Recall that if the sample proportion of defective cartridges is more than 0.02, the entire shipment will be returned to the vendor. By deduction, if the sample proportion is less than 0.02, the shipment will not be returned. For this part of the problem, we have been asked to determine the probability that a shipment will not be returned if the true proportion of defective cartridges in the shipment is 0.10. This means we will find the area in the left tail of the standard normal distribution below the z-score of -3.96. Recall that n= 220, p = 0.02, and p = 0.10. Use the appropriate table in Appendix A or technology to find the probability. (Round your answer to four decimal places.) P(Not Returned) = Pô < 0.02) - P(z < -3.96) The approximate probability that a shipment will be not returned if the true proportion of defective cartridges in the shipment is 0.10, rounded to four decimal places, is

MATLAB: An Introduction with Applications
6th Edition
ISBN:9781119256830
Author:Amos Gilat
Publisher:Amos Gilat
Chapter1: Starting With Matlab
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ch8 q11

Recall that if the sample proportion of defective cartridges is more than 0.02, the entire shipment will be returned to the vendor. By
deduction, if the sample proportion is less than 0.02, the shipment will not be returned. For this part of the problem, we have been
asked to determine the probability that a shipment will not be returned if the true proportion of defective cartridges in the shipment is
0.10. This means we will find the area in the left tail of the standard normal distribution below the z-score of -3.96.
Recall that n = 220, p = 0.02, and p = 0.10. Use the appropriate table in Appendix A or technology to find the probability. (Round
your answer to four decimal places.)
P(Not Returned) = P(p < 0.02)
- P(z < -3.96)
The approximate probability that a shipment will be not returned if the true proportion of defective cartridges in the shipment is 0.10,
rounded to four decimal places, is
Transcribed Image Text:Recall that if the sample proportion of defective cartridges is more than 0.02, the entire shipment will be returned to the vendor. By deduction, if the sample proportion is less than 0.02, the shipment will not be returned. For this part of the problem, we have been asked to determine the probability that a shipment will not be returned if the true proportion of defective cartridges in the shipment is 0.10. This means we will find the area in the left tail of the standard normal distribution below the z-score of -3.96. Recall that n = 220, p = 0.02, and p = 0.10. Use the appropriate table in Appendix A or technology to find the probability. (Round your answer to four decimal places.) P(Not Returned) = P(p < 0.02) - P(z < -3.96) The approximate probability that a shipment will be not returned if the true proportion of defective cartridges in the shipment is 0.10, rounded to four decimal places, is
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