Lesson 8-4: Appropriate Measures Reveal Math Grade 6

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Neft Teacher Unit 8
🏀

Appropriate Measures

6.SP.5d Lesson 8-4
My Math Notebook
I Can…

I can choose the best measure of center for a data set based on its shape.

Reveal Math Grade 6 How to Use 6.SP.5d
🏀 SPORTS ANALYTICS

How to Use This Deck

Present

Click Present or press F11 for fullscreen. Use arrow keys to advance.

👩‍🏫Teacher cues

Blue boxes show exactly what to say, ask, and how long to spend.

👨‍🎓Student work

Text boxes, polls, and drag-sort save automatically in the browser.

📝Notes

Press N or click 📝 in the toolbar for pacing tips and answers.

🎮Activity link

Launch the full HTML activity for independent practice.

🖨️Print

File → Print or the print button for handout copies.

⏱️ Time: 30 sec — read aloud, then advance
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Learning Targets 6.SP.5d

🎯 Content Objective / Objetivo de contenido

I can choose the best measure of center for a data set based on its shape.

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Agenda 6.SP.5d
🏀 SPORTS ANALYTICS

Today's Flow

1 Warm-Up 5m
2 Vocabulary 8m
3 I Do 5m
4 We Do 5m
5 Explore 8m
6 Practice 10m
7 Connect 5m
8 Exit Ticket 5m

Total pacing: ~45 min · Progress bar at top tracks your place

Reveal Math Grade 6 · Unit 8 · 8-4
🏀
Lesson Phase

LAUNCH

⏱ ~10 min

Reveal Math Grade 6 Warm-Up Hook 6.SP.5d

⏱️ 3 MIN · THINK-PAIR-SHARE

A top scorer's points were 22, 24, 20, 25, 23, 21, 58. The mean is 27.6 but the median is 23. Which should the league report as the 'typical' game, and why?

meanmedianoutlierskewedmeasure of center
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 CFU 1 6.SP.5d
🏀 SPORTS ANALYTICS

Check for Understanding #1

✋ CFU · THUMBS
Ask: Can you restate the warm-up question in your own words?
⏱️ Time: 30 sec

Teacher: If >30% thumbs down, re-teach with a fresh example before moving on.

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Be Curious 6.SP.5d
Visual Prompt

Stats Report Decision

The league is creating awards for the season. For the scoring title, they need to pick the best measure of a typical game. Here are the top scorer's points per game: 22, 24, 20, 25, 23, 21, 58. That 58-point game was a record-breaker! Should the league report the mean (27.6) or the median (23) as the player's typical scoring?

Top scorer — points per game202122232425262728293031323334353637383940414243444546474849505152535455565758Points per gameNotice the lone 58 (an outlier). It pulls the mean up to 27.6, while the median stays at 23.
👁 I Notice...
🔹 How does the 58-point game compare to the other scores?
🔹 What is the mean? What is the median?
🔹 Which measure is closer to what this player usually scores?
💭 I Wonder...
🔹 When does an outlier make the mean misleading?
🔹 Is there a rule for when to use mean vs. median?
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Concept Launch 6.SP.5d
🎯 I can choose the best measure of center for a data set based on its shape.
🏀 SPORTS ANALYTICS

Concept Launch

💡 Should I use the mean or the median?

👩‍🏫 Say: This is the big idea for today. Students should be able to repeat it by the end.

The mean and the median both describe the center of a data set, but one fits better depending on the shape. When the data has an outlier (a value far from the rest), the median is usually the better choice.

Key Idea:

Use the mean for data with no outliers; use the median when an outlier or a skewed shape would pull the mean away from typical.

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 I Do — Watch Me 6.SP.5d
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 I Do — Key Step 6.SP.5d
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 We Do — Together 6.SP.5d
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 CFU 2 6.SP.5d
🏀 SPORTS ANALYTICS

Check for Understanding #2

✋ CFU · THUMBS
Ask: Can you explain what we did in the We Do example?
⏱️ Time: 30 sec

Teacher: If >30% thumbs down, re-teach with a fresh example before moving on.

