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Eunyoung · Answer 1 · 2020-11-12T07:04:16+0000

Answer:

There is a significant difference between the two means based on this samples at the 0.10 level of significance.

Explanation:

Let's call

$\bf \mu_r$ mean of the systolic pressure from the right hand

$\bf \mu_l$ mean of the systolic pressure from the left hand

and construct a confidence interval for the difference

$\bf \mu_r - \mu_l$

based on the sample of size 5.

The confidence interval whose endpoints are

$\bf (\bar x_r -\bar x_l)\pm t^*\sqrt{(s_r^2)/(5)+(s_l^2)/(5)}$

where

$\bf \bar x_r$ = mean of the sample from the right hand

$\bf \bar x_l$ = mean of the sample from the left hand

$\bf s_r$ = standard deviation of the sample from the right hand

$\bf s_l$ = standard deviation of the sample from the left hand

$\bf t^*$ = t-score corresponding to a level of significance 0.10 or a confidence level 90%

Since the sample is too small we have better use the Student's t-distribution with 4 (sample size -1) degrees of freedom, which is the approximation of the Normal distribution for small samples.

For a 90% confidence level
$\bf t^*$ equals 2.132

Let's compute now the means and standard deviations of the samples

From the right hand we have

$\bf \bar x_r$ = 139.2

$\bf \s_r$ = 7.66

From the left hand we have

$\bf \bar x_l$ = 164.6

$\bf \s_l$ = 16.85

Then our confidence interval would be

$\bf (\bar x_r -\bar x_l)\pm z^*\sqrt{(s_r^2)/(5)+(s_l^2)/(5)}=-25.4\pm 2.132*8.28$

finally, the interval is

[-43.05, -7.75]

Since our confidence interval does not contain the zero, we can say there is a significant difference between the two means based on this samples at the 0.10 level of significance.

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