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Published bySpencer Nicholson Modified over 9 years ago
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How big? Significant Digits How small? How accurate?
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Scientific notation Scientific notation is used to when dealing with very small or very large numbers. Complete the chart below 9.07 x 10 – 2 0.0907 5.06 x 10 – 4 0.000506 2.3 x 10 12 2 300 000 000 000 1.27 x 10 2 127 Scientific notationDecimal notation
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Rounding Ends in a number greater than 5: round up Ends in a number less than 5: unchanged Ends in 5: look at preceding number, if odd: increase, if even: no change
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What time is it? Someone might say “1:30” or “1:28” or “1:27:55” Each is appropriate for a different situation In science we describe a value as having a certain number of “significant digits” The # of significant digits in a value includes all digits that are certain and one that is uncertain “1:30” likely has 2, 1:28 has 3, 1:27:55 has 5 There are rules that dictate the # of significant digits in a value
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Rules for Significant Digits 1. Numbers All digits from 1 to 9 (nonzero digits) are significant. 5.87 = 3 significant digits 8981 = 4 significant digits
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Zeroes 2. All zeros which are between non-zero digits are always significant. Ex. 901 (3), 321.09 (5), 1011(4) 3. Zeroes to the left are NOT significant, and serve only to locate the decimal point. Ex. 0.0987(3), 0.00001(1) 4.Zeros to the right MAY be significant, if it is also to the right of the decimal place. To be significant, the zero must follow a non-zero number. Ex. 23400 (no, 3), 0.0670 (yes,3)
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Answers to question A) 1. 2.83 2. 36.77 3. 14.0 4. 0.0033 5. 0.02 6. 0.2410 7. 2.350 x 10 – 2 8. 1.00009 9. 3 10. 0.0056040 3 4 3 2 1 4 6 infinite 5
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Significant Digits Tips It is better to represent 100 as 1.00 x 10 2 Alternatively you can underline the position of the last significant digit. E.g. 100. This is especially useful when doing a long calculation or for recording experimental results Don’t round your answer until the last step in a calculation.
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Adding with Significant Digits Adding a value that is much smaller than the last sig. digit of another value is irrelevant When adding or subtracting, the # of sig. digits is determined by the sig. digit furthest to the left when #s are aligned according to their decimal. E.g. a) 13.64 + 0.075 + 67 b) 267.8 – 9.36 13.64 0.075 67. 80.71581 267.8 9.36 258.44 – + +
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B) Answers 4.0283.14 i) 83.25 0.1075 – 4.02 0.001+ ii) 1.82 0.2983 1.52+ iii)
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Multiplication and Division Use the same number of significant digits as the value with the fewest number of significant digits. E.g. a) 608.3 x 3.45 b) 4.8 392 a) 3.45 has 3 sig. digits, so the answer will as well 608.3 x 3.45 = 2098.635 = 2.10 x 10 3 b) 4.8 has 2 sig. digits, so the answer will as well 4.8 392 = 0.012245 = 0.012 or 1.2 x 10 – 2 Try question C and D on the handout (recall: for long questions, don’t round until the end)
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C), D) Answers i) 7.255 81.334 = 0.08920 ii) 1.142 x 0.002 = 0.002 iii) 31.22 x 9.8 = 3.1 x 10 2 (or 310) i) 6.12 x 3.734 + 16.1 2.3 22.85208 + 7.0 = 29.9 ii) 0.0030 + 0.02 = 0.02 135700 =1.36 x10 5 1700 134000+ iii) iv) 33.4 112.7+ 0.032+ 146.132 6.487 = 22.5268 = 22.53 Note: 146.1 6.487 = 22.522 = 22.52
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Unit conversions Sometimes it is more convenient to express a value in different units. When units change, basically the number of significant digits does not. E.g. 1.23 m = 123 cm = 1230 mm = 0.00123 km Notice that these all have 3 significant digits This should make sense mathematically since you are multiplying or dividing by a term that has an infinite number of significant digits E.g. 123 cm x 10 mm / cm = 1230 mm Try question E on the handout
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