Regressions Word Problems

Authored by Barbara White

Mathematics

10th - 12th Grade

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11 questions

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MULTIPLE CHOICE QUESTION

15 mins • 1 pt

The data table in the picture shows the average length of daylight for each month of the year. Calculate the sinusoidal regression equation of the data.

y = 2.69sin(0.512x - 1.47) + 11.89

y = 11.89sin(2.69x + 0.512) - 1.47

y = -0.106x + 12.44

y = 12.44x - 0.106

MULTIPLE CHOICE QUESTION

15 mins • 1 pt

This equation models the data from question 1, where x stands for month of the year and y stands for daylight hours. Use the equation to predict th length of daylight during the month of May.

5 hours

14.28 hours

11.9 hours

13.85 hours

MULTIPLE CHOICE QUESTION

15 mins • 1 pt

Calculate the period of the regression equation.

12.27

0.512

2.69

2.34

MULTIPLE CHOICE QUESTION

15 mins • 1 pt

What would be the ideal (expected) period for this data?

12 since there are 12 months in the year.

365 since there are 365 days in the year.

24 since there are 24 hours in a day.

5 since May is the 5th month.

MULTIPLE CHOICE QUESTION

15 mins • 1 pt

What is the range of daylight hours according to this regression equation?

9.2 to 14.6

8.8 to 15.2

9.8 to 13.2

11.3 to 12.4

MULTIPLE CHOICE QUESTION

15 mins • 1 pt

At a pier, scientists measure the depth of the water according to the tides. At high tide, the water depth is 8 feet. At low tide, 6.2 hours later, the depth is 5 feet. Which of the following shows how you would fill-in the next 4 depths in the table?

6.5, 5, 6.5, 8

4, 0, 4, 8

5, 2.5, 5, 8

5, 8, 5, 8

At a pier, scientists measure the depth of the water according to the tides. At high tide, the water depth is 8 feet. At low tide, 6.2 hours later, the depth is 5 feet. Calculate the sinusoidal regression equation that models this scenario.

1.5sin(0.507x + 1.57) + 6.5

0.507 sin(1.5x + 6.5) + 1.57

y = 6.8x

y = 6.2x + 5

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Regressions Word Problems

The data table in the picture shows the average length of daylight for each month of the year. Calculate the sinusoidal regression equation of the data.

This equation models the data from question 1, where x stands for month of the year and y stands for daylight hours. Use the equation to predict th length of daylight during the month of May.

Calculate the period of the regression equation.

What would be the ideal (expected) period for this data?

What is the range of daylight hours according to this regression equation?

At a pier, scientists measure the depth of the water according to the tides. At high tide, the water depth is 8 feet. At low tide, 6.2 hours later, the depth is 5 feet. Which of the following shows how you would fill-in the next 4 depths in the table?

At a pier, scientists measure the depth of the water according to the tides. At high tide, the water depth is 8 feet. At low tide, 6.2 hours later, the depth is 5 feet. Calculate the sinusoidal regression equation that models this scenario.

At a pier, scientists measure the depth of the water according to the tides. At high tide, the water depth is 8 feet. At low tide, 6.2 hours later, the depth is 5 feet. Use the equation to predict the depth after 4 hours.

At a pier, scientists measure the depth of the water according to the tides. At high tide, the water depth is 8 feet. At low tide, 6.2 hours later, the depth is 5 feet. Use the equation to calculate how many hours it will be before the water depth is first below 7 feet?

At a pier, scientists measure the depth of the water according to the tides. At high tide, the water depth is 8 feet. At low tide, 6.2 hours later, the depth is 5 feet. Use the equation or table to decide: how often does the tide cycle repeat?

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