Given a sample of female students, n = 7, with SS = 550, and a sample of male st

Question

Given a sample of female students, n = 7, with SS = 550, and a sample of male

students, n = 10. with SS = 720:

a. Find the pooled variance for the two samples. (3 pts)

b. Compute the estimated standard error for the sample mean difference. (3 pts)

c. If the sample mean difference is 5 points, is this enough to reject the Ho for an

independentmeasures hypothesis test using .01, onetailed test? (3 pts)

d. If the sample mean difference is 20 points, is this enough to reject the Ho for

an independentmeasures hypothesis test using .01, onetailed test? (3 pts)

e. Compute Cohen’s d to measure the effect size for the 5point difference and

for the 20point difference. Briefly evaluate the effect size of each difference.

(4 pts)

Explanation / Answer

Solution:-

Given,

Female --> n1 = 7, SS1 = 550

Male ---> n2 = 10. SS2 = 720

(a)

Pooled variance = {(n1 - 1) SS1 + (n2 - 1)SS2} / (n1 + n2 -2)

= {6(550) + 9(720)} / 15 = 652

Therefore, the pooled variance is 652.

(b)

Standard error = sqrt[S2 (1/n1 + 1/n2)]

= sqrt[652 (1/7 + 1/10)]

= sqrt[652 * (17/70)]

= sqrt (158.39)

= 12.58

(c)

Sample mean difference = 5

t = 5 / standard error

t = {xbar1 - xbar2} / standard error = 5 / 12.58

=> t = 0.3975

Critical value, t0.01,15 = 2.602

As, Calculated test statistic is less than 2.602, which is the critical value

DO NOT REJECT Ho.

(d)

t = {xbar1 - xbar2} / standard error

= 20 / 12.58

= 1.59

Since, t-statistics is less than the critical value.

DO NOT REJECT Ho.

(e)

d = {xbar1 - xbar2} / sqrt(pooled variance)

i) 5 / sqrt(652) = 0.1958

ii) 20 / sqrt(652) = 0.7833

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