Answer:
Step-by-step explanation:
The formula to find the standard deviation is
[tex]\sigma = \sqrt{\frac{\Sigma |x-\mu|^{2} }{N-1} }[/tex]
Where [tex]\mu[/tex] represents the mean, [tex]N[/tex] the total number of elements and [tex]x[/tex] is each element.
So, first we need to find the mean
[tex]\mu =\frac{\Sigma x}{N}=\frac{27+38+47+42+33+56+37+57+38+52}{10}= 42.7[/tex]
Then, we subtract the mean with each element and find its square power
[tex](27-42.7)^{2} =246.49\\(38-42.7)^{2}= 22.09\\(47-42.7)^{2}= 18.49\\(42-42.7)^{2}= 0.49\\(33-42.7)^{2}= 94.09\\(56-42.7)^{2}= 176.89\\(37-42.7)^{2}= 32.49\\(57-42.7)^{2}= 204.49\\(38-42.7)^{2}= 22.09\\(52-42.7)^{2}= 86.49[/tex]
Then, we sum all, and that would be the numerator to find the standard deviation
[tex]\sigma = \sqrt{\frac{\Sigma |x-\mu|^{2} }{N-1} }=\sqrt{\frac{904.1}{9} } =\sqrt{100.46}\\ \sigma =10.02[/tex]
Therefore, the standard deviation rounded to the nearest hundredth is 10.02.
