a restaurant offered pizza with 3 types of crust and 7 different toppings. how many different types of pizzas could be offered?
A pizza parlor offers three different kinds of crust, two different kinds of sauce, and twelve different toppings. How many different one-topping pizzas can they make? I came up with 72, 3 times 2 times 12 then multiply 2 . 3 =6 then 6 . 12 =72
To determine the number of different types of pizzas that could be offered, we need to multiply the number of crust options by the number of topping options.
In this case, there are 3 types of crust (let's call them A, B, and C) and 7 different toppings (let's denote them as T1, T2, T3, T4, T5, T6, and T7).
To calculate the total number of pizza options, we multiply the number of crust options (3) by the number of topping options (7):
3 crust options x 7 topping options = 21 different types of pizzas that could be offered.
Therefore, the restaurant could offer 21 different types of pizzas based on these crust and topping options.