SOLUTION
First we will obtain the value for the Zscore using the formula
[tex]\begin{gathered} \text{Zscore = }\frac{\frac{x-\mu}{\sigma}}{\sqrt[]{n}} \\ \\ \text{Where }x\text{ = }sample\text{ mean = 19.6} \\ \mu=\text{ population mean = }20 \\ \sigma=\text{ standard deviation = }1.18 \\ n=\text{ }sample\text{ size = 61} \end{gathered}[/tex]
This becomes
[tex]\begin{gathered} \text{Zscore = }\frac{\frac{x-\mu}{\sigma}}{\sqrt[]{n}} \\ \\ \text{Zscore = }\frac{\frac{19.6-20}{1.18}}{\sqrt[]{61}} \\ \\ \text{Zscore = }\frac{-0.338983}{\sqrt[]{61}} \\ \\ \text{Zscore = -0.0434} \end{gathered}[/tex]
Now using the Zscore calculator, we obtain the score for -0.0434
This becomes
[tex]P(xTherefore,
the probability = 0.4827 to four decimal places.
Would the sample mean be considered unsual?
The sample mean will not be considered unsual because it has a probability that is greater than 5%
