Poisson Distribution Mastery Workbook

Concept Review

Poisson Distribution

Definition

A discrete random variable \(X\) follows a Poisson distribution if it counts the number of events occurring in a fixed interval (time, space, or volume), where events occur independently at a constant average rate \(\lambda\).

We write: \(X \sim \text{Po}(\lambda)\)

Probability Mass Function

\[ P(X = k) = \frac{e^{-\lambda} \lambda^{k}}{k!}, \quad k = 0, 1, 2, 3, \ldots \]

where \(\lambda > 0\) is the mean number of events per interval, \(e \approx 2.71828\), and \(k! = k \times (k-1) \times \cdots \times 1\).

Key Properties

Mean \(E[X] = \lambda\)

Variance \(\text{Var}(X) = \lambda\)

Std Deviation \(\sigma = \sqrt{\lambda}\)

Notation \(X \sim \text{Po}(\lambda)\)

Rate scaling: If \(X \sim \text{Po}(\lambda)\) per unit time, then over \(t\) units: \(X_t \sim \text{Po}(\lambda t)\).

Cumulative Probability

\[ P(X \leq k) = \sum_{i=0}^{k} \frac{e^{-\lambda}\lambda^{i}}{i!} \]

Four Conditions for Poisson Model

1. Discrete Events Events are countable and occur one at a time (not simultaneously).

2. Independence One event does not affect the probability of another.

3. Constant Rate The average rate \(\lambda\) is constant across the interval.

4. Fixed Interval Events are counted over a fixed period, area, or volume.

Poisson vs. Binomial Approximation

When \(n\) is large and \(p\) is small (\(n \geq 50,\ np \leq 5\)), the Binomial can be approximated by Poisson with \(\lambda = np\).

Feature	Binomial \(B(n,p)\)	Poisson \(\text{Po}(\lambda)\)
Trials	Fixed \(n\)	Not fixed
Outcomes	Success / Failure	Count of events
Parameter	\(n, p\)	\(\lambda\)
Mean	\(np\)	\(\lambda\)
Variance	\(np(1-p)\)	\(\lambda\)
Use when	Finite trials, moderate \(p\)	Rare events, large \(n\), small \(p\)

Quick Reference

Formulas to Memorize

Formula 01

PMF

\(P(X=k)=\dfrac{e^{-\lambda}\lambda^k}{k!}\)

Formula 02

Mean & Variance

\(E[X]=\text{Var}(X)=\lambda\)

Formula 03

Rate Scaling

\(X\sim\text{Po}(\lambda) \Rightarrow X_t\sim\text{Po}(\lambda t)\)

Formula 04

Complement Rule

\(P(X \geq 1)=1-e^{-\lambda}\)

Formula 05

Binomial Approx.

If \(n\geq50,\ np\leq5\): use \(\lambda=np\)

Formula 06

Sum of Poissons

If \(X\sim\text{Po}(\alpha),\ Y\sim\text{Po}(\beta)\) independent:
\(X+Y\sim\text{Po}(\alpha+\beta)\)

Worked Examples

See It First

EX 01 Direct PMF Calculation

A hospital emergency room receives an average of 4 patients per hour. Assuming the number of arrivals follows a Poisson distribution, find \(P(X = 3)\).

1
Identify \(\lambda = 4\) (average rate per hour), \(k = 3\).
2
Apply the PMF: \(P(X=3)=\dfrac{e^{-4}\cdot 4^3}{3!}\)
3
Calculate: \(4^3 = 64,\quad 3! = 6,\quad e^{-4} \approx 0.01832\)
4
\(P(X=3)=\dfrac{0.01832 \times 64}{6}=\dfrac{1.1725}{6}\approx 0.1954\)

Answer: P(X = 3) ≈ 0.1954

EX 02 Rate Scaling over Different Interval

A radioactive source emits on average 6 particles per minute. Find the probability that exactly 2 particles are emitted in a 30-second interval.

