A lunch menu has 4 different sandwiches, 2 different soups, and 5 different drinks. How many different lunches consisting of a sandwich, a soup, and a drink can you choose?
A. 10
B. 11
C. 40
D. 13
There are 4 options for the sandwich, 2 options for the soup, and 5 options for the drink. To find the total number of lunch combinations, we multiply these options together:
4 sandwiches × 2 soups × 5 drinks = 40 different lunch combinations
Therefore, the answer is C. 40.
To find the number of different lunches, we multiply the number of choices for each category.
Number of different sandwiches = 4
Number of different soups = 2
Number of different drinks = 5
Therefore, the number of different lunches = 4 x 2 x 5 = 40.
So, the correct answer is C. 40.
To solve this problem, we need to find the total number of possible combinations of sandwiches, soups, and drinks.
The number of different sandwiches is 4.
The number of different soups is 2.
The number of different drinks is 5.
To find the number of different lunches, we need to multiply the number of options for each category.
4 sandwiches * 2 soups * 5 drinks = 40 different lunches
Therefore, the correct answer is C. 40.