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## Go Math Grade 8 Answer Key Chapter 14 Scatter Plots

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**Lesson 1: Scatter Plots and Association**

**Lesson 2: Trend Lines and Predictions**

**Model Quiz**

**Mixed Review**

### Guided Practice – Scatter Plots and Association – Page No. 436

**Bob recorded his height at different ages. The table below shows his data.**

Question 1.

Make a scatter plot of Bob’s data.

Type below:

_____________

Answer:

Explanation:

As Bob gets older, his height increases along with the straight line on the

graph. So, the association is positive and linear.

Question 3.

The scatter plot shows the basketball shooting results for 14 players. Describe any clusters you see in the scatter plot. Identify any outliers.

Type below:

_____________

Answer:

There is an outlier at (35,18)

Explanation:

There is a cluster in the “20 – 25” shots attempted range and a smaller cluster in the “5 – 14” shots attempted range.

There is an outlier at (35,18)

**ESSENTIAL QUESTION CHECK-IN**

Question 4.

Explain how you can make a scatter plot from a set of bivariate data.

Type below:

_____________

Answer:

Bivariate data – data that has two variables per observation,

An x variable and y variable.

Scatterplot – The graph displaying categorical data, with an x and y-axis.

Response Variable – the variable that is explained by the other.

Explanatory Variable – the variable which explains the other.

### 14.1 Independent Practice – Scatter Plots and Association – Page No. 437

**Sports Use the scatter plot for 5–8.**

**Olympic Men’s Long Jump Winning Distances**

Question 5.

Describe the association between the year and the distance jumped for the years 1960 to 1988.

Type below:

_____________

Answer:

The data shows a positive linear association. If the year increases, the winning distance increases.

Question 9.

Communicate Mathematical Ideas Compare a scatter plot that shows no association to one that shows a negative association.

Type below:

_____________

Answer:

Randomly scattered data points with no apparent pattern define a scatter plot with no association. Data points that fall from left to right and have data set values that increase as the other decreases define a scatter plot with a negative association.

### Scatter Plots and Association – Page No. 438

**For 10–11, describe a set of real-world bivariate data that the given scatter plot could represent. Define the variable represented on each axis.**

Question 10.

_____________

Answer:

The x-axis represents the number of containers. The y-&is represents the price per container.

Question 11.

_____________

Answer:

The x-axis represents the number of hours spent watching tv. The y-axis represents the number of TVs owned.

**FOCUS ON HIGHER ORDER THINKING**

Question 12.

Multiple Representations Describe what you might see in a table of bivariate data that would lead you to conclude that the scatter plot of the data would show a cluster.

Type below:

_____________

Answer:

A cluster in a scatter plot is when there are a lot of points all grouped around the same location.

Look for points that have the same input and output values. If there are a lot of points together, you must have a cluster in your scatter plot.

### Guided Practice – Trend Lines and Predictions – Page No. 442

**Angela recorded the price of different weights of several bulk grains. She made a scatter plot of her data. Use the scatter plot for 1–4.**

Question 1.

Draw a trend line for the scatter plot.

Type below:

_____________

Answer:

Question 2.

How do you know whether your trend line is a good fit for the data?

Type below:

_____________

Answer:

Most of the data points are close to the trend line. The trend line has about the same number of points above and below it.

**ESSENTIAL QUESTION CHECK-IN**

Question 5.

A trend line passes through two points on a scatter plot. How can you use the trend line to make a prediction between or outside the given data points?

Type below:

_____________

Answer:

Use two points on the line. rind the slope and y-intercept. Substitute the values of the slope (m) and y-intercept (b) to form an equation using y = mx + b. Substitute the value of x for which you want to make a prediction and solve for y OR substitute your prediction for y and solve to find its value.

### 14.2 Independent Practice – Trend Lines and Predictions – Page No. 443

**Use the data in the table for Exercises 6–10.**

Question 6.

Make a scatter plot of the data and draw a trend line.

Type below:

_____________

Answer:

Question 7.

What type of association does the trend line show?

Type below:

_____________

Answer:

Negative Association

Explanation:

One data set increases – Wind Speed and the other – Wind Chill decrease. So, the trend line shows a Negative Association.

Question 9.

Make a Prediction Use the trend line to predict the wind chill at these wind speeds.

a. 36 mi/h

_________ °F

Answer:

-6.5°F

Explanation:

Use the trend line to predict the wind chill at 36mi/h

y = -0.25x + 2.5

y = -0.25(36) + 2.5

y = -9 + 2.5

y = -6.5

The wind chill at 36mi/h is -6.5ºF

Question 9.

b. 100 mi/h

_________ °F

Answer:

-22.5°F

Explanation:

Use the trend line to predict the wind chill at 100mi/h

y = -0.25x + 2.5

y = -0.25(100) + 2.5

y = -25 + 2.5

y = -22.5

The wind chill at 100mi/h is -22.5ºF

Question 10.

What is the meaning of the slope of the line?

Type below:

_____________

Answer:

The slope means that the wind chill falls about 1°F for every 4 mph increase in wind speed.

**Use the data in the table for Exercises 11–14.**

Question 11.

Make a scatter plot of the data and draw a trend line.

Type below:

_____________

Answer:

Question 14.

