a study recorded the time it took for a sample of seven different species of frogs and toads eggs to hatch…

a study recorded the time it took for a sample of seven different species of frogs and toads eggs to hatch. the following table shows the times to hatch, in days. determine the range and sample standard deviation. 7 10 13 10 13 7 5 range = □ day(s)

a study recorded the time it took for a sample of seven different species of frogs and toads eggs to hatch. the following table shows the times to hatch, in days. determine the range and sample standard deviation. 7 10 13 10 13 7 5 range = □ day(s)

Answer

Explanation:

Step1: Find the maximum and minimum values

The data set is (7, 10, 13, 10, 13, 7, 5). The maximum value (max = 13) and the minimum value (min=5).

Step2: Calculate the range

The formula for the range (R) is (R = max - min). So (R=13 - 5=8).

Step3: Calculate the mean

The mean (\bar{x}=\frac{7 + 10+13+10+13+7+5}{7}=\frac{65}{7}\approx9.286).

Step4: Calculate the squared - differences

((7 - 9.286)^2\approx5.22), ((10 - 9.286)^2\approx0.51), ((13 - 9.286)^2\approx13.89), ((10 - 9.286)^2\approx0.51), ((13 - 9.286)^2\approx13.89), ((7 - 9.286)^2\approx5.22), ((5 - 9.286)^2\approx18.37).

Step5: Calculate the sum of squared - differences

(S=\sum_{i = 1}^{n}(x_i-\bar{x})^2=5.22+0.51 + 13.89+0.51+13.89+5.22+18.37 = 57.61).

Step6: Calculate the sample variance

The formula for the sample variance (s^2=\frac{\sum_{i = 1}^{n}(x_i-\bar{x})^2}{n - 1}), where (n = 7). So (s^2=\frac{57.61}{7 - 1}=\frac{57.61}{6}\approx9.602).

Step7: Calculate the sample standard deviation

The sample standard deviation (s=\sqrt{s^2}=\sqrt{9.602}\approx3.1).

Answer:

Range = 8 day(s) Sample standard deviation (\approx3.1) day(s)