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 You Do — Your Turn 6.SP.5d
🎯 I can choose the best measure of center for a data set based on its shape.
🏀 SPORTS ANALYTICS

Now it's your turn

👨‍🎓 Students: Work independently first, then check with a partner.
⏱️ Time: 5 min
1Next, you will sort sports scenarios into "Use Mean" or "Use Median."
2For each one, look for an outlier or a skewed shape to decide.
🎮

Open the interactive HTML activity for full practice.

Launch Activity ↗
Reveal Math Grade 6 · Unit 8 · 8-4
📚
Lesson Phase

VOCABULARY

⏱ ~8 min

Reveal Math Grade 6 Vocabulary 6.SP.5d
Term / Término Meaning / Significado Example / Ejemplo Visual
Mean
Media
The average. Add all the numbers, then divide by how many there are.
El promedio. Suma todos los números y divide entre cuántos hay.
Mean of 10, 20, 30 = (10+20+30) ÷ 3 = 20
Median
Mediana
The middle number when you put them in order.
El número del medio cuando los pones en orden.
Data: 5, 8, 12, 15, 20 → median is 12 (the 3rd of 5 values)
Outlier
Valor atípico
A number that is much bigger or smaller than the rest.
Un número mucho mayor o menor que los demás.
Data: 12, 14, 13, 15, 45 → 45 is far from the cluster, so it is an outlier
Skewed
Sesgado
When most data sits on one side with a tail on the other.
Cuando la mayoría de los datos está de un lado con una cola del otro.
Scores: 5, 6, 7, 8, 8, 35 → most scores are low, but 35 creates a tail to the right (skewed right)
Data distribution
Distribución de datos
How the data looks: where it sits and how spread out it is.
Cómo se ven los datos: dónde están y qué tan separados están.
Symmetric = even on both sides. Skewed = bunched on one side with a tail
Variability
Variabilidad
How spread out the numbers are.
Qué tan separados están los números.
88, 90, 89, 91 (low variability) vs. 50, 70, 95, 100 (high variability)
Skewed: example vs. non-example
Most values low with a few very high valuesThe data has a tail, so it is skewed.
Values spread evenly around the centerThat is symmetric, not skewed.
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Which Word? 6.SP.5d
🎯 I can choose the best measure of center for a data set based on its shape.
🏀 SPORTS ANALYTICS

Which Word Fits?

❓ CLOZE POLL
Ask: Vote A B C D — then defend your choice.

The average of a data set is the ___.

Use It In a Sentence

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 CFU 3 6.SP.5d
🏀 SPORTS ANALYTICS

Check for Understanding #3

✋ CFU · THUMBS
Ask: Use one vocabulary word in a sentence about today's topic.
⏱️ Time: 30 sec

Teacher: If >30% thumbs down, re-teach with a fresh example before moving on.

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Turn & Talk 6.SP.5d
🎯 I can choose the best measure of center for a data set based on its shape.
🏀 SPORTS ANALYTICS

Turn & Talk — Launch

🗣️ TURN & TALK
👩‍🏫 Say: Partner A shares first for 45 seconds, then Partner B.
👨‍🎓 Students: Turn to your elbow partner. Use the sentence stems.
⏱️ Time: 90 sec

A top scorer's points were 22, 24, 20, 25, 23, 21, 58. The mean is 27.6 but the median is 23. Which should the league report as the 'typical' game, and why?

Sentence starters (tap to use):
✍️ The league should report the ___ because ___.La liga debería reportar la ___ porque ___.
✍️ The 58-point game is an ___ that affects the mean.El juego de 58 puntos es un ___ que afecta la media.
Stretch further:
➕ Without the 58, the mean drops to about ___ because ___.
➕ This shows the median is ___ to outliers while the mean is ___.
WORD BANK:
meanmedianoutlierskewedmeasure of center
90s

👂 Listen For

Students choose the median (23) and identify 58 as an outlier that pulls the mean up to 27.6, making it unrepresentative.

