The 90th percentile of x is approximately 63.36. This means that 90% of the values in the population are less than or equal to 63.36.
To find the probability that a randomly selected value from the population is greater than 45, you can use the Z-score formula and the standard normal distribution.
The Z-score is calculated as:
Z= X−μ/σ
where:
X is the value you're interested in (45 in this case),
μ is the mean of the population (48 in this case),
σ is the standard deviation of the population (12 in this case).
So,
Z= 45−48/12 =−0.25
Now, you can look up the probability that a Z-score is greater than -0.25 in the standard normal distribution table or use a calculator. For -0.25, the probability is about 0.5987.
Therefore, the probability that a randomly selected value from the population is greater than 45 is approximately 0.5987 or 59.87%.
Next, to find the 90th percentile of x, you'll need to find the Z-score corresponding to the 90th percentile. You can look up this value in the standard normal distribution table or use a calculator. For the 90th percentile, the Z-score is approximately 1.28.
Now, use the Z-score formula to find X (the value corresponding to the 90th percentile):
X=μ+Z×σ
X=48+1.28×12=48+15.36=63.36
Therefore, the 90th percentile of x is approximately 63.36. This means that 90% of the values in the population are less than or equal to 63.36.