accuracy and precision in the lab. precision and accuracy errors in scientific measurements...
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Accuracy and Precision in the Lab
Precision and Accuracy Errors in Scientific Measurements
Precision - Refers to reproducibility or “How close themeasurements are to each other.”
Accuracy - Refers to how close a measurement is to the real or true value.
Systematic error - produces values that are either all higher or all lower than the actual value.
Random Error - in the absence of systematic error, produces some values that are higher and some that are lower than the actual value.
Good accuracyGood precision
Poor accuracyGood precision
Good accuracyPoor precision
Poor accuracyPoor precision
Balances
0.1 mg precision
Accuracy determined by calibration
Graduated Cylinder
Correct way to read a graduated cylinder
Estimate the volume in the graduated cylinder…
Most would read between 19.1 to 19.3 mL
No one would properly read the volume as high as 19.5 mL or as low as 19.0 mL. No one could reasonably read the volume to the 1/100s digit.
Graduated Cylinder
Incorrect way to read a graduated cylinder
Burette
Spectronic-20
Estimate the reading on the upper scale…
Most would read between 35.4 to 35.6 %T
No one would properly read the scale as high as 36.0 or as low as 35 %T.
The Number of Significant Figures in aMeasurement Depends Upon the
Measuring Device
A linearly calibrated instrument can usually be read to 1 digit more precision than the engraved calibration
Significant Digit Rules and Conventions
A significant figure (also called a significant digit) in a measurement is one which is known to some level of precision. The rules presented here are simplifications of a more complete statistical analysis and should be used to imply a certain confidence in a written numerical value. These rules are not infallible.
To avoid round-off errors when making multiple-step calculations, carry one or two extra significant figures in the intermediate calculations. Round off the answer to the appropriate number of significant figures at the very end.
Rules:All nonzero digits in a reported value are significant.
422 g has 3 significant figures (SFs)
Zeroes between nonzero digits are significant.2003 miles has 4 SFs
Trailing zeroes after the decimal point are significant.-2.10 J has 3 SFs 0.110 g has 3 SFs
Leading zeroes after the decimal point are not significant.0.00214 g has 3 SFs
Trailing zeroes in a number without a decimal point lead to ambiguity and are usually assumed not to be significant. Eliminate the ambiguity by converting to scientific notation (exponential notation).
96,500 C (3, 4, or 5 SFs) might be 9.650 x 104 C (4 SFs)
Handling Significant Figure in Calculations
Addition/Subtraction:The number of decimal digits in the final answer is the same as the minimum number of decimal digits in any measurement.
(2 decimal digits)
(1 decimal digit)
(1 decimal digit)
2.01 g
12.1 g
14.11 g
14.1 g
+
Multiplication/Division:The total number of significant figures in the final answer is equal to the minimum number of significant figures in any measurement.
Area = Length x WidthLength = 12.5 cm Width = 2.0 cm
2
2
(3 SFs)
(2 SFs)
(2 SFs)
12.5 cm
2.0 cm
25.0 cm
25 cm
X
Logarithms: The number of decimal digits in the answer is equal to the number of significant digits in the measurement.
Powers of 10 and antilog: The number of significant figures in the answer is equal to the number of decimal digits in the measurement.
Log 54 (2 SFs) = 1.73 (2 decimal digits)
10-2.53 (2 decimal digits) = 0.0030 (2 SFs)
Review• Precision refers to the reproducibility of multiple measurements• Accuracy refers to how close a measurement or average of
measurements is to the real or true value.• Errors can be systematic (unidirectional and can be eliminated)
or random (bidirectional and normal)• A linearly calibrated instrument can usually be read to 1 digit
more precision than the engraved calibration• Presenting measurements and calculated results with appropriate
significant digits is a way to display the estimated precision of the values.
• The rules of significant figure calculations are merely approximations of a much more rigorous statistical analysis and must be used carefully to avoid introducing unexpected and possibly undetected errors.
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