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ID: 3374869 • Letter: H
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Question: Do various occupational groups differ in their diets? A British study of this question compared 8...
Do various occupational groups differ in their diets? A British study of this question compared 87 drivers and 66 conductors of London double-decker buses. The conductors' jobs require more physical activity. The article reporting the study gives the data as "Mean daily consumption ± (se)." Some of the study results appear below.
Drivers Conductors Total calories 2821 ± 14 2850 ± 15 Alcohol (grams) 0.27 ± 0.1 0.35 ± 0.14
(a) Give x and s for each of the four sets of measurements. (Give answers accurate to 3 decimal places.)
Drivers Total Calories: x =
s =
Drivers Alcohol: x =
s =
Conductors Total Calories: x =
s =
Conductors Alcohol: x =
s =
(b) Is there significant evidence at the 5% level that conductors consume more calories per day than do drivers? Use the conservative two-sample t method to find the t-statistic, and the degrees of freedom. (Round your answer for t to three decimal places.)
t =
df =
Conclusion Reject H0. Do not reject H0.?
(c) How significant is the observed difference in mean alcohol consumption? Use the conservative two-sample t method to obtain the t-statistic. (Round your answer to three decimal places.) t = Conclusion Reject H0. Do not reject H0.
(d) Give a 95% confidence interval for the mean daily alcohol consumption of London double-decker bus conductors. (Round your answers to three decimal places.) ( , )
(e) Give a 99% confidence interval for the difference in mean daily alcohol consumption for drivers and conductors. (conductors minus drivers. Round your answers to three decimal places.)
Explanation / Answer
(a) Give x and s for each of the four sets of measurements. (Give answers accurate to 3 decimal places.)
Drivers Total Calories:
x =2821
s =14*sqrt(87)=130.58
Drivers Alcohol:
x =0.27
s =0.1*sqrt(87)=0.9327
Conductors Total Calories: x =2850
s =15*sqrt(66)=121.86
Conductors Alcohol: x =0.35
s =0.14*sqrt(66)=1.1374
standard error(se)=s/sqrt(n)
(b)t=1.4,
df=151
Donot reject H0 ( as one tailed p-value is more than alpha=0.05)
here we use t-test with
null hypothesis H0:mean1=mean2 and
alternate hypothesis H1:mean1<mean2 ( left one tailed test )
statistic t=(mean1-mean2)/((sp*(1/n1 +1/n2)1/2) =1.4
and sp2=((n1-1)s12+(n2-1)s22)/n and with df is n=n1+n2-2=151
(c) t=0.48
df=151,
Donot Reject H0 (p-value is more than typical alpha=0.05)
here we use t-test with null hypothesis H0:mean1=mean2 and alternate hypothesis H1:mean1?mean2
statistic t=(mean1-mean2)/((sp*(1/n1 +1/n2)1/2) =0.48
and sp2=((n1-1)s12+(n2-1)s22)/n and with df is n=n1+n2-2=151
(d)(1-alpha)*100% confidence interval for population mean=sample mean±t(alpha/2,n-1)*sd/sqrt(n)
95% confidence interval for population mean=mean±t(0.05/2, n-1)*sd/sqrt(n)
(e) (1-alpha)*100% confidence interval for difference population mean=
=difference sample mean±t(alpha/2,n)*SE(difference of sample mean)
99% confidence interval =0.08±t(0.01/2, 151)*SE(difference)=0.08±1.997*0.1674=0.08±0.3343=(-0.2543,0.4143)
SE(difference)=(sp*(1/n1 +1/n2)1/2) =0.1674
please look part (c) also to find the SE(difference)
sample mean s s2 n (n-1)s2 Driver 2821 130.58 17051.1364 87 1466397.73 conductor 2850 121.86 14849.8596 66 965240.874 difference= 29 31900.996 153 2431638.604 sp2= 16103.57 sp= 126.90 t= 1.40 one tailed p-value= 0.0818Related Questions
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