Z Critical Value Calculator (2024)

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Enter a probability value between zero and one to calculate critical value. Critical values determine what probability a particular variable will have when a sampling distribution is normal or close to normal.

Formula:

Probability (p): p = 1 - α/2.

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Critical Value: Definition and Significance in the Real World

- Guide Authored by Corin B. Arenas, published on October 4, 2019

Ever wondered if election surveys are accurate? How about statistics on housing, health care, and testing scores?

In this section, we’ll discuss how sample data is tested for accuracy. Read on to learn more about critical value, how it’s used in statistics, and its significance in social science research.

What is a Critical Value?

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In testing statistics, a critical value is a factor thatdetermines the margin of error in a distribution graph.

According to StatisticsHow To, a site headed by math educator Stephanie Glen, if the absolute valueof a test statistic is greater than the critical value, then there isstatistical significance that rejects an accepted hypothesis.

Critical values divide a distribution graph into sections which indicate ‘rejection regions.’ Basically, if a test value falls within a rejection region, it means an accepted hypothesis (referred to as a null hypothesis) must be rejected. And if the test value falls within the accepted range, the null hypothesis cannot be rejected.

Testing sample data involves validating research and surveys like voting habits, SAT scores, body fat percentage, blood pressure, and all sorts of population data.

Hypothesis Testing and the Distribution Curve

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Hypothesis tests check if your data was taken from a sample population that adheres to a hypothesized probability distribution. It is characterized by a null hypothesis and an alternative hypothesis.

In hypothesis testing, a critical value is a point on adistribution graph that is analyzed alongside a test statistic to confirm if a nullhypothesis—a commonly accepted fact in a study which researchers aim todisprove—should be rejected.

The value of a null hypothesis implies that no statisticalsignificance exists in a set of given observations. It is assumed to be trueunless statistical evidence from an alternative hypothesis invalidatesit.

How does this relate with distribution graphs? Anormal distribution curve, which is a bell-shaped curve, is a theoreticalrepresentation of how often an experiment will yield a particular result.

Elements of Normal Distribution:

  • Has a mean, median, or mode. A mean is the average of numbers in a group, a median is the middle number in a list of numbers, and a mode is a number that appears most often in a set of numbers.
  • 50% of the values are less than the mean
  • 50% of the values are greater than the mean

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Majority of the data points in normaldistribution are relatively similar. A perfectly normal distribution ischaracterized by its symmetry, meaning half of the data observations fall on eitherside of the middle of the graph. This implies that they occur within a rangeof values with fewer outliers on the high and low points of the graph.

Given these implications, critical values do not fall within the range of common data points. Which is why when a test statistic exceeds the critical value, a null hypothesis is forfeited.

Take note: Critical values may look for a two-tailed test or one-tailed test (right-tailed or left-tailed). Depending on the data, statisticians determine which test to perform first.

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Finding the Critical Value

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The standard equation for the probability of a criticalvalue is:

p = 1 – α/2

Where p is the probability and alpha(α) represents the significance or confidence level. This establishes howfar off a researcher will draw the line from the null hypothesis.

The alpha functions as the alternative hypothesis. Itsignifies the probability of rejecting the null hypothesis when it is true. Forinstance, if a researcher wants to establish a significance level of 0.05, itmeans there is a 5% chance of finding that a difference exists.

When the sampling distribution of a data set is normal orclose to normal, the critical value can be determined as a zscore or t score.

Z Score or T Score: Which Should You Use?

Typically, when a sample size is big (more than 40) using z or t statistics is fine. However, while both methods compute similar results, most beginner’s textbooks on statistics use the z score.

When a sample size is small and the standard deviation of a population is unknown, the t score is used. The t score is a probability distribution that allows statisticians to perform analyses on specific data sets using normal distribution. But take note: Small samples from populations that are not approximately normal should not use the t score.

What’s a standard deviation? This measures how numbers are spread out in a set of values, showing the amount of variation. Low standard deviation means the numbers are close to the mean set, while a high standard deviation signifies numbers are dispersed at a wider range.

