Lesson 3Using Equations to Solve Problems
Learning Goal
Let’s use equations to solve problems involving proportional relationships.
Learning Targets
I can find missing information in a proportional relationship using the constant of proportionality.
I can relate all parts of an equation like
to the situation it represents.
Lesson Terms
- constant of proportionality
Warm Up: Number Talk: Quotients with Decimal Points
Problem 1
Without calculating, order the quotients of these expressions from least to greatest.
Problem 2
Place the decimal point in the appropriate location in the quotient:
. Use this answer to find the quotient of one of the previous expressions.
Activity 1: Concert Ticket Sales
Problem 1
A performer expects to sell 5,000 tickets for an upcoming concert. They want to make a total of $311,000 in sales from these tickets.
Assuming that all tickets have the same price, what is the price for one ticket?
How much will they make if they sell 7,000 tickets?
How much will they make if they sell 10,000 tickets? 50,000? 120,000? a million?
tickets? If they make $404,300, how many tickets have they sold?
How many tickets will they have to sell to make $5,000,000?
Activity 2: Recycling
Problem 1
Aluminum cans can be recycled instead of being thrown in the garbage. The weight of 10 aluminum cans is 0.16 kilograms. The aluminum in 10 cans that are recycled has a value of $0.14.
If a family threw away 2.4 kg of aluminum in a month, how many cans did they throw away? Explain or show your reasoning.
What would be the recycled value of those same cans? Explain or show your reasoning.
Write an equation to represent the number of cans
given their weight . Write an equation to represent the recycled value
of cans. Write an equation to represent the recycled value
of kilograms of aluminum.
Are you ready for more?
Problem 1
The EPA estimated that in 2013, the average amount of garbage produced in the United States was 4.4 pounds per person per day. At that rate, how long would it take your family to produce a ton of garbage? (A ton is 2,000 pounds.)
Lesson Summary
Remember that if there is a proportional relationship between two quantities, their relationship can be represented by an equation of the form
For example, we know that Denali, the highest mountain peak in North America, is 20,310 feet above sea level. How many miles is that? There are 5,280 feet in 1 mile. This relationship can be represented by the equation
So