Respuesta :
Answer:
a) [tex]t=\frac{1.51-0.87}{\sqrt{\frac{0.25^2}{6}+\frac{0.31^2}{6}}}=3.936[/tex] Â
"=T.INV(1-0.025,10)", and we got [tex]t_{critical}=\pm 2.28 [/tex] Â
Statistical decision Â
Since our calculated value is higher than our critical value,[tex]z_{calc}=3.936>2.28=t_{critical}[/tex], we have enough evidence to reject the null hypothesis at 5% of significance.
b) [tex] (\bar X_1 Â -\bar X_2) \pm t_{\alpha/2}\sqrt{\frac{s^2_{1}}{n_{1}}+\frac{s^2_{2}}{n_{2}}}[/tex]
The degrees of freedom are given:
[tex] df = n_1 + n_2 -2 = 6+6-2 = 10[/tex]
[tex] (1.51 -0.87) - 2.28\sqrt{\frac{0.25^2}{6}+\frac{0.31^2}{6}}= 0.269[/tex]
[tex] (1.51 -0.87) + 2.28\sqrt{\frac{0.25^2}{6}+\frac{0.31^2}{6}}= 1.010[/tex]
Step-by-step explanation:
Part a
Data given and notation  Â
[tex]\bar X_{1}=1.51[/tex] represent the mean for scent of pre ovulatory
[tex]\bar X_{2}=0.87[/tex] represent the mean for post ovolatory
[tex]s_{1}=0.25[/tex] represent the sample standard deviation for preovulatory
[tex]s_{2}=0.31[/tex] represent the sample standard deviation for postovulatory
[tex]n_{1}=6[/tex] sample size for the group preovulatory
[tex]n_{2}=6[/tex] sample size for the group postovulatory
z would represent the statistic (variable of interest) Â
[tex]p_v[/tex] represent the p value  Â
Concepts and formulas to use  Â
We need to conduct a hypothesis in order to check if the mean's are different, the system of hypothesis would be: Â Â
H0:[tex]\mu_{1} = \mu_{2}[/tex] Â Â
H1:[tex]\mu_{1} \neq \mu_{2}[/tex] Â Â
If we analyze the size for the samples both are lower than 30, so for this case is better apply a t test to compare means, and the statistic is given by: Â
[tex]t=\frac{\bar X_{1}-\bar X_{2}}{\sqrt{\frac{s^2_{1}}{n_{1}}+\frac{s^2_{2}}{n_{2}}}}[/tex] (1) Â Â
z-test: Is used to compare group means. Is one of the most common tests and is used to determine whether the means of two groups are equal to each other. Â Â
Calculate the statistic  Â
We have all in order to replace in formula (1) like this: Â Â
[tex]t=\frac{1.51-0.87}{\sqrt{\frac{0.25^2}{6}+\frac{0.31^2}{6}}}=3.936[/tex] Â
Find the critical value Â
We find the degrees of freedom:
[tex] df = n_1 + n_2 -2 = 6+6-2 = 10[/tex]
In order to find the critical value we need to take in count that we are conducting a two tailed test, so we are looking for thwo values on the t distribution with df =10 that accumulates 0.025 of the area on each tail. We can us excel or a table to find it, for example the code in Excel is: Â
"=T.INV(1-0.025,10)", and we got [tex]t_{critical}=\pm 2.28 [/tex] Â
Statistical decision Â
Since our calculated value is higher than our critical value,[tex]z_{calc}=3.936>2.28=t_{critical}[/tex], we have enough evidence to reject the null hypothesis at 5% of significance.
Part b
For this case the confidence interval is given by:
[tex] (\bar X_1 Â -\bar X_2) \pm t_{\alpha/2}\sqrt{\frac{s^2_{1}}{n_{1}}+\frac{s^2_{2}}{n_{2}}}[/tex]
The degrees of freedom are given:
[tex] df = n_1 + n_2 -2 = 6+6-2 = 10[/tex]
[tex] (1.51 -0.87) - 2.28\sqrt{\frac{0.25^2}{6}+\frac{0.31^2}{6}}= 0.269[/tex]
[tex] (1.51 -0.87) + 2.28\sqrt{\frac{0.25^2}{6}+\frac{0.31^2}{6}}= 1.010[/tex]
