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Deck 11: Probability
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Deck 11: Probability
1
Event 1B
Given the following event:
Suppose an irregular 7-sided solid object, having sides numbered 1 through 7, is rolled 100 times, and side 4 turns up 12 times.
In regard to Event 1B, what are the odds?
A) 1 to 4.
B) 7 to 100.
C) 7 to 125.
D) 3 to 25.
E) 3 to 22.
Given the following event:
Suppose an irregular 7-sided solid object, having sides numbered 1 through 7, is rolled 100 times, and side 4 turns up 12 times.
In regard to Event 1B, what are the odds?
A) 1 to 4.
B) 7 to 100.
C) 7 to 125.
D) 3 to 25.
E) 3 to 22.
3 to 22.
2
On one roll of a pair of dice, what is the probability of the points adding up to 4?
A) 1/12
B) 1/6
C) 1/11
D) 1/9
E) 1/8
A) 1/12
B) 1/6
C) 1/11
D) 1/9
E) 1/8
1/12
3
If the odds of the Steelers beating the Chiefs are 7 to 4, what is the probability of this event happening?
A) 4/7
B) 1/11
C) 7/11
D) 4/11
E) 7/4
A) 4/7
B) 1/11
C) 7/11
D) 4/11
E) 7/4
7/11
4
Event 3C
Given the following event:
Given an urn containing 3 white, 4 blue, and 5 pink balls. Two balls are drawn and the first ball is not replaced before the second is drawn.
Given Event 3C, what is the probability that both balls are blue?
A) 7/132
B) 1/12
C) 1/9
D) 2/25
E) 1/11
Given the following event:
Given an urn containing 3 white, 4 blue, and 5 pink balls. Two balls are drawn and the first ball is not replaced before the second is drawn.
Given Event 3C, what is the probability that both balls are blue?
A) 7/132
B) 1/12
C) 1/9
D) 2/25
E) 1/11
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5
Data Set 2A
Suppose that the ages of 8 kittens in a pet shop are as follows:
1, 2, 2, 3, 3, 4, 4, 5
According to the principle of indifference,
A) All possible outcomes of an event are equally probable.
B) It makes no difference who conducts the experiment.
C) Some possible outcomes are so unlikely that they are ignored.
D) All possible outcomes are invariant as to time and place.
E) The probability of an event is the same regardless of what theory is used to calculate it.
Suppose that the ages of 8 kittens in a pet shop are as follows:
1, 2, 2, 3, 3, 4, 4, 5
According to the principle of indifference,
A) All possible outcomes of an event are equally probable.
B) It makes no difference who conducts the experiment.
C) Some possible outcomes are so unlikely that they are ignored.
D) All possible outcomes are invariant as to time and place.
E) The probability of an event is the same regardless of what theory is used to calculate it.
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6
What is the probability of drawing a red king from a poker deck (no jokers) on a single draw?
A) 1/4
B) 1/26
C) 1/52
D) 1/13
E) 2/13
A) 1/4
B) 1/26
C) 1/52
D) 1/13
E) 2/13
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7
Event 1C
Given the following event:
Suppose an irregular 5-sided solid object, having sides numbered 1 through 5, is rolled 100 times, and side 3 turns up 16 times.
In regard to Event 1C, what are the odds?
A) 5 to 21.
B) 5 to 16.
C) 4 to 25.
D) 4 to 21.
E) 3 to 16.
Given the following event:
Suppose an irregular 5-sided solid object, having sides numbered 1 through 5, is rolled 100 times, and side 3 turns up 16 times.
In regard to Event 1C, what are the odds?
A) 5 to 21.
B) 5 to 16.
C) 4 to 25.
D) 4 to 21.
E) 3 to 16.
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8
To compute the probability of the Chargers football team beating the Patriots, the theory of probability that would normally be used is the:
A) Relativist theory.
B) Conditional theory.
C) Classical (a priori) theory.
D) Subjectivist theory.
E) Relative frequency theory.
A) Relativist theory.
B) Conditional theory.
C) Classical (a priori) theory.
D) Subjectivist theory.
E) Relative frequency theory.
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9
To compute the probability of drawing two aces from a poker deck (without replacing the first card before drawing the second) the theory of probability that would normally be used is the:
A) Conditional theory.
B) Subjectivist theory.
