Bernie's Breakfast Buffet has a wide selection of breakfast food available. They have 4 types of cereal, 5 types of fruit, and 6 styles of cooked eggs. How many different ways can someone choose a breakfast consisting of one type of cereal, one piece of fruit, and one style of cooked eggs?
I am not that good at probabilities.
To determine the number of different ways to choose a breakfast consisting of one type of cereal, one piece of fruit, and one style of cooked eggs, you can use the concept of the product rule.
First, determine the number of options for each component: cereal, fruit, and cooked eggs.
The number of options for cereal is 4.
The number of options for fruit is 5.
The number of options for cooked eggs is 6.
To calculate the total number of different ways to choose a breakfast, multiply the number of options for each component:
4 (cereal options) * 5 (fruit options) * 6 (cooked eggs options) = 120
Therefore, there are 120 different ways to choose a breakfast consisting of one type of cereal, one piece of fruit, and one style of cooked eggs at Bernie's Breakfast Buffet.
To calculate the number of different ways someone can choose a breakfast consisting of one type of cereal, one piece of fruit, and one style of cooked eggs, you can use the principle of multiplication.
First, determine the number of choices for each category:
1. Cereal: There are 4 types of cereal to choose from.
2. Fruit: There are 5 types of fruit to choose from.
3. Cooked eggs: There are 6 styles of cooked eggs to choose from.
To find the total number of possibilities, multiply the number of choices for each category:
Total possibilities = Number of cereal types × Number of fruit types × Number of styles of cooked eggs
Total possibilities = 4 × 5 × 6 = 120
Therefore, there are 120 different ways someone can choose a breakfast consisting of one type of cereal, one piece of fruit, and one style of cooked eggs at Bernie's Breakfast Buffet.