1
Original rate: \(\lambda = 6\) per minute. New interval: 30 sec = 0.5 min.
2
Scale rate: \(\lambda' = 6 \times 0.5 = 3\) particles per 30 seconds.
3
\(P(X=2)=\dfrac{e^{-3}\cdot 3^2}{2!}=\dfrac{0.04979 \times 9}{2}\approx 0.2240\)

Answer: P(X = 2) ≈ 0.2240

EX 03 Cumulative Probability

Defects in a fabric roll occur at an average rate of 2 per metre. Find the probability that a 1-metre section has at most 3 defects.

1
\(\lambda = 2\), find \(P(X \leq 3) = P(0)+P(1)+P(2)+P(3)\).
2
\(P(0)=e^{-2}\approx 0.1353\)
\(P(1)=2e^{-2}\approx 0.2707\)
\(P(2)=\frac{4e^{-2}}{2}\approx 0.2707\)
\(P(3)=\frac{8e^{-2}}{6}\approx 0.1804\)
3
\(P(X\leq 3)=0.1353+0.2707+0.2707+0.1804=0.8571\)

Answer: P(X ≤ 3) ≈ 0.8571

Practice Problems

20 Exam-Style Questions

Problem 1 Direct PMF

A call centre receives an average of 3 calls per minute. The number of calls follows a Poisson distribution.

Find \(P(X = 2)\). Give your answer to 4 decimal places.

Your Answer

Problem 2 PMF: Zero Events

A Geiger counter records an average of 5 alpha particles per second from a radioactive source.

Find the probability that no alpha particles are recorded in a given second. Give your answer to 4 decimal places.

Your Answer

Problem 3 Rate Scaling

Emails arrive at a server at an average rate of 12 per hour.

Find the probability that exactly 1 email arrives in a 10-minute period. Give your answer to 4 decimal places.

Your Answer

Problem 4 Cumulative: At Most

A road intersection has an average of 2 accidents per month. Assume a Poisson model.

Find \(P(X \leq 2)\) for a randomly selected month. Give your answer to 4 decimal places.

Your Answer

Problem 5 Complement Rule

Typos in a manuscript occur at an average rate of 1.5 per page.

Find the probability that a randomly chosen page contains at least one typo. Give your answer to 4 decimal places.

Your Answer

Problem 6 P(X > k)

A bank ATM machine has breakdowns occurring at an average rate of 0.8 per week.

Find the probability that the ATM has more than 2 breakdowns in a given week. Give your answer to 4 decimal places.

Your Answer

Problem 7 Mean & Variance

The number of goals scored per match in a football league follows \(X \sim \text{Po}(\lambda)\). The variance of goals scored is 2.7.

State the value of \(\lambda\) and find the standard deviation of \(X\). Give the standard deviation to 4 decimal places.

Your Answer (standard deviation only)

Problem 8 Rate Scaling (Area)

Flaws in a sheet of glass occur at an average rate of 3 per square metre. A sheet of glass has an area of 0.5 m².

Find the probability that the sheet contains exactly 2 flaws. Give your answer to 4 decimal places.

Your Answer

Problem 9 Sum of Poissons

Customers arrive at checkout A at an average rate of 2 per minute and at checkout B at an average rate of 3 per minute, independently of each other.

Find the probability that a total of exactly 4 customers arrive at both checkouts combined in one minute. Give your answer to 4 decimal places.

Your Answer

Problem 10 Binomial Approximation

In a large city, the probability that any one person is left-handed is 0.02. A random sample of 200 people is selected.

Using a Poisson approximation, find the probability that exactly 5 people in the sample are left-handed. Give your answer to 4 decimal places.

Your Answer

Problem 11 Conditional Probability

Website errors occur at a rate of 2 per hour. Given that at least 1 error occurs in an hour, find the probability that exactly 2 errors occur.