C) Classical (a priori) theory.
D) Relative frequency theory.
E) Relativist theory.
A) Conditional theory.
B) Subjectivist theory.
C) Classical (a priori) theory.
D) Relative frequency theory.
E) Relativist theory.
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10
Event 2C
Given the following event:
Given two urns, one containing 3 white, 4 blue, and 5 pink balls, and the other containing 2 white, 3 blue, and 7 pink balls. A single ball is drawn from each.
Given Event 2C, what is the probability that at least one ball is blue?
A) 5/12
B) 7/12
C) 1/2
D) 11/24
E) 3/8
Given the following event:
Given two urns, one containing 3 white, 4 blue, and 5 pink balls, and the other containing 2 white, 3 blue, and 7 pink balls. A single ball is drawn from each.
Given Event 2C, what is the probability that at least one ball is blue?
A) 5/12
B) 7/12
C) 1/2
D) 11/24
E) 3/8
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11
To compute the probability of having a loaded die turn up six, the theory of probability that would normally be used is the:
A) Relative frequency theory.
B) Classical (a priori) theory.
C) Subjectivist theory.
D) Conditional theory.
E) Relativist theory.
A) Relative frequency theory.
B) Classical (a priori) theory.
C) Subjectivist theory.
D) Conditional theory.
E) Relativist theory.
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12
Data Set 2A
Suppose that the ages of 8 kittens in a pet shop are as follows:
1, 2, 2, 3, 3, 4, 4, 5
To compute the probability of having a fair coin turn up heads four times on four tosses, the theory of probability that would normally be used is the:
A) Conditional theory.
B) Classical (a priori) theory.
C) Subjectivist theory.
D) Relative frequency theory.
E) Relativist theory.
Suppose that the ages of 8 kittens in a pet shop are as follows:
1, 2, 2, 3, 3, 4, 4, 5
To compute the probability of having a fair coin turn up heads four times on four tosses, the theory of probability that would normally be used is the:
A) Conditional theory.
B) Classical (a priori) theory.
C) Subjectivist theory.
D) Relative frequency theory.
E) Relativist theory.
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13
Event 1B
Given the following event:
Suppose an irregular 7-sided solid object, having sides numbered 1 through 7, is rolled 100 times, and side 4 turns up 12 times.
What is the approximate probability of Event 1B happening?
A) .33
B) .12
C) 1/12
D) 1/7
E) 7/12
Given the following event:
Suppose an irregular 7-sided solid object, having sides numbered 1 through 7, is rolled 100 times, and side 4 turns up 12 times.
What is the approximate probability of Event 1B happening?
A) .33
B) .12
C) 1/12
D) 1/7
E) 7/12
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14
To compute the probability of one team winning against another in a sporting event, the theory of probability that would normally be used is the:
A) Classical (a priori) theory.
B) Conditional theory.
C) Subjectivist theory.
D) Relativist theory.
E) Relative frequency theory.
A) Classical (a priori) theory.
B) Conditional theory.
C) Subjectivist theory.
D) Relativist theory.
E) Relative frequency theory.
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15
What is the probability of getting at least 1 head on 4 successive tosses of a coin?
A) 31/32
B) 7/8
C) 3/4
D) 13/16
E) 15/16
A) 31/32
B) 7/8
C) 3/4
D) 13/16
E) 15/16
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16
What is the probability of drawing two hearts from a poker deck (no jokers) if the first card is not replaced before the second is drawn?
A) 13/51
B) 1/16
C) 13/52
D) 1/17
E) 1/32
A) 13/51
B) 1/16
C) 13/52
D) 1/17
E) 1/32
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17
Given an urn containing 3 red balls, 4 green balls, and 5 yellow balls. What is the probability of drawing either a red ball or a green ball on a single draw?
A) 7/12
B) 1/2
C) 2/5
D) 2/3
E) 3/7
A) 7/12
B) 1/2
C) 2/5
D) 2/3
E) 3/7
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18
Event 2C
Given the following event:
Given two urns, one containing 3 white, 4 blue, and 5 pink balls, and the other containing 2 white, 3 blue, and 7 pink balls. A single ball is drawn from each.
Given Event 2C, what is the probability that both balls are pink?
