Respuesta :
Answer:
0.7176
Step-by-step explanation:
We solve this question, using z score formula.
Z score formula = (x - μ)/σ
where x is the raw score
μ is the population mean
σ is the population standard deviation.
For z1, where x1 = 2.8, μ = 4, σ = 0.5
z score formula = (2.8 - 4)/0.5
= -2.4
We find the probability of the z score using the z score table.
P(x = 2.8) = P(z = -2.4)
= 0.0081975
For z2, where x2 = 4.3, μ = 4, σ = 0.5
z score formula = (4.3 - 4)/0.5
= 0.3/0.5
= 0.6
We find the probability of the z score using the z score table.
P(x = 4.3) = P(z = 0.6)
= 0.72575
The probability that an item will take between 2.8 and 4.3 hours to move through the assembly line is calculated as:
= 2.8 < x < 4.3
= P(z = 0.6) - P(z = -2.4)
= 0.72575 - 0.0081975
= 0.7175525
Approximately ≈ 0.7176
Therefore, the probability that an item will take between 2.8 and 4.3 hours to move through the assembly line is 0.7176
