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29 March, 01:23

The reputation of many businesses can be severely damaged due to a large number of defective items during shipment. suppose 300 batteries are randomly selected from a large shipment; each is tested and 9 defective batteries are found. at a 0.1 level of significance, does this provide evidence that the proportion of defective batteries is less than 5%? what is the p-value for the test.

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  1. 29 March, 01:40
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    P^ = 9/300 = 0.03

    H0 = p < 5%

    H1 = p > 5%

    standard deviation of sample distribution = sqrt[p (1 - p) / n] = sqrt[0.05 (1 - 0.05) / 300] = sqrt (0.0001583) = 0.01258

    test statistics, z = (p^ - p) / standard deviation = (0.03 - 0.05) / 0.01258 = - 1.589

    P (-1.589) = 1 - P (1.589) = 1 - 0.94402 = 0.05598

    Since, p = 0.05598 < significant level of 0.1, we reject the H0.

    i. e. There is no sufficient evidence to suggest that the proportion of defective batteries is less than 5%.

    The p-value of the test is 0.05598
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