(New page: I am still confused of how we can expect the order of an modulo multiplication groups which has very big orders without arranging each element one by one.)
 
 
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  I am still confused of how we can expect the order of an modulo multiplication group
  I am still confused of how we can expect the order of an modulo multiplication groups
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  which has very big orders without arranging each element one by one.
 
  which has very big orders without arranging each element one by one.
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--[[User:lee462|lee462]]
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I assume you are referring to finding the order of <math>U(750)</math>.  Here is how I did it on the homework last week:
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Find a formula for <math>|U(p^n)|</math> where p is a prime.  Then, try factoring 750 into two numbers, one of them in a convenient form.  You can get <math>750 = 6*5^3</math>.  Five is prime, and we know <math>|U(5^3)|</math>.  We can also get <math>|U(6)|</math> pretty easily.  Then, from the previous homework, we had a conjecture on what, in general, is <math>|U(a*b)|</math>.  Use that conjecture with the factors of 750 you generated, and there's your prediction.  Of course, if you proved your conjecture, it would cease to be simply a prediction.
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-Josh Magner

Latest revision as of 22:56, 21 November 2008

I am still confused of how we can expect the order of an modulo multiplication group
which has very big orders without arranging each element one by one.

--lee462


I assume you are referring to finding the order of $ U(750) $. Here is how I did it on the homework last week: Find a formula for $ |U(p^n)| $ where p is a prime. Then, try factoring 750 into two numbers, one of them in a convenient form. You can get $ 750 = 6*5^3 $. Five is prime, and we know $ |U(5^3)| $. We can also get $ |U(6)| $ pretty easily. Then, from the previous homework, we had a conjecture on what, in general, is $ |U(a*b)| $. Use that conjecture with the factors of 750 you generated, and there's your prediction. Of course, if you proved your conjecture, it would cease to be simply a prediction. -Josh Magner

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