20090204, 12:02  #1 
Mar 2004
17×29 Posts 
modular arithmetic problem
I can't remember one of the things I learned in algebra class:
Given odd numbers N and r, suppose we know n is an rth root of k. Are there any general or special cases when we can find a different rth root of k? 
20090204, 12:15  #2  
Nov 2003
1C40_{16} Posts 
Quote:
(1) You have not specified the domain in which you are working. (2) If you are working in the reals, only one such rth root ever exists. (3) If you are working over C, then k always has r rth roots. What do you mean by "special cases when we can find a different rth root"? What do you mean by "find"??? Determining all of the r'th roots of k is trivially given by DeMoivre's Theorem. This is high school level math. (4) Your notation sucks. You use both N and n to mean the same thing. Or, if you intend that they denote different numbers, then you have not defined N. Last fiddled with by R.D. Silverman on 20090204 at 12:15 Reason: fix bold 

20090204, 15:55  #3  
Mar 2004
17·29 Posts 
Of course. Sorry, I didn't realize I didn't type mod N.
Restated correctly: Given odd numbers N and r, suppose we know n is an rth root of k mod N. Are there any general or special cases when we can find a different rth root of k mod N? I think I know the answer to the question, but I wanted to verify it. Quote:


20090204, 18:45  #4  
Nov 2003
2^{6}×113 Posts 
Quote:
Sometimes, (many times) when r is odd, there is only one such root. When there exists more than one, there are a variety of methods to "find" them; e.g. Berlekamp, CantorZassenhaus, variations of ShanksTonelli, etc. 

20090311, 16:06  #5 
Feb 2005
11111100_{2} Posts 
Just multiply n by any rth power root of 1 modulo N. In particular, if r is even, you can multiply n by 1 to get a different rth power root of k mod N.

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