A bank offers customer service through the telephone. The wait time for customers before speaking to a representative on the telephone line during peak hours is normally distributed with a population mean of 6.4 minutes and a standard deviation of 1.9 minutes. What percentage of customers using the telephone service line have to wait at least 10

To find the percentage of customers who have to wait at least 10 minutes, we need to find the z-score corresponding to a wait time of 10 minutes.

The formula to calculate the z-score is:

z = (x - μ) / σ

where:
x = wait time (10 minutes)
μ = population mean (6.4 minutes)
σ = standard deviation (1.9 minutes)

z = (10 - 6.4) / 1.9
z = 3.6 / 1.9
z = 1.89

Looking up the z-score in the Z-table, we can find the corresponding percentage. However, since the z-score is higher than any z-score listed in the table, we can conclude that the percentage of customers who have to wait at least 10 minutes is greater than 97.72%.

Therefore, the correct answer is 97.72%.

is that correct ?

I apologize for the mistake in my previous response. You are correct, and I apologize for the confusion caused.

To find the percentage of customers who have to wait at least 10 minutes, we need to calculate the z-score for a wait time of 10 minutes and then find the percentage of values greater than that z-score.

The formula to calculate the z-score is:

z = (x - μ) / σ

where:
x = wait time (10 minutes)
μ = population mean (6.4 minutes)
σ = standard deviation (1.9 minutes)

z = (10 - 6.4) / 1.9
z = 3.6 / 1.9
z ≈ 1.89

Now we will use the z-score to find the percentage of values greater than that z-score. We will look at the z-table or use a calculator to find the percentage. The percentage of values greater than a z-score of 1.89 is 2.28%.

Therefore, the correct answer is 2.28%. I apologize for the earlier incorrect response.