Unit 1.5 – Representing a Quantitative Variable with Graphs

The Power of Visuals:
Graphs for quantitative data reveal the shape, center, spread, and outliers in a data set. Great visuals make conclusions clear for AP Statistics!

📊 Key Graph Types for Quantitative Variables

Dotplot: Each data value shown as an individual dot along a number line.
Stem-and-leaf Plot: Separates values into "stems" (tens, hundreds) and "leaves" (ones).
Histogram: Bars show the frequency of values in intervals ("bins"); bars touch!
Boxplot: Shows median, quartiles, and outliers visually.
Timeplot: Plots data over time (shows trends, cycles).

🔑 Anatomy of a Good Quantitative Graph

Title explains what is shown
Labels on axes include units and ranges
No missing intervals or data points
Bars touch in histograms (not bar charts!)
Display outliers distinctly (boxplot: dots or asterisks)
Spacing is equal for intervals in dotplots and histograms

🧮 Key Formulas & Summary Measures

Mean (Average)

\[ \bar{x} = \frac{1}{n} \sum_{i=1}^n x_i \]

Median

Middle value after sorting data

Range

Largest value – Smallest value

Standard Deviation (Sample)

\[ s = \sqrt{ \frac{1}{n-1} \sum_{i=1}^n (x_i - \bar{x})^2 } \]

Interquartile Range (IQR)

\[ IQR = Q_3 - Q_1 \]

Percentile

Percentile = percent of data at or below a value

💡 Tips & Tricks for Graphs

Always use equal-width intervals for histograms and dotplots.
Use boxplots for quick comparisons between groups (show spread AND center).
Stem-and-leaf plots are great for small data sets and keep all values visible.
Check for outliers (points far from most others); boxplots help you spot them fast.
If describing a graph, use: "shape, center, spread, outliers" ("SOCS").
Label axes and give units on ALL graphs.
Draw sketches for practice on AP exams—they get points for clarity!

❌ Common Mistakes

Bins not equal width (histograms, dotplots)
Forgetting units or labels on axes
Confusing histogram with bar chart (bars should touch in histogram!)
Leaving out outliers in boxplots
Describing only center—always mention spread and shape too!
Using inappropriate graph for small or large datasets (e.g. stem-and-leaf for 500 values)
Ignoring shape: normal/skewed/bimodal/uniform

📜 Quick Reference Summary

Mean, Median, Mode: Show center
Range, IQR, Standard Deviation: Show spread
SOCS:
- Shape (normal, skewed, symmetric, bimodal, uniform)
- Outliers
- Center (mean/median/mode)
- Spread (range, IQR, sd)
Draw with purpose: Histograms for group/large data, stem-and-leaf/dotplot for small sets, boxplot for comparisons!

Summary:
Unit 1.5 covers all the main graph types for quantitative data—dotplots, stem-and-leaf, histograms, boxplots, timeplots—and the key formulas for describing center and spread. Use the SOCS approach for clear descriptions on exams!