Calculating Z Score

The critical value of a z score can be used to determine the margin of error, as shown in the equations below:

  • Margin of error = Critical value x Standarddeviation of the statistic
  • Margin of error = Critical value x Standarderror of the statistic

The z score, also known as the standard normal probability score, signifies how many standard deviations a statistical element is from the mean. A z score table is used in hypothesis testing to check proportions and the difference between two means. Z tables indicate what percentage of the statistics is under the curve at any given point.

cumulative probt .50t .75t .80t .85t .90t .95 t.975 t .98t .99t .995t . 9975t .999 t .9995
α 1-tail.5.25 .20 .15 .10 .05 .025 .02 .01 .005 .0025 .001 .0005
α 2-tail1.50.40.30.20.10.050.04.02.010.0050.002.0010
df
z0.00 0.674 0.841 1.036 1.282 1.645 1.9602.054 2.3262.576 2.807 3.0913.291
1 0.001.000 1.376 1.963 3.078 6.314 12.71 15.89 31.82 63.66 127.3 318.3 636.6
2 0.000.816 1.061 1.386 1.8862.920 4.3034.8496.965 9.925 14.09 22.33 31.60
3 0.000.765 0.978 1.250 1.638 2.353 3.182 3.482 4.541 5.841 7.453 10.21 12.92
4 0.000.741 0.941 1.190 1.533 2.132 2.776 2.999 3.747 4.604 5.598 7.173 8.610
50.00 0.727 0.920 1.156 1.476 2.015 2.571 2.7573.3654.032 4.773 5.893 6.869
60.000.7180.9061.1341.4401.9432.4472.6123.1433.7074.3175.2085.959
7 0.000.711 0.896 1.119 1.415 1.895 2.365 2.517 2.998 3.499 4.029 4.785 5.408
8 0.000.706 0.889 1.108 1.397 1.8602.306 2.4492.896 3.3553.833 4.501 5.041
9 0.000.703 0.883 1.1001.383 1.8332.262 2.398 2.821 3.250 3.690 4.297 4.781
10 0.000.700 0.879 1.093 1.372 1.812 2.228 2.359 2.764 3.169 3.581 4.144 4.587
110.00 0.697 0.876 1.088 1.363 1.796 2.201 2.328 2.7183.106 3.497 4.025 4.437
120.00 0.695 0.8731.083 1.356 1.782 2.179 2.303 2.681 3.055 3.428 3.930 4.318
13 0.000.694 0.870 1.079 1.3501.7712.160 2.2822.650 3.0123.3723.852 4.221
14 0.000.692 0.868 1.0761.3451.761 2.1452.264 2.6242.977 3.326 3.787 4.140
15 0.000.691 0.866 1.0741.341 1.753 2.131 2.249 2.602 2.947 3.2863.733 4.073
16 0.000.690 0.865 1.071 1.337 1.746 2.120 2.235 2.5832.921 3.252 3.686 4.015
17 0.000.689 0.863 1.069 1.333 1.740 2.1102.224 2.5672.898 3.222 3.646 3.965
18 0.000.688 0.862 1.067 1.330 1.734 2.101 2.214 2.552 2.878 3.197 3.6113.922
19 0.000.688 0.861 1.066 1.328 1.729 2.0932.205 2.539 2.861 3.174 3.579 3.883
20 0.000.687 0.860 1.064 1.325 1.725 2.086 2.1972.528 2.845 3.153 3.552 3.850
21 0.000.686 0.8591.063 1.3231.721 2.080 2.189 2.518 2.831 3.135 3.5273.819
22 0.000.686 0.858 1.061 1.321 1.717 2.074 2.183 2.508 2.819 3.119 3.505 3.792
23 0.000.685 0.858 1.060 1.319 1.714 2.069 2.177 2.500 2.807 3.104 3.485 3.768
240.00 0.685 0.857 1.059 1.318 1.711 2.0642.172 2.492 2.797 3.091 3.467 3.745
250.00 0.684 0.856 1.0581.316 1.7082.060 2.167 2.485 2.7873.0783.450 3.725
260.00 0.684 0.8561.0581.315 1.706 2.056 2.1622.479 2.779 3.067 3.435 3.707
270.00 0.684 0.855 1.057 1.3141.703 2.0522.158 2.4732.7713.0573.4213.690
280.00 0.683 0.855 1.056 1.313 1.701 2.048 2.154 2.467 2.7633.0473.408 3.674
29 0.000.683 0.854 1.055 1.311 1.699 2.045 2.150 2.462 2.756 3.038 3.396 3.659
300.00 0.683 0.854 1.0551.310 1.697 2.042 2.1472.457 2.750 3.030 3.385 3.646
400.00 0.681 0.851 1.050 1.303 1.684 2.021 2.123 2.423 2.704 2.971 3.307 3.551
500.00 0.679 0.849 1.047 1.2991.676 2.009 2.109 2.403 2.678 2.937 3.2613.496
600.000.6790.848 1.045 1.2961.6712.0002.099 2.390 2.660 2.915 3.232 3.460
800.00 0.678 0.846 1.043 1.292 1.664 1.990 2.088 2.374 2.639 2.887 3.195 3.416
1000.00 0.677 0.845 1.042 1.290 1.660 1.9842.081 2.3642.626 2.8713.1743.390
10000.00 0.675 0.842 1.037 1.282 1.646 1.962 2.056 2.3302.581 2.813 3.0983.300
0%50% 60% 70% 80% 90%95% 96% 98% 99% 99.5%99.8% 99.9%

