The Standard Normal Distribution | Calculator, Examples & Uses (2024)

Published on 16 September 2022 by Pritha Bhandari. Revised on 6 February 2023.

The standard normal distribution, also called the z-distribution, is a special normal distribution where the mean is 0 and the standard deviation is 1.

Any normal distribution can be standardised by converting its values into z-scores. Z-scores tell you how many standard deviations from the mean each value lies.

The Standard Normal Distribution | Calculator, Examples & Uses (1)

Converting a normal distribution into a z-distribution allows you to calculate the probability of certain values occurring and to compare different data sets.

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Table of contents

  1. Standard normal distribution calculator
  2. Normal distribution vs the standard normal distribution
  3. Standardising a normal distribution
  4. Use the standard normal distribution to find probability
  5. Step-by-step example of using the z-distribution
  6. Frequently asked questions about the standard normal distribution

Standard normal distribution calculator

You can calculate the standard normal distribution with our calculator below.

Normal distribution vs the standard normal distribution

All normal distributions, like the standard normal distribution, are unimodal and symmetrically distributed with a bell-shaped curve. However, a normal distribution can take on any value as its mean and standard deviation. In the standard normal distribution, the mean and standard deviation are always fixed.

Every normal distribution is a version of the standard normal distribution that’s been stretched or squeezed and moved horizontally right or left.

The mean determines where the curve is centred. Increasing the mean moves the curve right, while decreasing it moves the curve left.

The standard deviation stretches or squeezes the curve. A small standard deviation results in a narrow curve, while a large standard deviation leads to a wide curve.

The Standard Normal Distribution | Calculator, Examples & Uses (2)

CurvePosition or shape (relative to standard normal distribution)
A (M = 0, SD = 1)Standard normal distribution
B (M = 0, SD = 0.5)Squeezed, because SD < 1
C (M = 0, SD = 2)Stretched, because SD > 1
D (M = 1, SD = 1)Shifted right, because M > 0
E (M = –1, SD = 1)Shifted left, because M < 0

Standardising a normal distribution

When you standardise a normal distribution, the mean becomes 0 and the standard deviation becomes 1. This allows you to easily calculate the probability of certain values occurring in your distribution, or to compare data sets with different means and standard deviations.

While data points are referred to as x in a normal distribution, they are called z or z-scores in the z-distribution. A z-score is a standard score that tells you how many standard deviations away from the mean an individual value (x) lies:

  • A positive z-score means that your x-value is greater than the mean.
  • A negative z-score means that your x-value is less than the mean.
  • A z-score of zero means that your x-value is equal to the mean.

Converting a normal distribution into the standard normal distribution allows you to:

  • Compare scores on different distributions with different means and standard deviations.
  • Normalise scores for statistical decision-making (e.g., grading on a curve).
  • Find the probability of observations in a distribution falling above or below a given value.
  • Find the probability that a sample mean significantly differs from a known population mean.

How to calculate a z-score

To standardise a value from a normal distribution, convert the individual value into a z-score:

  1. Subtract the mean from your individual value.
  2. Divide the difference by the standard deviation.
Z-score formulaExplanation
The Standard Normal Distribution | Calculator, Examples & Uses (3)
  • x = individual value
  • μ = mean
  • σ = standard deviation
You collect SAT scores from students in a new test preparation course. The data follows a normal distribution with a mean score (M) of 1150 and a standard deviation (SD) of 150. You want to find the probability that SAT scores in your sample exceed 1380.

To standardise your data, you first find the z-score for 1380. The z-score tells you how many standard deviations away 1380 is from the mean.

Step 1: Subtract the mean from the x value.x = 1380

M = 1150

xM = 1380 − 1150 = 230

Step 2: Divide the difference by the standard deviation.SD = 150

z = 230 ÷ 150 = 1.53

The z-score for a value of 1380 is 1.53. That means 1380 is 1.53 standard deviations from the mean of your distribution.

