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Old race car problem/puzzle

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1

$begingroup$

This was in an old (1935) "brain teaser" book, and I can't figure it out how to solve it!

There's a car race during which the cars experience 4 different types of car trouble, e.g. flat tire, blown motor, etc. I can't recall exactly what they are let's say they are A, B, C, and D.

Also it is stated that: 95% of the cars experience trouble A, 85% of the cars experience trouble B, 75% of the cars experience trouble C, and 65% of the cars experience trouble D

Then the question that is asked is, what is the least percentage of cars which must have experienced all 4 car troubles?

Anybody have any ideas? Thanks!

puzzle

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edited 4 hours ago

Ramblin Wreck

asked 4 hours ago

Ramblin WreckRamblin Wreck

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$endgroup$

• 
  
  
  

  
  1
  

  
  
  
  
  
  

  
  $begingroup$
  Hint: when you rephrase the information in terms of percentages of cars that did not experience trouble, the answer might become obvious.
  $endgroup$
  – whuber♦
  3 hours ago
  

  
  
  
  

add a comment | 

1

$begingroup$

This was in an old (1935) "brain teaser" book, and I can't figure it out how to solve it!

There's a car race during which the cars experience 4 different types of car trouble, e.g. flat tire, blown motor, etc. I can't recall exactly what they are let's say they are A, B, C, and D.

Also it is stated that: 95% of the cars experience trouble A, 85% of the cars experience trouble B, 75% of the cars experience trouble C, and 65% of the cars experience trouble D

Then the question that is asked is, what is the least percentage of cars which must have experienced all 4 car troubles?

Anybody have any ideas? Thanks!

puzzle

share|cite|improve this question

edited 4 hours ago

Ramblin Wreck

asked 4 hours ago

Ramblin WreckRamblin Wreck

63

New contributor

Ramblin Wreck is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.

$endgroup$

• 
  
  
  

  
  1
  

  
  
  
  
  
  

  
  $begingroup$
  Hint: when you rephrase the information in terms of percentages of cars that did not experience trouble, the answer might become obvious.
  $endgroup$
  – whuber♦
  3 hours ago
  

  
  
  
  

add a comment | 

$begingroup$

This was in an old (1935) "brain teaser" book, and I can't figure it out how to solve it!

There's a car race during which the cars experience 4 different types of car trouble, e.g. flat tire, blown motor, etc. I can't recall exactly what they are let's say they are A, B, C, and D.

Also it is stated that: 95% of the cars experience trouble A, 85% of the cars experience trouble B, 75% of the cars experience trouble C, and 65% of the cars experience trouble D

Then the question that is asked is, what is the least percentage of cars which must have experienced all 4 car troubles?

Anybody have any ideas? Thanks!

puzzle

share|cite|improve this question

edited 4 hours ago

Ramblin Wreck

asked 4 hours ago

Ramblin WreckRamblin Wreck

63

New contributor

Ramblin Wreck is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.

$endgroup$

share|cite|improve this question

edited 4 hours ago

Ramblin Wreck

asked 4 hours ago

Ramblin WreckRamblin Wreck

63

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edited 4 hours ago

Ramblin Wreck

asked 4 hours ago

Ramblin WreckRamblin Wreck

63

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asked 4 hours ago

Ramblin WreckRamblin Wreck

63

New contributor

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asked 4 hours ago

Ramblin WreckRamblin Wreck

63

1 Answer
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$begingroup$

The probability of having car troubles A, B, C, and D is given by
$$P(A cap B cap C cap D)=1-P((A cap B cap C cap D)^c)=1-P(A^c cup B^c cup C^c cup D^c).$$
Notice the upper bound on $P(A^c cup B^c cup C^c cup D^c)$ (and therefore the lower bound on $P(A cap B cap C cap D)$) is given by the case where the four sets $A^c, B^c, C^c,$ and $D^c$ are mutually exclusive (it helps to draw a picture to better understand this). In this case
$$P(A^c cup B^c cup C^c cup D^c)=P(A^c)+P(B^c)+P(C^c)+P(D^C)=.35+.25+.15+.05=0.8,$$
since $P(A^c)=.35, P(B^c)=.25, P(C^c)=.15,$ and $P(D^c)=.05$. Thus, the upper bound on the probability of having car troubles A, B, C, and D is given by
$$P(A cap B cap C cap D)=1-0.8=0.2.$$

