

Perhaps the most astonishing thing about some of the most important ideas mankind has developed and that have proved so important in the development of new discoveries is how simple the ideas actually are.

A case in point is collection of ideas pioneered by the German mathematician Karl Fredrich Gauss. The name Gauss within mathematics commands the same level of respect that Shakespeare's name does in the world of literature. His myriad contributions to all corners of mathematics have molded the shape of mathematics well over a hundred years after he did his work.

The idea here is the development of a notation for and approach to the divisibility of integers.

Following Gauss we will use the congruence symbol: for a simple arithmetic idea.

We will write a b mod m (where m is a positive integer which is at least 2) to mean that b - a is exactly divisible by m with remainder zero. (Alternatively we can say that a and b leave the same remainder when divided by m.)

By way of example let us fix m to be 5 for the moment. When one divides by 5 one can only have the remainders 0, 1, 2, 3, or 4. Thus any integer will will be congruent to one of these number mod (modulo) m.

We would write such congruences as:

81 1 mod 5

17 2 mod 5

19 4 mod 5

23 3 mod 5

To check that say the very last of these is correct we need to verify that 23-3 is diviible by 5 with remainder 0. This is certainly true since 5x4 is 20.

Notice that every integer is congruent to one of the numbers 0, 1, 2, 3, or 4 modulo 5.

What symbol does the congruence symbol remind you? Almost certainly the equal sign. Does similarity to the equal sign have anything to do with why Gauss used this notation? Yes, the congruence symbol shares many of the properties of the equal sign.

Thus, (remember we are mixiing the modulus m in the discussion below):

we have a = b implies b = a and also a b implies b a.

a = b and b = c implies a =c and also a b and b c implies a c.

a = b and c = d implies a + c = b + d and also a b and c d implies a + c b + c.

More examples:

31 1 mod 6

83 17 mod 2