Next, we can find the probability of this score using a z-table.

Use the standard normal distribution to find probability

The standard normal distribution is a probability distribution, so the area under the curve between two points tells you the probability of variables taking on a range of values. The total area under the curve is 1 or 100%.

Every z-score has an associated p-value that tells you the probability of all values below or above that z-score occuring. This is the area under the curve left or right of that z-score.

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Z-tests and p-values

The z-score is the test statistic used in a z-test. The z-test is used to compare the means of two groups, or to compare the mean of a group to a set value. Its null hypothesis typically assumes no difference between groups.

The area under the curve to the right of a z-score is the p-value, and it’s the likelihood of your observation occurring if the null hypothesis is true.

Usually, a p-value of 0.05 or less means that your results are unlikely to have arisen by chance; it indicates a statistically significant effect.

By converting a value in a normal distribution into a z-score, you can easily find the p-value for a z-test.

How to use a z-table

Once you have a z-score, you can look up the corresponding probability in a z-table.

In a z-table, the area under the curve is reported for every z-value between -4 and 4 at intervals of 0.01.

There are a few different formats for the z-table. Here, we use a portion of the cumulative table. This table tells you the total area under the curve up to a given z-score – this area is equal to the probability of values below that z-score occurring.

The first column of a z-table contains the z-score up to the first decimal place. The top row of the table gives the second decimal place.

To find the corresponding area under the curve (probability) for a z-score:

  1. Go down to the row with the first two digits of your z-score.
  2. Go across to the column with the same third digit as your z-score.
  3. Find the value at the intersection of the row and column from the previous steps.

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We’ve calculated that a SAT score of 1380 has a z-score of 1.53. Using the full z-table, we find that for a z-score of 1.53, the p-value is 0.937.

This is the probability of SAT scores being 1380 or less (93.7%), and it’s the area under the curve left of the shaded area.

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To find the shaded area, you take away 0.937 from 1, which is the total area under the curve.

Probability of x > 1380 = 1 − 0.937 = 0.063

That means it’s likely that only 6.3% of SAT scores in your sample exceed 1380.

Step-by-step example of using the z-distribution

Let’s walk through an invented research example to better understand how the standard normal distribution works.

As a sleep researcher, you’re curious about how sleep habits changed during COVID-19 lockdowns. You collect sleep duration data from a sample during a full lockdown.

Before the lockdown, the population mean was 6.5 hours of sleep. The lockdown sample mean is 7.62.

To assess whether your sample mean significantly differs from the pre-lockdown population mean, you perform a z-test:

  1. First, you calculate a z-score for the sample mean value.
  2. Then, you find the p-value for your z-score using a z-table.

Step 1: Calculate a z-score

To compare sleep duration during and before the lockdown, you convert your lockdown sample mean into a z-score using the pre-lockdown population mean and standard deviation.

FormulaExplanationCalculation
The Standard Normal Distribution | Calculator, Examples & Uses (7)x = sample mean

μ = population mean

σ = population standard deviation

The Standard Normal Distribution | Calculator, Examples & Uses (8)

The Standard Normal Distribution | Calculator, Examples & Uses (9)

The Standard Normal Distribution | Calculator, Examples & Uses (10)

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A z-score of 2.24 means that your sample mean is 2.24 standard deviations greater than the population mean.

Step 2: Find the p-value

To find the probability of your sample mean z-score of 2.24 or less occurring, you use the z-table to find the value at the intersection of row 2.2 and column +0.04.

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The table tells you that the area under the curve up to or below your z-score is 0.9874. This means that your sample’s mean sleep duration is higher than about 98.74% of the population’s mean sleep duration pre-lockdown.

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To find the p-value to assess whether the sample differs from the population, you calculate the area under the curve above or to the right of your z-score. Since the total area under the curve is 1, you subtract the area under the curve below your z-score from 1.

A p-value of less than 0.05 or 5% means that the sample significantly differs from the population.

