Understanding Probabilities

Playing the Odds

60 Minutes Session

Session Objectives

By the end of this lesson, students will:

  • Grasp the basic concept of probability and how it applies to decision-making.

  • Learn to calculate simple probabilities using fractions and percentages.

  • Understand how probabilities influence choices and outcomes.

  • Begin to apply probabilistic thinking to everyday decisions.

Let's Talk About Chance

Time: 10 minutes

Have you ever wondered why some things seem to happen randomly? Like when you’re playing a game and you really need to roll a six on the dice, or when you’re hoping it won’t rain on the day of your outdoor party? These situations all have something in common – they involve chance, or what we call probability.

Let’s start with something simple. Imagine you’re holding a coin in your hand. If you flip it, what are the chances it’ll land on heads? Take a moment to think about it. How do you know? What makes you sure of your answer?

rolling-a-die

Now think about rolling a regular six-sided die. What are the chances of rolling exactly the number six? Is it the same as getting heads on a coin flip? Why or why not?

 

These might seem like simple questions, but they’re actually teaching us something really important about how the world works. When we understand probability – that is, how likely something is to happen – we can make better decisions about all sorts of things in our lives.

For example, when you check the weather forecast and it says there’s a 70% chance of rain tomorrow, that information helps you decide whether to plan an indoor or outdoor activity. Or when you’re playing your favorite card game, understanding probability can help you make smarter choices about which cards to play.

Today, we’re going to explore how understanding probability can help you make better decisions. We’ll start with simple things like coin flips and dice rolls, but by the end of our session, you’ll see how probability affects many of the choices you make every day.

Teaching Note: This warm-up sets the foundation for understanding probability through familiar examples. The key is to help students recognize that they already have an intuitive sense of probability from their everyday experiences, which we’ll build upon throughout the session.

The Case of the Missing Stamps: A Lesson in Probability

Time: 15 minutes

Let me tell you about something that happened to my friend Sarah last week. She wanted to send a postcard to her grandmother. Now, there are two types of stamps you can use for postcards: regular stamps that cost $1.25, and special postcard stamps that cost $1.00. Sarah knew she had some postcard stamps somewhere in her desk, but she couldn’t find them right away.

Sarah had plenty of regular stamps right there in front of her. But she really wanted to save that 25 cents, so she started searching. She looked through all her desk drawers. Then she checked her backpack. Then she went through the kitchen drawer where her family sometimes keeps stamps. Then she looked in her old school folders. Twenty minutes later, she still hadn’t found the postcard stamps.

Let’s stop here for a moment and think about this situation. 

What was Sarah trying to decide?

She had two choices:
1. Use a regular stamp right away
2. Keep searching for the cheaper postcard stamp

 

Now, here’s where probability comes in. After searching for 20 minutes, what do you think were the chances that Sarah would find those stamps in the next few minutes? Was it likely or unlikely? And even if she did find them, was saving 25 cents worth spending all that time searching?

Think about it this way: If Sarah values her time at even $5 per hour (which is less than minimum wage), then spending 20 minutes searching cost her about $1.67 in terms of her time. That’s more than six times the amount she was trying to save on the stamp!

This is how probability helps us make better decisions. 

Sarah could have asked herself:

  1. What are the chances I’ll find these stamps quickly?
  2. If the chances are low, is it worth spending more time looking?
  3. What am I giving up by spending time searching?

What would you have done in Sarah’s situation? At what point would you have decided to just use the regular stamp?

Here’s something interesting to consider: If you were 90% sure the stamps were in your desk drawer, checking there makes sense. But if you’ve already looked in all the obvious places, the probability of finding them gets lower and lower with each new place you check. Understanding this can help you decide when it’s time to stop searching and use a different solution.

Teaching Note: This story introduces how probability affects everyday decisions and the concept of weighing likelihood against value. It sets up the next section where we’ll learn more about calculating actual probabilities.

Understanding Probability: Your Tool for Better Decisions

Time: 10 minutes

You know how we were just talking about Sarah and her stamps? Let’s use what we learned from that story to understand something really useful called probability.

Probability is just a fancy word for measuring how likely something is to happen. Think of it like this: if you flip a coin, there are only two possible ways it can land – heads or tails. Since both are equally likely, we say the probability of getting heads is 1 out of 2, or 1/2, or 50%. 

Those all mean the same thing!

Let’s look at some other examples that will help us understand probability better:

  • If you roll a regular six-sided die, what’s the chance of getting a 3? Well, there’s only one 3 on the die, and there are six possible numbers total. So the probability is 1 out of 6 (or 1/6, or about 16.7%).
  • What if you wanted to roll either a 3 OR a 4? Now you have two favorable outcomes out of six possibilities, so the probability is 2/6 (or 1/3, or about 33.3%).

Here’s something cool about probability: it always falls between two numbers:

  •  0 (or 0%) means something is impossible
  • 1 (or 100%) means something is certain to happen

Back to Sarah’s stamp situation. After searching for 20 minutes and looking in all the obvious places, the probability of finding those stamps quickly was getting pretty low. Understanding this could have helped her make a better decision about whether to keep searching.

This is why probability is so useful in making decisions. 

When you know the chances of something happening, you can make smarter choices about:

  1. How much time to spend on it
  2. Whether it’s worth trying
  3. If you should consider a different approach

What other situations can you think of where knowing the probability might help you make a better decision?

Teaching Note: This section introduces formal probability concepts while maintaining connections to real-world applications. The goal is to help students see probability as a practical tool rather than just a mathematical concept.

