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ERT 207 Analytical Chemistry ERT 207 Analytical Chemistry Lecture 4 23rd July 2007 ERT 207 Analytical Chemistry Titles to be covered: • 2.3 The effect of errors towards data analysis • 2.4 Significant Figures • 2.5 Standard Deviation • 2.6 Propagation of error ERT 207 Analytical Chemistry 2.3 THE EFFECT OF ERRORS TOWARDS DATA ANALYSIS 2.3.1 WAYS OF DESCRIBING ACCURACY 2.3.2 WAYS OF DESCRIBING PRECISION ERT 207 Analytical Chemistry 2.3.1 WAYS OF DESCRIBING ACCURACY • • • • • • Recall: Accuracy is expressed as absolute error or relative error. Errors will show the closeness of measurements to the accepted or correct values. Absolute errors: E = O – A E = absolute error O = observed error A = accepted value ERT 207 Analytical Chemistry • Absolute errors is the difference between true value and measured value. • For example, if 2.62 g sample analyzed to be 2.52 g: • Therefore, the absolute error = 2.52 g -2.62 g • = -0.10 g. • The positive and negative sign is assigned to show whether the errors are high or low. ERT 207 Analytical Chemistry • If the measured value is average of several measurements, the error is called the mean error. • Q1: How to calculate mean error? • A1: By taking the average difference wrt sign, of the individual test results from the true value. ERT 207 Analytical Chemistry •Q1: What is relative error? Relative errors ERT 207 Analytical Chemistry • A1: Relative error is the absolute or mean error expressed as a percentage of the true value. ERT 207 Analytical Chemistry • • • • • • Consider the previous case, Measured value = 2.52 g True value = 2.62 g The relative error = -0.10 X 100% 2.62 = -3.8% ERT 207 Analytical Chemistry • Now, Q2: What is relative accuracy? • A2: Relative accuracy is the measured value or mean expressed as a percentage of the true value. ERT 207 Analytical Chemistry • Task: Calculate the relative accuracy of the above case. • Solution: • Relative accuracy = 2.52 X 100% • 2.62 • = 96.2 % ERT 207 Analytical Chemistry • Example (3.6 from Gary D. Christian): • The result of an analysis are 36.97 g, compared with the accepted value of 37.06 g. What is the relative error in parts per thousand? • Solution: • Absolute error = 36.97 g – 37.06 g • = -0.09 g • Relative error = -0.09 g X 100%o • 37.06 g • = -2.4 ppt • 100%o indicates parts per thousand. ERT 207 Analytical Chemistry 2.3.2 WAYS OF DESCRIBING PRECISION Recall: Precision can be expressed as standard deviation, deviation from the mean, deviation from the median, and range or relative precision. ERT 207 Analytical Chemistry Example 1: The analysis of chloride ion on samples A, B and C gives the following result Sample %Cl- Deviation from mean Deviation from median A B C 0.10 0.09 0.01 0.11 0.08 0.00 đ = 0.07 (d bar) 0.06 24.39 24.20 24.28 = 24.29 ERT 207 Analytical Chemistry • Deviation from mean • Deviation from mean is the difference between the values measured and the mean. • For example, deviation from mean for sample A= 0.10% • Q1: How to get X ? • A1: = 24.39 + 24.20 + 24.28 • 3 • = 24.29 ERT 207 Analytical Chemistry • Deviation from median • Deviation from median is the difference between the values measured and the median. • Example, deviation from the median for sample A = 0.11%. • Now, identify median = 24.28 • Therefore, deviation from median for sample A = 24.39- 24.28 = 0.11% ERT 207 Analytical Chemistry • Range is the difference between the highest and the lowest values. • For example, range = 24.39- 24.20 = 0.19 %. ERT 207 Analytical Chemistry • Sample standard deviation For N (number of measurement) < 30 ERT 207 Analytical Chemistry For N > 30 ERT 207 Analytical Chemistry 2.4 SIGNIFICANT FIGURES Q1 : What is significant figures? ERT 207 Analytical Chemistry • A1: The number of digits necessary to express the results of a measurement consistent with the measured precision. ERT 207 Analytical Chemistry • A2: Digits that are known to be certain plus one digit that is uncertain. • -The zero value is significant if it is part of the numbers. • -The zero values is not significant figure when it is used to show magnitude or to locate decimal points. • -The position of decimal points have no relation with significant figures. ERT 207 Analytical Chemistry • The number of significant figures = the number of digits necessary to express the results of a measurement consistent with the measured precision. ERT 207 Analytical Chemistry • Since there is uncertainty (imprecision) in any measurement of at least ± 