FAD1015 L13 — Binomial Distribution
Lecture 13 of FAD1015 Mathematics III covering the binomial distribution as a discrete probability distribution. Source: (L13) FAD 1015 - Week 7_1 Binomial - std.pdf (34 slides).
Learning Objectives
- Identify the binomial setting/characteristics
- Apply the binomial probability formula
- Use the binomial distribution table (cumulative probabilities)
- Calculate the mean and standard deviation of a binomial distribution
1. The Binomial Setting
The binomial distribution applies to probability problems that have only two outcomes or can be reduced to two outcomes.
Natural two-outcome situations:
- Baby born: male or female
- Coin tossed: head or tail
- Basketball game: win or lose
Situations reducible to two outcomes:
- Medical treatment: effective or ineffective
- Blood pressure: normal or abnormal
- Multiple choice question: correct or incorrect
2. Four Characteristics of a Binomial Experiment
A binomial experiment must satisfy all four conditions:
- Fixed number of trials — $n$ identical trials
- Two possible outcomes — each trial is either success or failure
- $P(\text{success}) = p$
- $P(\text{failure}) = 1 - p = q$
- Independent trials
- Constant probability — the probability of success/failure remains the same for every trial
The binomial random variable $X$ is defined as: $$X = \text{number of successes observed when an experiment or trial is performed}$$
The probability distribution of $X$ is called the binomial probability distribution.
Checking for Binomial Distribution — Examples
| Scenario | Fixed $n$ | 2 Outcomes | Independent | Constant $p$ | Binomial? |
|---|---|---|---|---|---|
| Throwing dart till bullseye | No | Yes | Yes | Yes | No |
| Playing two football matches | Yes | No (win/draw/lose) | Yes | Yes | No |
| Playing two tennis games | Yes | Yes | No | Yes | No |
| Throw dice + toss coin for 6 and head | Yes | Yes | Yes | No | No |
| Throwing dice three times to get a 6 | Yes | Yes | Yes | Yes | Yes |
graph TD
Q1["Fixed number of trials n?"] -->|No| NOT1["NOT Binomial"]
Q1 -->|Yes| Q2["Exactly two outcomes<br/>per trial?"]
Q2 -->|No| NOT2["NOT Binomial"]
Q2 -->|Yes| Q3["Trials are independent?"]
Q3 -->|No| NOT3["NOT Binomial"]
Q3 -->|Yes| Q4["Constant probability p<br/>for every trial?"]
Q4 -->|No| NOT4["NOT Binomial"]
Q4 -->|Yes| YES["Binomial Distribution<br/>X ~ B(n,p)"]
style Q1 fill:#e7f5ff,stroke:#1971c2
style Q2 fill:#e7f5ff,stroke:#1971c2
style Q3 fill:#e7f5ff,stroke:#1971c2
style Q4 fill:#e7f5ff,stroke:#1971c2
style NOT1 fill:#ffe3e3,stroke:#c92a2a
style NOT2 fill:#ffe3e3,stroke:#c92a2a
style NOT3 fill:#ffe3e3,stroke:#c92a2a
style NOT4 fill:#ffe3e3,stroke:#c92a2a
style YES fill:#d3f9d8,stroke:#2f9e44
3. The Binomial Probability Formula
If $X \sim \text{Bin}(n, p)$, then:
$$P(X = x) = \binom{n}{x} p^x (1-p)^{n-x} = \frac{n!}{x!(n-x)!} \times p^x \times q^{n-x}$$
Where:
- $n$ = total number of trials
- $p$ = probability of success
- $q = 1-p$ = probability of failure
- $x$ = number of successes in $n$ trials
- $n-x$ = number of failures in $n$ trials
Recall: $$^nC_r = \binom{n}{r} = \frac{n!}{r!(n-r)!}$$
4. Worked Examples — Using the Formula
graph LR
subgraph identify["Step 1: Identify Parameters"]
I1["n = number of trials"]
I2["p = probability of success"]
I3["x = desired successes"]
end
subgraph formula["Step 2: Apply Formula"]
F1["P(X=x) = C(n,x) * p^x * q^(n-x)"]
end
subgraph interpret["Step 3: Interpret"]
INT["State probability in context"]
end
I1 --> F1
I2 --> F1
I3 --> F1
F1 --> INT
style identify fill:#e7f5ff,stroke:#1971c2
style formula fill:#ffe8cc,stroke:#d9480f
style interpret fill:#d3f9d8,stroke:#2f9e44
Example 1: Exactly One Defective
Problem: Ten percent of all iPhones manufactured by Apple are defective. A quality control inspector randomly selects five iPhones from the production line. Is this a binomial experiment? What is the probability that exactly one of these iPhones is defective?
