7.2: Estimated Probability

(Based on Section 7.2 in Finite Mathematics and Finite Mathematics and Applied Calculus

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To start, here are some basic definitions.

Definition

Example

The frequency of the event E is the number of times the event E occurs.

fr(E) = the number of times E occurs

Toss a coin 20 times. If heads comes up 13 times, then the frequency of the event that heads comes up is

fr(E) = 13.

The relative frequency or estimated probability of the event E is the fraction of times E occurs.

P(E)

fraction of times E occurs

fr(E)

Note: It follows that P(E) must be a number between 0 and 1 (inclusive).

Referring to the situation above, the estimated probability of the event that heads comes up is

P(E)

fr(E)

The number of times that the experiment is performed is called the sample size.

N = number of times the experiment is performed.

The experiment above was performed 20 times, so this is the sample size;

N = 20.

Dice Simulation
To simulate the above experiment, press the "Throw Dice" button 30 tims, or press the "Throw Dice 10 x" button three times.

You will see later in the tutorial that the theoretical probability that x=7 is 1/6 = 0.1666... The estimated probability should approach this number as the sample size gets large. You can now verify this experimentally.

Q In 1993, there were approximately 10,000 fast food outlets in the US that specialized in Mexican food. Of these, the largest were Taco Bell with 4,809 outlets, Taco John's with 430 outlets and Del Taco with 275 outlets.* The experimental probability that a fast food outlet that specializes in Mexican food is none of the above is:

	0.4486			0.4809			0.5514
	0

* Source: Technomic Inc./The New York Times, February 9, 1995, p. D4.

You can find more examples similar to those above in Section 7.2 of Finite Mathematics, or Finite Mathematics and Applied Calculus.

Probability Distribution

The collection of the estimated probabilities of all the outcomes is the estimated probability distribution or relative frequency distribution.

Example
If 10 rolls of a die resulted in the outcomes 2, 1, 4, 4, 5, 6, 1, 2, 2, 1, then the associated estimated probability distribution is the one shown in the following table.

Outcome	1	2	3	4	5	6
Probability	0.3	0.3	0	0.2	0.1	0.1

Following are some of the properties of (estimated) probability. Which one did you use in answering the last question?

Some Properties of Estimated Probability

Let S = {s₁, s₂, ... , s_n} be a sample space and let P(s_i) be the estimated probability of the event {s_i}. Then

(a) 0 P(s_i) 1
(b) P(s₁) + P(s₂) + ... + P(s_n) = 1
(c) If E = {e₁, e₂, ..., e_r}, then P(E) = P(e₁) + P(e₂) + ... + P(e_r).

In words:
(a) The estimated probability of each outcome is a number between 0 and 1.
(b) The estimated probabilities of all the outcomes add up to 1.
(c) The estimated probability of an event E is the sum of the estimated probabilities of the individual outcomes in E.

For more practice, try some of the questions in the chapter quiz (Warning: it covers the whole of Chapter 7) by pressing the button on the sidebar. Then try the exercises in Section 7.2 of Finite Mathematics and Finite Mathematics and Applied Calculus

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Probability

Q The estimated probability of the outcome 7 is P(7) =	.
	Answer should be accurate to 4 decimal places.