Today, we're going to explore Algebra Tiles, a fantastic tool that helps us model algebraic expressions. They allow us to visualize mathematical concepts. Can someone tell me what an algebraic expression is?

Exactly! And using Algebra Tiles, we can represent these expressions physically. For example, each square tile could represent x², while rectangles could represent single x terms. Let's remember: 'Tiles help us see!' That's a nice memory aid!

Great question! We can arrange them to form expressions and visually manipulate them. For instance, if we have 3x + 1, we would place three rectangle tiles and one single tile.

Yes, we can! Factorization is a fantastic application for Algebra Tiles. We'll discuss how to use them to break down expressions later. For now, remember: 'Tiles equal clarity!'

Now that we understand how to represent expressions, let's dive into factorization. Does anyone remember what factorization means?

Exactly! When we factor an expression like x² - 1, we can use the tiles to visualize it. What does x² mean here?

Correct! And we also need to consider the constant -1, which we could represent by removing a single tile. How would we show that in factored form?

Yes! Remember: 'Factor to simplify!' is a helpful phrase to keep in mind for today's lesson.

Let's transition to a hands-on activity! I want you all to pair up and use your Algebra Tiles to represent the expression 2x² + 3x - 2. Can anyone lead us on how we might start?

Exactly! As you work, think about how these arrangements help you combine and simplify expressions. When you're done, try to factor what you've built into a product of binomials.

To wrap things up, what have we learned today about Algebra Tiles?

Absolutely! Keep in mind our memory aids as we finalize: 'Tiles help us see!' and 'Factor to simplify!'.