Difference between revisions of "Aufgaben:Exercise 1.3Z: Winning with Roulette?"

From LNTwww
 
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{A player simultaneously places one 1-euro chip on each of the squares  "0",  "Red"  and  "Black".  What are his average winnings per game?
 
{A player simultaneously places one 1-euro chip on each of the squares  "0",  "Red"  and  "Black".  What are his average winnings per game?
 
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$G_1 \ =\ $  { -0.083--0.079 } $\ \rm Euro$
+
$G_1 \ =\ $  { -0.083--0.079 } $\ \rm euro$
  
 
{How much does he win on average per game if he always places one  $1$  Euro chip on each of the squares  "Red"  and  "Black"?
 
{How much does he win on average per game if he always places one  $1$  Euro chip on each of the squares  "Red"  and  "Black"?
 
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|type="{}"}
$G_2 \ =\ $ { -0.056--0.052 } $\ \rm Euro$
+
$G_2 \ =\ $ { -0.056--0.052 } $\ \rm euro$
  
 
{How much does he win on average per game if he always bets  $1$  Euro on  "0"  and  $10$  Euro on  "Red"?
 
{How much does he win on average per game if he always bets  $1$  Euro on  "0"  and  $10$  Euro on  "Red"?
 
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|type="{}"}
$G_3 \ =\ $  { -0.307--0.287 } $\ \rm Euro$
+
$G_3 \ =\ $  { -0.307--0.287 } $\ \rm euro$
  
 
{The player bets as shown in the picture.   Which number  $Z_{\rm desire}$   should he be hoping for?  How big would his winnings be then?
 
{The player bets as shown in the picture.   Which number  $Z_{\rm desire}$   should he be hoping for?  How big would his winnings be then?
 
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|type="{}"}
 
$Z_{\rm desire} \ = \ $ { 23 }
 
$Z_{\rm desire} \ = \ $ { 23 }
$G_4 \ =\ $ { 40 3% } $\ \rm Euro$
+
$G_4 \ =\ $ { 40 3% } $\ \rm euro$
  
 
{Is there a betting combination such that the average winnings are positive?
 
{Is there a betting combination such that the average winnings are positive?
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===Solution===
 
===Solution===
 
{{ML-Kopf}}
 
{{ML-Kopf}}
'''(1)'''  The player loses one euro each time one of the numbers  $1$  to  $36$  is drawn.  
+
'''(1)'''  The player loses one euro each time if one of the numbers  $1$  to  $36$  is drawn.  
*He wins  $33$  euro, if  $0$  is drawn. It follows that:
+
*He wins  $33$  euro,  if  $0$  is drawn.  It follows that:
:$$G_1 =\rm  {36}/{37}\cdot (-1\hspace{0.1cm} Euro) + {1}/{37}\cdot (33\hspace{0.1cm} Euro) \hspace{0.15cm}\underline {= - 0.081\hspace{0.1cm} Euro\hspace{0.1cm}(Loss)}.$$
+
:$$G_1 =\rm  {36}/{37}\cdot (-1\hspace{0.1cm} euro) + {1}/{37}\cdot (33\hspace{0.1cm} euro) \hspace{0.15cm}\underline {= - 0.081\hspace{0.1cm} euro\hspace{0.1cm}(Loss)}.$$
  
  
 +
'''(2)'''   The player wins and loses nothing unless the zero is drawn.  If the zero appears,  he loses his bet:
 +
:$$G_2 = \rm {1}/{37}\cdot (-2\hspace{0.1cm} euro)\hspace{0.15cm}\underline { = -0.054 \hspace{0.1cm}euro \hspace{0.1cm}(Loss)}.$$
  
'''(2)'''   The player wins and loses nothing unless the zero is drawn.  If the zero appears, he loses his bet:
 
:$$G_2 = \rm {1}/{37}\cdot (-2\hspace{0.1cm} Euro)\hspace{0.15cm}\underline { = -0.054 \hspace{0.1cm}Euro \hspace{0.1cm}(Loss)}.$$
 
  
 +
'''(3)'''  If  "red"  is drawn,  he wins nine euro.
 +
*If  "zero" comes,  he effectively wins  $25$  euro.
 +
*If  "black"  is drawn,  he loses his entire bet of  $11$  euro:
 +
:$$G_3 = \rm {18}/{37}\cdot (10 -1) + {1}/{37}\cdot (35-10) + {18}/{37}\cdot (-10-1)\hspace{0.15cm}\underline { = - 0.297\hspace{0.1cm}euro}.$$
  
  
'''(3)'''  If "red" is drawn, he wins nine euro.
+
'''(4)'''  He gets the highest winning at  $Z_{\rm desire} \;  \underline{ = 23} $.  Then four of his five chips win:
*If zero comes, he effectively wins  $25$  euro.
 
*If "black" is drawn, he loses his entire bet of  $11$  euro:
 
:$$G_3 = \rm {18}/{37}\cdot (10 -1) + {1}/{37}\cdot (35-10) + {18}/{37}\cdot (-10-1)\hspace{0.15cm}\underline { = - 0.297\hspace{0.1cm}Euro}.$$
 
 
 
 
 
 
 
'''(4)'''  He gets the highest winning at  $Z_{\rm Wunsch} \;  \underline{ = 23} $.  Then four of his five chips win:
 
 
:$$G_4 = \rm 10\hspace{0.1cm}(Red) + 10\hspace{0.1cm}(Passe) + 10\hspace{0.1cm}(Impair) +   
 
