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Students will apply their understanding of inequalities to keep game characters on screen.

Prerequisites

Relevant Standards

Select one or more standards from the menu on the left (⌘-click on Mac, Ctrl-click elsewhere).

Common Core Math Standards
6.EE.B.6

Use variables to represent numbers and write expressions when solving a real-world or mathematical problem; understand that a variable can represent an unknown number, or, depending on the purpose at hand, any number in a specified set.

6.EE.B.8

Write an inequality of the form x > c or x < c to represent a constraint or condition in a real-world or mathematical problem. Recognize that inequalities of the form x > c or x < c have infinitely many solutions; represent solutions of such inequalities on number line diagrams.

7.EE.B

Solve real-life and mathematical problems using numerical and algebraic expressions and equations.

HSA.CED.A.1

Create equations and inequalities in one variable and use them to solve problems.

HSA.CED.A.3

Represent constraints by equations or inequalities, and by systems of equations and/or inequalities, and interpret solutions as viable or nonviable options in a modeling context.

HSF.BF.A.1.C

Compose functions.

HSF.BF.B

Build new functions from existing functions.

MP.4

Model with mathematics

Oklahoma Standards
OK.A1.A.2

Represent and solve real-world and mathematical problems using linear inequalities, compound inequalities and systems of linear inequalities; interpret solutions in the original context.

OK.PA.A.4.3

Represent real-world situations using equations and inequalities involving one variable.

Lesson Goals

Students will be able to:

  • apply their understanding of inequalities to keep a game character on the screen

Student-Facing Lesson Goals

  • I can use what I know about inequalities to define the boundaries that will keep a character on the screen.

Materials

Preparation

  • Make sure all materials have been gathered

  • Decide how students will be grouped in pairs

Supplemental Resources

Language Table

Types

Functions

Values

Number

num-expt, num-sqr, num-sqrt

4, -1.2, 2/3, pi

String

string-length, string-repeat, string-contains

"hello", "91"

Boolean

<, >, <>, <=, >=, string-equal, <, >, ==, <>, >=, and, or

true, false

Image

star, triangle, circle, square, rectangle, rhombus, ellipse, regular-polygon, radial-star, text, overlay, above, beside, rotate, scale, flip-horizontal, flip-vertical

πŸ”΅πŸ”ΊπŸ”Ά

Glossary
coordinate

a number or set of numbers describing an object’s location

expression

a computation written in the rules of some language (such as arithmetic, code, or a Circle of Evaluation)

🔗Introducing Sam 30 minutes

Overview

Students are introduced to Sam the Butterfly: a simple activity in which they must write 1-step inequalities to detect when Sam has gone too far in one dimension.

Launch

Have students open the

Sam The Butterfly starter file (Pyret) and click "Save A Copy."

Have students turn to the Introducing Sam (Page 74), click run and use the arrow keys to investigate the program with their partner.

  • What is something you noticed about this program? As Sam moves, the coordinates are displayed at the top of the screen; the coordinates are all in the 1st quadrant; etc.

  • What do you see when Sam is at (0,0)? Why is that? You only see part of Sam’s wing. Sam’s position is based on the center of Sam’s image.

  • How far can Sam go to the left and stay on the screen? Up to, but not beyond, an x of -40.

  • How could we write this as an expression? x ≥ -40, or x > -50

Every time Sam moves, we want to check and see if Sam is safe.

  • There are three functions defined in this file. What are they?

Optional: For extra scaffolding…​

  • What should our left-checking function do? Check to see if x is greater than -50

  • What should our right-checking function do? Check to see if x is less than 690

  • What should onscreen? do? Answers may vary, let students drive the discussion, and don’t give away the answer

Investigate

With their partners, students complete Left and Right (Page 75). Once finished, students can fix the corresponding functions in their Sam the Butterly file, and test them out.

Students will notice that fixing is-safe-left keeps Sam from disappearing off the left, but fixing is-safe-right doesn’t seem to keep Sam from disappearing off the right side! When students encounter this, encourage them to look through the code to try and figure out why. The answer will be revealed in the next lesson.

  • Recruit three new student volunteers to roleplay those same functions, which have now been corrected. Make sure students provide correct answers, testing both true and false conditions using coordinates where Sam is onscreen and offscreen.

