Final answer:
The interval containing the middle-most 60% of scores for a normal distribution with mean 100 and standard deviation 6 is approximately [95.0, 105.0] using z-scores and the standard normal distribution table.
Step-by-step explanation:
The student is asked to find the interval containing the middle-most 60% of scores for a normal distribution with a mean of 100 and a standard deviation of 6. To find this interval, we need to use the z-scores associated with the middle 60%. Since we're not given the exact z-scores to use for 60%, we need to look at a standard normal distribution table or use a calculator to determine the z-scores that correspond to the 20th percentile (bottom 20%) and the 80th percentile (top 20%), thus encompassing the middle 60%.
The z-score for the bottom 20% is approximately -0.84 and for the top 20% is approximately +0.84. We can then convert these z-scores back to the original scale using the formula:
x = μ + (z)(σ)
For the lower limit: x = 100 + (-0.84)(6) = 94.96 (approximately 95)
For the upper limit: x = 100 + (0.84)(6) = 105.04 (approximately 105)
The interval containing the middle-most 60% of scores is approximately [95.0, 105.0] in interval notation.