use technology to find the P- Value for the a right tailed test about a mean with n=14 and test statistics t=2.825
Solution:-
Solution:- The P-value for a right-tailed test about a mean with n =14 and test statistic t equals 2.825 is 0.0072.
t = 2.825
n = 14
D.F = n - 1
D.F = 13
P(t > 2.825) = 0.00716
use technology to find the P- Value for the a right tailed test about a mean...
use technology to find the P- Value for the a right tailed test about a mean with n=14 and test statistics t= - 2.925
Use technology to find the P-value for a right-tailed test about a mean with n = 9 and test statistic t = 1.451. P-value(Round to four decimal places as needed.)
Use technology to find the P-value for a right-tailed test about a mean with n equals=11 and test statistic t equals 2.258
question #9
Use technology to find the P-value for a right-tailed test about a mean with n=29 and test statistic 1.946. P-value (Round to four decimal places as needed.)
Use technology to find the P-value for a right-tailed test about a mean with n = 21 and test statistic t = 2.752. P-value (Round to four decimal places as needed.)
Use technology to find the P-value for a two-tailed test withn equals=15and test statistic t equals negative t=−2.143.
Use technology to find the P-value for a two-tailed test with n equals=15 and test statistic t equals negative t=−2.143.
Use technology to find the P-value for a two-tailed test with nequals11 and test statistic t equals 3.075 . P-valuealmost equals nothing (Round to four decimal places as needed.)
Use technology and a? t-test to test the claim about the population mean ? at the given level of significance ? using the given sample statistics. Assume the population is normally distributed. ?Claim: ?>70; ?=0.10????Sample? statistics: x overbar=71.1?, s=3.5?, n=27 a. What are the null and alternative? hypotheses? ho: u< or equal to 70, ha: ?>70 b. What is the p-value for t=1.63?(show process please.) p-value= 0.058
Use technology to find the P-value for the hypothesis test described below. The claim is that for a smartphone carrier's data speeds at airports, the mean is μ=15.00 Mbps. The sample size is n=14 and the test statistic is t=1.176. P-value= (Round to three decimal places as needed.)