Answer:
Step-by-step explanation:
P(200<X<275)
P(200-200/50 <X< 275-200/50)
P(0/50 <X< 75/50)
P(0<X<1.5)
P(X<1.5) -P(X>0)
0.9332-0.5 = 0.4332
Answer:
The probability is 0.4332.
Explanation:
Mean = μ = 200
Standard deviation = σ = 50
We are required to find the probability that a randomly selected resident has a triglyceride level between 200 and 275. That is,
P (200 < X < 275) = ?
We are further informed that the triglyceride levels are normally distributed. We, therefore, convert it into standard normal distribution (Z-distribution), and compute it as follows.
P (200 < X < 275)
= P [(200 - 200)/50 < (X - μ)/σ < (275 - 200)/50]
= P (0 < Z < 1.5)
= P(Z < 1.5) - P(Z < 0)
= 0.9332 - 0.5
= 0.4332
Therefore, the probability that a randomly selected resident has a triglyceride level between 200 and 275 is 0.4332.