Solution:
- Let $X$ = number of defects in 5 trials
- $X \sim B(5, 0.1)$
- Verify conditions: fixed $n=5$ ✓, 2 outcomes ✓, independent ✓, constant $p=0.1$ ✓
- $P(X = 1) = \binom{5}{1}(0.1)^1(0.9)^4 = 0.32805$
Example 2: Multiple Probability Questions (Same Scenario)
Using $X \sim B(5, 0.1)$:
-
Exactly three defective: $$P(X = 3) = \binom{5}{3}(0.1)^3(0.9)^2 = 0.0081$$
-
More than one defective: $$P(X > 1) = P(X=2) + P(X=3) + P(X=4) + P(X=5) = 0.08146$$
-
Less than two defective: $$P(X < 2) = P(X=1) + P(X=0) = 0.9185$$
-
At least one defective: $$P(X \geq 1) = 0.40951$$
-
At most two defective: $$P(X \leq 2) = P(X=2) + P(X=1) + P(X=0) = 0.99144$$
5. The Binomial Distribution Table
The provided binomial distribution table gives cumulative probabilities of the form:
$$P(X \geq r) = P(X=r) + P(X=r+1) + \dots + P(X=n)$$
The table lists $P(X \geq r)$ for common values of $n$ (number of trials) and $p$ (probability of success), with $r$ = number of successes.
Important: The table shows cumulative probabilities $P(X \geq r)$, not individual probabilities $P(X = r)$.
Example 3: Using the Binomial Table ($p \leq 0.5$)
Problem: Same iPhone scenario ($n=5, p=0.1$). Use the table to find:
- $P(\text{exactly one})$ → read $P(X \geq 1)$ from table
- $P(\text{exactly three})$ → $P(X \geq 3) - P(X \geq 4)$
- $P(\text{more than one})$ → $P(X \geq 2)$
- $P(\text{less than two})$ → $1 - P(X \geq 2)$
- $P(\text{at least one})$ → $P(X \geq 1)$
- $P(\text{at most two})$ → $1 - P(X \geq 3)$
Example 5: Using the Binomial Table When $p > 0.5$
Problem: Eighty percent of iPhones are defective. Inspector selects ten iPhones ($n=10, p=0.8$).
Trick — Flip success and failure:
| Success ($p=0.8$) $X$ | Failure ($p=0.2$) $Y$ |
|---|---|
| 0 | 10 |
| 1 | 9 |
| 2 | 8 |
| 3 | 7 |
| 4 | 6 |
| 5 | 5 |
| 6 | 4 |
| 7 | 3 |
| 8 | 2 |
| 9 | 1 |
| 10 | 0 |
If $X \sim B(10, 0.8)$, then $Y \sim B(10, 0.2)$ where $Y = 10 - X$.
Questions:
- At most 3 defective → $P(X \leq 3) = P(Y \geq 7)$
- More than 5 defective → $P(X > 5) = P(Y < 5) = 1 - P(Y \geq 5)$
- Less than 3 defective → $P(X < 3) = P(Y > 7) = P(Y \geq 8)$
- At least 7 defective → $P(X \geq 7) = P(Y \leq 3) = 1 - P(Y \geq 4)$
- More than 1 but less than 5 → $P(1 < X < 5) = P(5 < Y < 9) = P(Y \geq 6) - P(Y \geq 9)$
- Exactly 6 defective → $P(X = 6) = P(Y = 4) = P(Y \geq 4) - P(Y \geq 5)$
6. Reading the Table — Key Rules
From the NOTES slide:
| Probability Wanted | How to Read from Table |
|---|---|
| $P(X \geq x)$ | Read straight from table |
| $P(X \leq x)$ | $1 - P(X \geq x+1)$ |
| $P(X < x)$ | $1 - P(X \geq x)$ |
| $P(X = x)$ | $P(X \geq x) - P(X \geq x+1)$ |
| $P(X > x)$ | $P(X \geq x+1)$ |
7. Mean and Standard Deviation
For $X \sim \text{Bin}(n, p)$:
- Mean: $\mu = np$
- Variance: $\sigma^2 = npq$
- Standard Deviation: $\sigma = \sqrt{npq}$
Example 6: Mean, Variance and Standard Deviation
Problem: An egg supplier sends a daily shipment of 500 eggs. Previous records show 4% arrive damaged. Let $X$ be the number of damaged eggs. Find the mean and standard deviation.
Solution:
- $X \sim B(500, 0.04)$
- $\mu = np = 500 \times 0.04 = 20$
- $\sigma = \sqrt{npq} = \sqrt{500 \times 0.04 \times 0.96} = 4.38178$
8. Binomial Distribution in Real Life
- Medical professionals use it to model the probability that a certain number of patients will experience side effects from new medications.
- Banks use it to model the probability that a certain number of credit card transactions are fraudulent.
- Flood control systems use it to model the probability that rivers overflow a certain number of times each year due to excessive rain.
- Retail stores use it to model the probability that they receive a certain number of shopping returns each week.
Related Topics
- Probability Distributions — overview of discrete and continuous distributions
- FAD1015 L14 — Poisson Distribution — next discrete distribution
- FAD1015 L15-L16 — Normal Distribution & Approximation — continuous distribution including normal approximation to binomial
- FAD1015 - Mathematics III — course page
Key Equations
$$P(X = x) = \binom{n}{x} p^x q^{n-x}$$
$$\mu = np, \quad \sigma^2 = npq, \quad \sigma = \sqrt{npq}$$