:$$G_4 = \rm 10\hspace{0.1cm}(Red) + 10\hspace{0.1cm}(Passe) + 10\hspace{0.1cm}(Impair) +   
\rm 11\hspace{0.1cm}(between \hspace{0.1cm}22\hspace{0.1cm} and \hspace{0.1cm}24) - 1 \hspace{0.1cm}(not \hspace{0.1cm}0) \hspace{0.15cm}\underline {= 40 \hspace{0.1cm}Euro}.$$
+
\rm 11\hspace{0.1cm}(between \hspace{0.1cm}22\hspace{0.1cm} and \hspace{0.1cm}24) - 1 \hspace{0.1cm}(not \hspace{0.1cm}0) \hspace{0.15cm}\underline {= 40 \hspace{0.1cm}euro}.$$
*If, on the other hand, the zero comes, he wins only  $\rm 35 - 31 = 4 \ Euro$.
+
*If,  on the other hand,  the  "zero"  comes,  he wins only  $\rm 35 - 31 = 4 \ euro$.
  
  
  
'''(5)'''&nbsp; <u>No, unfortunately not.  On statistical average, the house always wins.</u>.
+
'''(5)'''&nbsp; '''No,&nbsp; unfortunately not.&nbsp; On statistical average,&nbsp; the house always wins'''.
 
{{ML-Fuß}}
 
{{ML-Fuß}}
  

Latest revision as of 15:52, 25 November 2021

Considered betting situation

In roulette,  a winning number  $Z$  is determined in each game by means of a ball and a roulette wheel,  where we want to assume that all possible numbers  $Z \in \{0, 1, 2, \ \text{...} \ , 36 \}$  are equally probable.

The players can now bet on a single number or on a group of numbers with chips of different value.  Some of the possibilities and the corresponding winnings will be briefly explained here on the basis of the chips bet by a player (see graph):

  • If a player bets on a number  (in the example on "0"),  he would get back  $35$ times his stake as winnings in addition to his bet.
  • If a player bets on a group of numbers with three fields  (in the example,  the 1-euro chip for the numbers from  "22"  to  "24"),  he would receive  $ 11$ times his stake as winnings in addition to his bet.
  • If a player bets on a group of numbers with  $ 18$  fields  (for example,  the 10-euro chips on  "Rouge",  on  "Impair"  and on  "Passe"),  he will receive the same amount back as winnings in addition to his bet.
  • If the number drawn does not belong to one of the squares he occupies,  his bet is lost.



Hints:

  • The exercise belongs to the chapter  Set Theory Basics.
  • Enter any losses as negative winnings  in the following questions.
  • The topic of this chapter is illustrated with examples in the  (German language)  learning video
Mengentheoretische Begriffe und Gesetzmäßigkeiten   $\Rightarrow$   "Set-Theoretical Concepts and Laws".


Questions

1

A player simultaneously places one 1-euro chip on each of the squares  "0",  "Red"  and  "Black".  What are his average winnings per game?

$G_1 \ =\ $

$\ \rm euro$

2

How much does he win on average per game if he always places one  $1$  Euro chip on each of the squares  "Red"  and  "Black"?

$G_2 \ =\ $

$\ \rm euro$

3

How much does he win on average per game if he always bets  $1$  Euro on  "0"  and  $10$  Euro on  "Red"?

$G_3 \ =\ $

$\ \rm euro$

4

The player bets as shown in the picture.   Which number  $Z_{\rm desire}$  should he be hoping for?  How big would his winnings be then?

$Z_{\rm desire} \ = \ $

$G_4 \ =\ $

$\ \rm euro$

5

Is there a betting combination such that the average winnings are positive?

Yes   ⇒   Quit university and go to the next casino.
No   ⇒   Continue with $\rm LNTwww$.


Solution

(1)  The player loses one euro each time if one of the numbers  $1$  to  $36$  is drawn.

  • He wins  $33$  euro,  if  $0$  is drawn.  It follows that:
$$G_1 =\rm {36}/{37}\cdot (-1\hspace{0.1cm} euro) + {1}/{37}\cdot (33\hspace{0.1cm} euro) \hspace{0.15cm}\underline {= - 0.081\hspace{0.1cm} euro\hspace{0.1cm}(Loss)}.$$


(2)  The player wins and loses nothing unless the zero is drawn.  If the zero appears,  he loses his bet:

$$G_2 = \rm {1}/{37}\cdot (-2\hspace{0.1cm} euro)\hspace{0.15cm}\underline { = -0.054 \hspace{0.1cm}euro \hspace{0.1cm}(Loss)}.$$


(3)  If  "red"  is drawn,  he wins nine euro.

  • If  "zero" comes,  he effectively wins  $25$  euro.
  • If  "black"  is drawn,  he loses his entire bet of  $11$  euro:
$$G_3 = \rm {18}/{37}\cdot (10 -1) + {1}/{37}\cdot (35-10) + {18}/{37}\cdot (-10-1)\hspace{0.15cm}\underline { = - 0.297\hspace{0.1cm}euro}.$$


(4)  He gets the highest winning at  $Z_{\rm desire} \; \underline{ = 23} $.  Then four of his five chips win:

$$G_4 = \rm 10\hspace{0.1cm}(Red) + 10\hspace{0.1cm}(Passe) + 10\hspace{0.1cm}(Impair) + \rm 11\hspace{0.1cm}(between \hspace{0.1cm}22\hspace{0.1cm} and \hspace{0.1cm}24) - 1 \hspace{0.1cm}(not \hspace{0.1cm}0) \hspace{0.15cm}\underline {= 40 \hspace{0.1cm}euro}.$$
  • If,  on the other hand,  the  "zero"  comes,  he wins only  $\rm 35 - 31 = 4 \ euro$.


(5)  No,  unfortunately not.  On statistical average,  the house always wins.