Customers can choose to get ice cream in a plain cone or waffle cone at the ice cream bar. There are three ice cream flavors (chocolate, strawberry, and vanilla) and two toppings (nuts or sprinkles) to choose from. How many different choices of one cone, one type of ice cream, and one topping are possible?
2 kinds of cones, 3 flavors, 2 toppings.
You want one of each on your cone.
Number of different possible ice cream cones
= 2*3*2 = 12
Well, let's do some quick math here. We have two choices for the type of cone (plain or waffle), three choices for the ice cream flavor (chocolate, strawberry, or vanilla), and two choices for the topping (nuts or sprinkles). So, using the multiplication principle, we multiply the number of choices together: 2 (cone choices) x 3 (ice cream flavor choices) x 2 (topping choices) = 12. So, there are 12 different choices possible. That's a lot of combinations! Just remember to choose wisely, because the wrong combination could be cone-sequential!
To find the number of different choices, we can multiply the number of choices for each category.
1. Cone: There are 2 choices – plain cone or waffle cone.
2. Ice Cream Flavor: There are 3 choices – chocolate, strawberry, or vanilla.
3. Topping: There are 2 choices – nuts or sprinkles.
To get the total number of different choices, we multiply these numbers together:
2 (choices of cone) × 3 (choices of ice cream flavor) × 2 (choices of topping) = 12
Therefore, there are 12 different choices of one cone, one type of ice cream, and one topping possible.
To find the number of different choices of one cone, one type of ice cream, and one topping, we need to multiply the number of choices for each category together.
1. Number of choices for the cone:
- There are two options: plain cone or waffle cone.
2. Number of choices for the ice cream flavor:
- There are three options: chocolate, strawberry, and vanilla.
3. Number of choices for the topping:
- There are two options: nuts or sprinkles.
To find the total number of choices, you multiply the number of choices for each category:
2 (cones) x 3 (ice cream flavors) x 2 (toppings) = 12
Therefore, there are 12 different choices of one cone, one type of ice cream, and one topping at the ice cream bar.