#### Answer

See below.

#### Work Step by Step

The mean of $n$ numbers is the sum of the numbers divided by $n$. The median of $n$ is the middle number of the numbers when they are in order (and the mean of the middle $2$ numbers if $n$ is even). The mode of $n$ numbers is the number or numbers that appear(s) most frequently.
Hence here the mean: $\frac{4+24+28+37+57+57+65+78+88}{9}=48.67$
The median is the the middle item in the sequence $4, 24,28,37,57, 57,65,78, 88$, which is: $57$.
The mode is: $57$.
The range is the difference between the largest and the smallest data value. The standard deviation of $x_1,x_2,...,x_n$ is (where $\overline{x}$ is the mean of the data values): $\sqrt{\frac{(x_1-\overline{x})^2+(x_2-\overline{x})^2+...+(x_n-\overline{x})^2}{n}}$.
Hence here the range is: $88-4=84$, and the standard deviation is: $\sqrt{\frac{(4-48.67)^2+(24-48.67)^2+...+(88-48.67)^2}{9}}\approx25.776$