Answer:
(a) Null hypothesis: The calling range (in feet) of a manufacturer's 900-MHz cordless telephone is the same as that of its leading competitor
Alternate hypothesis: The calling range (in feet) of a manufacturer's 900-MHz cordless telephone is greater than that of its leading competitor
(b) The t-test statistic is 1.490
(c) The decision rule is 2.787
(d) The calling range (in feet) of a manufacturer's 900-MHz cordless telephone is greater than that of its leading competitor
Explanation:
(a) Null hypothesis is a statement from a population parameter that is subject to testing while alternate hypothesis is a statement that negates the null hypothesis
(b) Mean of manufacturer = 1020, n1 = 10, sd = 25, variance = 25^2 = 625
Mean of competitor = 1010, n2 = 17, sd = 29, variance = 29^2 = 841
Pooled variance = 625(10-1) + 841(17-1) ÷ (10+17-2) = (625×9) + (841×16) ÷ (27-2) = (5625+13456) ÷ 25 = 19081 ÷ 25 = 763.24
t = (mean of manufacturer - mean of competitor) ÷ √[pooled variance (1/n1 + 1/n2)] = (1020 - 1010) ÷ √[763.24(1/10 + 1/17)] = 10 ÷ √45.031 = 10 ÷ 6.711 = 1.490
(c) Total number of observation = n1 + n2 = 10+17 = 27, degree of freedom = 27 - 2 = 25
t-value corresponding to 25 degrees of freedom and 0.01 significance level is 2.787
(d) The t-test statistic (1.490) is less than the critical value (2.787), so reject the null hypothesis
Conclusion: The calling range (in feet) of a manufacturer's 900-MHz cordless telephone is greater than that of its leading competitor