AP Statistics 2017

(Marvins-Underground-K-12) #1
(from   Table   B).

(When   read    directly    from    Table   B,  t = –1.48   with    df  =   10  is  between tail    probabilities   of
0.05 and 0.10. However, those are one-sided values and must be doubled for the two-sided
alternative since we are interested in the probability of getting 1.48 standard deviations
away from the mean in any direction. Using the TI-83/84, P -value =
2tcdf(-100,-1.48,10)= 0.170. Using the 2SampTTest from the STAT TESTS menu, P -
value = 0.156 with df = 18.99.)
IV . The P -value is too large to be strong evidence against the null hypothesis that there is no
difference between the machines. We do not have strong evidence that the types of machines
actually differ in the number of defects produced.



  1.     Using   a   two-sample  t   -test,  Steps   I   and II  would   not change. Step    III would   change  to



based   on  df  =   min{30  –   1,30    –   1}  =   29. Step    IV  would   probably    arrive  at  a   different   conclusion—
reject the null because the P -value is small. Large sample sizes make it easier to detect statistically
significant differences.

11.

This    P   -value  is  quite   low and provides    evidence    against the null    and in  favor   of  the alternative that
security procedures actually detect less than the claimed percentage of banned objects.





I . Let μ (^) d = the mean of the differences between the scores of husbands and wives.
H 0 : μ (^) d = 0.
H (^) A : μ (^) d < 0.
II . We are told to assume that σ = 1.77 (Note : This is a reasonable assumption, given the large
sample size). This is a matched-pairs situation and we will use a one-sample z -test for a
population mean. We assume that this is a random sample of married couples.
III.
(If you are bothered by using z rather than t —after all, we really don’t know σ (^) D —note that

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