The basic formula for a z score sample is:

z = (X – μ) / σ

Where,

  • X is the value of the element
  • μ is the population mean
  • σ is the standard deviation

Let’s solve an example. For instance, let’s say you have a test score of 85. If the test has a mean (μ) of 45 and a standard deviation (σ) of 23, what’s your z score?
X = 85, μ = 45, σ = 23

z = (85 – 45) / 23
= 40 / 23
z = 1.7391

For this example, your score is 1.7391 standard deviations above the mean.

What do the z scores imply?

  • If a score is greater than 0, the statistic sample is greater than the mean
  • If the score is less than 0, the statistic sample is less than the mean
  • If a score is equal to 1, it means the sample is 1 standard deviation greater than the mean, and so on
  • If a score is equal to -1, it means the sample is 1 standard deviation less than the mean, and so on

For elements in a large set:

  • Around 68% fall between -1 and 1
  • Around 95% fall between -2 and 2
  • Around 99% fall between -3 and 3

To give you an idea, here’s how spread out statistical elements would look like under a z score graph:

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Calculating T Score

On the other hand, here’s the standard formula for the t score:

t = [ x – μ ] / [ s / sqrt( n ) ]

Where,

  • x is the sample mean
  • μ is the population mean
  • s is the sample’s standard deviation
  • n is the sample size

Then, we account for the degrees of freedom (df) which is the sample size minus 1. df = n – 1

T distribution, also known as the student’s distribution, is associated with a unique cumulative probability. This signifies the chance of finding a sample mean that’s less than or equal to x, based on a random sample size n. Cumulative probability refers to the likelihood that a random variable would fall within a specific range. To express the t statistic with a cumulative probability of 1 – α, statisticians use tα.

Part of finding the t score is locating the degrees of freedom (df) using the t distribution table as a reference. For demonstration purposes, let’s say you have a small sample of 5 and you want to conduct a right-tailed test. Follow the steps below.

5 df, α = 0.05

  1. Take your sample size and subtract 1. 5 – 1 = 4. df = 4
  2. For this example, let’s say the alpha level is 5% (0.05).
  3. Look for the df in the t distribution table along with its corresponding alpha level. You’ll find the critical value where the column and row intersect.
df α = 0.1 0.05 0.025 0.01 0.005
ta= 1.2816 1.6449 1.96 2.3263 2.5758
1 3.078 6.314 12.706 31.821 63.656
2 1.886 2.920 4.303 6.965 9.925
3 1.638 2.353 3.182 4.541 5.841
4 1.533 2.132 2.776 3.747 4.604
5 1.476 2.015 2.571 3.365 4.032

*One-tail t distribution table referenced from How to Statistics.
In this example, 5 df, α = 0.05, the critical value is 2.132.

Here’s another example using the t score formula.

A factory produces CFL light bulbs. The owner says that CFL bulbs from their factory lasts for 160 days. Quality specialists randomly chose 20 bulbs for testing, which lasted for an average of 150 days, with a standard deviation of 40 days. If the CFL bulbs really last for 160 days, what is the probability that 20 random CFL bulbs would have an average life that’s less than 150 days?

t = [ x – μ ] / [ s / sqrt( n ) ]

  • x = 150
  • μ = 160
  • s = 40
  • n = 20

t = [ 150 – 160 ] / [ 40 / sqrt( 20 ) ]
= -10 / [40 / 4.472135]
= -10 / 8.94427
t = -1.118034

The degrees of freedom: df = 20 – 1, df = 19

Again, use the variables above to refer to a t distribution table, or use a t score calculator.

For this example, the critical value is 0.1387. Thus, if the life of a CFL light bulb is 160 days, there is a 13.87% probability that the average CFL bulb for 20 randomly chosen bulbs would be less than or equal to 150 days.

If we were to plot the critical value and shade the rejection region in a graph, it would look like this:

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If a test statistic is greater than this critical value, then the null hypothesis, which is ‘CFL light bulbs have a life of 160 days,’ should be rejected. That’s if tests show more than 13.87% of the sample light bulbs (20) have a lifespan of less than or equal 150 days.

Why is Determining Critical Value Important?

Researchers often work with a sample population, which is asmall percentage when they gather statistics.

Working with sample populations does not guarantee that it reflects the actual population’s results. To test if the data is representative of the actual population, researchers conduct hypothesis testing which make use of critical values.

