Answer:
The probability is 0.046
Solution:
As per the question:
Minimum calorie intake of an individual per day, [tex]bar{X} = 2600[/tex]
The no. of calories ingestion on an average per day per capita, Mean[tex](\mu) = 2460[/tex]
Standard deviation, [tex]\sigma = 500[/tex]
No. of individuals in a random sample, n = 36
Now,
The Probability for the sample mean to exceed the WHO minimum is given by:
P([tex]\bar{X} geq 2600) = [tex]\frac{\bar{X} - \mu}{\frac{\sigma}{n}}[/tex]
P([tex]\bar{X} geq 2600) = [tex]\frac{2600 - 2460}{\frac{500}{6}} = 1.68[/tex]
Now, with the help of Standard Normal table:
P(Z > 1.68) = 0.0046
