I need a calculated solution regarding the following question: CDs are produced

Question

I need a calculated solution regarding the following question:

CDs are produced by a firm. The number of flaws, X, on a CD has the following probability distribution:

1. Calculate the mean and standard deviation of the number of flaws per CD and describe the distribution of the average number of flaws per CD in a sample of 400 CDs. Calculate the mean and variance of this distribution.

2. what is the probability that the mean number of flaws per CD in a batch of 400 is less than 0.3?

Explanation / Answer

1. Mean = xp(x)

= 0*0.75 + 1*0.15 + 2*0.10

= 0.35

Variance 2 = x2p(x) - Mean2

= 0*0.75 + 1*0.15 + 4*0.10 - 0.35*0.35

= 0.4275

Standard deviation = 0.4275 = 0.6538.

Since the probabilities sum to 1, the average number of flaws form a normal distribution.

Sample variance s2 = 2 / n

= 0.4275 / 400

= 0.00106875

2. Sample standard deviation s = 0.00106875 = 0.03269

x = + zs

=> 0.3 = 0.35 + 0.03269z

z = (0.3 - 0.35) / 0.03269

= -1.5295

Probability from tables = 0.0631.

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