Republic of Mathematics blog

How do I prove that 5 divides x^5 – x? The joys of modular arithmetic

Posted by: Gary Ernest Davis on: February 11, 2010

In: Uncategorized
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“How do I prove that 5 divides $x^5 - x$ ??”

In this question, the variable “ $x$ ” should be thought of as restricted to integer values – in fact positive integer values – since divisibility for fractions or real numbers in general is trivial.

So another way to ask the question is: if $x$ Â is a positive integer, how do we see that $x^5-x$ is always a multiple of 5?

First thought is to factor an $x$ Â in Â $x^5-x$ to get $x(x^4-1)$ .

The reason this is suggestive is because 5 is a prime number , so if 5 divides Â $x(x^4-1)$ then either 5 divides $x$ Â or 5 divides $x^4-1$ .

So now the question becomes, if 5 does not divide $x$ , why does 5 divide $x^4-1$ ?

We can think of this in terms of arithmetic modulo 5, where we only keep remainders after division by 5.

In the language of modular arithmetic, the question is:

if $x\neq 0 (mod 5)$ Â is $x^4-1= 0 (mod 5)$ ?

$x\neq 0 (mod 5)$ means $x$ gives a remainder of 1, 2, 3 or 4 after division by 5 , so there are 4 cases to consider.

How about the other way around:

if $x^4-1\neq 0 (mod 5)$ is $x =0 (mod 5)$ ?

$x^4-1\neq 0 (mod 5)$ means $x^4 \neq 1 (mod 5)$

What are the $4^{th}$ powers of integers modulo 5?

x	x^4	x^4 (mod 5)
0	0	0
1	1	1
2	16	1
3	81	1
4	256	1

So this little table tells us that the only time $x^4 \neq 1 (mod 5)$

is when $x$ Â is itself a multiple of 5.

This simple little argument shows the power of working with remainders after whole number division – which is just modular arithmetic.

Fermat’s little theorem

Piere de Fermat stated, and Euler and others proved, a useful little gem of number theory, known as Fermat’s little theorem.

It states that if $p$ is a prime number then for all integers $x$ , $x^p = x(mod p)$ .

Since 5 is a prime number, the result above is just a special case of Fermat’s little theorem.

This page has a number of different proofs of Fermat’s little theorem.

5" of snow: is that a lot of snow?

Posted by: Gary Ernest Davis on: February 10, 2010

In: Uncategorized
2 Comments

It’s snowing heavily here in Dartmouth, Massachusetts. Forecasts are anything from 5″ – 12″ of snow before it eases overnight.

Is 5″ of snow a lot of snow? Let me tell you, when I’m shovelling it, it seems like a lot! Could we compare 5″ of snow with something else – like water, for example.

My driveway is about 20′ by 40′ – 800 square feet, or Â $800\times 144= 115200$ square inches.

So, a layer of 5″ of snow on my driveway is about Â $5\times 115200 =576,000$ cubic inches.

That’s a lot of cubic inches.

How much water would that be? Typically, fresh snow is about 10% the density of water.

So 5″ of fresh snow on my driveway is equivalent to about Â 57,600 cubic inches of water.

There are 231 cubic inches in a US gallon, so there would be the fresh snow equivalent of $\frac{57600}{231}\approx 249$ gallons of water sitting on my driveway – say 250 gallons between friends.

That’s about $4\frac{1}{2}$ 55-gallon drums of water.

Seems like quite a lot of water.

Certainly feels like it when I’m shovelling!

This blog post was prompted by the conjunction of two events, one predicted, the other entirely unexpected.

The first event was the snow, which was accurately forecast.

The second event was John Allen Paulos retweeting me on Twiitter.

John Allen Paulos

That was pretty cool, and I was thinking about his books as I shovelled snow and – boing! – I wondered how someone who had never see snow could relate to 5″ of the white stuff on my driveway.

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How do I prove that 5 divides x^5 – x? The joys of modular arithmetic

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5" of snow: is that a lot of snow?

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