Find \(P(X=2 \mid X \geq 1)\). Give your answer to 4 decimal places.

Your Answer

Problem 12 Finding Lambda

The number of misprints per page of a book follows \(X \sim \text{Po}(\lambda)\). It is known that \(P(X = 0) = 0.4066\).

Find the value of \(\lambda\). Give your answer to 4 decimal places.

Your Answer

Problem 13 Multi-Interval

Buses arrive at a stop at an average rate of 4 per hour.

Find the probability that at least 3 buses arrive in a 30-minute period. Give your answer to 4 decimal places.

Your Answer

Problem 14 Expected Value Application

A factory produces bolts. On average, 0.5% of bolts are defective. A sample of 1000 bolts is examined. Let \(X\) be the number of defective bolts.

Using a Poisson approximation, find \(E[X]\) and \(P(X \geq 3)\). Give \(P(X \geq 3)\) to 4 decimal places.

Your Answer (P(X ≥ 3) only)

Problem 15 P(a ≤ X ≤ b)

The number of earthquakes of magnitude 4.0 or greater in a region follows \(\text{Po}(3)\) per year.

Find the probability that between 2 and 4 earthquakes (inclusive) occur in a given year. Give your answer to 4 decimal places.

Your Answer

Problem 16 Mode of Poisson

The number of daily power outages in a district follows \(X \sim \text{Po}(4)\).

Find the mode(s) of \(X\). Then calculate \(P(X = \text{mode})\) for the smaller mode if two modes exist. Give your probability to 4 decimal places.

Your Answer (P at mode)

Problem 17 Independent Poissons

Machine A breaks down at an average rate of 1 per week. Machine B breaks down at an average rate of 2 per week. Breakdowns are independent.

Find the probability that the total number of breakdowns in one week is exactly 3. Give your answer to 4 decimal places.

Your Answer

Problem 18 Inequality / At Least

A random variable \(X \sim \text{Po}(6)\).

Find \(P(X \geq 5)\). Give your answer to 4 decimal places.

Your Answer

Problem 19 Estimating Lambda from Data

A biologist counts bacteria colonies on 100 Petri dishes. The data is: 0 colonies (30 dishes), 1 colony (36 dishes), 2 colonies (22 dishes), 3 colonies (9 dishes), 4+ colonies (3 dishes).

Estimate \(\hat{\lambda}\) using the sample mean. Give your answer to 4 decimal places.

Your Answer

Problem 20 Multi-Step Applied Problem

A customer service hotline receives calls at an average rate of 5 per 15 minutes. Assuming a Poisson model:

(a) Find the probability that exactly 3 calls are received in a 6-minute period.
(b) Find the probability of receiving fewer than 2 calls in a 6-minute period.

Enter the answer to part (a) to 4 decimal places.

Your Answer — Part (a)

Answer Key & Full Solutions

Detailed Solutions

Problem 1 Direct PMF | \(\lambda=3\)

Answer: 0.2240

\(X\sim\text{Po}(3)\). \(P(X=2)=\dfrac{e^{-3}\cdot 3^2}{2!}=\dfrac{0.049787\times 9}{2}=\dfrac{0.44809}{2}\approx 0.2240\)

Problem 2 PMF: Zero Events | \(\lambda=5\)

Answer: 0.0067

\(P(X=0)=\dfrac{e^{-5}\cdot 5^0}{0!}=e^{-5}\approx 0.006738 \approx 0.0067\)

Problem 3 Rate Scaling | 10 min interval

Answer: 0.2707

Rate: 12 per hour. 10 min = 10/60 hour. New \(\lambda=12\times\frac{10}{60}=2\).
\(P(X=1)=\dfrac{e^{-2}\cdot 2^1}{1!}=2e^{-2}\approx 2\times 0.13534=0.2707\)

Problem 4 Cumulative \(P(X\leq 2)\) | \(\lambda=2\)

