Question #45694

A stamping machine produces ‘can tops’ whose diameters are normally distributed with a standard deviation of 0.02 inch. At what nominal mean diameter should the machine be set, so that no more than 9 % of the ‘can tops’ produced have diameters exceeding 3.5 inches?
1

Expert's answer

2014-09-10T09:04:48-0400

Answer on Question #45694 – Math – Statistics and Probability

Task:

A stamping machine produces ‘can tops’ whose diameters are normally distributed with a standard deviation of 0.02 inch. At what nominal mean diameter should the machine be set, so that no more than 9 % of the ‘can tops’ produced have diameters exceeding 3.5 inches?

Solution:

Let X be the diameter of a can top produced by the machine, then X is assumed a normal distribution with to - be-determined mean μ and standard deviation 0.01. From the question we need to consider P(X > 3.5) < 0.09. So we solve


0.09>P(X>3.5)=P(Z>3.5μ0.02).0.09 > P(X > 3.5) = P(Z > \frac{3.5 - \mu}{0.02}).


From tables on the standard normal distribution, we have 3.5μ0.02>1.34\frac{3.5 - \mu}{0.02} > 1.34, and therefore it should be set μ<3.473\mu < 3.473 inch.

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