To determine how much money Mini Motorbikes & More will make by selling nine raffle tickets, we first need to identify the value represented by nine tickets on the step function graph.
If the graph shows money earned based on the number of raffle tickets sold (and considers that tickets are sold in groups of three), we need to find the corresponding "y" value on the graph when the "x" value is at nine tickets.
Since you are asking specifically about a situation involving a step function and ticket quantities in groups of three, let's calculate:
- Selling 3 tickets correlates to a certain earnings (let's say Y1).
- Selling 6 tickets correlates to another earnings (Y2).
- Selling 9 tickets correlates to yet another earnings (Y3).
In this context, from your options:
- The earnings for selling 9 tickets likely corresponds to a step value indicated on the graph at that point.
In the absence of visual data, I'd recommend reviewing the graph's corresponding y-value to the x-value of 9. If based on your provided options, the significant earnings occur at 9 tickets, it likely represents either $250 or $150 from your options.
If the graphical data has explicitly defined segments and we've established that at 9 tickets, the graph shows $250, then that would be the answer.
If it shows $150, that would then be your answer.
Without the actual graphic, it is impossible to give an exact answer here, but based on logical deduction, if the higher earning tier corresponds to 9 or if it’s stated, then aim for $250 as your expected result based on common increments of such raffle scenarios in most cases.
That said, if the information was generalized and no further values shown at 9, generally follow the steps of calculating based on how many tickets were sold times the increments shown, preferably approaching $250 over $150 if no other references were made.
Final decision: likely $250 based on expected step function results and value orientation to the higher earnings capacity.
1 answer