Answer: 0.6767

\(P(0)=e^{-2}\approx0.1353\); \(P(1)=2e^{-2}\approx0.2707\); \(P(2)=\frac{4e^{-2}}{2}\approx0.2707\)
\(P(X\leq 2)=0.1353+0.2707+0.2707=0.6767\)

Problem 5 Complement | \(\lambda=1.5\)

Answer: 0.7769

\(P(X\geq 1)=1-P(X=0)=1-e^{-1.5}=1-0.22313\approx 0.7769\)

Problem 6 \(P(X>2)\) | \(\lambda=0.8\)

Answer: 0.0474

\(P(X>2)=1-P(X\leq 2)\)
\(P(0)=e^{-0.8}\approx0.4493\); \(P(1)=0.8e^{-0.8}\approx0.3595\); \(P(2)=\frac{0.64e^{-0.8}}{2}\approx0.1438\)
\(P(X\leq2)\approx0.9526\); \(P(X>2)\approx1-0.9526=0.0474\)

Problem 7 Mean & Variance | \(\lambda=2.7\)

Answer: \(\lambda=2.7\); \(\sigma\approx 1.6432\)

For Poisson, \(\text{Var}(X)=\lambda\), so \(\lambda=2.7\).
\(\sigma=\sqrt{\lambda}=\sqrt{2.7}\approx 1.6432\)

Problem 8 Area Scaling | \(\lambda'=1.5\)

Answer: 0.2510

Rate: 3 per m². Area: 0.5 m². Scaled rate: \(\lambda'=3\times 0.5=1.5\).
\(P(X=2)=\dfrac{e^{-1.5}\cdot(1.5)^2}{2!}=\dfrac{0.22313\times2.25}{2}=\dfrac{0.50204}{2}\approx 0.2510\)

Problem 9 Sum of Poissons | \(\lambda=5\)

Answer: 0.1755

\(A\sim\text{Po}(2)\), \(B\sim\text{Po}(3)\) independent. \(T=A+B\sim\text{Po}(5)\).
\(P(T=4)=\dfrac{e^{-5}\cdot 5^4}{4!}=\dfrac{0.006738\times625}{24}=\dfrac{4.2112}{24}\approx 0.1755\)

Problem 10 Binomial Approx. | \(\lambda=4\)

Answer: 0.1563

\(n=200,\ p=0.02\). Since \(n\geq50\) and \(np=4\leq5\), use \(X\sim\text{Po}(4)\).
\(P(X=5)=\dfrac{e^{-4}\cdot4^5}{5!}=\dfrac{0.01832\times1024}{120}=\dfrac{18.761}{120}\approx 0.1563\)

Problem 11 Conditional Probability | \(\lambda=2\)

Answer: 0.2998

\(P(X=2\mid X\geq1)=\dfrac{P(X=2)}{P(X\geq1)}=\dfrac{P(X=2)}{1-P(X=0)}\)
\(P(X=2)=\dfrac{e^{-2}\cdot4}{2}=2e^{-2}\approx0.2707\)
\(P(X\geq1)=1-e^{-2}\approx1-0.1353=0.8647\)
\(P(X=2\mid X\geq1)=\dfrac{0.2707}{0.8647}\approx 0.3130\)

Problem 12 Finding \(\lambda\)

Answer: \(\lambda \approx 0.8994\)

\(P(X=0)=e^{-\lambda}=0.4066\)
\(-\lambda=\ln(0.4066)\approx-0.8994\)
\(\lambda\approx 0.8994\)

Problem 13 Multi-Interval | \(\lambda'=2\)

Answer: 0.3233

Rate: 4/hr. 30 min = 0.5 hr. \(\lambda'=4\times0.5=2\).
\(P(X\geq3)=1-P(X\leq2)=1-[e^{-2}+2e^{-2}+2e^{-2}]=1-5e^{-2}\)
\(=1-5\times0.13534=1-0.6767=0.3233\)

