Lesson 12On Both of the Lines
Learning Goal
Let’s use lines to think about situations.
Learning Targets
I can use graphs to find an ordered pair that two real-world situations have in common.
Lesson Terms
- system of equations
Warm Up: Notice and Wonder: Bugs Passing in the Night
Problem 1
What do you notice? What do you wonder?
Activity 1: Bugs Passing in the Night, Continued
Problem 1
A different ant and ladybug are a certain distance apart, and they start walking toward each other. The graph shows the ladybug’s distance from its starting point over time and the labeled point
The ant is walking 2 centimeters per second.
Write an equation representing the relationship between the ant’s distance from the ladybug’s starting point and the amount of time that has passed.
If you haven’t already, draw the graph of your equation on the same coordinate plane.
Activity 2: A Close Race
Problem 1
Elena and Jada were racing 100 meters on their bikes. Both racers started at the same time and rode at constant speed. Here is a table that gives information about Jada’s bike race:
time from start (seconds) | distance from start (meters) |
---|---|
Graph the relationship between distance and time for Jada’s bike race. Make sure to label and scale the axes appropriately.
Elena traveled the entire race at a steady 6 meters per second. On the same set of axes, graph the relationship between distance and time for Elena’s bike race.
Who won the race?
Lesson Summary
The solutions to an equation correspond to points on its graph. For example, if Car A is traveling 75 miles per hour and passes a rest area when
If you have two equations, you can ask whether there is an ordered pair that is a solution to both equations simultaneously. For example, if Car B is traveling towards the rest area and its distance from the rest area is
we can ask if there is ever a time when the distance of Car A from the rest area is the same as the distance of Car B from the rest area. If the answer is “yes”, then the solution will correspond to a point that is on both lines.
Looking at the coordinates of the intersection point, we see that Car A and Car B will both be 7.5 miles from the rest area after 0.1 hours (which is 6 minutes).
Now suppose another car, Car C, had also passed the rest stop at time
When we have two linear equations that are equivalent to each other, like