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STAT 200 Sophia Introduction to Statistics Unit 3 Milestone 3
Which of the following is a property of binomial
... [Show More] distributions?
All of the observations made are dependent of each other.
There are exactly four possible outcomes for each trial.
The expected value is equal to the number of successes in the experiment.
The variable of interest is the total number of successes or failures for a given number of observations.
RATIONALE
Recall that for the binomial distribution we are concerned with an event occurring (successes) or not occurring (failures) in a given number of trails (n).
CONCEPT
Binomial Distribution 2
A survey asked 1,000 people which magazine they preferred, given three choices. The table below breaks the votes down by magazine and age group.
Age Below 40 Age 40 and Above
The National Journal 104 200
Newsday 120 230
The Month 240 106
If a survey is selected at random, what is the probability that the person voted for "Newsday" and is also age 40 or older? Answer choices are rounded to the hundredths place.
0.34
0.54
0.23
0.66
RATIONALE
If we want the probability of people who voted for "Newsday" and are also age 40 and over, we just need to look at the box that is associated with both categories, or 230. To calculate the probability, we can use the following formula:
CONCEPT
Two-Way Tables/Contingency Tables 3
Zhi and her friends moved on to the card tables at the casino. Zhi wanted to figure out the probability of drawing a King of clubs or an Ace of clubs.
Choose the correct probability of drawing a King of clubs or an Ace of clubs. Answer choices are in the form of a percentage, rounded to the nearest whole number.
8%
4%
2%
6%
RATIONALE
Since the two events, drawing a King of Clubs and drawing an Ace of Clubs, are non-overlapping, we can use the following formula:
CONCEPT
"Either/Or" Probability for Non-Overlapping Events 4
Which of the following situations describes a discrete distribution?
A probability distribution showing the weights of newborns.
A probability distribution showing the heights of children in a first grade class.
A probability distribution of the quantity of babies in the intensive care unit.
A probability distribution showing the average time it takes for children to walk to school.
RATIONALE
A distribution is discrete if the outcomes we are measuring can only take on a limited number of values. The number of babies in an intensive care unit can be 0, 1, 2, and so on, which are a limited set of values.
CONCEPT
Probability Distribution 5
What is the probability of NOT drawing a Queen from a standard deck of 52 cards?
RATIONALE
Recall that the probability of a complement, or the probability of something NOT happening, can be calculated by finding the probability of that event happening, and then subtracting from 1. Note that there are a total of 4 Queen cards in a standard deck of 52 cards. So the probability of NOT getting a Queen is equivalent to:
CONCEPT
Complement of an Event 6
Fifty people were asked whether they were left handed. Six people answered "yes."
What is the relative frequency of left-handed people in this group? Answer choices are rounded to the hundredths place.
1.14
0.88
8.33
0.12
RATIONALE
The relative frequency of a left hand is:
CONCEPT
Relative Frequency Probability/Empirical Method 7
Colleen has 6 eggs, one of which is hard-boiled while the rest are raw. Colleen can't remember which of the eggs are raw.
Which of the following statements is true?
If Colleen selected one egg, cracked it open and found out it was raw, the probability of selecting the hard-boiled egg on her second pick is 1/5.
If Colleen selected one egg, cracked it open and found out it was raw, the probability of selecting the hard-boiled egg on her second pick is 1/6.
The probability of Colleen selecting a raw egg on her first try is 1/6.
The probability of Colleen selecting the hard-boiled egg on her first try is 1/5.
RATIONALE
The probability of choosing the hard-boiled egg is 1/6. If she cracks an egg and it is not the hard-boiled egg, then it becomes 1/5 on the next try because there are now only 5 eggs remaining and one has to be the hard-boiled egg as she did not pick it on the first try.
CONCEPT
Independent vs. Dependent Events 8
Two sets A and B are shown in the Venn diagram below.
Which statement is TRUE?
There are a total of 2 elements shown in the Venn diagram.
Set A has 8 elements.
Set B has 7 elements.
Sets A and B have 3 common elements.
RATIONALE
The intersection, or middle section, would show the common elements, which is 3.
The number of elements of Set A is everything in Circle A, or 8+3 = 11 elements, not 8 elements. The number of elements of Set B is everything in Circle B, or 7+3 = 10 elements, not 7 elements.
To get the total number of items in the Venn diagram, we add up what is in A and B and outside, which is 8+3+7+2=20 elements, not 2 elements.
CONCEPT
Venn Diagrams 9
Eric is randomly drawing cards from a deck of 52. He first draws a red card, places it back in the deck, shuffles the deck, and then draws another card.
What is the probability of drawing a red card, placing it back in the deck, and drawing another red card? Answer choices are in the form of a percentage, rounded to the nearest whole number.
25%
4%
22%
13%
RATIONALE
Since Eric puts the card back and re-shuffles, the two events (first draw and second draw) are independent of each other. To find the probability of red on the first draw and second draw, we can use the following formula:
Note that the probability of drawing a red card is or for each event.
CONCEPT
"And" Probability for Independent Events 10
Asmita went to a blackjack table at the casino. At the table, the dealer has just shuffled a standard deck of 52 cards.
Asmita has had good luck at blackjack in the past, and she actually got three blackjacks with Aces in a row the last time she played. Because of this lucky run, Asmita thinks that Ace is the luckiest card.
The dealer deals the first card to her. In a split second, she can see that it is a non-face card, but she is unsure if it is an Ace.
What is the probability of the card being an Ace, given that it is a non-face card? Answer choices are in a percentage format, rounded to the nearest whole number.
69%
8%
10%
77%
RATIONALE
The probability of it being an Ace given it is a Non-face card uses the conditional formula:
Note, that in a standard deck of 52 cards, there are 12 face cards, so 40 non-face cards. Of those non-face cards, there are only 4 Aces.
CONCEPT
Conditional Probability
11
Using this Venn diagram, what is the probability that event A or event B occurs?
0.42
0.22
0.60
0.78
RATIONALE
To find the probability that event A or event B occurs, we can use the following formula for overlapping events:
The probability of event A is ALL of circle A, or 0.39 + 0.18 = 0.57. The probability of event B is ALL of circle B, or 0.21 + 0.18 = 0.39.
The probability of event A and B is the intersection of the Venn diagram, or 0.18. We can also simply add up all the parts = 0.39 + 0.18 + 0.21 = 0.78.
CONCEPT
"Either/Or" Probability for Overlapping Events 12
The gender and age of Acme Painting Company's employees are shown below.
Age Gender
23 Female
23 Male
24 Female
26 Female
27 Male
28 Male
30 Male
31 Female
33 Male
33 Female
33 Female
34 Male
36 Male
37 Male
38 Female
40 Female
42 Male
44 Female
If the CEO is selecting one employee at random, what is the chance he will select a male OR someone in their 40s?
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