Adding Probabilities to Decision Trees

The Power of Possibilities - 60 minute session.

Session Objectives

By the end of this lesson, students will:

  • Understand how to incorporate probabilities into decision trees.

  • Learn to calculate expected values based on probabilities and outcomes.

  • Recognize how probabilities affect decision-making.

  • Apply probabilistic decision trees to real-life scenarios.

Connecting Decisions and Chances

Time: 10 minutes

Remember last time when we learned about decision trees? We discovered how drawing out our choices like branches of a tree can help us make better decisions. You learned about decision nodes – those squares where we make choices – and chance nodes – the circles where different things might happen.

Today, we’re going to make our decision trees even more powerful by adding something new: probabilities.

But before we dive into that, let’s do a quick check:

  • Can you tell me what a decision tree helps us see?
  • What were the different parts we learned about?

Think about the last big choice you made. Maybe it was choosing between different activities, or deciding whether to try something new. Was there anything uncertain about what might happen? For example, if you decided to try out for a sports team, you couldn’t be completely sure you’d make the team, right?

probabilities-in-decision-making

That’s where probabilities come in. When we make decisions, we often have to think about how likely different outcomes are. 

Like when you check the weather forecast and it says there’s a 70% chance of rain – that helps you decide whether to bring an umbrella.

Today, we’re going to learn how to put these chances – these probabilities – right into our decision trees. This will help us make even smarter choices because we’ll be able to see not just what might happen, but how likely each outcome is.

Let me show you what I mean. Remember our test-studying decision tree from last time? We knew studying would make a good grade more likely, but we didn’t say exactly how likely. Today, we’ll learn how to add those numbers to make our decision trees even more helpful.

Are you ready to add this new tool to your decision-making toolbox?

Teaching Note: This opening helps students connect their previous knowledge of decision trees with the new concept of probability while keeping the discussion relatable and engaging.

When Chances Matter: The Stamp Story Revisited

Time: 10 minutes

Remember our story about Sarah and her postcard stamps? Let’s look at it again, but this time we’ll think about the chances of different things happening.

Sarah had a choice to make. She could:

  1. Use a regular stamp right away that cost $1.25
  2. Search for a postcard stamp that cost $1.00

Now, let’s think about this with probabilities. After searching her desk drawer and not finding the stamps, what were the chances she’d find them quickly in another place? Pretty low, right? Let’s put some numbers to it:

  • If she looked in the kitchen drawer: maybe a 20% chance
  • If she looked in her backpack: maybe a 15% chance
  • If she looked in her old folders: maybe only a 10% chance

And each time she looked and didn’t find them, the chance of finding them in the next place got even smaller.

Here’s something interesting to think about: Even if she did find the stamps, she’d only save 25 cents. But let’s look at what she was giving up:

  1. 20 minutes of her time
  2. The chance to do other important things
  3. Peace of mind

When we put the probabilities into our thinking, the choice becomes clearer. If there’s only a small chance (let’s say 20%) of finding the stamps quickly, is it worth spending time searching to save 25 cents?

Let’s work this out together:

  • If she searches for 20 minutes, that’s using up time worth about $1.67 (at $5 per hour)
  • She has a 20% chance of saving 25 cents
  • So even if she finds the stamps, she’s actually losing money through the value of her time!

This is why understanding probabilities helps us make better decisions. When we know something has a low chance of success, we can decide if it’s really worth trying.

What would you have done in Sarah’s situation, now that you can see the probabilities? How do these chances change how you think about the decision?

Teaching Note: This revisited story helps bridge the gap between basic decision trees and those with probabilities, showing how adding numerical chances helps clarify choices.

Making Choices with Numbers: Adding Probabilities to Our Decision Trees

Time: 15 minutes

Let me show you how to make your decision trees even more helpful by adding numbers that tell us how likely different things are to happen.

Remember how we check the weather forecast before going out? When it says there’s a 60% chance of rain, that number helps us decide what to do. Let’s use this example to learn how to put probabilities in our decision trees.

Imagine you’re deciding whether to take an umbrella to school tomorrow. Let’s draw this out together:

Take Umbrella? Yes No Weather? Weather? 60% Rain 40% No Rain 60% Rain 40% No Rain Stay dry (+10 points) Extra weight (-2 points) Get wet (-8 points) No extra weight (+2 points)

Now, let’s learn something really cool called “Expected Value.” It helps us figure out which choice is better by combining the chances of something happening with how good or bad each outcome is.

Let’s calculate it for taking the umbrella:
– If it rains (60% chance): Stay dry = +10 points × 0.60 = +6 points
– If no rain (40% chance): Extra weight = -2 points × 0.40 = -0.8 points
– Total Expected Value = +6 + (-0.8) = +5.2 points

Now for not taking the umbrella:
– If it rains (60% chance): Get wet = -8 points × 0.60 = -4.8 points
– If no rain (40% chance): No weight = +2 points × 0.40 = +0.8 points
– Total Expected Value = -4.8 + 0.8 = -4 points

See how the numbers help us decide? Taking the umbrella has an expected value of +5.2 points, while not taking it has -4 points. The math shows us that taking the umbrella is probably a better choice!

What other decisions could we look at this way? What if we changed the chances of rain to 30%? How would that change our decision?

