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If S is discrete and finite
 
S = {<math>s_1,s_2,s_3</math>}
 
S = {head,tail}
 
S = {win, lose}
 
S = {1,2,3,4,5,6}
 
  
 
1/9/13
 
1/9/13
  
 
+
If S is discrete and finite
 
S = {<math>s_1,s_2,s_3</math>}
 
S = {<math>s_1,s_2,s_3</math>}
 +
S = {head,tail},
 +
S = {win, lose},
 +
S = {1,2,3,4,5,6}
  
 
If S is discrete but infinite,
 
If S is discrete but infinite,

Revision as of 17:17, 14 April 2013

Note: this is the first of many pages to be uploaded.



1/9/13

If S is discrete and finite S = {$ s_1,s_2,s_3 $} S = {head,tail}, S = {win, lose}, S = {1,2,3,4,5,6}

If S is discrete but infinite,

S = {$ s_1,s_2,s_3 $,...} ex. S = {1,2,3,4,...}

    S = {sin(2$ \pi $*440t),sin(2$ \pi $*880t),sin(2$ \pi $*1320t),...}
    Observe $ _{S = \mathbb{R}} $ is not routable; S = [0,1] is not routable
    S = {sin(2$ \pi $*f*t)} f $ \in \mathbb{R} \geq $ 0 
      = {sin(2$ \pi $*f*t)|0$ \leq f < \infty $}

$ \mathbb{Z} $ is all integers $ -\infty $ to $ \infty $

Is $ \mathbb{Z} $ routable? yes.

  $ \mathbb{Z} $={0,1,-1,2,-2,3,-3, }as opposed to $ \mathbb{R} $

$ \mathbb{R} $= {0,3,e,$ \pi $,-1,1.14,$ \sqrt{2} $}

Many different ways to write a set [0,1] = {x $ \in \mathbb{R} $such that(s. t.) 0$ \leq x \leq $ 1} ={real positive numbers no greater than 1 as well as 0}

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To all math majors: "Mathematics is a wonderfully rich subject."

Dr. Paul Garrett