Hands-On Probability Adventures

Time: 25 minutes

Let’s do some fun experiments to see probability in action! I’ll show you three different ways to explore how chance works in the real world.

Adventure 1: The Great Coin Challenge

What you’ll need: A coin and a piece of paper

Let’s test if a coin really does have a 50-50 chance of landing on heads or tails. Here’s what we’ll do:

  1. Flip the coin 20 times
  2. Make two columns on your paper: one for heads, one for tails
  3. Put a check mark in the right column each time you flip
  4. After all 20 flips, let’s count how many heads and how many tails you got

What do you think will happen? Will you get exactly 10 heads and 10 tails?

Let’s find out!

Adventure 2: Roll the Dice

What you’ll need: One regular six-sided die and your paper

Now let’s try something a little different. We’re going to:

  1. Roll the die 24 times
  2. Write down each number you get
  3. Circle every time you roll a 6
  4. At the end, we’ll figure out: How many times did you get a 6?
  5. We’ll compare this to what we expect (4 times, since 24 ÷ 6 = 4)

Adventure 3: Card Detective

What you’ll need: A deck of regular playing cards
This is where things get really interesting! We’ll:

  1. Shuffle the cards well
  2. Draw 10 cards, one at a time
  3. Before each draw, try to predict if the next card will be red or black
  4. Keep track of your predictions and whether you were right
  5. Calculate your “prediction success rate” (If you got 6 right out of 10, that’s 60%!)

Making Connections:

After each activity, let’s talk about:

  • Was your result what you expected?
  • Why might your results be different from the “perfect” probability?
  • How could you use this kind of thinking in real life?

Teaching Note: These activities can be easily modified based on available materials and time. The key is maintaining engagement through prediction, experimentation, and discussion. For younger students (around 10), focus more on the experimental aspect and basic fractions. For older students (13-15), introduce percentage calculations and the concept of theoretical vs. experimental probability.

Let's Talk About What We Discovered

Time: 10 minutes

Now that we’ve done our probability experiments, let’s explore what we learned. What surprised you the most about our activities? Maybe you noticed that even though we know a coin flip should be 50-50, your actual results were different. That’s part of what makes probability so interesting!

Let’s take what we learned from our experiments and think about how we can use it in real life. Here are some situations to consider:

The Weather Decision
Imagine the weather forecast says there’s a 30% chance of rain tomorrow. What does that actually mean? Based on what we learned about probability, it means that in similar weather conditions, it rains 3 out of 10 times. 

Would you:

  • Pack an umbrella?
  • Plan an outdoor activity?
  • How would your decision change if it was a 70% chance of rain?

The Game Show Choice
Think about those TV game shows where contestants choose between three doors to win a prize. If you know the prize is behind one door, what’s the probability of choosing correctly? How might this help you decide whether to switch doors if given the chance?

Your Daily Choices
Let’s think about some decisions you make every day where probability plays a role:

  • Choosing which line to join at the store
  • Deciding whether to start your homework now or later
  • Picking the best time to ask your parents for something special

Share some of your own examples – when do you think about chances or likelihood before making a decision?

Remember what we learned from Sarah and her stamps: sometimes understanding probability helps us know when to try something and when to choose a different path.

Can you think of a time when knowing the chances of something might have helped you make a better decision?

Teaching Note: This discussion helps students connect abstract probability concepts to practical decision-making. Encourage them to share personal examples and think critically about how probability influences their choices.

Wrapping Up Our Probability Adventure

Now that we’ve explored the world of probability, let’s pull everything together. Remember Sarah and her stamp search? Her story taught us something really important: when we make decisions, we need to think about both how likely something is to happen and what we might give up while trying to make it happen.

Today you learned that probability isn’t just about math – it’s a tool that helps you make smarter choices. You discovered how to calculate simple probabilities through our experiments with coins, dice, and cards, and you saw how understanding chances can help you make better decisions in your daily life.

Your Probability Challenge

Over the next few days, I have an interesting mission for you. Become a “Probability Detective” and:
– Notice three situations where probability plays a role in your life
– Write down what you think the chances are of different things happening
– Think about how these chances affect your decisions

For example, you might write:
Today I noticed that when I leave early for my friend’s house, I almost always (90% chance) get there on time. When I leave at the last minute, I’m usually (70% chance) late. This helps me decide when to start getting ready.

When we meet next time, we’ll learn about decision trees and how they can help us make even better choices. Bring your Probability Detective notes – I’d love to hear what you discovered!

Remember: Understanding probability doesn’t mean you’ll always make perfect choices or that things will always work out exactly as planned. But it does help you make smarter decisions based on what’s most likely to happen.

What was your favorite part of today’s probability adventures? What do you think you’ll notice differently now that you understand more about how probability works?

Song: Chances and Choices

Verse 1:
Flip a coin, roll a die
Fifty-fifty, one in five
Every choice has numbers showing
What might happen when we’re going
Down a path we need to choose
Some might win and some might lose

Chorus:
Understanding chances
Helps us see ahead
Like a map that guides us
Through the paths we tread
Sometimes what we’re sure of
Isn’t what we get
But knowing probabilities
Makes choices clearer yet

Verse 2:
Like that searching stamp tale shows
When to stay and when to go
Time spent looking has its cost
Count the chances or get lost
Zero to a hundred percent
Shows us how our odds are meant

(Chorus)

Bridge:
Weather forecasts, game show doors
Every choice has scores
When we know the numbers
We can see much more

(Chorus)

Outro:
So before you make your choice
Count the chances there
Probability’s a tool to use
When decisions need your care