Finds the probability that a normal variable falls between two bounds, as Φ((upper − mean) ÷ σ) − Φ((lower − mean) ÷ σ). Within one standard deviation of the mean, the probability is about 68.27%.
Explanation
This is the probability that a normal variable lands between a and b. Take the probability up to the upper bound and subtract the probability up to the lower one.
P(a≤X≤b)=Φ(σb−μ)−Φ(σa−μ) where Φ is the lower-tail probability of the standard normal distribution.
Example
On a test with mean 60 and standard deviation 10, what share of scores fall between 50 and 70?
zlower=1050−60=−1zupper=1070−60=1 P(50≤X≤70)=Φ(1)−Φ(−1)=0.8413−0.1587=0.6827 68.27%. Since this is exactly one standard deviation either side of the mean, the famous 68% figure drops straight out.
Ranges worth knowing
- Mean ±1σ — 68.27%
- Mean ±1.96σ — 95.00%
- Mean ±2σ — 95.45%
- Mean ±3σ — 99.73%
The "six sigma" of manufacturing refers to a specification window six standard deviations wide, where defects become vanishingly rare.
Watch out
- The lower bound must not exceed the upper bound
- The standard deviation must be positive
- For a continuous distribution the probability of any single point is zero, so it makes no difference whether the bounds are written with ≤ or <