A) 17/72
B) 35/144
C) 19/72
D) 1/4
E) 2/7
Given the following event:
Given two urns, one containing 3 white, 4 blue, and 5 pink balls, and the other containing 2 white, 3 blue, and 7 pink balls. A single ball is drawn from each.
Given Event 2C, what is the probability that both balls are pink?
A) 17/72
B) 35/144
C) 19/72
D) 1/4
E) 2/7
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19
Event 3C
Given the following event:
Given an urn containing 3 white, 4 blue, and 5 pink balls. Two balls are drawn and the first ball is not replaced before the second is drawn.
Given Event 3C, what is the probability that at least one ball is either white or blue?
A) 9/11
B) 119/144
C) 10/72
D) 28/33
E) 29/33
Given the following event:
Given an urn containing 3 white, 4 blue, and 5 pink balls. Two balls are drawn and the first ball is not replaced before the second is drawn.
Given Event 3C, what is the probability that at least one ball is either white or blue?
A) 9/11
B) 119/144
C) 10/72
D) 28/33
E) 29/33
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20
Event 1C
Given the following event:
Suppose an irregular 5-sided solid object, having sides numbered 1 through 5, is rolled 100 times, and side 3 turns up 16 times.
What is the approximate probability of Event 1C happening?
A) .08
B) .32
C) 1/16
D) .20
E) .16
Given the following event:
Suppose an irregular 5-sided solid object, having sides numbered 1 through 5, is rolled 100 times, and side 3 turns up 16 times.
What is the approximate probability of Event 1C happening?
A) .08
B) .32
C) 1/16
D) .20
E) .16
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21
Given an urn containing 4 red balls, 2 blue balls, and 3 yellow balls. What is the probability of drawing either a red ball or a blue ball on a single draw?
A) 2/3
B) 1/2
C) 8/9
D) 1/3
E) 4/9
A) 2/3
B) 1/2
C) 8/9
D) 1/3
E) 4/9
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22
Event 1A
Given the following event:
Suppose an irregular 4-sided solid object, having sides numbered 1 through 4, is rolled 100 times, and side 3 turns up 28 times.
In regard to Event 1A , what are the odds?
A) 7 to 18
B) 7 to 32
C) 7 to 25
D) 3 to 28
E) 1 to 7
Given the following event:
Suppose an irregular 4-sided solid object, having sides numbered 1 through 4, is rolled 100 times, and side 3 turns up 28 times.
In regard to Event 1A , what are the odds?
A) 7 to 18
B) 7 to 32
C) 7 to 25
D) 3 to 28
E) 1 to 7
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23
To compute the probability of the LA Lakers defeating the Boston Celtics in their upcoming game, the theory of probability that would typically be used is the:
A) Relative frequency theory.
B) Conditional theory.
C) Classical (a priori) theory.
D) Relativist theory.
E) Subjectivist theory.
A) Relative frequency theory.
B) Conditional theory.
C) Classical (a priori) theory.
D) Relativist theory.
E) Subjectivist theory.
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24
What is the probability of getting at least 1 head on 5 successive tosses of a coin?
A) 3/4
B) 7/8
C) 31/32
D) 5/8
E) 15/16
A) 3/4
B) 7/8
C) 31/32
D) 5/8
E) 15/16
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25
What is the probability of getting at least 1 head on 3 successive tosses of a coin?
A) 1/8
B) 3/4
C) 5/8
D) 15/16
E) 7/8
A) 1/8
B) 3/4
C) 5/8
D) 15/16
E) 7/8
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26
Given an urn containing 4 green balls and 5 orange balls. If two balls are drawn and the first ball is not replaced before the second is drawn, what is the probability that both balls are green?
A) 7/18
B) 1/6
C) 4/27
D) 7/17
E) 16/81
A) 7/18
B) 1/6
C) 4/27
D) 7/17
E) 16/81
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27
If the odds of the Yankees beating the Red Sox are 5 to 3, what is the probability of this event happening?
A) 1/8
B) 5/8
C) 3/5
D) 3/8
E) 5/3
A) 1/8
B) 5/8
C) 3/5
D) 3/8
E) 5/3
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28
On one roll of a pair of dice, what is the probability of the points adding up to 5?