Extend: Justify: by how much does removing the 58-point game change the mean? What does that show about outliers?

Reveal Math Grade 6 · Unit 8 · 8-4
🔍
Lesson Phase

EXPLORE & PRACTICE

⏱ ~18 min

Reveal Math Grade 6 Visual Model 6.SP.5d
🎯 I can choose the best measure of center for a data set based on its shape.
🏀 SPORTS ANALYTICS

Visual Modeling Workspace

Use the drawing tray below to annotate the visual model. Teacher: say "Click to reveal" on key steps.

Top scorer — points per game202122232425262728293031323334353637383940414243444546474849505152535455565758Points per gameNotice the lone 58 (an outlier). It pulls the mean up to 27.6, while the median stays at 23.
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Explore 6.SP.5d
🏀 SPORTS ANALYTICS

Explore Activity

Sort each sports data scenario into the correct category: Use Mean or Use Median.

outlierskewedpulledextremesymmetricclusteredspread

✍️ Explore Discourse

What pattern do you notice about when median is the better choice?

The median is better when the data has ___ because the mean gets pulled toward ___. The mean is better when the data is ___ because ___.
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Whiteboard CFU 6.SP.5d
🎯 I can choose the best measure of center for a data set based on its shape.
🏀 SPORTS ANALYTICS

Whiteboard Moment

🖊️ WHITEBOARD CFU
👨‍🎓 Students: On your whiteboard or paper, solve ONE quick problem using today's strategy. Hold it up when done.
⏱️ Time: 2 min

Show your work clearly. Be ready to explain your thinking to a partner.

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Discuss Explore 6.SP.5d
🎯 I can choose the best measure of center for a data set based on its shape.
🏀 SPORTS ANALYTICS

Turn & Talk — Explore

🗣️ TURN & TALK
👩‍🏫 Say: Partner A shares first for 45 seconds, then Partner B.
👨‍🎓 Students: Turn to your elbow partner. Use the sentence stems.
⏱️ Time: 90 sec

As you sort scenarios into 'Use Mean' or 'Use Median,' what clue tells you a data set needs the median instead of the mean?

Sentence starters (tap to use):
✍️ I use the median when the data has ___.Uso la mediana cuando los datos tienen ___.
✍️ I use the mean when the data is ___.Uso la media cuando los datos son ___.
Stretch further:
➕ The mean is better for ___ because ___.
➕ The median is better for ___ because ___.
WORD BANK:
meanmedianoutlierskewedmeasure of center
90s

👂 Listen For

A strong answer says the presence of an outlier or skew signals the median, while symmetric data with no outliers fits the mean.

Extend: Compare: give one sports example where the mean is the better choice and one where the median is. Justify each.

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Practice A 6.SP.5d
🎯 I can choose the best measure of center for a data set based on its shape.
🏀 SPORTS ANALYTICS

Practice Check A

📝 QUICK CHECK
Ask: Give students 1 minute. Cold-call one student to defend their answer.
⏱️ Time: 2 min

A baseball player's batting averages over 6 seasons are: .280, .295, .290, .285, .300, .110. The .110 was an injury-shortened season. Which measure better represents the player's typical batting average?

✍️ Show Your Work

Explain why your answer is correct using today's vocabulary.

Teacher reveal: The .110 is an outlier that pulls the mean down to .260. The median (.2875) better represents typical performance because it isn't affected by the extreme value.
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Practice B 6.SP.5d
🎯 I can choose the best measure of center for a data set based on its shape.
🏀 SPORTS ANALYTICS

Practice Check B

📝 QUICK CHECK
Ask: Partner discussion first, then vote.
⏱️ Time: 2 min

A gymnast's scores are: 8.5, 8.8, 8.7, 8.6, 8.9. There are no outliers. Which measure best represents a typical score?

