Use the image to answer the question.
An illustration of a histogram shows number of hours spent outside last week. The horizontal axis shows the number of hours outside ranging from 0 to 80 in increments of 10. The vertical axis shows the number of people ranging from 0 to 10 in increments of 2. The graph shows the following data: 0 to 10 hours spent outside by 5 people; 10 to 20 hours spent outside by 9 people; 20 to 30 hours spent outside by 2 people; 30 to 40 hours spent outside by 0 people; 40 to 50 hours spent outside by 1 person; 50 to 60 hours spent outside by 1 person; 60 to 70 hours spent outside by 0 people; 70 to 80 hours spent outside by 1 person.
Monica is curious about how much time her friends and family members spend outside. She asks her friends and family members to track their hours outside for one week. She organizes their responses into a histogram. Interpret the distribution of the data shown in the histogram by identifying whether it is symmetric or skewed.
(1 point)
Responses
The data in the histogram is symmetric and bimodal.
The data in the histogram is symmetric and bimodal.
The data in the histogram is skewed, with the majority of the data on the right side.
The data in the histogram is skewed, with the majority of the data on the right side.
The data in the histogram is symmetric and normal.
The data in the histogram is symmetric and normal.
The data in the histogram is skewed, with the majority of the data on the left side.
The data in the histogram is skewed, with the majority of the data on the left side.
The data in the histogram is skewed, with the majority of the data on the right side. This is because there are fewer people spending more hours outside (50 to 80 hours) compared to those spending fewer hours outside (0 to 30 hours).
Histograms Quick Check
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Question
Use the image to answer the question.
An illustration shows a histogram titled Number of Hours Friends Spent Outside Last Week. The horizontal axis is labeled Number of Hours Outside and ranges from 0 to 110 in increments of 10. The vertical axis is labeled Number of People and ranges from 0 to 10 in increments of 2. The graph shows the following data: 5 people spent 0 to 10 hours outside; 9 people spent 10 to 20 hours outside; 2 people spent 20 to 30 hours outside; 5 people spent 40 to 50 hours outside; 1 person spent 50 to 60 hours outside; 1 person spent 100 to 110 hours outside.
Monica is curious about how much time her friends and family members spend outside. She asks her friends and family members to track their hours outside for one week. She organizes their responses into a histogram. Interpret the distribution of the data shown in the histogram by identifying any gaps, clusters, or outliers.
(1 point)
Responses
The data in the histogram contains a cluster between 0 hours and 20 hours and another cluster between 40 hours and 50 hours. There is an outlier between 100 hours and 110 hours. There are no gaps.
The data in the histogram contains a cluster between 0 hours and 20 hours and another cluster between 40 hours and 50 hours. There is an outlier between 100 hours and 110 hours. There are no gaps.
The data in the histogram contains a cluster between 0 hours and 20 hours and another cluster between 40 hours and 50 hours. There is a gap between 30 hours and 40 hours. There is an outlier between 50 hours and 60 hours.
The data in the histogram contains a cluster between 0 hours and 20 hours and another cluster between 40 hours and 50 hours. There is a gap between 30 hours and 40 hours. There is an outlier between 50 hours and 60 hours.
The data in the histogram contains a cluster between 0 hours and 20 hours and another cluster between 40 hours and 50 hours. There is a gap between 30 hours and 40 hours. There is an outlier between 100 hours and 110 hours.
The data in the histogram contains a cluster between 0 hours and 20 hours and another cluster between 40 hours and 50 hours. There is a gap between 30 hours and 40 hours. There is an outlier between 100 hours and 110 hours.
The data in the histogram contains a cluster between 0 hours and 110 hours. There is a gap between 30 hours and 40 hours. There is an outlier between 100 hours and 110 hours.
The data in the histogram contains a cluster between 0 hours and 110 hours. There is a gap between 30 hours and 40 hours. There is an outlier between 100 hours and 110 hours.
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