Common Misconceptions

  • Many students - especially traditionally high-achieving ones - will be very concerned about writing examples that are "wrong." The misconception here is that an expression that produces false is somehow incorrect. You can preempt this in advance, by explaining that our Boolean-producing functions should sometimes return false, such as when Sam is offscreen.

  • Push students to think carefully about corner-cases, such as when Sam is exactly at -50 or 690.

🔗Protecting Sam on Both Sides 30 minutes

Overview

Students solve a word problem involving compound inequalities, using and to compose the simpler Boundary-checking functions from the previous lesson.

Launch

  • Recruit three student volunteers to roleplay the functions safe-left?, safe-right? and onscreen?. Give them 1 minute to read the contract and code, as written in the program.

  • As in the previous lesson, ask the volunteers what their name, Domain and Range are, and then test them out by calling out their name, followed by a number. (For example, "(safe-left? 20)!", "(safe-right? -100)!", "(onscreen? 829)!") Note" the code for onscreen calls the safe-left function!. So the student roleplaying onscreen should turn to safe-left and give the input to them.

For example:

  • Facilitator: "is-onscreen 70"

  • is-onscreen (turns to is-safe-left): "is-safe-left 70"

  • is-safe-left: "true"

  • is-onscreen (turns back to facilitator): "true"

  • Facilitator: "onscreen-huh -100"

  • is-onscreen (turns to is-safe-left): "safe-left-huh -100"

  • is-safe-left: "false"

  • is-onscreen (turns back to facilitator): "false"

  • Facilitator: "onscreen-huh 900"

  • is-onscreen (turns to is-safe-left): "safe-left-huh 900"

  • is-safe-left: "true"

  • is-onscreen (turns back to facilitator): "true"

Ask the rest of the class

  • What is the problem with is-onscreen?
    It’s only talking to is-safe-left, it’s not checking with is-safe-right

  • How can is-onscreen check with both?
    It needs to talk to is-safe-left AND is-safe-right

Have students complete Word Problem: is-onscreen (Page 76). When this functions is entered into WeScheme, students should now see that Sam is protected on _both sides of the screen.

Extension Option What if we wanted to keep Sam safe on the top and bottom edges of the screen as well? What additional functions would we need? What functions would need to change?

🔗Boundary Detection in the Game 10 minutes

Overview

Students identify common patterns between 2-dimensional Boundary detection and detecting whether a player is onscreen. They apply the same problem-solving and narrow mathematical concept from the previous lesson to a more general problem.

Launch

Have students open their in-progress game file and press Run.

  • How are the TARGET and DANGER behaving right now?
    They move across the screen.

  • What do we want to change?
    We want them to come back after they leave one side of the screen.

  • How do we know when an image has moved off the screen?
    We can see it.

  • How can we make the computer understand when an image has moved off the screen?
    We can teach the computer to compare the image’s coordinates to a boundary on the number line, just like we did with Sam the Butterfly!

Investigate

Students apply what they learned from Sam the Butterly to fix the is-safe-left, is-safe-right, and is-onscreen functions in their own code.

Since the screen dimensions for their game are 640x480, just like Sam, they can use their code from Sam as a starting point.

Common Misconceptions

  • Students will need to test their code with their images to see if the boundaries are correct for them. Students with large images may need to use slightly wider boundaries, or vice versa for small images. In some cases, students may have to go back and rescale their images if they are too large or too small for the game.

  • Students may be surprised that the same code that "traps Sam" also "resets the DANGER and `TARGET`". It’s critical to explain that these functions do neither of those things! All they do is test if a coordinate is within a certain range on the x-axis. There is other code (hidden in the teachpack) that determines what to do if the coordinate is offscreen. The ability to re-use function is one of the most powerful features of mathematics - and programming!

🔗Additional Exercises

These materials were developed partly through support of the National Science Foundation, (awards 1042210, 1535276, 1648684, and 1738598). CCbadge Bootstrap:Algebra by the Bootstrap Community is licensed under a Creative Commons 4.0 Unported License. This license does not grant permission to run training or professional development. Offering training or professional development with materials substantially derived from Bootstrap must be approved in writing by a Bootstrap Director. Permissions beyond the scope of this license, such as to run training, may be available by contacting contact@BootstrapWorld.org.