Here are their responses:[br]1 2 1 3 0 1 1 2 0 3 0 0 1 2 2[br][br]Could you use a dot plot to represent the data? Explain your reasoning.

Use your dot plot to study the distribution for number of toppings. What do you notice about the number of toppings that this group of customers ordered? Write 2–3 sentences summarizing your observations.

Think of a statistical question that can be answered with the data about the number of toppings ordered, as displayed on the dot plot.

Answer the statistical question that you just wrote above.

Use the dot plot to answer the following questions. For each, show or explain your reasoning.[img]data:image/png;base64,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[/img][br][br][br]What percentage of the students reported spending 1 hour on homework each week?

What percentage of the students reported spending 4 or fewer hours on homework each week?

Would 6 hours per week be a good description of the number of hours this group of students spends on homework per week? What about 1 hour per week? Explain your reasoning.

What value do you think would be a good description of the homework time of the students in this group? Explain your reasoning.

Someone said, “In general, these students spend roughly the same number of hours doing homework.” Do you agree? Explain your reasoning.