The deli special lunch offers a choice of three different sandwiches, four kinds of salads, and five different desserts. Use the multiplication rule of counting to determine the number of different lunches that can be ordered using the deli special lunch option, if each consists of one sandwich, one salad, and one dessert.

What are you saying Ms. Sue

To determine the number of different lunches that can be ordered, we can apply the multiplication rule of counting. According to this rule, the total number of arrangements is found by multiplying together the number of choices for each component.

The deli special lunch offers three sandwich choices, four salad choices, and five dessert choices. Thus, using the multiplication rule, the total number of possible lunches is:

3 (sandwich choices) x 4 (salad choices) x 5 (dessert choices) = 60

Therefore, there are 60 different lunches that can be ordered using the deli special lunch option, assuming each consists of one sandwich, one salad, and one dessert.

To determine the number of different lunches that can be ordered using the deli special lunch option, we need to multiply the number of choices for each component.

1. Start by identifying the number of choices for each component:
- Sandwiches: 3 different options
- Salads: 4 different options
- Desserts: 5 different options

2. Apply the multiplication rule of counting:
- Multiply the number of choices together: 3 x 4 x 5 = 60

Therefore, there are 60 different lunches that can be ordered using the deli special lunch option, each consisting of one sandwich, one salad, and one dessert.

3 * 4 * 5 = ?