Answer:
Step-by-step explanation:
To test the hypothesis is the mean SAT score is less than 1520 at 5% significance level
The nul hypothesis is
[tex]H_0; \mu \geq 1520[/tex]
The alternative hypothesis is
[tex]H_0 ; \mu\leq 1520[/tex]
The test statistic is
[tex]t=\frac{\bar x- \mu}{(\frac{s}{\sqrt{n} } )}[/tex]
[tex]t= \frac{1501-1520}{(\frac{53}{\sqrt{20} } )} \\\\=-1.603[/tex]
The t - test statistics is -1.603
The t - critical value is,
The small size is small and left tail test.
Look in the column headed [tex]\alpha = 0.05[/tex] and the row headed in the t - distribution table by using degree of freedom is,
d.f = n - 1
= 20 - 1
= 19
The t - critical value is -1.729
The conclusion is that the t value corresponds to sample statistics is not fall in the critical region, so the null hypothesis is not rejected at 5% level of significance.
there is insignificance evidence ti indicate that the mean SAT score is less than 1520. The result is not statistically significant
Answer:
Critical value = -1.729
Step by Step explanation:
Given:
n = 20
X' = 1501
Standard deviation = 53
Mean, u = 1520
Level of significance, a = 0.05
The null and alternative hypotheses:
H0 : u = 1520
H1 : u < 1520
This is a lower tailed test.
Degrees of freedom, df = 20 - 1 = 19
For critical value:
[tex]t critical = - t_a, _d_f [/tex]
From t table df = 19, one tailed
[tex]t critical = -t _0._0_5, _1_9 = -1.729[/tex]
Critical value = -1.729
Decision: Reject null hypothesis H0, if test statistic Z, is less than critical value.
Test statistic Z =
[tex] Z = \frac{X' - u}{\sigma / \sqrt{n}} [/tex]
[tex] Z = \frac{1501 - 1520}{53/ \sqrt{20}}= -1.603[/tex]
Z = -1.603
For p-value:
From excel,
P(t< -1.603) = t.dist( -1.603, 19, 1)
= 0.06269
≈ 0.0627
P value = 0.0627
Since test statistic Z, -1.603, is greater than critical value, -1.729, we fail to reject the null hypothesis H0.
There is not enough statistical evidence to conclude that mean is less than 1520.
