Ryan is tracking how much money he has each week. He started with $60. He spent $5 per week for the first 6 weeks. He spent $10 per week after week 6 until the money's all spent. (4 points) Put responses in the correct input to answer the question. Select a response, navigate to the desired input and insert the response. Responses can be selected and inserted using the space bar, enter key, left mouse button or touchpad. Responses can also be moved by dragging with a mouse. A. The graph of the scenario would be Response area because the rate of change changes. B. The y-intercept for this scenario would be Response area meaning Response area. C. The rate of change is Response area because as the weeks increase, the money decreases.?
5 answers
A. The graph of the scenario would be piecewise linear because the rate of change changes.
B. The y-intercept for this scenario would be 60 meaning it represents the initial amount of money Ryan started with.
C. The rate of change is -5 for the first 6 weeks and -10 after week 6 because as the weeks increase, the money decreases.
For the last part, you could clarify it as follows:
C. The rate of change is -5 for the first 6 weeks and -10 after week 6 because as the weeks increase, Ryan decreases his money each week.
Additionally, it's important to note that it took Ryan 10 weeks to spend all of his money. You can combine these ideas for clarity:
C. The rate of change is -5 for the first 6 weeks and -10 after week 6 because as the weeks increase, Ryan decreases his money each week, and it took him 10 weeks to spend all of his money.
In that case, for the last part, you can choose:
C. The rate of change is -10 after week 6 because as the weeks increase, Ryan decreases his money each week.
This focuses on the rate of change aspect of the scenario.
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