Lesson 7

The diagram shows several lines. You can only see part of the lines, but they actually continue forever in both directions.

1. Which lines are images of line \(f\) under a translation?
2. For each line that is a translation of \(f\), draw an arrow on the grid that shows the vertical translation distance.

1. Diego earns $10 per hour babysitting. Assume that he has no money saved before he starts babysitting and plans to save all of his earnings. Graph how much money, \(y\), he has after \(x\) hours of babysitting.

2. Now imagine that Diego started with $30 saved before he starts babysitting. On the same set of axes, graph how much money, \(y\), he would have after \(x\) hours of babysitting.

3. Compare the second line with the first line. How much more money does Diego have after 1 hour of babysitting? 2 hours? 5 hours? \(x\) hours?

4. Write an equation for each line.

 

1. Experiment with moving point \(A\).
   1. Place point \(A\) in three different locations above the \(x\)-axis. For each location, write the equation of the line and the coordinates of point \(A\).
   2. Place point \(A\) in three different locations below the \(x\)-axis. For each location, write the equation of the line and the coordinates of point \(A\).
   3. In the equations, what changes as you move the line? What stays the same?
   4. If the line passes through the origin, what equation is displayed? Why do you think this is the case?
2. Your teacher will give you 12 cards. There are 4 pairs of lines, A–D, showing the graph, \(a\), of a proportional relationship and the image, \(h\), of \(a\) under a translation. Match each line \(h\) with an equation and either a table or description. For the line with no matching equation, write one on the blank card.

During a mid-winter storm, the snow again fell at a rate of \(\frac12\) inch per hour, but this time there was already 5 inches of snow on the ground.