question archive The breaking strengths of cables produced by a certain manufacturer have a mean, H, of 1950 pounds, and a standard deviation of 95 pounds
The breaking strengths of cables produced by a certain manufacturer have a mean, H, of 1950 pounds, and a standard deviation of 95 pounds
Subject:StatisticsPrice: Bought3
The breaking strengths of cables produced by a certain manufacturer have a mean, H, of 1950 pounds, and a standard deviation of 95 pounds. It is claimed that an improvement in the manufacturing process has increased the mean breaking strength. To evaluate this claim, 42 newly manufactured cables are randomly chosen and tested, and their mean breaking strength is found to be 1969 pounds. Assume that the population is normally distributed. Can we support, at the 0.01 level of significance, the claim that the mean breaking strength has increased? (Assume that the standard deviation has not changed.) Perform a one-tailed test. Then fill in the table below. Carry your intermediate computations to at least three decimal places, and round your responses as specified in the table. The null hypothesis: Ho : I X S P The alternative hypothesis: H : I The type of test statistic: (Choose one) 0=0 OSO 020 Z The value of the test 0* <0 0>0 statistic: Chi square (Round to at least three F decimal places.) X 5 The p-value: (Round to at least three 0 decimal places.) Can we support the claim that the mean breaking strength has increased? O Yes O No
