Illustrative Math - Algebra 1 - Unit 1- Lesson 16

By Formative Library
Last updated 23 days ago
12 Questions
1.

Here are the statistics for the high temperatures in a city during October:
  • mean of 65.3 degrees Fahrenheit
  • median of 63.5 degrees Fahrenheit
  • standard deviation of 9.3 degrees Fahrenheit
  • IQR of 7.1 degeres Fahrenheit
Recall that the temperature C, measured in degrees Celsius, is related to the temperature F, measured in degrees Fahrenheit, by C=\frac{5}{9}(F-32).

Describe how the value of each statistic changes when 32 is subtracted from the temperature in degrees Fahrenheit.

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2.

Here are the statistics for the high temperatures in a city during October:
  • mean of 65.3 degrees Fahrenheit
  • median of 63.5 degrees Fahrenheit
  • standard deviation of 9.3 degrees Fahrenheit
  • IQR of 7.1 degeres Fahrenheit
Recall that the temperature C, measured in degrees Celsius, is related to the temperature F, measured in degrees Fahrenheit, by C=\frac{5}{9}(F-32).

Describe how the value of each statistic further changes when the new values are multiplied by \frac{5}{9}.

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3.

Here are the statistics for the high temperatures in a city during October:
  • mean of 65.3 degrees Fahrenheit
  • median of 63.5 degrees Fahrenheit
  • standard deviation of 9.3 degrees Fahrenheit
  • IQR of 7.1 degeres Fahrenheit
Recall that the temperature C, measured in degrees Celsius, is related to the temperature F, measured in degrees Fahrenheit, by C=\frac{5}{9}(F-32).

Describe how to find the value of each statistic when the temperature is measured in degrees Celsius.

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4.

Here is a box plot.
Give an example of a box plot that has a greater median and a greater measure of variability, but the same minimum and maximum values.

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5.

The mean vitamin C level for 20 dogs was 7.6 milligrams per liter, with a standard deviation of 2.1 milligrams per liter.

One dog’s vitamin C level was not in the normal range. It was 0.9 milligrams per liter, which is a very low level of vitamin C.

If the value 0.9 is eliminated from the data set, does the mean increase or decrease?

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6.

The mean vitamin C level for 20 dogs was 7.6 milligrams per liter, with a standard deviation of 2.1 milligrams per liter.

One dog’s vitamin C level was not in the normal range. It was 0.9 milligrams per liter, which is a very low level of vitamin C.

If the value 0.9 is eliminated from the data set, does the standard deviation increase or decrease?

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7.

The data set represents the number of hours that fifteen students walked during a two-week period.

6, 6, 7, 8, 8, 8, 9, 10, 10, 12, 13, 14, 15, 16, 30

The median is 10 hours, Q1 is 8, Q3 is 14, and the IQR is 6 hours. Are there any outliers in the data?

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8.

Here are some summary statistics about the number of accounts that follow some bands on social media.
  • mean: 15,976 followers
  • median: 16,432 followers
  • standard deviation: 3,279 followers
  • Q1: 13,796
  • Q3: 19,070
  • IQR: 5,274 followers
Give an example of a number of followers that a very popular band might have that would be considered an outlier for this data. Explain or show your reasoning.

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9.

Here are some summary statistics about the number of accounts that follow some bands on social media.
  • mean: 15,976 followers
  • median: 16,432 followers
  • standard deviation: 3,279 followers
  • Q1: 13,796
  • Q3: 19,070
  • IQR: 5,274 followers
Give an example of a number of followers that a relatively unknown band might have that would be considered an outlier for this data. Explain or show your reasoning.

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10.

The weights of one population of mountain gorillas have a mean of 203 pounds and standard deviation of 18 pounds. The weights of another population of mountain gorillas have a mean of 180 pounds and standard deviation of 25 pounds. Andre says the two populations are similar.

Do you agree?

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11.

The box plot represents the distribution of the amount of change, in cents, that 50 people were carrying when surveyed.
The box plot represents the distribution of the same data set, but with the maximum, 203, removed.
The median is 25 cents for both plots. After examining the data, the value 203 is removed since it was an error in recording.

Explain why the median remains the same when 203 cents was removed from the data set.

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12.

The box plot represents the distribution of the amount of change, in cents, that 50 people were carrying when surveyed.
The box plot represents the distribution of the same data set, but with the maximum, 203, removed.
The median is 25 cents for both plots. After examining the data, the value 203 is removed since it was an error in recording.

When 203 cents is removed from the data set, does the mean remain the same? Explain your reasoning.

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This lesson is from Illustrative Mathematics. Algebra 1, Unit 1, Lesson 16. Internet. Available from https://curriculum.illustrativemathematics.org/HS/teachers/1/1/16/index.html ; accessed 26/July/2021.

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