Error Calculations Percent Error
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Concepts Section Tests Pre-test Post-test Useful Materials Glossary Online Calculators Redox Calculator Kinetics Arrhenius Calculator Thermodynamics Calculator Nuclear Decay Calculator Linear Least Squares Regression Newton's Method Equation Solver Compressibility Calculator Units Conversion Calculator percent error formula Nomenclature Calculator Related Information Links Texas Instruments Calculators Casio Calculators Sharp Calculators percent error equation Hewlett Packard Calculators Credits Credits Contact Webmaster Simple Statistics There are a wide variety of useful statistical tools
Percent Difference
that you will encounter in your chemical studies, and we wish to introduce some of them to you here. Many of the more advanced calculators have excellent statistical capabilities built into
Percent Error Calculations Worksheet
them, but the statistics we'll do here requires only basic calculator competence and capabilities. Arithmetic Mean, Error, Percent Error, and Percent Deviation Standard Deviation Arithmetic Mean, Error, Percent Error, and Percent Deviation The statistical tools you'll either love or hate! These are the calculations that most chemistry professors use to determine your grade in lab experiments, specifically percent error. Of all of percent error calculations are used to determine the terms below, you are probably most familiar with "arithmetic mean", otherwise known as an "average". Mean -- add all of the values and divide by the total number of data points Error -- subtract the theoretical value (usually the number the professor has as the target value) from your experimental data point. Percent error -- take the absolute value of the error divided by the theoretical value, then multiply by 100. Deviation -- subtract the mean from the experimental data point Percent deviation -- divide the deviation by the mean, then multiply by 100: Arithmetic mean = ∑ data pointsnumber of data points (n) Error = Experimental value - "true" or theoretical value Percent Error = Error Theoretical value ∗100 Deviation = Experimental value - arithmetic mean Percent Deviation = DeviationTheoretical value ∗100 A sample problem should make this all clear: in the lab, the boiling point of a liquid, which has a theoretical value of 54.0° C, was measured by a student four (4) times. Determine, for each measurement, the error, percent error, deviation, and percent deviation. Obs
of Accuracy Accuracy depends on the instrument you are measuring with. But as a general rule: The degree of accuracy is half a unit each side of the unit of measure Examples: When your instrument measures in "1"s then any value between 6½ and 7½
Percent Error Calculations Chemistry
is measured as "7" When your instrument measures in "2"s then any value between 7 and how do you do percent error calculations in chemistry 9 is measured as "8" Plus or Minus We can show the error using the "Plus or Minus" sign: ± When the value could percent yield calculations be between 6½ and 7½ 7 ±0.5 The error is ±0.5 When the value could be between 7 and 9 8 ±1 The error is ±1 Example: a fence is measured as 12.5 meters long, accurate to 0.1 of a https://www.shodor.org/unchem-old/math/stats/index.html meter Accurate to 0.1 m means it could be up to 0.05 m either way: Length = 12.5 ±0.05 m So it could really be anywhere between 12.45 m and 12.55 m long. Absolute, Relative and Percentage Error The Absolute Error is the difference between the actual and measured value But ... when measuring we don't know the actual value! So we use the maximum possible error. In the example above the Absolute Error is 0.05 m What happened to the http://www.mathsisfun.com/measure/error-measurement.html ± ... ? Well, we just want the size (the absolute value) of the difference. The Relative Error is the Absolute Error divided by the actual measurement. We don't know the actual measurement, so the best we can do is use the measured value: Relative Error = Absolute Error Measured Value The Percentage Error is the Relative Error shown as a percentage (see Percentage Error). Let us see them in an example: Example: fence (continued) Length = 12.5 ±0.05 m So: Absolute Error = 0.05 m And: Relative Error = 0.05 m = 0.004 12.5 m And: Percentage Error = 0.4% More examples: Example: The thermometer measures to the nearest 2 degrees. The temperature was measured as 38° C The temperature could be up to 1° either side of 38° (i.e. between 37° and 39°) Temperature = 38 ±1° So: Absolute Error = 1° And: Relative Error = 1° = 0.0263... 38° And: Percentage Error = 2.63...% Example: You measure the plant to be 80 cm high (to the nearest cm) This means you could be up to 0.5 cm wrong (the plant could be between 79.5 and 80.5 cm high) Height = 80 ±0.5 cm So: Absolute Error = 0.5 cm And: Relative Error = 0.5 cm = 0.00625 80 cm And: Percentage Error = 0.625% Area When working out areas you need to think about both the width and length ...
| Scientific Calculator | Statistics Calculator In the real world, the data measured or used is normally different from the true value. The error comes from the measurement inaccuracy or the approximation used percent error instead of the real data, for example use 3.14 instead of π. Normally people use absolute error, relative error, and percent error to represent such discrepancy: absolute error = |Vtrue - Vused| relative error = |(Vtrue percent error calculations - Vused)/Vtrue| (if Vtrue is not zero) percent error = |(Vtrue - Vused)/Vtrue| X 100 (if Vtrue is not zero) Where: Vtrue is the true value Vused is the value used The definitions above are based on the fact that the true values are known. In many situations, the true values are unknown. If so, people use the standard deviation to represent the error. Please check the standard deviation calculator. Math CalculatorsScientificFractionPercentageTimeTriangleVolumeNumber SequenceMore Math CalculatorsFinancial | Weight Loss | Math | Pregnancy | Other about us | sitemap © 2008 - 2016 calculator.net