Question

In: Statistics and Probability

In the manufacturing process of automotive windshield glass, it is known that the average number of...

In the manufacturing process of automotive windshield glass, it is known that the average number of air bubbles found in a 1 [cm3] is 0.12. To detect the presence of bubbles in the crystal, samples of 10 [cm3] are analyzed. Assuming that the number of bubbles per cm3 follows a Poisson distribution and that this number is independent of one cm3 to another, it is requested

a) Calculate the probability that a 10 cm3 sample does not contain air bubbles

b) Calculate the minimum number of samples of 10 cm3 that must be examined so that it can be assured, with a probability of at least 0.99, that bubbles are present in them.

Solutions

Expert Solution

Here  the average number of air bubbles found in a 1 [cm3] is 0.12. Here samples of 10 [cm3] are analyzed

So, the expected number of air bubble found in 10 [cm3] is 10 * 0.12 = 1.2

so here if x is the number of air bubbles in 10 [cm3] then x ~ POISSON (1.2)

P(X) = e-1.2 1.2x/x!

(a) Here we have to find

P(x = 0) = e-1.2 1.20/0! = 0.3012

(b) here let say there are k number of samples of 10 cm3 that must be examined so that it can be assured, with a probability of at least 0.99. So, here expected number of bubbles in k samples = k * 0.2 = 1.2 k

Here,

P(X) = e-1.2k (1.2k)x/x!

P(x > 0) > 0.99

P(x > 0) = 1 - P(x = 0)

1 - P(x = 0) > 0.99

P(x = 0) < 0.01

e-0.12k < 0.01

taking logarithm both sides

0.12 k > 4.6052

k > 38.4

so here at least 39 number of samples of 10 cm3 that must be examined so that it can be assured, with a probability of at least 0.99, that bubbles are present in them.


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