The standard deviation in a frequency table is a tool to gauge the dispersion of data points. The process to calculate it involves determining the mean, deducting this mean from every individual value, and squaring these differences. Each squared value is then multiplied by its respective frequency. By adding all these products together, dividing by the total frequency, and finally extracting the square root, we arrive at the standard deviation.
| Topic | Problem | Solution |
|---|---|---|
| None | A frequency table is given as follows: \[\begin{a… | Step 1: First, let's calculate the mean (\(\mu\)) of the distribution. Mean is calculated as \(\mu … |