A) 1/3
B) 1/9
C) 1/12
D) 5/36
E) 2/9
A) 1/3
B) 1/9
C) 1/12
D) 5/36
E) 2/9
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29
To compute the probability of drawing a jack and a queen from a poker deck (without replacing the first card before drawing the second) the theory of probability that would likely be used is the:
A) Relative frequency theory.
B) Subjectivist theory.
C) Conditional theory.
D) Classical (a priori) theory.
E) Relativist theory.
A) Relative frequency theory.
B) Subjectivist theory.
C) Conditional theory.
D) Classical (a priori) theory.
E) Relativist theory.
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30
Given an urn containing 3 red balls and 4 white balls. If two balls are drawn and the first ball is not replaced before the second is drawn, what is the probability that both balls are red?
A) 2/7
B) 7/12
C) 1/6
D) 1/7
E) 1/5
A) 2/7
B) 7/12
C) 1/6
D) 1/7
E) 1/5
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31
Event 2B
Given the following event:
Given an urn containing 2 green, 3 white, and 4 red balls. Two balls are drawn and the first ball is not replaced before the second is drawn.
Given Event 2B, what is the probability that the first ball is white and the second is red?
A) 2/3
B) 7/17
C) 4/27
D) 1/6
E) 2/9
Given the following event:
Given an urn containing 2 green, 3 white, and 4 red balls. Two balls are drawn and the first ball is not replaced before the second is drawn.
Given Event 2B, what is the probability that the first ball is white and the second is red?
A) 2/3
B) 7/17
C) 4/27
D) 1/6
E) 2/9
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32
Event 1A
Given the following event:
Suppose an irregular 4-sided solid object, having sides numbered 1 through 4, is rolled 100 times, and side 3 turns up 28 times.
What is the approximate probability of Event 1A happening?
A) 3/28
B) 7/25
C) 7/32
D) 1/7
E) 3/7
Given the following event:
Suppose an irregular 4-sided solid object, having sides numbered 1 through 4, is rolled 100 times, and side 3 turns up 28 times.
What is the approximate probability of Event 1A happening?
A) 3/28
B) 7/25
C) 7/32
D) 1/7
E) 3/7
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33
Event 2B
Given the following event:
Given an urn containing 2 green, 3 white, and 4 red balls. Two balls are drawn and the first ball is not replaced before the second is drawn.
Given Event 2B, what is the probability that the two balls are the same color?
A) 1/3
B) 2/9
C) 5/18
D) 1/6
E) 5/9
Given the following event:
Given an urn containing 2 green, 3 white, and 4 red balls. Two balls are drawn and the first ball is not replaced before the second is drawn.
Given Event 2B, what is the probability that the two balls are the same color?
A) 1/3
B) 2/9
C) 5/18
D) 1/6
E) 5/9
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34
To compute the probability that a mass produced rocket engine would fail prematurely, the theory of probability that would likely be used is the:
A) Classical (a priori) theory.
B) Relative frequency theory.
C) Subjectivist theory.
D) Conditional theory.
E) Relativist theory.
A) Classical (a priori) theory.
B) Relative frequency theory.
C) Subjectivist theory.
D) Conditional theory.
E) Relativist theory.
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35
Event 3B
Given the following event:
Given two urns, one containing 1 yellow, 3 red, and 5 blue balls, and the other containing 4 yellow, 2 red, and 3 blue balls. A single ball is drawn from each.
Given Event 3B, what is the probability that at least one is either yellow or red?
A) 7/9
B) 5/27
C) 1/3
D) 2/3
E) 22/27
Given the following event:
Given two urns, one containing 1 yellow, 3 red, and 5 blue balls, and the other containing 4 yellow, 2 red, and 3 blue balls. A single ball is drawn from each.
Given Event 3B, what is the probability that at least one is either yellow or red?
A) 7/9
B) 5/27
C) 1/3
D) 2/3
E) 22/27
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36
Event 3B
Given the following event:
Given two urns, one containing 1 yellow, 3 red, and 5 blue balls, and the other containing 4 yellow, 2 red, and 3 blue balls. A single ball is drawn from each.
Given Event 3B, what is the probability that one is red, the other is blue?
A) 2/3
B) 3/27
C) 77/81
D) 19/81
E) 1/3
Given the following event:
Given two urns, one containing 1 yellow, 3 red, and 5 blue balls, and the other containing 4 yellow, 2 red, and 3 blue balls. A single ball is drawn from each.
