To determine which option is cheaper per day, you'd typically need to compare the cost equations or data points provided for both options.
Option A is represented by the equation \( y = 4.25x \), where \( y \) is the total cost and \( x \) is the number of days.
For Option B, you'll want to examine the graph to identify the cost for various values of \( x \) (days).
- Calculate the cost of Option A for a certain number of days.
- Check the corresponding cost for Option B from the graph for the same number of days.
- Compare the costs to see which is lower.
Since I can't see the graph to provide a specific answer, I cannot definitively tell you which option is cheaper. However, by following the steps outlined, you will be able to figure it out.
If you observe that Option A's cost for a specific number of days is less than Option B's cost from the graph, then you would enter 1 for Option A. If Option B is cheaper, you would enter 2 for Option B.
Please perform the calculations or review the graph to reach a conclusion based on the specific values.