Example

Consider the function [latex]f(x)\displaystyle\frac{{1}}{{20}}[/latex] is a horizontal line. However, since [latex]0{\leq}x{\leq}20[/latex], f(x) is restricted to the portion between [latex]x=0[/latex] and [latex]x=20[/latex], inclusive.

[latex]f(x)=\frac{{1}}{{20}}[/latex] for [latex]0{\leq}x{\leq}20[/latex].

The graph of [latex]f(x)=\frac{{1}}{{20}}[/latex] is a horizontal line segment when [latex]0{\leq}x{\leq}20[/latex].

The area between [latex]f(x)\frac{{1}}{{20}}[/latex].

[latex]\displaystyle\text{AREA}={20}{(\frac{{1}}{{20}})}={1}[/latex]

Suppose we want to find the area between [latex]f(x)=[/latex] and the x-axis where [latex]0<x<2[/latex].

[latex]\displaystyle\text{AREA}={({2}-{0})}{(\frac{{1}}{{20}})}={0.1}[/latex]

[latex]\displaystyle({2}-{0})={2}=\text{base of a rectangle}[/latex]

Reminder: area of a rectangle = (base)(height).The area corresponds to a probability. The probability that x is between zero and two is 0.1, which can be written mathematically as [latex]P(0<x<2)=P(x<2)=0.1[/latex].

Suppose we want to find the area between [latex]f(x)=\frac{{1}}{{20}}[/latex] and the x-axis where [latex]4<x<15[/latex].

[latex]\displaystyle\text{AREA}={({15}-{4})}{(\frac{{1}}{{20}})}={0.55}[/latex]

[latex]\displaystyle\text{AREA}={({15}-{4})}{(\frac{{1}}{{20}})}={0.55}[/latex]

[latex]\displaystyle{({15}-{4})}={11}=\text{the base of a rectangle}[/latex]

The area corresponds to the probability [latex]P(4<x<15)=0.55[/latex].

Suppose we want to find [latex]P(x=15)[/latex]. On an x-y graph, [latex]x=15[/latex] is a vertical line. A vertical line has no width (or zero width). Therefore, [latex]P(x=15)=(\text{base})(\text{height})=(0){(\frac{{1}}{{20}})}=0[/latex]

[latex]P(X{\leq}x)[/latex] (can be written as [latex]P(X<x)[/latex] for continuous distributions) is called the cumulative distribution function or CDF. Notice the “less than or equal to” symbol. We can use the CDF to calculate [latex]P(X>x)[/latex]. The CDF gives “area to the left” and [latex]P(X>x)[/latex] gives “area to the right.” We calculate [latex]P(X > x)[/latex] for continuous distributions as follows: [latex]P(X>x)=1–P(X<x)[/latex].

Label the graph with f(x) and x. Scale the x and y axes with the maximum x and y values.f(x) = [latex]\displaystyle\frac{{1}}{{20}}[/latex], [latex]0{\leq}x{\leq}20[/latex].

To calculate the probability that x is between two values, look at the following graph. Shade the region between [latex]x=2.3[/latex] and [latex]x=12.7[/latex]. Then calculate the shaded area of a rectangle.

[latex]\displaystyle{P}{({2.3}{<}{x}{<}{12.7})}={(\text{base})}{(\text{height})}={({12.7}-{2.3})}{(\frac{{1}}{{20}})}={0.52}[/latex]