91Ó°ÊÓ

The given information is:

Mean of Owned:

$$\begin{gathered} \mathrm{μ}=∑xP\left(X=x\right) \\ =1×0.003+2×0.002+3×0.023+4×0.104+5×0.210+6×0.224+ \\ 7×0.197+8×0.149+9×0.053+10×0.035 \\ =6.284 \end{gathered}$$

Mean of Rented:

$$\begin{gathered} \mathrm{μ}=∑xP\left(X=x\right) \\ =1×0.008+2×0.027+3×0.287+4×0.363+5×0.164+6×0.093+ \\ 7×0.039+8×0.013+9×0.003+10×0.003 \\ =4.187 \end{gathered}$$

Because the width of the histogram for owner-occupied apartments is wider than the width of the histogram for renter-occupied units, the spread of the number of rooms in owner-occupied units is greater than the spread of the number of rooms in renter-occupied homes.

The histogram of owner-occupied units is larger, we inferred that the spread of the owner-occupied distribution was greater than the spread of the renter-occupied distribution in section (a).

The standard deviations reflect this, with the standard deviation of "owned" being higher than the standard deviation of "rented".

The standard deviations confirm that the histogram of owner-occupied apartments is wider than the histogram of renter-occupied units.