(New page: Chapter 13, Problem 6. Find a nonzero element in a ring that is neither a zero-divisor nor a unit. Answer: In the ring Z, 2 is neither a zero-divisor (because Z is an integral domain, and...)
 
 
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Chapter 13, Problem 6. Find a nonzero element in a ring that is neither a zero-divisor nor
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a unit.
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[[Category:algebra]]
  
Answer: In the ring Z, 2 is neither a zero-divisor (because Z
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=[[HW7_MA453Fall2008walther|HW7]] (Chapter 13, Problem 6, [[MA453]], Fall 2008, [[user:walther|Prof. Walther]]=
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==Question==
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Find a nonzero element in a ring that is neither a zero-divisor nor a unit.
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----
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== Answer 1==
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In the ring Z, 2 is neither a zero-divisor (because Z
 
is an integral domain, and hence has no zero-divisors) nor a unit.
 
is an integral domain, and hence has no zero-divisors) nor a unit.
  
--Neely Misner
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:--Neely Misner
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==Answer 2==
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Write it here.
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[[HW7_MA453Fall2008walther|Back to HW7]]
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[[Main_Page_MA453Fall2008walther|Back to MA453 Fall 2008]]

Latest revision as of 08:51, 21 March 2013


HW7 (Chapter 13, Problem 6, MA453, Fall 2008, Prof. Walther


Question

Find a nonzero element in a ring that is neither a zero-divisor nor a unit.


Answer 1

In the ring Z, 2 is neither a zero-divisor (because Z is an integral domain, and hence has no zero-divisors) nor a unit.

--Neely Misner

Answer 2

Write it here.


Back to HW7

Back to MA453 Fall 2008

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