Teaching Note: Help students understand that while the math might seem complicated, it’s really just a way of thinking through how likely and how important different outcomes are.

Let's Calculate Your Chances of Success!

Time: 15 minutes

Let’s work through a decision many students face: should you study for tomorrow’s test or play your favorite video game? We’ll use probabilities to help make this choice clearer.

Test Tomorrow: What to do? Study Play Games Results Results 80% Do Well 20% Struggle 30% Do Well 70% Struggle Good Grade (+10 points) Poor Grade (0 points) Good Grade (+10 points) Poor Grade (0 points)

Let’s work out the math together!

If you choose to study:
– 80% chance (0.80) of doing well: 0.80 × 10 points = 8 points
– 20% chance (0.20) of struggling: 0.20 × 0 points = 0 points
– Total Expected Value = 8 + 0 = 8 points

If you choose to play video games:
– 30% chance (0.30) of doing well anyway: 0.30 × 10 points = 3 points
– 70% chance (0.70) of struggling: 0.70 × 0 points = 0 points
– Total Expected Value = 3 + 0 = 3 points

Look at that difference! Studying gives you an expected value of 8 points, while playing video games only gives you 3 points. The numbers are telling us that studying is probably a much better choice!

But here’s something cool to think about: What if we changed some of these numbers? Like:

  • What if you’re really good at this subject and have a 50% chance of doing well without studying?
  • What if studying gives you a 95% chance of doing well?
  • What if we counted the fun points from playing video games too?

Want to try calculating one of these different scenarios?

Teaching Note: This helps students see how math can guide real-life decisions while keeping the calculations simple and relatable.

Creating Your Own Probability Tree

Time: 20 minutes

Now it’s your turn to create a decision tree with probabilities! Let’s work through this step by step.

First, pick a decision you’re facing right now, or choose from these interesting scenarios:

  1. The Young Entrepreneur
    • You have $20 saved up
    • Should you use it to buy supplies and make friendship bracelets to sell?
    • Or keep it safe in your piggy bank?
  2. The Team Tryout
    • Soccer team tryouts are next week
    • Should you try out or stick with art club?
    • Think about your chances of making the team
  3. The School Show
    • The school is putting on a talent show
    • Should you sign up to perform?
    • Consider your preparation time and chances of doing well

Let’s use this simple template to build your tree:

[Your Decision] Step 1: Write your decision here Step 2: Add probabilities Step 3: Write outcomes and values

Let’s fill it in together:

  1. Write your decision in the gold square
  2. Draw two branches for your options
  3. Add circles for chance events
  4. Write the probabilities (they should add up to 100% for each circle)
  5. Add the outcomes and their values (positive or negative points)

Then we’ll calculate the expected value for each option, just like we did in our study vs. play example.

Remember:

  • Be realistic with your probabilities
  • Think carefully about the value of each outcome
  • Consider both short-term and long-term results

What decision would you like to map out? Let’s start filling in the template together!

Teaching Note: Guide the student through each step, helping them assign realistic probabilities and values while keeping the math manageable.

Using Numbers to Make Smarter Choices: Wrapping Up

Today we learned how to make our decision trees even more powerful by adding probabilities. Let’s look at what we discovered:

We can use numbers to show how likely different things are to happen. Just like checking a weather forecast tells us the chance of rain, we can estimate the chances of different outcomes in our decisions. And when we combine these chances with how good or bad each outcome would be, we can calculate something called “expected value” that helps us compare our choices.

Think about everything we practiced today:

  • Adding percentages to our decision trees
  • Calculating expected values
  • Comparing different choices using numbers
  • Making decisions based on both chances and outcomes

Your Decision-Making Challenge

Over the next few days, try using probabilities in your decisions.

Here’s a fun way to practice:

  1. Pick one decision each day
  2. Write down your different options
  3. Try to guess the chances of different outcomes
  4. Think about how good or bad each outcome would be
  5. Use these numbers to help you choose

For example, you might write:
Today I had to decide whether to start my homework right after school or play outside first. I thought there was an 80% chance I’d finish all my homework if I started right away, but only a 40% chance if I played first. Since finishing my homework was worth 10 points to me, starting right away had a better expected value!

When we meet next time, we’ll learn even more about making smart choices. Bring your examples of using probabilities in your decisions – I’d love to hear how the numbers helped you choose!

For Parents/Teachers:

This wrap-up reinforces the key concepts while keeping the focus on practical application. The take-home challenge encourages students to continue practicing with probabilities in their daily decisions.

Song: Numbers Show the Way

Verse 1:
Draw your tree like we did before
Then add some numbers to explore
Every chance has its percent
Showing how our paths are meant
Eighty, twenty, sixty, ten
Help us see what might happen when

Chorus:
Numbers show which way to go
When the chances matter so
Add them up and you will see
What your best choice might just be
Like a map with chances clear
Making tricky choices near

Verse 2:
Like our friend who searched all day
For stamps to save some cents away
Twenty percent, ten percent, five
Showed the choice was not so wise
When you count the chances through
Better paths come into view

(Chorus)

Bridge:
Multiply your odds and gains
Add them up to see
Which choice might bring
The most to be

(Chorus)

Outro:
So when choices make you pause
Let the numbers guide your way
Adding up each chance because
That’s how better choices stay