Does it take more time for seeds to germinate if they are near rock music that is continuously playing compared to being near classical music? The 26 seeds that were exposed to rock music took an average of 22 days to germinate, and had a standard deviation was 15 days. The 60 seeds that were exposed to classical music took an average of 17 days to germinate, and had a standard deviation for these seeds was 7 days. What can be concluded at the α = 0.10 level of significance? a. For this study, we should useSelect an answerb. The null and alternative hypotheses would be:Họ: Select an answer ♥Select an answer vSelect an answer v (please enter a decimal)Hj: Select an answer vSelect an answer vSelect an answer v (Please enter a decimal)C. The test statistic ? v =(please show your answer to 3 decimal places.)d. The p-value(Please show your answer to 4 decimal places.)e. The p-value is ? v af. Based on this, we should Select an answer v the null hypothesis.g. Thus, the final conclusion is that ...O The results are statistically insignificant at a = 0.10, so there is statistically significantevidence to conclude that the population mean time for seeds exposed to rock music togerminate is equal to the population mean time for seeds exposed to classical music togerminate.O The results are statistically significant at a = 0.10, so there is sufficient evidence toconclude that the population mean time for seeds exposed to rock music to germinate ismore than the population mean time for seeds exposed to classical music to germinate.The results are statistically insignificant at a = 0.10, so there is insufficient evidence toconclude that the population mean time for seeds exposed to rock music to germinate ismore than the population mean time for seeds exposed to classical music to germinate.O The results are statistically significant at a = 0.10, so there is sufficient evidence toconclude that the mean germination time for the 26 seeds exposed to rock music thatwere observed is more than the mean germination time for the 60 seeds that wereexposed to classical music that were observed. h. Interpret the p-value in the context of the study.O If the population mean time for seeds exposed to rock music to germinate is the sameas the population mean time for seeds exposed to classical music to germinate and ifanother 26 seeds exposed to rock music and 60 seeds exposed to classical music areobserved then there would be a 5.74% chance that the mean germination time for the26 seeds exposed to rock music would be at least 5 days more than the meangermination time for the 60 seeds exposed to classical music.O If the sample mean germination time for the 26 seeds exposed to rock music is thesame as the sample mean germination time for the 60 seeds exposed to classical musicand if another 26 seeds exposed to rock music and 60 seeds exposed to classical musicare observed then there would be a 5.74% chance of concluding that the meangermination time for the 26 seeds exposed to rock music is at least 5 days more than themean germination time for the 60 seeds exposed to classical musicO There is a 5.74% chance of a Type I error.O There is a 5.74% chance that the mean germination time for the 26 seeds exposed torock music is at least 5 days more than the mean germination time for the 60 seedsexposed to classical music.i. Interpret the level of significance in the context of the study.O There is a 10% chance that the seeds just don't like your taste in music, so please letsomeone else conduct the study.O If the population mean time for seeds exposed to rock music to germinate is the sameas the population mean time for seeds exposed to classical music to germinate and ifanother 26 seeds exposed to rock music and 60 seeds exposed to classical music areobserved, then there would be a 10% chance that we would end up falsely concudingthat the sampe mean times to germinate for these 26 seeds exposed to rock music and60 seeds exposed to classical music differ from each other.O There is a 10% chance that there is a difference in the population mean time for seedsexposed to rock vs. classical music to germinate.O If the population mean time for seeds exposed to rock music to germinate is the same

We want to find null hypothesis, alternate hypothesis and test statistics. Note: According to bartleby experts question answers guidelines an expert can solve only first three sub parts of one question rest can be reposted..Sample Mean 1 (\bar X_1)(Xˉ1) = 2222 Sample Standard Deviation 1 (s_1)(s1) = 1515 Sample Size (n_1)(n1) = 2626 Sample Mean 2 (\bar X_2)(Xˉ2) = 1717 Sample Standard Deviation 1 (s_2)(s2) = 77 Sample Size (n_2)(n2) = 6666 Significance Level (\alpha)(α) = 0.10.1 A) We should use t-test for difference of mean for unequal variance because ratio of standards deviation is greater than 2 A) Null hypothesis and Alternate hypothesis Null hypothesis=H0:μ1-μ2=0 Alternate hypothesis=H1:μ1-μ2>0 C) Test statistics=t t=(x̄1-x̄2)/√((S12/n1)+(S22/n2)) t=(22-17)/√((152/26)+(72/66))=1.631