Answer:
The appropriate hypothesis for the test model are as follows:
Null hypothesis:
[tex]H_o = The \ tutoring \ has \ no \ effect \ on \ the \ math \ scores[/tex]
Alternative Hypothesis :
[tex]H_a : The \ tutoring \ has \ an \ effect \ on \ the \ math \ scores[/tex]
The mean of the difference = -5.2
The standard deviation of the difference = 5.45
The value of the test statistic t is = -2.13
Step-by-step explanation:
The appropriate hypothesis for the test model are as follows:
Null hypothesis:
[tex]H_o = The \ tutoring \ has \ no \ effect \ on \ the \ math \ scores[/tex]
Alternative Hypothesis :
[tex]H_a : The \ tutoring \ has \ an \ effect \ on \ the \ math \ scores[/tex]
We use  MINITAB to obtain the p-value as follows:
Step 1 : Choose Stat>Basic Statistics> Paired t
Step 2 : Choose Samples in columns.
Step 3 : In First sample , enter column as Before
Step 4 : In Second sample, enter the column as After
MINITAB output:
Paired T-Test and CI : Before , After
Paired T for Before  -  After
           N      Mean         StDev          SE  Mean
Before      5      71.2000       4.8166          2.1541
After        5      76.4000      8.0498         3.6000
Difference    5     -5.20000      5.44977        2.43721
99% CI for mean difference : Â (-16.42115, 6.02115)
T-Test of mean difference = 0 (vs  not = 0)
T-value = -2.13
P-Value = 0.100
However, from the MINITAB output ; it is obvious that the mean and the standard deviation of the difference are -5.2 and 5.45.
Therefore, the mean of the difference = -5.2
The standard deviation of the difference = 5.45
Also, we can see that the T-value = -2.13 ;
Thus, the value of the test statistic t is = -2.13