Problem 14 Poisson Approx. | \(\lambda=5\)

Answer: \(E[X]=5\); \(P(X\geq3)\approx 0.8753\)

\(n=1000,\ p=0.005\). \(\lambda=np=5\). So \(X\sim\text{Po}(5)\).
\(P(X\geq3)=1-P(X\leq2)\)
\(P(0)=e^{-5}\approx0.0067\); \(P(1)=5e^{-5}\approx0.0337\); \(P(2)=12.5e^{-5}\approx0.0842\)
\(P(X\leq2)\approx0.1247\); \(P(X\geq3)\approx 0.8753\)

Problem 15 \(P(2\leq X\leq4)\) | \(\lambda=3\)

Answer: 0.6161

\(P(2)+P(3)+P(4)\) where \(\lambda=3\):
\(P(2)=\frac{9e^{-3}}{2}\approx0.2240\); \(P(3)=\frac{27e^{-3}}{6}\approx0.2240\); \(P(4)=\frac{81e^{-3}}{24}\approx0.1680\)
Total \(\approx0.2240+0.2240+0.1680=0.6161\) (Note: slight rounding — exact sum \(\approx0.6161\))

Problem 16 Mode of Poisson | \(\lambda=4\)

Answer: Mode(s) = 3 and 4; \(P(X=3)\approx 0.1954\)

When \(\lambda\) is a positive integer, Poisson has two modes: \(\lambda-1\) and \(\lambda\). Here modes are 3 and 4.
\(P(X=3)=\dfrac{e^{-4}\cdot4^3}{3!}=\dfrac{0.01832\times64}{6}\approx 0.1954\)
Verify: \(P(X=4)=\dfrac{e^{-4}\cdot4^4}{4!}=\dfrac{0.01832\times256}{24}\approx 0.1954\) ✓

Problem 17 Independent Poissons | \(\lambda=3\)

Answer: 0.2240

\(A\sim\text{Po}(1)\), \(B\sim\text{Po}(2)\). \(T=A+B\sim\text{Po}(3)\).
\(P(T=3)=\dfrac{e^{-3}\cdot3^3}{3!}=\dfrac{0.04979\times27}{6}=\dfrac{1.3443}{6}\approx 0.2240\)

Problem 18 \(P(X\geq5)\) | \(\lambda=6\)

Answer: 0.7149

\(P(X\geq5)=1-P(X\leq4)\)
\(P(0)=e^{-6}\approx0.002479\)
\(P(1)=6e^{-6}\approx0.014873\)
\(P(2)=18e^{-6}\approx0.044618\)
\(P(3)=36e^{-6}\approx0.089235\)
\(P(4)=54e^{-6}\approx0.133853\)
\(P(X\leq4)\approx0.28513\); \(P(X\geq5)\approx1-0.28513=0.7149\)

Problem 19 MLE of \(\lambda\)

Answer: \(\hat{\lambda}\approx 1.1900\)

Assume 4+ colonies = exactly 4 (conservative estimate for the 3 dishes).
Total colonies \(= 0\times30 + 1\times36 + 2\times22 + 3\times9 + 4\times3 = 0+36+44+27+12=119\)
\(\hat{\lambda}=\dfrac{119}{100}=1.19\)

Problem 20 Multi-Step | \(\lambda'=2\)

Part (a): 0.1804 | Part (b): 0.4060

Rate: 5 per 15 min = 1/3 per min. Over 6 min: \(\lambda'=6\times\frac{1}{3}=2\).
(a) \(P(X=3)=\dfrac{e^{-2}\cdot8}{6}=\dfrac{0.13534\times8}{6}=\dfrac{1.0827}{6}\approx 0.1804\)
(b) \(P(X<2)=P(0)+P(1)=e^{-2}+2e^{-2}=3e^{-2}\approx3\times0.13534=0.4060\)