Can We Get There?
Students will calculate the rate of change and y-intercept from a real-world problem represented in a graph, a table, and/or an equation. They will then display and present their findings to the class.
Students working in their group
Camping with Fractions
Students will create equivalent fractions using measuring cups to make a trail mix and use the fractions to find the total amount of different ingredients.
Teacher during Introduction
No Interest If Paid in Full: How Much Do I Owe?
Students will write a linear equation from a real-world situation, identify the components of the equation, and interpret their meanings in the problem’s context.
Students working on task
Which One Doesn't Belong? Proportional vs Non-Proportional Relationships
Students will make connections as they examine proportional and non-proportional relationships represented in functions including tables, equations, graphs, and verbal descriptions and think critically to determine which one does not belong in a set and why.
Outside observers watching students working
Explain Your Thinking!
Students will use numberless and numbered logic problems as well as a rubric to practice self-reflection and justify their thinking.
Balancing Act
Given a prompt, students will solve a multi-step equation using concrete and/or pictorial models.
Teacher Posing the Task
Breakout with Linear Relationships
Through a collaborative breakout station format, students will access prior knowledge to develop a deeper understanding of the relationships of slope through proportional relationships represented by unit rate and linear non-proportional relationships. A variety of representations will be practiced through scenarios, tables, graphs, and equations.
Solving Multi-Step Word Problems with Rational Numbers
Students will apply strategies and the use of an analysis tool to break down steps in a word problem to understand the vocabulary and processes necessary to apply correct math operations and analyze solution feasibility.
Eric's Journey
Students will collaborate to solve a word problem involving rates of change using their prior knowledge and create a graph and/or table showing their work.
Teacher going over vocabulary
Fraction Division is Sweet
In learning stations, students use concrete objects, pictorial models, and digital models to represent and divide whole numbers by unit fractions and unit fractions by whole numbers.