The ages (in years) of the 5 doctors at a local clinic are the following. 40, 44, 49, 40, 52 Assuming that these ages constitute an entire population, find the standard deviation of the population. Round your answer to two decimal places.

The standard deviation of the population is 4.82 years.

Step-by-step explanation:

Mean = summation of all ages : number of doctors = (40+44+49+40+52) : 5 = 225 : 5 = 45 years

Population standard deviation = sqrt[sum of squares of the difference between each age and mean : number of doctors] = sqrt[ ((40 - 45) ^2 + (44 - 45) ^2 + (49 - 45) ^2 + (40 - 45) ^2 + (52 - 45) ^2) : 5] = sqrt[ (25+1+16+25+49) : 5] = sqrt[116 : 5] = sqrt (23.2) = 4.82 years