1 in the last significant figure, the number of significant figures includes all of the digits that are known, plus the first uncertain one. ERT 207 Analytical Chemistry • Each digit denotes the actual quantity it specifies. For example, in the number 237, we have 2 hundreds, 3 tens, and 7 units. ERT 207 Analytical Chemistry • The digit 0 can be a significant part of a measurement, or it can be used merely to place the decimal point. • The number of significant figures in a measurement is independent of the placement of the decimal point. ERT 207 Analytical Chemistry • Take the number 92,067. This number has five significant figures, regardless of where the decimal point is placed. • For example. 92.067 μm, 9.2067 cm, 0.92067 dm and 0.092067 m all have the same number of significant figures. • They merely represent different ways (units) of expressing one measurement. ERT 207 Analytical Chemistry • The zero between the decimal point and the 9 in the last number is used only to place the decimal point. • There is no doubt whether any zero that follows a decimal point is significant or is used to place the decimal point. • In the number 727.0, the zero is not used to locate the decimal point but is a significant part of the figure. ERT 207 Analytical Chemistry • Ambiguity can arise if a zero precedes a decimal point. If it falls between two other nonzero integers, then it will be significant. Such was the case with 92,067. • In the number 936,600, it is impossible to determine whether one or both or neither of the zeros is used merely to place the decimal point or whether they are a part of the measurement. ERT 207 Analytical Chemistry • It is best in cases like this to write only the significant figures you are sure about and then to locate the decimal point by scientific notation. • Thus, 9.3660 X 10 has five significant figures, but 936,600 contains six digits, one to place the decimal. ERT 207 Analytical Chemistry • Example: • List the proper number of significant figures in the following numbers and indicate which zeros are significant. 0.216; 90.7; 800.0; 0.0670 ERT 207 Analytical Chemistry • Solution • 0.216 three significant figures • 90.7 three significant figures; zero is significant • 800.0 four significant figures; all zeros are significant • 0.0670 three significant figures; only the last zero is significant ERT 207 Analytical Chemistry Steps in Writing Significant Figures • Make sure that there is no digit after the first uncertainty figure. • For example:32.5239 uncertainty figure ERT 207 Analytical Chemistry Rounding Off • If the last digit to be removed is greater than 5, add one to the second last digit. • Example, 22.486 22.49 • If the last digit to be removed is smaller than 5, then the second last digit does not change. • Example, 31.392 31.39 ERT 207 Analytical Chemistry • If the last digit is 5 and the second last digit is an even number, thus the second last digit does not change. • Example, 73.285 73.28 • If the last digit is 5 and the second last digit is an odd number, thus add one to the last digit. • Example, 63.275 63.28 ERT 207 Analytical Chemistry Addition and Subtraction Operation • The number of digits to the right of decimal point in the operation of addition/subtraction should remain. • The answer to this operation has a value with the least decimal point. ERT 207 Analytical Chemistry • Example : Give the answer for the following operation to the maximum number of significant figures. ERT 207 Analytical Chemistry 43.7 4.941 + 13.13 61.771 61.8 • answer is therefore 61.8 based on the key number (43.7). ERT 207 Analytical Chemistry Multiplication and Division Operation • The number of significant figures in this operation should be the same as the number with the least significant figure in the data. • Example : Give the correct answer for the following operation to the maximum number of significant figures. • 1.0923 x 2.07 ERT 207 Analytical Chemistry • Solution: • 1.0923 x 2.07 = 2.261061 2.26 • The correct answer is therefore 2.26 based on the key number (2.07). ERT 207 Analytical Chemistry Exponential • The exponential can be written as follows. Example, 0.000250 2.50 x 10-4 ERT 207 Analytical Chemistry • • • • 2.5 STANDARD DEVIATION The most important statictics. Recall back: Sample standard deviation. For N (number of measurement) < 30 ERT 207 Analytical Chemistry For N > 30, ERT 207 Analytical Chemistry • Try these questions on standard deviations. ERT 207 Analytical Chemistry • Thank you ERT 207 Analytical Chemistry
