\$\(\text{Range} = \text{Maximum} - \text{Minimum}\)\$
- Simple but heavily affected by outliers
Where:
- \(Q_1\) = lower quartile (median of lower half)
- \(Q_3\) = upper quartile (median of upper half)
The IQR covers the middle 50% of the data. Resistant to outliers.
| Distribution | Best measure of centre | Best measure of spread |
|---|---|---|
| Symmetric, no outliers | Mean \(\bar{x}\) | Standard deviation \(s\) |
| Skewed or has outliers | Median \(M\) | IQR |
KEY TAKEAWAY: Mean and standard deviation go together; median and IQR go together. Never mix them.
Data: 12, 15, 14, 10, 18, 14, 22, 13
Sorted: 10, 12, 13, 14, 14, 15, 18, 22 (n = 8)
| Statistic | Calculation | Value |
|---|---|---|
| Mean | \((10+12+13+14+14+15+18+22)/8\) | \(14.75\) |
| Median | Average of 4th and 5th: \((14+14)/2\) | \(14\) |
| Mode | Most frequent | \(14\) |
| Range | \(22 - 10\) | \(12\) |
| \(Q_1\) | Median of {10,12,13,14} | \(12.5\) |
| \(Q_3\) | Median of {14,15,18,22} | \(16.5\) |
| IQR | \(16.5 - 12.5\) | \(4\) |
EXAM TIP: On VCAA exams, always show which formula/method you used. For the median with even \(n\), show the two middle values and their average.
COMMON MISTAKE: When finding \(Q_1\) and \(Q_3\), exclude the median value(s) from the two halves. Different calculators/textbooks use slightly different conventions — CAS calculators use the standard VCAA method.