What are Real-World Uses for It?

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Validating statistical knowledge is important in the studyof a wide range of fields. This includes research in social sciences such aseconomics, psychology, sociology, political science, and anthropology.

For one, it keeps qualitymanagement in check. This includes product testing in companies and analyzingtest scores in educational institutions.

Moreover, hypothesis testing is crucial for the scientific and medical community because it is imperative for the advancement of theories and ideas.

If you’ve come across research that studies behavior, then the study likely used hypothesis testing and sampling in populations. From the public’s voting behavior, to what type of houses people tend to buy, researchers conduct distribution tests.

Studies such as how male adolescents in certain states are prone to violence, or how children of obese parents are prone to becoming obese, are other examples that use critical values in distribution testing.

In the field of health care, topics like how often diseases like measles, diphtheria, or polio occur in an area is relevant for public safety. Testing would help communities know if there are certain health conditions rising at an alarming rate. This is especially relevant now in the age of anti-vaccine activists.

The Bottom Line

Finding critical values are important for testing statistical data. It’s one of the main factors in hypothesis testing, which can validate or disprove commonly accepted information.

Proper analysis and testing of statistics help guide thepublic, which corrects misleading or dated information.

Hypothesis testing is useful in a wide range of disciplines, such as medicine, sociology, political science, and quality management in companies.

About the Author

Corin is an ardent researcher and writer of financial topics—studying economic trends, how they affect populations, as well as how to help consumers make wiser financial decisions. Her other feature articles can be read on Inquirer.net and Manileno.com. She holds a Master’s degree in Creative Writing from the University of the Philippines, one of the top academic institutions in the world, and a Bachelor’s in Communication Arts from Miriam College.

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FAQs

What is the z-score for 95% critical value? ›

The critical z-score values when using a 95 percent confidence level are -1.96 and +1.96 standard deviations. The uncorrected p-value associated with a 95 percent confidence level is 0.05.

What is the Z critical for 92? ›

The Z-score for a 92% confidence interval is approximately 1.75.

What is the difference between z-score and Z critical value? ›

The Z-score and Z critical value are essential statistical measures that play distinct roles in data analysis. The Z-score measures the distance of a data point from the mean in terms of standard deviations, while the Z critical value sets threshold values used for hypothesis testing.

What is the Z critical value of 91%? ›

Therefore the critical value for z α / 2 that corresponds to 91% confidence level is 1.6954.

How to determine critical value? ›

Determine the critical value by finding the value of the known distribution of the test statistic such that the probability of making a Type I error — which is denoted (greek letter "alpha") and is called the "significance level of the test" — is small (typically 0.01, 0.05, or 0.10).

What is the z-score for 99.8 confidence interval? ›

The Z-score for a 99.8% interval is approximately 3.09

Find the (1 + 0.998) / 2 = 0.999 value in the table below to find the Z-score for a 99.8% CI. Table 4: Look up the 0.999 value in the table. It's the intersection of 3.0 and 0.08 or 0.09, and 3.1 and 0.00.

What is the Z critical value for an 80% confidence level? ›

We see that in the z table, a probability of 0.9 lies between 1.28 and 1.29. Thus, the value of the critical value is approximately 1.285. Hence, the critical value of a z score for 80% confidence interval is 1.285.

What is the Z critical for 90 percent? ›

Hence, the critical z score for a 90% confidence interval is 1.645.

What is the z star for 95 confidence interval? ›

The value of z* for a confidence level of 95% is 1.96. After putting the value of z*, the population standard deviation, and the sample size into the equation, a margin of error of 3.92 is found. The formulas for the confidence interval and margin of error can be combined into one formula.

How do you find the critical point of Z? ›

To find the critical points of a two-variable function f(x, y), set ∂f / ∂x = 0 and ∂f / ∂y = 0 and solve the system of equations. To find the critical points of a three-variable function f(x, y, z), set ∂f / ∂x = 0, ∂f / ∂y = 0, and ∂f / ∂z = 0 and solve the resultant system of equations.

How do you calculate the Z value? ›

To calculate the standard error of the mean, you can use the following formula:Z = (x - μ) / (σ / √n)Where: x is the data point you choose. μ is the mean. σ is the standard deviation.

What is the critical value of the Z test? ›

Normal Distribution

For a one-tailed test, the critical value is 1.645 . So the critical region is Z<−1.645 for a left-tailed test and Z>1.645 for a right-tailed test. For a two-tailed test, the critical value is 1.96 . So the confidence interval is |Z|<1.96 and the critical regions are where |Z|>1.96 .

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