With the following simulation, you can look at a variety of normal curves. Use the slider to change the standard deviation. As you change the standard deviation, you will of course get different normal curves. Observe that the two properties we discussed in the examples remain true for any standard deviation you select:

• The probability that a value is within 1 standard deviation of the mean is 68%.
• The x-values of the inflection points correspond to 1 standard deviation above and below the mean.

Click here to open this simulation in its own window.

Now we extend this idea to look at the probability of a value falling within 2 standard deviations of the mean or 3 standard deviations of the mean.

If X is a normal random variable with mean [latex]\mathrm{μ}[/latex] and standard deviation [latex]\mathrm{σ}[/latex], then

1. The probability that X is within 1 standard deviation of the mean equals approximately 0.68.
2. The probability that X is within 2 standard deviations of the mean equals approximately 0.95.
3. The probability that X is within 3 standard deviations of the mean equals approximately 0.997.

To summarize using probability notation:

[latex]\begin{array}{l}\mathrm{1.}P(\mu-\sigma

These three facts together are called the empirical rule for normal curves.

Comment

Let’s take a moment to look a bit deeper at what the empirical rule tells us.

• The first statement of the empirical rule really defines a range of likely values of X. It gives us an interval – within 1 standard deviation of the mean – that contains the central 68% of the values. This statement is very similar to statements about the interquartile range (IQR) that we saw back in the module Summarizing Data Graphically and Numerically. The IQR is the width of the interval that captures the central 50% of the data points of a quantitative distribution.
• The second and third statements in the empirical rule help us identify values that are unlikely to occur. Compare this to the discussion in Summarizing Data Graphically and Numerically where we defined an outlier to be a value that is either more than 1.5 IQRs above quartile 3 or more than 1.5 IQRs below quartile 1. Here we can make the following characterizations of extreme values in normal distributions.
  • 95% of values fall within 2 standard deviations of the mean. It is therefore unlikely for a value to fall more than 2 standard deviations away from the mean. Values more than 2 standard deviations away from the mean in a normal distribution are often called outliers.
  • 99.7% of values fall within 3 standard deviations of the mean. It is therefore extremely unlikely for a value to fall more than 3 standard deviations away from the mean. Values more than 3 standard deviations away from the mean are often called extreme outliers.