✍️ Show Your Work

Explain why your answer is correct using today's vocabulary.

Teacher reveal: The data is symmetric with no outliers, so the mean (8.7) best represents the typical score.
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Statistical vs Not Sort 6.SP.5d
🎯 I can choose the best measure of center for a data set based on its shape.
🏀 SPORTS ANALYTICS

Statistical vs Not Sort

📈 CARD SORT
👨‍🎓 Students: Work at your own pace. Check with a partner before we discuss.
⏱️ Time: 5 min

Drag each question into the correct column.

How many hours do students sleep?
What is the capital of France?
How tall are the plants in our class garden?
What color is your backpack?
How many pets do families in our school have?
Who invented the telephone?
📊 Statistical
📚 Not Statistical

✍️ Justify Your Thinking

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Sort It Out 6.SP.5d

Sort each measure into whether it describes the CENTER of the data or the SPREAD of the data.

Card Bank — cut or drag these cards:
Mean
Median
Mode
Range
Mean absolute deviation (MAD)
Measure of Center
Measure of Spread
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Error Analysis 6.SP.5d
⚠ Find the Reasoning Error

A classmate turned in the work below. One step has a mistake. Read every step, find it, name it, and fix it.

Student's work — read every step:
1 Data Player minutes per game: 32, 34, 30, 35, 33, 5
2 Find mean Sum = 169, Count = 6, Mean = 28.2
3 Find median Ordered: 5, 30, 32, 33, 34, 35 → Median = (32+33) ÷ 2 = 32.5
4 Conclusion The mean (28.2) is the best measure because it uses all the data.
Which step has the error?
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Choice Board 6.SP.5d

Choose ONE option to show what you know — then do it in the workspace below.

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Think Write 6.SP.5d

Use evidence from today's lesson to complete each frame.

Frame 1 Explain the Rule

Today's key idea is: "Use the mean for data with no outliers; use the median when an outlier or a skewed shape would pull the mean away from typical." — and it works because ___.

Frame 2 Because / But / So

Because Mean means ___, but a tricky part is ___, so I have to ___.

Frame 3 Catch the Mistake

A common mistake with Mean is ___. It happens because ___, and the fix is ___.

Frame 4 Prove It

I can prove my answer is correct by ___, using Median to check my work.

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Because · But · So 6.SP.5d

✍️ TWR · WRITE 3 SENTENCES · 7 MIN

Sentence kernelUse the mean for data with no outliers; use the median when an outlier or a skewed shape would pull the mean away from typical.
because
Give a reason

Use the mean for data with no outliers; use the median when an outlier or a skewed shape would pull the mean away from typical. because ___

but
Name a tricky part

Use the mean for data with no outliers; use the median when an outlier or a skewed shape would pull the mean away from typical. but ___

so
State what it means

Use the mean for data with no outliers; use the median when an outlier or a skewed shape would pull the mean away from typical. so ___

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Sentence Expansion 6.SP.5d

🌱 TWR · GROW THE KERNEL · 6 MIN

Sentence kernelToday we used Mean.

Answer these to add detail

What exactly?When?Where in real life?Why does it work?How did we use it?

Sentence starters (tap to use)

First, …For example, …This means that …In other words, …As a result, …I know this because …
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Student Workspace 6.SP.5d
🎯 I can choose the best measure of center for a data set based on its shape.
🏀 SPORTS ANALYTICS

Student Workspace

📊 FILL THE TABLE
👨‍🎓 Students: Complete the missing cells. Check with a partner before we discuss.
⏱️ Time: 5 min

Fill in the table using today's strategy.