What is the meaning of the y-intercept of the line?

Type below:

_____________

Answer:

The y-intercept explains that at 0% humidity, the apparent temperature is 64ºF

### FOCUS ON HIGHER ORDER THINKING – Trend Lines and Predictions – Page No. 444

Question 15.

Communicate Mathematical Ideas Is it possible to draw a trend line on a scatter plot that shows no association? Explain.

_____________

Answer:

No

Explanation:

It is not possible to draw a trend line on a scatter plot that shows no association. If the scatter plot shows no association, the data points have no relationships with one another. You can draw a trend line if a linear association is available.

Question 16.

Critique Reasoning Sam drew a trend line that had about the same number of data points above it as below it, but did not pass through any data points. He then picked two data points to write the equation for the line. Is this the correct way to write the equation? Explain.

_____________

Answer:

No

Explanation:

Sam did not use the correct way to write an equation.

Sam may have drawn a correct trend line but using the data points that are not on the trend line may have an incorrect equation for the line. He should use two points on that trend line to write the equation.

Question 17.

Marlene wanted to find a relationship between the areas and populations of counties in Texas. She plotted x (area in square miles) and y (population) for two counties on a scatter plot:

Kent County (903, 808) Edwards County (2118, 2002)

She concluded that the population of Texas counties is approximately equal to their area in square miles and drew a trend line through her points.

a. Critique Reasoning Do you agree with Marlene’s method of creating a scatter plot and a trend line? Explain why or why not.

_____________

Answer:

I do not agree with Marlene’s method of creating a scatter plot and a trend line. She did not have enough data. Marlene should have collected and plotted data for many more counties.

Question 17.

b. Counterexamples Harris County has an area of 1778 square miles and a population of about 4.3 million people. Dallas County has an area of 908 square miles and a population of about 2.5 million people. What does this data show about Marlene’s conjecture that the population of Texas counties is approximately equal to their area?

Type below:

_____________

Answer:

The data collected are only of two counties whose populations are nearly equal to their area. The fact that the populations of Harris and Dallas counties are in the millions, Marlene’s conjecture about the population of Texas counties being equivalent to their area is invalid.

### Ready to Go On? – Model Quiz – Page No. 445

**14.1 Scatter Plots and Association**

**An auto store is having a sale on motor oil. The chart shows the price per quart as the number of quarts purchased increases. Use the data for Exs. 1–2.**

Question 1.

Use the given data to make a scatter plot.

Type below:

_____________

Answer:

**14.2 Trend Lines and Predictions**

**The scatter plot below shows data comparing wind speed and wind chill for an air temperature of 20 °F. Use the scatter plot for Exs. 3–5.**

Question 3.

Draw a trend line for the scatter plot.

Type below:

_____________

Answer:

**ESSENTIAL QUESTION**

Question 6.

How can you use scatter plots to solve real-world problems?

Type below:

_____________

Answer:

Using a scatter plot, you can see positive and negative trends such as prices over time. You can also make predictions such as height at a certain age.

### Selected Response – Mixed Review – Page No. 446

Question 1.

Which scatter plot could have a trend line whose equation is y = 3x + 10?

Options:

a. A

b. B

c. C

d. D

Answer:

b. B

Question 2.

What type of association would you expect between a person’s age and hair length?

Options:

a. linear

b. negative

c. none

d. positive

Answer:

c. none

Explanation:

The length of their hair reduces. This is because the length of hair changes with the growth phase of the hair follicles. When one is young, the cells of the papilla divide more rapidly, and hence the length of the hair is long before reaching the transitional phase and then shedding off in the telogen phase. The older one gets, the papilla cells do not divide as rapidly and the length of the hair shortens with age.

Question 3.

Which is not shown on the scatter plot?

Options:

a. cluster

b. negative association

c. outlier

d. positive association

Answer:

d. positive association

Explanation:

The scatter plot shows a cluster, some outliers, and a negative association.

It does not show a positive association.

Question 4.

A restaurant claims to have served 352,000,000 hamburgers. What is this number in scientific notation?

Options:

a. 3.52 × 10^{6}

b. 3.52 × 10^{8}

c. 35.2 × 10^{7}

d. 352 × 10^{6}

Answer:

b. 3.52 × 10^{8}

Explanation:

100,000,000

So, 3.52 × 10^{8}

Question 5.

Which equation describes the relationship between x and y in the table?

Options:

a. y = −4x

b. y = −\(\frac{1}{4}\)x

c. y = 4x

d. y = \(\frac{1}{4}\)x

Answer:

b. y = −\(\frac{1}{4}\)x

Explanation:

In order to find out the relationship between x and y, we have to use the values in the question and substitute them into the solution options.

So, y = -1/4x

**Mini-Task**

Question 6.

Use the data in the table.

a. Make a scatterplot of the data.

Type below:

______________

Answer:

Question 6.

b. Which data point is an outlier?

Type below:

______________

Answer:

The outlier is the point (92, 135).

Question 6.

c. Predict the number of visitors on a day when the high temperature is 102 °F.

Type below:

______________

Answer:

Based on the cluster around 100°F, I would expect that on a day with a temperature of 102 °F, the pool would have between 350 and 400 visitors.

### Conclusion:

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