An ice cream store sells 20 different flavors of ice cream and 3 different types of cones. How many different combinations of cone and ice cream flavor are possible, if customers are permitted to choose only one flavor of ice cream to be served in one of the 3 cones?
The local ice cream parlor has 20 different flavors of ice cream, 4 different types of cones, and 6 different types of toppings. The customer can choose 1 flavor of ice cream, 1 type of cone, and 1 topping. How many different kinds of ice cream cones can be created?
Ms. Sue is right! 3*20=?
At an ice cream parlor, you can choose one flavor of ice cream, one topping, and either a sugar cone, a waffle cone, or a cup.
There are 20 flavors of ice cream and 10 types of toppings.
How many different desserts can be created at this ice cream parlor?
To find the total number of different combinations of cones and ice cream flavors, we need to multiply the number of choices for each category.
There are 20 different flavors of ice cream, and each flavor can be paired with any one of the 3 types of cones. So the total number of combinations is calculated as:
Total combinations = Number of ice cream flavors × Number of cone types
Total combinations = 20 flavors × 3 cones
Total combinations = 60
Therefore, there are 60 different combinations of cone and ice cream flavor that are possible.