The reason we cannot exactly calculate the probability $P(A cap B cap C cap D)$ is that we do not have information about the probability of set intersections. We can, however, find an upper bound, which is given by the case where the sets do not overlap.

share|cite|improve this answer

edited 3 hours ago

answered 3 hours ago

dlnBdlnB

3264

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$endgroup$

• 
  
  
  

  
  

  
  
  
  
  
  

  
  $begingroup$
  (+1) but note that it should say "(and therefore the lower bound on $P(A cap B cap C cap D)$) "
  $endgroup$
  – dnqxt
  3 hours ago
  
  
  

  
  
  
  


• 
  
  
  

  
  

  
  
  
  
  
  

  
  $begingroup$
  Yes, thank you. Corrected.
  $endgroup$
  – dlnB
  3 hours ago
  

  
  
  
  


• 
  
  
  

  
  

  
  
  
  
  
  

  
  $begingroup$
  Thank you for the clear explanation! Drawing a picture of the mutually exclusive sets (for a small number of cars) helped me get it. Also, 20% is what the book had for the answer too.
  $endgroup$
  – Ramblin Wreck
  3 hours ago
  
  
  

  
  
  
  


• 
  
  
  

  
  

  
  
  
  
  
  

  
  $begingroup$
  Pictures usually help with the intuition. Glad I could help. If you are satisfied, please accept the answer.
  $endgroup$
  – dlnB
  2 hours ago
  

  
  
  
  

add a comment | 

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4

$begingroup$

The probability of having car troubles A, B, C, and D is given by
$$P(A cap B cap C cap D)=1-P((A cap B cap C cap D)^c)=1-P(A^c cup B^c cup C^c cup D^c).$$
Notice the upper bound on $P(A^c cup B^c cup C^c cup D^c)$ (and therefore the lower bound on $P(A cap B cap C cap D)$) is given by the case where the four sets $A^c, B^c, C^c,$ and $D^c$ are mutually exclusive (it helps to draw a picture to better understand this). In this case
$$P(A^c cup B^c cup C^c cup D^c)=P(A^c)+P(B^c)+P(C^c)+P(D^C)=.35+.25+.15+.05=0.8,$$
since $P(A^c)=.35, P(B^c)=.25, P(C^c)=.15,$ and $P(D^c)=.05$. Thus, the upper bound on the probability of having car troubles A, B, C, and D is given by
$$P(A cap B cap C cap D)=1-0.8=0.2.$$

The reason we cannot exactly calculate the probability $P(A cap B cap C cap D)$ is that we do not have information about the probability of set intersections. We can, however, find an upper bound, which is given by the case where the sets do not overlap.

share|cite|improve this answer

edited 3 hours ago

answered 3 hours ago

dlnBdlnB

3264

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dlnB is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
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$endgroup$

• 
  
  
  

  
  

  
  
  
  
  
  

  
  $begingroup$
  (+1) but note that it should say "(and therefore the lower bound on $P(A cap B cap C cap D)$) "
  $endgroup$
  – dnqxt
  3 hours ago
  
  
  

  
  
  
  


• 
  
  
  

  
  

  
  
  
  
  
  

  
  $begingroup$
  Yes, thank you. Corrected.
  $endgroup$
  – dlnB
  3 hours ago
  

  
  
  
  


• 
  
  
  

  
  

  
  
  
  
  
  

  
  $begingroup$
  Thank you for the clear explanation! Drawing a picture of the mutually exclusive sets (for a small number of cars) helped me get it. Also, 20% is what the book had for the answer too.
  $endgroup$
  – Ramblin Wreck
  3 hours ago
  
  
  

  
  
  
  


• 
  
  
  

  
  

  
  
  
  
  
  

