Final answer:
Approximately 25.14% of the tax refunds are more than $3,100, calculated using the normal distribution and the z-score for a $3,100 refund.
Step-by-step explanation:
To determine what percent of tax refunds are more than $3,100 when the mean tax refund is $2,800 with a standard deviation of $450, we'll use the normal distribution properties.
First, we need to find the z-score for $3,100, which is calculated by subtracting the mean from the value and then dividing by the standard deviation. So, the z-score for a $3,100 refund is:
Z = ($3,100 - $2,800) / $450 ≈ 0.67
Now, using a z-table or normal distribution calculator, we can find the probability that a tax refund is less than $3,100, and then subtract this value from 1 to find the probability that a refund is more than $3,100.
The z-table gives us a probability of approximately 0.7486 that a refund is less than $3,100, so the probability that a refund is greater is:
1 - 0.7486 = 0.2514
This means approximately 25.14 percent of the tax refunds are more than $3,100.