Question

Stanley_Marsh · 2007-05-15 16:19:29

Is it true that

JaneFairfax · 2007-05-15 22:19:34

No. The set of all nonzero real numbers under multiplication cant be written this way.

Ricky · 2007-05-15 23:38:41

What exactly do you mean multiplicative? Typically, any group operation is written multiplicatively.

If that's the case, neither can finite non-cyclic groups, such as the group of symmetries of the square (D8 (or D4, depends on your notation) ) or the group of permutations of order 6 (S6).

Stanley_Marsh · 2007-05-16 02:15:10

Here is the question
Show that if G is a finite group of even order , then G has an odd number of elements of order 2. Note that e is the only element of order 1.

If I regard G as

The proof will be very easy , but I am not sure whether I can do it this way.

JaneFairfax · 2007-05-16 03:45:56

No, you cant do it that way.

Here is one way to do it. Notice that the elements of order 2 are their own inverse. e is also an element that is its own inverse. The other elements are not their own inverse. If an element is not its own inverse, that element and its inverse must form a distinct pair hence the number of such elements must be even (so that they can be neatly paired up with each other). So we have

|G| = (number of elements that are their own inverse) + (number of elements that are not their own inverse)
= 1 + (number of elements of order 2) + (number of elements that are not their own inverse)

Since |G| is even, the number of elements of order 2 must be odd for the equation above to hold.

Last edited by JaneFairfax (2007-05-16 04:34:32)

Math Is Fun Forum

#1 2007-05-15 16:19:29

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#3 2007-05-15 23:38:41

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#5 2007-05-16 03:45:56

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