Final answer:
The probability that the first winner randomly selects the card for the pizza topped with spicy italian sausage, banana peppers, and beef is \( \frac{1}{680} \).
Step-by-step explanation:
To calculate the probability that the first winner randomly selects the card for the pizza topped with spicy italian sausage, banana peppers, and beef, we first need to determine the total number of possible distinct three-topping pizzas that can be made from the list provided.
- The toppings available are: Green peppers, onions, kalamata olives, sausage, mushrooms, black olives, pepperoni, spicy italian sausage, roma tomatoes, green olives, ham, grilled chicken, jalapeño peppers, banana peppers, beef, chicken fingers, and red peppers.
There are a total of 17 toppings to choose from. Since we want to choose 3 distinct toppings for a pizza, we use the combination formula \( C(n, k) = \frac{n!}{k!(n-k)!} \) where \( n \) is the total number of items to pick from, and \( k \) is the number of items to pick. Here, \( n=17 \) and \( k=3 \).
\( C(17, 3) = \frac{17!}{3!(17-3)!} = \frac{17 \times 16 \times 15}{3 \times 2 \times 1} = 17 \times 8 \times 5 = 680 \).
So, there are 680 different distinct three-topping pizza combinations that can be made. Since only one of these combinations includes spicy italian sausage, banana peppers, and beef, the probability that this specific combination is chosen is \( \frac{1}{680} \).
Therefore, the probability that the first winner selects the card for the pizza with spicy italian sausage, banana peppers, and beef is \( \frac{1}{680} \).