  
  $begingroup$
  Pictures usually help with the intuition. Glad I could help. If you are satisfied, please accept the answer.
  $endgroup$
  – dlnB
  2 hours ago
  

  
  
  
  

add a comment | 

4

$begingroup$

The probability of having car troubles A, B, C, and D is given by
$$P(A cap B cap C cap D)=1-P((A cap B cap C cap D)^c)=1-P(A^c cup B^c cup C^c cup D^c).$$
Notice the upper bound on $P(A^c cup B^c cup C^c cup D^c)$ (and therefore the lower bound on $P(A cap B cap C cap D)$) is given by the case where the four sets $A^c, B^c, C^c,$ and $D^c$ are mutually exclusive (it helps to draw a picture to better understand this). In this case
$$P(A^c cup B^c cup C^c cup D^c)=P(A^c)+P(B^c)+P(C^c)+P(D^C)=.35+.25+.15+.05=0.8,$$
since $P(A^c)=.35, P(B^c)=.25, P(C^c)=.15,$ and $P(D^c)=.05$. Thus, the upper bound on the probability of having car troubles A, B, C, and D is given by
$$P(A cap B cap C cap D)=1-0.8=0.2.$$

The reason we cannot exactly calculate the probability $P(A cap B cap C cap D)$ is that we do not have information about the probability of set intersections. We can, however, find an upper bound, which is given by the case where the sets do not overlap.

share|cite|improve this answer

edited 3 hours ago

answered 3 hours ago

dlnBdlnB

3264

New contributor

dlnB is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.

$endgroup$

• 
  
  
  

  
  

  
  
  
  
  
  

  
  $begingroup$
  (+1) but note that it should say "(and therefore the lower bound on $P(A cap B cap C cap D)$) "
  $endgroup$
  – dnqxt
  3 hours ago
  
  
  

  
  
  
  


• 
  
  
  

  
  

  
  
  
  
  
  

  
  $begingroup$
  Yes, thank you. Corrected.
  $endgroup$
  – dlnB
  3 hours ago
  

  
  
  
  


• 
  
  
  

  
  

  
  
  
  
  
  

  
  $begingroup$
  Thank you for the clear explanation! Drawing a picture of the mutually exclusive sets (for a small number of cars) helped me get it. Also, 20% is what the book had for the answer too.
  $endgroup$
  – Ramblin Wreck
  3 hours ago
  
  
  

  
  
  
  


• 
  
  
  

  
  

  
  
  
  
  
  

  
  $begingroup$
  Pictures usually help with the intuition. Glad I could help. If you are satisfied, please accept the answer.
  $endgroup$
  – dlnB
  2 hours ago
  

  
  
  
  

add a comment | 

$begingroup$

The probability of having car troubles A, B, C, and D is given by
$$P(A cap B cap C cap D)=1-P((A cap B cap C cap D)^c)=1-P(A^c cup B^c cup C^c cup D^c).$$
Notice the upper bound on $P(A^c cup B^c cup C^c cup D^c)$ (and therefore the lower bound on $P(A cap B cap C cap D)$) is given by the case where the four sets $A^c, B^c, C^c,$ and $D^c$ are mutually exclusive (it helps to draw a picture to better understand this). In this case
$$P(A^c cup B^c cup C^c cup D^c)=P(A^c)+P(B^c)+P(C^c)+P(D^C)=.35+.25+.15+.05=0.8,$$
since $P(A^c)=.35, P(B^c)=.25, P(C^c)=.15,$ and $P(D^c)=.05$. Thus, the upper bound on the probability of having car troubles A, B, C, and D is given by
$$P(A cap B cap C cap D)=1-0.8=0.2.$$

The reason we cannot exactly calculate the probability $P(A cap B cap C cap D)$ is that we do not have information about the probability of set intersections. We can, however, find an upper bound, which is given by the case where the sets do not overlap.

share|cite|improve this answer

edited 3 hours ago

answered 3 hours ago

dlnBdlnB

3264

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edited 3 hours ago

answered 3 hours ago

dlnBdlnB

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answered 3 hours ago

dlnBdlnB

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answered 3 hours ago

dlnBdlnB

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