IM 8.3.14 Lesson: Using Linear Relations to Solve Problems

Grapes cost $2.39 per pound. Bananas cost $0.59 per pound. You have $15 to spend on  pounds of grapes and  pounds of bananas.

A savings account has $50 in it at the start of the year and $20 is deposited each week. After  weeks, there are  dollars in the account.

Choose one line and write a description of what happens to that person's account over the first 17 weeks of the year. Do not tell your group which line you chose. Share your story with your group and see if anyone can guess your line.

Write an equation for line on the graph. What do the slope, , and vertical intercept, , in each equation mean in the situation?

Write an equation for line on the graph. What do the slope, , and vertical intercept, , in each equation mean in the situation?

Write an equation for line on the graph. What do the slope, , and vertical intercept, , in each equation mean in the situation?

Write an equation for line on the graph. What do the slope, , and vertical intercept, , in each equation mean in the situation?

Write an equation for line on the graph. What do the slope, , and vertical intercept, , in each equation mean in the situation?

For which equation is  a solution? Interpret this solution in terms of your story.

Predict the balance in each account after 20 weeks.

What are five different combinations of salmon and tilapia that the market can order?

Define variables and write an equation representing the relationship between the amount of each fish bought and how much the market spends.

Explain or show your reasoning.

List two ways you can tell if a pair of numbers is a solution to an equation.