Help with a proof on divisibility

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    Divisibility Proof
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AlexChandler
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Homework Statement



Prove the following:
If 5 divides [tex]a^2 + b^2 + c^2[/tex] then 5 divides a and 5 divides b and 5 divides c.

Homework Equations



[tex]5 \mid a \implies a=5k , k \in Z[/tex]

The Attempt at a Solution



My idea is to assume 5 divides [tex]a^2 + b^2 +c^2[/tex]

also assume that "5 does not divide a" or "5 does not divide b" or "5 does not divide c"

then by the division algorithm, for some integers k,s,t

[tex]a=5k+1[/tex] or [tex]a=5k+2[/tex] or [tex]a=5k+3[/tex] or [tex]a=5k+4[/tex]

[tex]b=5s+1[/tex] or [tex]b=5s+2[/tex] or [tex]b=5s+3[/tex] or [tex]b=5s+4[/tex]

[tex]c=5t+1[/tex] or [tex]c=5t+2[/tex] or [tex]c=5t+3[/tex] or [tex]c=5t+4[/tex]

Now if we square each possibility for a, b, and c and add them together in each possible way, we would find that there is no possible combination that will give that 5 divides a^2 + b^2 + c^2. Then we would see that this is a contradiction so we must have that 5 divides a,b, and c. However, there must be an easier way than to have to manipulate 3^4 (i think) equations. Does anybody see a better way to go about this? or a quicker way to check all of the equations?
Thanks!
 
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You are absolutely right! I misread the problem. It says prove that 5 divides a or 5 divides b or 5 divides c. Thanks! This is much easier! Hah i feel stupid
 
Yes that is exactly right. I have it figured out now. Thank you