(New page: Category:MA453Spring2009Walther If φ(7)=7 then φ(7^k)=7^k. So the powers of 7 run through the elements 1,7,19,13, which are half the elements of U(30). Then you have to find what ha...)
 
 
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-Linley Johnson
 
-Linley Johnson
 
--[[User:Johns121|Johns121]] 17:04, 17 February 2009 (UTC)
 
--[[User:Johns121|Johns121]] 17:04, 17 February 2009 (UTC)
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[[Category:MA453Spring2009Walther]]
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Does φ need to be written out as some sort of equation or is it fine to leave it with a map for each element?
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-Tyler McQueen
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The mapping is probably okay for this particular problem.
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-Daniel Castillo

Latest revision as of 12:42, 18 February 2009


If φ(7)=7 then φ(7^k)=7^k. So the powers of 7 run through the elements 1,7,19,13, which are half the elements of U(30). Then you have to find what happens to the other 4 elements 11,17,23 and 29. We are told that 11 goes to 1. Then 7*11=17 goes to φ(7)*φ(11)=7, and 7*17=29 goes to φ(7)*φ17)=7*7=19, and 7*29=23 goes to φ(7)*φ(29)=7*19=13. So the morphism does 1->1, 11->1, 7->7, 17->7, 19->19. 29->19, 13->13, 23->13.

-Linley Johnson --Johns121 17:04, 17 February 2009 (UTC)

Does φ need to be written out as some sort of equation or is it fine to leave it with a map for each element? -Tyler McQueen

The mapping is probably okay for this particular problem. -Daniel Castillo

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