Lesson 5How Crowded Is this Neighborhood?

Learning Goal

Let’s see how proportional relationships apply to where people live.

Activity 1: Dot Density

The figure shows four squares. Each square encloses an array of dots. Squares A and B have side length 2 inches. Squares C and D have side length 1 inch.

Four squares labeled A, B, C and D, each with an array of dots inside, as follows: Square A: 8 by 8 array. Square B: 16 by 16 array. Square C: 4 by 4 array. Square D: 8 by 8 array.

Complete the table with information about each square.
square
area of the square
in square inches
number
of dots
number of dots
per square inch
A
B
C
D
Compare each square to the others. What is the same and what is different?

Activity 2: Dot Density with a Twist

The figure shows two arrays, each enclosed by a square that is 2 inches wide.

Two equal sized squares with an array of dots inside each. The left square contains an 8 by 8 array of dots. In the right square, the array of dots are as follows: Row 1: 4 blue dots, 2 yellow dots. Row 2: 4 blue dots, 2 yellow dots. Row 3: 4 blue dots, 2 yellow dots. Row 4: 4 blue dots, 2 yellow dots. Row 5: 2 blue dots. Row 6: 2 blue dots. Row 7: 2 blue dots. Row 8: 2 blue dots.

- Let $a$ be the area of the square and $d$ be the number of dots enclosed by the square. For each square, plot a point that represents its values of $a$ and $d$ .
- Draw lines from $(0, 0)$ to each point. For each line, write an equation that represents the proportional relationship.
open applet in presentation mode
What is the constant of proportionality for each relationship? What do the constants of proportionality tell us about the dots and squares?

Print Version

The figure shows two arrays, each enclosed by a square that is 2 inches wide.

Let $a$ be the area of the square and $d$ be the number of dots enclosed by the square.
- For each square, plot a point that represents its values of $a$ and $d$ .
- Draw lines from $(0, 0)$ to each point. For each line, write an equation that represents the proportional relationship.
What is the constant of proportionality for each relationship? What do the constants of proportionality tell us about the dots and squares?

Activity 3: Housing Density

Here are pictures of two different neighborhoods.

This image depicts an area that is 0.3 kilometers long and 0.2 kilometers wide.

An aerial image of a neighborhood displaying the roofs of houses. Each 0 point1 kilometer by 0 point 1 kilometer area has a total of 8 houses.

This image depicts an area that is 0.4 kilometers long and 0.2 kilometers wide.

An aerial image of a neighborhood displaying the roofs of houses. A length of 0 point 1 kilometer indicating one fourth of the length of the neighborhood is indicated. There are a total of 9 or 10 houses displayed.

For each neighborhood, find the number of houses per square kilometer.

Activity 4: Population Density

New York City has a population of 8,406 thousand people and covers an area of 1,214 square kilometers.
Los Angeles has a population of 3,884 thousand people and covers an area of 1,302 square kilometers.

The points labeled $A$ and $B$ each correspond to one of the two cities. Which is which? Label them on the graph.
Write an equation for the line that passes through $(0, 0)$ and $A$ . What is the constant of proportionality?
Write an equation for the line that passes through $(0, 0)$ and $B$ . What is the constant of proportionality?
What do the constants of proportionality tell you about the crowdedness of these two cities?

Are you ready for more?

Problem 1

Predict where these types of regions would be shown on the graph:

a suburban region where houses are far apart, with big yards
a neighborhood in an urban area with many high-rise apartment buildings
a rural state with lots of open land and not many people

Problem 2

Next, use this data to check your predictions:

place	description	population	area km²
Chalco	a suburb of Omaha, Nebraska	$10, 994$	$7.5$
Anoka County	a county in Minnesota, near Minneapolis/St. Paul	$339, 534$	$1, 155$
Guttenberg	a city in New Jersey	$11, 176$	$0.49$
New York	a state	$19, 746, 227$	$141, 300$
Rhode Island	a state	$1, 055, 173$	$3, 140$
Alaska	a state	$736, 732$	$1, 717, 856$
Tok	a community in Alaska	$1, 258$	$342.7$