Final answer:
The question pertains to comparing the total cost of pizzas from two different restaurants, involving algebraic expressions to calculate and compare these costs. Maya will need to use the expressions C1 = $6 + $12x for the first restaurant and C2 = $14x for the second to determine which offers the better deal for the number of pizzas she needs.
Step-by-step explanation:
The student's question involves comparing costs between two different pizza restaurants to determine which gives the best deal for the quantity of pizzas needed for a party. To calculate and compare the costs, we can use algebraic expressions to represent the total cost from each restaurant. For the first restaurant, which charges a delivery fee and a separate price per pizza, the total cost would be expressed as the sum of the delivery fee plus the product of the number of pizzas and the price per pizza. For the second restaurant, which only charges a price per pizza with no delivery fee, the total cost is simply the product of the number of pizzas and the price per pizza.
Let's denote the number of pizzas Maya plans to order as x. For the first restaurant, the cost would be C1 = $6 + $12x (with $6 representing the delivery fee and $12 being the price per pizza). For the second restaurant, the cost is C2 = $14x, as there is no delivery fee.
Maya will need to compare the two costs for the number of pizzas she wants to order to see which restaurant offers the better deal. If we are given a specific number of pizzas, we can plug that into both expressions and calculate the total cost for each restaurant. Additional factors, such as promotions or discounts, could also influence Maya's decision, but based on the information provided, the calculations focus solely on the direct costs.