Here is a [b]dot plot [/b]for a data set.[br][img]data:image/png;base64,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[/img][br][br]Determine if each of the following would be an appropriate label to represent the data in the dot plot?

Explain your reasoning. [br]

Write it below the scale of the dot plot. Be sure to include the unit of measurement.[br]

In your scenario, what does one dot represent?

In your scenario, what would a data point of 0 mean?

What would a data point of [math]3\frac{1}{4}[/math] mean?

How long does it usually take you to travel to school? Answer to the nearest minute.

[list][*]Walk[/*][*]Bike[/*][*]Scooter or skateboard[/*][*]Car[/*][*]School bus[/*][*]Public transport[/*][*]Other[/*][/list]

How tall are you without your shoes on? Answer to the nearest centimeter.

What is the length of your right foot without your shoe on? Answer to the nearest centimeter.

What is your arm span? Stretch your arms open, and measure the distance from the tip of your right hand’s middle finger to the tip of your left hand’s middle finger, across your back. Answer to the nearest centimeter.

How important is the following issue to you? Rate each on a scale from 0 (not important) to 10 (very important): Reducing pollution

How important is the following issue to you? Rate each on a scale from 0 (not important) to 10 (very important): Recycling

How important is the following issue to you? Rate each on a scale from 0 (not important) to 10 (very important): Conserving water

Do you have any siblings?

How many hours of sleep per night do you usually get when you have school the next day? Answer to the nearest half hour.

How many hours of sleep per night do you usually get when you do not have school the next day? Answer to the nearest half hour.

[list][*]Have a snack[/*][*]Do homework[/*][*]Read a book[/*][*]Talk on the phone[/*][*]Practice a sport[/*][*]Do chores[/*][*]Use the computer[/*][*]Participate in an extracurricular activity[/*][/list]

[list][*]A city or state leader[/*][*]A champion athlete[/*][*]A movie star[/*][*]A musical artist[/*][*]A best-selling author[/*][/list]

[list][*]Playing sports or doing outdoor activities[/*][/list]

[list][*]Using a screen for fun (watching TV, playing computer games, etc.)[/*][/list]

[list][*]Doing homework[/*][/list]

[list][*]Reading[/*][/list]

The first survey question about travel [i]time[/i] produces [b]numerical data[/b]. Identify [b][u]two [/u][/b]other questions that produce numerical data. For each, describe what was measured and its unit of measurement.[br][br][table][tr][td]Question #:  ______[/td][td]What was measured:[/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][/tr][tr][td][/td][td]Unit of measurement:[/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][/tr][tr][td]Question #:  ______[/td][td]What was measured:[/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][/tr][tr][td][/td][td]Unit of measurement:[/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][/tr][/table]

The second survey question about travel [i]method[/i] produces categorical data. Identify [b][u]two [/u][/b]other questions that produce [b]categorical data[/b]. For each, describe what characteristic or feature was being studied.[br][table][tr][td]Question #: ______ [/td][td]Characteristic being studied: [/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][/tr][tr][td][br][/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][/tr][tr][td]Question #: ______[br][/td][td]Characteristic being studied:[/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][td][/td][/tr][/table]

How many pets do you have?

How many years have you lived in this state?

What is your favorite band?

What kind of music do you like best?

What is the area code of your school’s phone number?

Where were you born?

How much does your backpack weigh?

Name two characteristics you could investigate to learn more about your classmates. Make sure one would give categorical data and the other would give numerical data.

This list shows Priya’s records: [br][br]Jan Apr Jan Feb Oct May June July Aug Aug Sep Jan Feb Mar Apr Nov Nov Dec Feb Mar[br][br][br]This list shows Han’s records: [br]1 4 1 2 10 5 6 7 8 8 9 1 2 3 4 11 11 12 2 3[br][br][br]How are their records alike? How are they different?

What kind of data—categorical or numerical—do you think the variable “birth month” produces? Explain how you know.

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[/img]

What is your favorite breakfast food?

How did you get to school this morning?

How many different teachers do you have?

What is the last thing you ate or drank?

How many minutes did it take you to get ready this morning—from waking up to leaving for school?

For each question, explain how you know that responses to it would produce categorical data.

For each question, explain how you know that responses to it would produce numerical data.

Name the coordinates of 3 points that are inside triangle [math]DEF[/math].

What is the area of the triangle? Show your reasoning.