Question
The following dot plot shows the number of wildcards in each of Sampson's decks of cards. Each dot represents a different deck.
"A dot plot. The number line, labeled Number of wildcards, is numbered 0 to 4.
Point 0 has 3 dots.
Point 1 has 1 dot.
Point 2 has 5 dots.
Point 3 has 2 dots.
Point 4 has 1 dot."
\[0\]
\[1\]
\[2\]
\[3\]
\[4\]
Which of the following is a typical number of wildcards in one of Sampson's decks?
Choose 1 answer:
Choose 1 answer:
(Choice A)
\[0\] wildcards
A
\[0\] wildcards
(Choice B)
\[2\] wildcards
B
\[2\] wildcards
(Choice C)
\[3\] wildcards
C
\[3\] wildcards
(Choice D)
\[5\] wildcards
D
\[5\] wildcards
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"A dot plot. The number line, labeled Number of wildcards, is numbered 0 to 4.
Point 0 has 3 dots.
Point 1 has 1 dot.
Point 2 has 5 dots.
Point 3 has 2 dots.
Point 4 has 1 dot."
\[0\]
\[1\]
\[2\]
\[3\]
\[4\]
Which of the following is a typical number of wildcards in one of Sampson's decks?
Choose 1 answer:
Choose 1 answer:
(Choice A)
\[0\] wildcards
A
\[0\] wildcards
(Choice B)
\[2\] wildcards
B
\[2\] wildcards
(Choice C)
\[3\] wildcards
C
\[3\] wildcards
(Choice D)
\[5\] wildcards
D
\[5\] wildcards
Related content
Answers
GPT-4o mini
To determine the typical number of wildcards in one of Sampson's decks based on the dot plot provided, we can look at the frequency of each number of wildcards:
- **0 wildcards:** 3 decks
- **1 wildcard:** 1 deck
- **2 wildcards:** 5 decks
- **3 wildcards:** 2 decks
- **4 wildcards:** 1 deck
The most frequent number of wildcards is 2, with 5 decks having that amount. In statistics, the typical value often refers to the mode, which is the value that appears most often in a data set.
Given this information, the answer for the typical number of wildcards in one of Sampson's decks would be:
(Choice B) \[2\] wildcards.
- **0 wildcards:** 3 decks
- **1 wildcard:** 1 deck
- **2 wildcards:** 5 decks
- **3 wildcards:** 2 decks
- **4 wildcards:** 1 deck
The most frequent number of wildcards is 2, with 5 decks having that amount. In statistics, the typical value often refers to the mode, which is the value that appears most often in a data set.
Given this information, the answer for the typical number of wildcards in one of Sampson's decks would be:
(Choice B) \[2\] wildcards.