Exponential distribution
The exponential distribution models the waiting time until the next of a series of independent events that occur at a constant average rate λ, with mean waiting time 1 ÷ λ.
See it move
A support line receives calls at an average rate of 12 an hour, or λ = 0.2 per minute. The probability that more than 10 minutes passes before the next call is e^(−0.2 × 10) = e^(−2) ≈ 13.5%. The mean waiting time is 1 ÷ 0.2, or 5 minutes, and because the process is memoryless, that 13.5% figure holds no matter how long the wait has already lasted.
The formula
Variables
- Waiting time until the next event
- A specific time value being tested
- Average rate of events per unit of time (must be positive)
- Euler's number, approximately 2.71828
Probability that the waiting time T until the next event exceeds t, given events occur independently at constant average rate λ.
Variables
- Expected (mean) waiting time until the next event
- Average rate of events per unit of time
The average time between events is the reciprocal of the event rate; a higher rate of events means a shorter average wait.