Column AColumn B

✏️ Sketch Your Strategy

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Differentiation 6.SP.5d
🏀 SPORTS ANALYTICS

Differentiation Paths

🎯 CHOOSE YOUR LEVEL
👩‍🏫 Say: Everyone works on the same math goal — pick the level of support that fits today.
⏱️ Time: 8–10 min independent or partner
🧩 Level 0 · Most support

Step-by-step with a worked model and sentence frames.

🌱 Level 1 · Support

A gymnast's scores are: 8.5, 8.8, 8.7, 8.6, 8.9. There are no outliers. Which measure best represents a typical score?

🎯 Level 2 · Core

A baseball player's batting averages over 6 seasons are: .280, .295, .290, .285, .300, .110. The .110 was an injury-shortened season. Which measure better represents the player's typical batting average?

🚀 Level 2+ · Enrichment

Extension with error analysis or multi-step reasoning.

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Partner Activity 6.SP.5d
🎯 I can choose the best measure of center for a data set based on its shape.
🏀 SPORTS ANALYTICS

Partner Activity

🤝 PARTNER WORK
📦 Materials: Whiteboards or paper, pencils, vocabulary reference cards
👨‍🎓 Students: Partner A solves, Partner B coaches. Switch roles on the next problem.
⏱️ Time: 6 min

Work with your partner on the practice problems at your differentiation path level. Explain each step using math vocabulary.

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 CFU 4 6.SP.5d
🏀 SPORTS ANALYTICS

Check for Understanding #4

✋ CFU · THUMBS
Ask: Thumbs up if you and your partner agree on your answer.
⏱️ Time: 30 sec

Teacher: If >30% thumbs down, re-teach with a fresh example before moving on.

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Math in the Wild 6.SP.5d
🎯 I can choose the best measure of center for a data set based on its shape.
🏀 SPORTS ANALYTICS

Real-World Connection

🌍 Math in the Wild

👩‍🏫 Say: Read the scenario. Ask: where else have you seen this kind of math?

A sports reporter writes: 'The average ticket price for the playoffs is $85.' The actual prices are: $45, $50, $48, $52, $55, $260. The $260 ticket is a courtside seat.

meanmedian8551outlierpullshighermisleadingtypical

✍️ Connection Reasoning

Is $85 a fair way to describe a 'typical' ticket price? What measure should the reporter use?

The reporter used the ___, which is ___. A better measure would be the ___ (about ___) because ___. The courtside seat at $260 is an ___ that pulls the mean ___.

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Discuss Connect 6.SP.5d
🎯 I can choose the best measure of center for a data set based on its shape.
🏀 SPORTS ANALYTICS

Turn & Talk — Connect

🗣️ TURN & TALK
👩‍🏫 Say: Partner A shares first for 45 seconds, then Partner B.
👨‍🎓 Students: Turn to your elbow partner. Use the sentence stems.
⏱️ Time: 90 sec

A reporter writes 'the average playoff ticket is $85,' but prices are $45, $50, $48, $52, $55, $260. Is $85 a fair 'typical' price? What measure should the reporter use?

Sentence starters (tap to use):
✍️ $85 is / is not fair because the $260 ticket ___.$85 es / no es justo porque el boleto de $260 ___.
✍️ The reporter should use the ___ because ___.El reportero debería usar la ___ porque ___.
Stretch further:
➕ Using the mean here could be misleading because ___.
➕ An honest report would show ___ so readers understand ___.
WORD BANK:
meanmedianoutlierskewedmeasure of center
90s

👂 Listen For

Students explain $85 is misleading because the $260 courtside seat skews the mean upward, and the median (~$51) better reflects a typical ticket.

Extend: Critique: could the reporter be using the mean ON PURPOSE to make tickets sound pricier? Argue whether that is honest.

Reveal Math Grade 6 · Unit 8 · 8-4
Lesson Phase

CLOSURE & REFLECT

⏱ ~8 min

Reveal Math Grade 6 Exit Ticket 6.SP.5d
Reflection

Today I learned that ___ because ___.

