Frequency Distribution A frequency distribution summarizes how often values or ranges of values occur in a dataset. It organizes raw data into a format that makes patterns, central tendencies, spread, and outliers easier to see and analyze. Definition A frequency distribution is a table or chart that shows the number (frequency) of observations within specified intervals (classes). It can be presented as a frequency table, histogram, or bar chart. Explore More Resources
How it works
* Frequency: count of observations that fall into a particular class or value.
* Distribution: the overall pattern of those frequencies across classes.
* Intervals (classes) must be mutually exclusive (no overlap) and exhaustive (cover all observations).
* Choice of interval size (class width) affects how much detail the distribution reveals.
Steps to construct a frequency distribution
1. Determine the range: max value β min value.
2. Choose the number of classes (k) based on the level of detail desired.
3. Calculate class width β (range / k), then round up to a convenient value.
4. Define class boundaries so they donβt overlap and cover all data.
5. Tally the observations in each class to get frequencies.
6. (Optional) Compute relative frequency = frequency / total observations, and cumulative frequencies.
Visual representation
* Histogram: adjacent bars where height = frequency; useful for continuous data and for spotting shapes (normal, skewed, bimodal).
* Bar chart: separate bars, typically for categorical or discrete data.
* Frequency table: lists classes with their frequencies, relative frequencies, and cumulative totals.
A histogram often reveals a normal distribution when most observations cluster near the center and taper off symmetrically toward the tails. Common types of frequency distributions
* Ungrouped frequency distribution: lists frequencies for each distinct value (best for small-range discrete data).
* Grouped frequency distribution: groups values into intervals (used for continuous or large-range data).
* Cumulative frequency distribution: running total of frequencies up to each class.
* Relative frequency distribution: frequencies expressed as proportions or percentages.
* Relative cumulative frequency distribution: cumulative proportions or percentages.
Example Measuring the heights of 50 children:
- Range = tallest β shortest.
- Decide, for example, 5 classes β class width = ceil(range / 5).
- Create five non-overlapping height intervals and count how many children fall in each.
- Display counts in a table or histogram to visualize where most heights concentrate. Explore More Resources
Use in trading Frequency concepts appear in some trading tools:
- Point-and-figure charts (an early form of frequency/price visualization) use Xs and Os to mark price changes and filter noise.
- Traders interpret patterns such as a column of three Xs as evidence of an uptrend (demand > supply) and three Os as a downtrend (supply > demand).
- More broadly, frequency distributions can help assess price behavior, volatility, and the likelihood of outcomes when analyzing returns. Importance and applications Frequency distributions:
- Organize large datasets into interpretable formats.
- Reveal trends, central tendency, variability, and outliers.
- Support decision making in fields like business (sales, surveys), statistics (demographics), and finance (asset performance, risk assessment). Explore More Resources
Key takeaways
* A frequency distribution converts raw data into counts or proportions by class.
* Proper class selection (mutually exclusive and exhaustive) is essential.
* Visual forms (histograms, tables) make underlying patterns easy to spot.
* Variants (grouped, cumulative, relative) serve different analytical needs.