Final answer:
The probability of a customer getting more than a 20% discount at the store is 30%, calculated by dividing the number of squares with more than a 20% discount (3) by the total number of squares (10).
Step-by-step explanation:
To answer the question about the probability that a customer gets more than a 20% discount at a new clothing store, we first need to identify the outcomes that are considered more than a 20% discount. In this case, the squares labeled with 30% and 50% discounts are the ones that fit this criterion.
Upon examining the distribution of discount percentages on the table, we find:
- 10% discount: 5 squares
- 20% discount: 2 squares
- 30% discount: 2 squares
- 50% discount: 1 square
The total number of squares is 10. To get the probability, we need to count the number of squares that offer more than a 20% discount and divide that by the total number of squares.
Probability = (Number of squares with more than 20% discount) / (Total number of squares) = (2 + 1) / 10 = 3/10 = 0.3
Therefore, the probability that a customer gets more than a 20% discount is 0.3 or 30%.