Answer:
Conclusion: Reject the mean of 50 cm/sec and establish a new mean of 51.3 cm/sec
Step-by-step explanation:
In this case we can set our hypothesis the following way:
[tex]\bf H_0[/tex]:The mean burning rate equals 50 cm/sec.
[tex]\bf H_a[/tex]: The mean burning rate is greater than 50 cm/sec.
So this is a right-tailed hypothesis test.
For a 5% level of significance, the Z-score against with we are going to compare is [tex]\bf Z_{0.05}=1.64[/tex] (the area under the normal curve N(0;1) to the right of Z is less than 5%)
We compute the Z score corresponding to the sample with the formula
[tex]\bf Z=\frac{\bar x-\mu}{s/\sqrt n}[/tex]
where
[tex]\bf \bar x[/tex] = mean of the sample
[tex]\bf \mu[/tex] mean of the null hypothesis
s = standard deviation of the sample
n = size of the sample
Computing our Z, we get
[tex]\bf Z=\frac{51.3-50}{2/\sqrt {40}}=4.1109[/tex]
Since our Z is greater than [tex]\bf Z_{0.05}[/tex], we reject the null hypothesis and we could also state a new mean equals to the alternative, that is to say, we could say that the mean is 51.3 instead of 50.