Given Event 3B, what is the probability that one is red, the other is blue?
A) 2/3
B) 3/27
C) 77/81
D) 19/81
E) 1/3
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37
Given an urn containing 2 pink balls, 3 green balls, and 5 yellow balls. What is the probability of drawing either a green ball or a yellow ball on a single draw?
A) 2/25
B) 3/20
C) 3/4
D) 9/10
E) 4/5
A) 2/25
B) 3/20
C) 3/4
D) 9/10
E) 4/5
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38
What is the probability of drawing either an ace or a king from a poker deck (no jokers) on a single draw?
A) 1/52
B) 1/26
C) 1/13
D) 2/13
E) 1/4
A) 1/52
B) 1/26
C) 1/13
D) 2/13
E) 1/4
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39
If the odds of the Dodgers defeating the Astros are 4 to 5, what is the probability of this event happening?
A) .20
B) 5/9
C) 4/9
D) .50
E) .80
A) .20
B) 5/9
C) 4/9
D) .50
E) .80
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40
What is the probability of drawing a black jack from a poker deck (no jokers) on a single draw?
A) 2/13
B) 1/4
C) 1/26
D) 1/13
E) 1/52
A) 2/13
B) 1/4
C) 1/26
D) 1/13
E) 1/52
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41
On one roll of a pair of dice, what is the probability of the points adding up to 6?
A) 5/36
B) 1/9
C) 1/6
D) 7/36
E) 2/9
A) 5/36
B) 1/9
C) 1/6
D) 7/36
E) 2/9
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42
Event 2A
Given the following event:
Given an urn containing 2 black, 3 yellow, and 5 orange balls. Two balls are drawn and the first ball is not replaced before the second is drawn.
Given Event 2A, what is the probability that the two balls are the same color?
A) 7/25
B) 19/45
C) 14/45
D) 8/25
E) 1/4
Given the following event:
Given an urn containing 2 black, 3 yellow, and 5 orange balls. Two balls are drawn and the first ball is not replaced before the second is drawn.
Given Event 2A, what is the probability that the two balls are the same color?
A) 7/25
B) 19/45
C) 14/45
D) 8/25
E) 1/4
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43
Event 3A
Given the following event:
Given two urns, one containing 2 green, 3 yellow, and 5 pink balls, and the other containing 4 green, 2 yellow, and 4 pink balls. A single ball is drawn from each.
Given Event 3A, what is the probability that at least one is either green or yellow?
A) 4/5
B) 4/25
C) 1/5
D) 21/25
E) 67/100
Given the following event:
Given two urns, one containing 2 green, 3 yellow, and 5 pink balls, and the other containing 4 green, 2 yellow, and 4 pink balls. A single ball is drawn from each.
Given Event 3A, what is the probability that at least one is either green or yellow?
A) 4/5
B) 4/25
C) 1/5
D) 21/25
E) 67/100
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44
Event 3A
Given the following event:
Given two urns, one containing 2 green, 3 yellow, and 5 pink balls, and the other containing 4 green, 2 yellow, and 4 pink balls. A single ball is drawn from each.
Given Event 3A, what is the probability that one is green, the other is pink?
A) 1/4
B) 2/3
C) 8/25
D) 47/50
E) 7/25
Given the following event:
Given two urns, one containing 2 green, 3 yellow, and 5 pink balls, and the other containing 4 green, 2 yellow, and 4 pink balls. A single ball is drawn from each.
Given Event 3A, what is the probability that one is green, the other is pink?
A) 1/4
B) 2/3
C) 8/25
D) 47/50
E) 7/25
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45
Event 2A
Given the following event:
Given an urn containing 2 black, 3 yellow, and 5 orange balls. Two balls are drawn and the first ball is not replaced before the second is drawn.
Given Event 2A, what is the probability that the first ball is orange and the second is yellow?
A) 1/25
B) 1/3
C) 3/20
D) 1/6
E) 1/5
Given the following event:
Given an urn containing 2 black, 3 yellow, and 5 orange balls. Two balls are drawn and the first ball is not replaced before the second is drawn.
Given Event 2A, what is the probability that the first ball is orange and the second is yellow?
A) 1/25
B) 1/3
C) 3/20
D) 1/6
E) 1/5
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