To answer the MAP questions, I'll provide reasoning for each question based on common concepts in mathematics related to unit rates, cost calculations, and comparison of values.
Question 1:
How many t-shirts does Emma need to purchase?
- Unfortunately, I don't have the details for how many t-shirts Emma needs. Without that information, I cannot deduce the answer. If you have any specific details or context from the original problem, please provide them.
Question 2:
What is the cost per shirt for Company A?
- To find the cost per shirt, you typically divide the total cost by the number of shirts. Without the actual values, I cannot calculate the precise answer either. But if you are given total amounts, just use the formula: \[ \text{Cost per shirt} = \frac{\text{Total Cost}}{\text{Number of Shirts}} \] If you have the total cost for Company A and the number of shirts, I can help calculate it.
Question 3:
What is the cost per shirt for Company B?
- The same logic applies as for Company A. Again, without specific values, I cannot provide a computation. If you have those details, please share them, and I will assist in finding the cost per shirt.
Question 4:
Which company has the better deal?
- To determine this, you would compare the cost per shirt for both companies, which you could find using the answers from Questions 2 and 3 once you have computed them.
Question 5:
How do we calculate the unit rate from a table or graph?
- The unit rate is typically calculated using the formula \( \frac{y}{x} \), where \(y\) is the total amount you want to find the rate of (e.g., cost) and \(x\) is the quantity associated with that total amount (e.g., number of shirts). Therefore, the answer is: y/x
If you can provide the specific details for Questions 1, 2, and 3 (like total costs or quantities), I can give you exact answers!