The given data sets are:

Mean of first data:

$$\begin{gathered} \overline{x}=\frac{0+12+14+15+............+14+15+17}{14} \\ =\frac{189}{14} \\ =13.5 \\ \sigma =\sqrt{\frac{{\left(0-13.5\right)}^2+{\left(12-13.5\right)}^2+....+{\left(15-13.5\right)}^2+{\left(17-13.5\right)}^2}{14-1}} \\ \approx 6.8247 \end{gathered}$$

Mean of second data:

$$\begin{gathered} \overline{x}=\frac{10+14+15+....+14+15+16}{10} \\ =\frac{142}{10} \\ =14.2 \\ \sigma =\sqrt{\frac{{\left(10-14.2\right)}^2+{\left(14-14.2\right)}^2+.......+{\left(15-14.2\right)}^2+16-{\left(16-14.2\right)}^2}{10-1}} \\ \approx 1.988 \end{gathered}$$

Range$=\mathrm{Maximum} \mathrm{value}-\mathrm{Minimum} \mathrm{value}$

For data set I:

$24-0=24$

For data set II:

$17-10=7$

The first data set's measures of variation are higher than the second data set's.

As a result, the first data set's measures of variance are higher than the second data set's.