One thing I am still not sure about is ___.

Quick Exit Ticket

Data set: 15, 18, 16, 17, 15, 72. Which measure of center best represents the data?

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Goal Tracker 6.SP.5d
My Goal: I can choose the best measure of center for a data set based on its shape.
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Bonus Check 6.SP.5d
🎯 I can choose the best measure of center for a data set based on its shape.
🏀 SPORTS ANALYTICS

Bonus Exit Check

📝 QUICK CHECK
Ask: Optional for early finishers.
⏱️ Time: 2 min

A runner's mile times are: 7:10, 7:15, 7:12, 7:20, 12:00. The 12:00 was due to a cramp. Which measure best represents a typical mile?

✍️ Show Your Work

Explain why your answer is correct using today's vocabulary.

Teacher reveal: The 12:00 is an outlier that pulls the mean up. The median (7:15) better represents the runner's typical time.
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Reflection 6.SP.5d
🏀 SPORTS ANALYTICS

Reflection & Self-Assessment

3 Things I learned:
2 Connections:
1 Question:
Self-Assessment:
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Digital Activity 6.SP.5d
🏀 SPORTS ANALYTICS

Continue Learning

🎮

Launch the Full Interactive Activity

Students continue practice in the HTML lesson engine with auto-check, hints, and differentiation.

👩‍🏫 Say: Early finishers: open the activity. Everyone else: start homework tonight.
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Family Connection 6.SP.5d
🏀 SPORTS ANALYTICS

Family Connection

Share tonight's family homework and discuss one vocabulary word at home.

Open Family Homework ↗
👩‍🏫 Say: Tell families: "Ask your student to teach you one thing from today's lesson."
Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Teacher Notes 6.SP.5d
🏀 SPORTS ANALYTICS

Teacher Notes

⏱️ Pacing Guide

  • Launch & vocab: 12 min
  • I Do / We Do / You Do: 15 min
  • Explore & practice: 15 min
  • Connect & closure: 8 min

Total: ~45 min

🎯 Listen For · Common Errors

• Students choose the median (23) and identify 58 as an outlier that pulls the mean up to 27.6, making it unrepresentative.

• A strong answer says the presence of an outlier or skew signals the median, while symmetric data with no outliers fits the mean.

• Students explain $85 is misleading because the $260 courtside seat skews the mean upward, and the median (~$51) better reflects a typical ticket.

• Students choose the median (~16.5), identify 72 as the outlier, and explain it would inflate the mean.

Common mistake: A common mistake in Appropriate Measures is skipping the key idea: "Use the mean for data with no outliers; use the median when an outlier or a skewed shape would pull the mean away from typical." — always check your work against this rule before you submit.

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math Grade 6 Answer Key 6.SP.5d
🏀 SPORTS ANALYTICS

Answer Key (Teacher Appendix)

Hide this slide during presentation or move to the end of your copy.

✓ Practice 1: Median, because the .110 outlier pulls the mean down — The .110 is an outlier that pulls the mean down to .260. The median (.2875) better represents typical performance because it isn't affected by the extreme value.

✓ Practice 2: Mean — The data is symmetric with no outliers, so the mean (8.7) best represents the typical score.

✓ Practice 3: Median — the outlier 12:00 pulls the mean too high — The 12:00 is an outlier that pulls the mean up. The median (7:15) better represents the runner's typical time.

✓ Practice 4: Median (7) — the outlier 50 inflates the mean — The mean (13.8) is higher than 5 of the 6 values because the outlier 50 pulls it up. The median (7) better represents a typical value.

✓ Exit ticket: Median, because 72 is an outlier — The value 72 is an outlier. The mean (25.5) is pulled high by 72 and doesn't represent the typical values. The median (16.5) is a better measure of center.

Reveal Math Grade 6 · Unit 8 · 8-4
Reveal Math · Unit 8 · Lesson 8-4 STANDARD: 6.SP.5d
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