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The table shows the distribution of ages of 22 students in a school. Using an ...

The table shows the distribution of ages of 22 students in a school.
Age (years) 12-14 15-17 18-20 21-23 24-26
Frequency 6 10 3 2 1



Using an assumed mean of 19, calculate, correct to three significant figures, the :
(a) mean age ; (b) standard deviation ; of the distribution.
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    Correct Answer: Option n
    Explanation:
    Assumed mean, A = 19.
    Age (years) Mid-age (x) Frequency \(d = x - A\) \(fd\) \(fd^{2}\)
    12 - 14 13 6 -6 -36 216
    15 - 17 16 10 -3 -30 90
    18 - 20 19 3 0 0 0
    21 - 23 22 2 3 6 18
    24 - 26 25 1 6 6 36
    22 -54 360



    (a) \(\bar{x} = A + \frac{\sum fd}{\sum f}\)
    = \(19 + \frac{-54}{22}\)
    = \(19 - 2.455\)
    = \(16.545 \approxeq 16.5\) years.
    (b) Standard deviation , \(\sigma = \sqrt{\frac{\sum fd^{2}}{\sum f} - (\frac{\sum fd}{\sum f})}\)
    = \(\sqrt{\frac{360}{22} - (\frac{-54}{22})}\)
    = \(\sqrt{16.364 - (2.45)^{2}}\)
    = \(\sqrt{16.364 - 6.025}\)
    = \(\sqrt{10.339}\)
    = 3.215 \(\approxeq\) 3.22 years.

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