graph theory

GemmaJ1988 · 2008-11-04 01:34:59

suppose that n=3 mod4 and we colour the edges of kn red or blue
take ri to be the no. of red edges and bi=n-1-ri to be the no. of blue egdes
show that it is not possible to have ri=bi for all i
1<=i<=n

does anyone know how i would go about answering this question.
Im unsure what the value of n would be as i dont really know what n=3 mod 4 equals. please help

Ricky · 2008-11-04 01:54:43

and we colour the edges of kn

Is "kn" the complete graph of order n?

take ri to be the no. of red edges and bi=n-1-ri to be the no. of blue egdes
show that it is not possible to have ri=bi for all i
1<=i<=n

What does it mean for i to vary?

Im unsure what the value of n would be as i dont really know what n=3 mod 4 equals.

This means when the number is divided by 4, it leaves a remainder of 3. For example, 3 is of course equivalent to 3 mod 4, since 3/4 has remainder 3. Similarly 7/4 is equivalent to 3 mod 4. Continuing like this, we see this is a complete list of all integers that are equivalent to 3 mod 4:

3, 7, 11, 15, 19, 23, 27, 31, 35, ...

GemmaJ1988 · 2008-11-04 02:26:19

yes kn is the complete graph of order n
so kn is of odd order.
but i still dont understand how to show ri is not equal to bi

Ricky · 2008-11-04 07:36:58

You have that ri is the number of red edges and bi is the number of blue edges for the graph kn. But what does the index i mean? It doesn't seem to have anything to do with the problem. In other words, how would r1 and r2 be different?

Math Is Fun Forum

#1 2008-11-04 01:34:59

graph theory

#2 2008-11-04 01:54:43

Re: graph theory

#3 2008-11-04 02:26:19

Re: graph theory

#4 2008-11-04 07:36:58

Re: graph theory

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