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Rules for Use of Significant Figures

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1 Rules for Use of Significant Figures

2 If you calculate the area of a parcel of land 94
If you calculate the area of a parcel of land m long and 63 m wide, your calculator tells you the area is 5, m2.

3 But, if you’re certain of one length only to the closest meter (63), how can you be certain of the area to the hundredth of a square meter (5,955.39)?

4 Likewise, if we add three measured values of length:. 24. 3 cm. 1
Likewise, if we add three measured values of length: cm cm cm we can’t know the total length, with certainty, to any precision greater than the whole cm.

5 Obviously, we have to use care in calculating with measured values.

6 Significant figures relate to measurements and include all certain digits plus one and only one uncertain digit (the estimated digit).

7 Defined numbers and counting numbers are not measurements and contain an unlimited number of significant figures(they are exact numbers).  Examples:  Number of pounds in a ton equals exactly 2000 Number of cards in a deck equals exactly 52

8 Counting Significant Figures

9 The digits 1, 2, 3, 4, 5, 6, 7, 8, and 9 are always significant.

10 27,356 (5 significant figures) 49. 2 (3 significant figures) 81
27,356 (5 significant figures) (3 significant figures) (6 significant figures)

11 Zeros are not significant at the end of a whole number which does not have a decimal point (they are place-holders).   Examples:  (2 significant  figures)     2000 (1 significant figure)

12 Zeros are not significant at the beginning of a deci-number which does not have a whole number (they are place-holders).    Examples:  (2 sig fig)    (1 sig fig)

13 All other zeros are significant. Examples:. 3400. (4 sig figs). 200
All other zeros are significant.    Examples:    (4 sig figs)    (4 sig figs)    (5 sig figs)    (6 sig figs)

14 Special case - when some zeros are significant and some are not, use a line to  show which ones are.    Examples:  (3 sig fig)    (2 sig fig)

15 Or, even better, use scientific notation to show which zeros are significant. The “M” part of the number is always written using significant figures (to 3 sig figs) is x 103

16 Significant Figures in Calculated Answers The precision of a calculated answer is limited by the least precise measurement used in the calculation.

17 Addition & Subtraction

18 Find the last precise value in each quantity to be added or subtracted (the colored numbers below) mm mm   mm mm = mm

19 The ones place is the last digit in the least precise measurement
  = 7154 Therefore, the ones place is the last digit in the answer.

20 In a subtraction problem such as:. 597. 0 m. - 56. 742 m. 540
In a subtraction problem such as: m m m = m the tenths place is the last place to have a digit in the answer.

21 Multiplication & Division

22 Determine how many significant figures there are in each number to be multiplied or divided.

23 Determine which of these has the least number of significant figures.

24 This is the number of significant digits to keep in the final answer.

25 Multiplication 3020. 1 m (5 significant figures) x 2
Multiplication  m  (5 significant figures)    x      2.0 m   (2 sig fig) m2  = 6000 m2 (= 6.0 x 103 m2) 2 is the least number of significant figures.  So, keep 2 sig figs in the final answer.  The line indicates that the first zero is significant, and the last two are place holders.

26 Division cm (4 significant figures) (3 significant figures) = 253 cm (3 sig figs) is the least number of significant figures.  So, keep 3 sig fig in the final answer.

27 Rules for Rounding:

28 If the digit immediately to the right of the last significant figure you want to retain is greater than 5, increase the last digit by 1.

29 497.356 (to 4 significant figures) is 497.4

30 If the digit immediately to the right of the last significant figure you want to retain is less than 5, do not change the last digit.

31 8442.63 (to 3 significant figures) is 8440 The 0 is a place holder and is not a significant digit.

32


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