CRN 12109: HW 1

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(Created page with "'''Problem 1.''' Exercise 1.3.2. '''Problem 2.''' Exercise 1.3.3. '''Problem 3.''' Exercise 1.4.4. '''Problem 4.''' Let $A=\{x\in\mathbb{Q}\ |\ x^2\leq 5\}$. Show that A is...")
 
 
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'''Problem 1.''' Exercise 1.3.2.
 
'''Problem 1.''' Exercise 1.3.2.
  
'''Problem 2.''' Exercise 1.3.3.
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'''Problem 2.''' Exercise 1.3.3(a)(b).
  
 
'''Problem 3.''' Exercise 1.4.4.
 
'''Problem 3.''' Exercise 1.4.4.
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'''Problem 4.''' Let $A=\{x\in\mathbb{Q}\ |\ x^2\leq 5\}$. Show that A is bounded from above, but that $A$ has no maximum.  
 
'''Problem 4.''' Let $A=\{x\in\mathbb{Q}\ |\ x^2\leq 5\}$. Show that A is bounded from above, but that $A$ has no maximum.  
  
'''Problem 5.''' Show that the ''Nested Interval Property'' implies the ''Axiom of Completeness''.
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'''Problem 5.''' Show that the ''Nested Interval Property'' together with the ''Archimedean Principle'' implies the ''Axiom of Completeness''.

Latest revision as of 13:14, 13 September 2013

Problem 1. Exercise 1.3.2.

Problem 2. Exercise 1.3.3(a)(b).

Problem 3. Exercise 1.4.4.

Problem 4. Let $A=\{x\in\mathbb{Q}\ |\ x^2\leq 5\}$. Show that A is bounded from above, but that $A$ has no maximum.

Problem 5. Show that the Nested Interval Property together with the Archimedean Principle implies the Axiom of Completeness.

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