Mistake on website?

Fruityloop · 2009-08-20 11:24:06

Try #4 on the exercises at the bottom of this website...

http://www.math.rutgers.edu/~erowland/m … metic.html

4. Show that if x, y, z are integers such that x^3 + y^3 = z^3, then at least one of them is divisible by 7.

Yeah..good luck with that!

Last edited by Fruityloop (2009-08-20 11:27:01)

bobbym · 2009-08-20 12:08:26

Hi Fruityloop;

Is it a joke?

I used to know a teacher who claimed he always put mistakes in his problem answers to see if his students were aware. I think he was just covering his rear.

Last edited by bobbym (2009-08-20 20:28:08)

mathsyperson · 2009-08-20 22:39:16

This is a legitimate exercise. The cubes of 1 to 6 (mod 7) are just 1 and 6.
There's no way to add two of those together to produce 1 or 6 (1+1 = 2, 1+6 = 0, 6+6 = 5), and so if the first equation is true then one of them must be a multiple of 7.

If we're staying in the positive integers then FLT makes it true vacuously, but there's no need to go that deep.

bobbym · 2009-08-21 11:04:50

Hi;

Is it a joke?

When I first looked at this I just thought about positive integrs so the solution is trivial. Everybody knows that 2 integer cubes cannot sum to a third cube other than for the trivial cases. But when you think about negative integers it is not so well known as to whether the difference of 2 integer cubes can be a cube. So in that sense it is a legitimate question.

Math Is Fun Forum

#1 2009-08-20 11:24:06

Mistake on website?

#2 2009-08-20 12:08:26

Re: Mistake on website?

#3 2009-08-20 22:39:16

Re: Mistake on website?

#4 2009-08-21 11:04:50

Re: Mistake on website?

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