Probability of z > 2.24 = 1 − 0.9874 = 0.0126 or 1.26%

With a p-value of less than 0.05, you can conclude that average sleep duration in the COVID-19 lockdown was significantly higher than the pre-lockdown average.

Frequently asked questions about the standard normal distribution

What is the difference between the t-distribution and the standard normal distribution?

The t-distribution gives more probability to observations in the tails of the distribution than the standard normal distribution (a.k.a. the z-distribution).

In this way, the t-distribution is more conservative than the standard normal distribution: to reach the same level of confidence or statistical significance, you will need to include a wider range of the data.

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Pritha Bhandari

Pritha has an academic background in English, psychology and cognitive neuroscience. As an interdisciplinary researcher, she enjoys writing articles explaining tricky research concepts for students and academics.

The Standard Normal Distribution | Calculator, Examples & Uses (2024)

FAQs

What is an example of a standard normal distribution? ›

In a normal distribution, half the data will be above the mean and half will be below the mean. Examples of normal distributions include standardized test scores, people's heights, IQ scores, incomes, and shoe size.

How is the normal distribution curve used in probability problems? ›

Since the normal distribution is a continuous distribution, the probability that X is greater than or less than a particular value can be found. A normal curve table gives the precise percentage of scores between the mean (Z-score = 0) and any other Z score.

What is the formula for calculating the normal distribution? ›

What is the normal distribution formula? For a random variable x, with mean “μ” and standard deviation “σ”, the normal distribution formula is given by: f(x) = (1/√(2πσ2)) (e[-(x-μ)^2]/^2).

What is the formula for converting to the standard normal distribution? ›

Any point (x) from a normal distribution can be converted to the standard normal distribution (z) with the formula z = (x-mean) / standard deviation. z for any particular x value shows how many standard deviations x is away from the mean for all x values.

How to solve a normal distribution problem? ›

Step 1: Subtract the mean from the x value. Step 2: Divide the difference by the standard deviation. The z score for a value of 1380 is 1.53. That means 1380 is 1.53 standard deviations from the mean of your distribution.

What is the rule for the normal distribution? ›

The empirical rule, or the 68-95-99.7 rule, tells you where most of your values lie in a normal distribution: Around 68% of values are within 1 standard deviation from the mean. Around 95% of values are within 2 standard deviations from the mean. Around 99.7% of values are within 3 standard deviations from the mean.

How to find probability using standard normal distribution? ›

The probability of P(a < Z < b) is calculated as follows. Then express these as their respective probabilities under the standard normal distribution curve: P(Z < b) – P(Z < a) = Φ(b) – Φ(a). Therefore, P(a < Z < b) = Φ(b) – Φ(a), where a and b are positive.

What is the formula for calculating distribution? ›

Probability Distribution of a Normal Distribution

The probability distribution formulas are given below: Probability Distribution Function: F(x) = P=(Z≤x−μσ)=Φ(x−μσ) Probability Density Function: f(x) = 1σ√2Πe−(x−μ)22σ2.

When to use normal distribution? ›

Making inferences about populations. If you have a sample of data from a population that is normally distributed, you can use the normal distribution to make inferences about the population as a whole. For example, you could use the normal distribution to estimate the mean or standard deviation of the population.

How to find standard normal distribution on TI-84? ›

The Normal Probability Distribution menu for the TI-84+ is found under DISTR (2nd VARS). NOTE: A mean of zero and a standard deviation of one are considered to be the default values for a normal distribution on the calculator, if you choose not to set these values.

How to use normalcdf on TI-84 Plus CE? ›

Normal CDF

In the Distributions menu, scroll down to “normalcdf(“ and press Н. The command syntax is “normalcdf(lower value, upper value, mean, standard deviation)”. For example, if my lower value is 40, upper is 60, mean of 50 and standard deviation of 5, then “normalcdf(40,60,50,5)”. Press Н.

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