# Selecting a Distribution

A LevelAQAEdexcelOCR

## Selecting a Distribution

In practice, a question might not tell you which distribution to use. Furthermore, you might be given some data and asked which distribution best fits it. For this, we need to establish the conditions for each distribution, then when faced with a question, you just pick the distribution whose conditions are satisfied.

Make sure you are happy with the following topics before continuing.

A Level   ## Conditions for a Binomial Distribution

1. The data is discrete.
2. There is a fixed number of trials ($n$) which end in only two outcomes: success or failure.
3. The success probability ($p$) is constant, and every trial is independent of each other.

If these conditions are met, use a binomial distribution.

A Level   ## Conditions for a Normal Distribution

1. The data is continuous.
2. The data is symmetrically distributed (or at least close to symmetrically distributed) with a peak at the mean.
3. The data tails off as you move away from the mean. Specifically, almost all of the data falls within three standard deviations of the mean.

If these conditions are met, use a normal distribution.

A Level   A Level   ## Example 1: In Practice

The price of a first class plane ticket from London to Paris varies according to demand. The price is symmetric about the mean of $£500$, it has a standard deviation of $£33$, and a price lower than $£400$ or higher than $£600$ is yet to be recorded. Suggest what distribution to use then use it to calculate the probability of being able to fly first class to Paris for under $£450$.

[3 marks]

The data is continuous and symmetric about its mean. Three standard deviations is $£99$, and data lower than $£400$ or higher than $£600$ is yet to be recorded, so virtually all data lies between $£401-£599$. Hence, we can use a normal distribution.

$X\sim N(500,33^{2})$

$\mathbb{P}(X<450)=0.0649$

A Level   ## Example 2: In Practice

St. David’s Sixth Form College have a pass rate of $92\%$. They have $30$ students taking exams this year, and are hoping at least $28$ of them pass. What is the probability of this happening?

[3 marks]

The data is discrete, there is a set pass or fail probability for each student, which are the only outcomes, and we are not told anything that suggests the events of students passing might not be independent. Hence, we can use a binomial distribution.

$X\sim B(30,0.92)$

$\mathbb{P}(X\geq 28)=0.5654$

A Level   ## Example Questions

a) Normal

Speed is continuous, and this is likely to have an average with most drivers in a small range of the average, fitting the normal distribution assumptions.

b) Binomial

The data is discrete, there is a fixed success probability, and each spin is independent.

c) Neither

The data is discrete so we can rule out normal. But because the cards are chosen without replacement, the probability of selecting a spade changes each time, so we can rule out binomial too.

Data is continuous, tails off from the mean with almost all data being within three standard deviations of the mean. Hence, we should use a normal distribution.

$X\sim N(20,2)$

$\mathbb{P}(X\leq 16)=0.0228$

The data is discrete; there are two outcomes, with a fixed success probability; and each trial is independent. Therefore we should use a binomial distribution.

$X\sim B(50,0.7)$

$\mathbb{P}(X\geq 40)=0.0789$

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