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Problem 28: (Minimums And Maximums Are Unique)

Prove that a minimum of set $S$, if it exists, is unique. In other words, prove that if $m_1$ and $m_2$ are both minimums of $S$, then we must have $m_1=m_2$. A similar proof will show that maximums are unique.

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Problem.MinimumsAndMaximumsAreUnique
Schedule.20180516
Schedule.20180518
Schedule.20180521
Schedule.AllProblems

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Page last modified on May 25, 2018, at 03:49 PM

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HomePage Schedule Pictures Writing Tips LaTeX Commands External Resources List of Problems List of Definitions List of Theorems List of Conjectures All Recent changes (use this to find a page that may have been lost)	Problem Minimums And Maximums Are Unique Please Login to access more options. Problem 28: (Minimums And Maximums Are Unique) Prove that a minimum of set $S$, if it exists, is unique. In other words, prove that if $m_1$ and $m_2$ are both minimums of $S$, then we must have $m_1=m_2$. A similar proof will show that maximums are unique. The following pages link to this page. Problem.MinimumsAndMaximumsAreUnique Schedule.20180516 Schedule.20180518 Schedule.20180521 Schedule.AllProblems Here are the old pages. Edit Page History Source Attach File Backlinks List Group Page last modified on May 25, 2018, at 03:49 PM
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