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Graphs of binomial distribution using a graphics calculator (Investigation)

Lesson

The Graph of the Binomial Distribution

We'll begin by interacting with the applet below to get a feel for how different values of n and p affect the distribution of our probabilities for a Binomial distribution.

Remember!

n is the number of trials of a Bernoulli experiment (an experiment with only two outcomes, a success or a failure)

p is the probability of success of each trial and each trial is independent. 

Begin by setting the applet to n=10 and p=0.5.

How would you describe the distribution of the graph you see?

Remember when describing the shape of a histogram we use the phrases positively skewed, symmetrical and negatively skewed.

Keeping p=0.5, change the value of n. Does your description of the distribution stay the same?

In both cases, with p=0.5, you should see that the graphs are symmetrical.

This makes a lot of sense! A value of p=0.5 indicates an equal probability of success and failure, so you'd expect symmetry.

Now set the applet to n=10 and and slide the p value to the left and to the right.

Questions:

  1. As the probability of success decreases, what happens to the shape of the distribution?
  2. As the probability of success increases, what happens to the shape of the distribution?

Answers:

  1. The distribution becomes positively skewed with a tail to the right
  2. The distribution becomes negatively skewed with a tail to the left

Now slide the n and p values around and confirm that those findings about the shape of the distribution hold for all scenarios.

Graphing the Binomial Distribution Using Your Graphics Calculator

Let's look through a series of screenshots to do these problems using the TI-Nspire.

Firstly through the menu we select Statistics and Distribution and select BinomialPdf to calculate P(X=5) when n=8 and p=0.3

To calculate the cumulative probability of P(1<=X<=3) we select BinomialCdf instead.

 

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