Measures of Central Location

Measures of Central Location

ANSWERS

a. $\mathrm{9}$ .
b. $\mathrm{41}$ .
c. $\mathrm{0}$ .
d. $\mathrm{14}$ .

$\bar{x}=2.5, \widetilde{x}=2.5$ , mode $=\{1,2,3,4\}$

$\bar{x}=3, \widetilde{x}=2$ , mode $=2$

$\bar{x}=3, \widetilde{x}=2$ , mode $=2$

$\{0,0,3\}$ .

$\{0,1,1,2\}$ .

$\bar{x}=146.9, \widetilde{x}=147.5$

$\bar{x}=2.6, \widetilde{x}=2$ , mode $=2$

$\bar{x}=48.96, \widetilde{x}=49$ , mode $=49$

a. No, the survival times of the fourth and fifth mice are unknown.
b. Yes, $\widetilde{x}=421$

$\bar{x}=48.96, \widetilde{x}=49$ , mode $=49$

$\bar{x}=2.05, \widetilde{x}=2$ , mode $=1$

Mean: $n x_{\min } \leq \sum x$ so dividing by $n$ yields $x_{\min } \leq \bar{x}$ , so the minimum value is not above average. Median: the middle measurement, or average of the two middle measurements, $\widetilde{x}$ , is at least as large as $x_{\min }$ , so the minimum value is not above average. Mode: the mode is one of the measurements, and is not greater than itself.

a. $\bar{x}=3. \overline{18}, \widetilde{x}=3$ , mode $=5$ .
b. $\bar{x}=6. \overline{18}, \widetilde{x}=6$ , mode $=8$
c. $\bar{x}=-2. \overline{81}, \tilde{x}=-3, \operatorname{mode}=-1$
d. If a number is added to every measurement in a data set, then the mean, median, and mode all change by that number.

a. $\mu=1528.74$
b. $\bar{x}=1502.8$
c. $\bar{x}=1535.2$

a. $\bar{x}=553.4286$ and $\widetilde{x}=552.5$
b. $\bar{x}=665.9692$ and $\widetilde{x}=667$
c. $\bar{x}=455.8933$ and $\widetilde{x}=448$