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Cup of coffee = ~ 200 ml. Add drop of H 2 O = 0.05 mL. New volume: ~200 mL or 200.05 mL??. If you say 200.05 you imply that the volume of the initial cup of coffee was exactly 200 mL and we don’t know that accurately. New volume: ~200 mL or 200.05 mL??.
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Cup of coffee = ~ 200 ml Add drop of H2O = 0.05 mL New volume: ~200 mL or 200.05 mL?? If you say 200.05 you imply that the volume of the initial cup of coffee was exactly 200 mL and we don’t know that accurately.
New volume: ~200 mL or 200.05 mL?? We convey our uncertainty in measured quantities by abiding by the rules of significant figures. Definition of Significant figures. The number of all known digits reported in measurements plus one estimated digits.
We would have to report the coffee measurement as ~200 because that is our least accurate number. A chain can never be stronger than its weakest link. An answer can never be more precise than the least precise number you use to get the answer.
Try These! 3 significant digits 1.36 3 significant digits 172 4 significant digits 3247
Try These! 1 significant digit 0.5 5 significant digits 0.0053567 4 significant digits 0.0008769
Try These! 4 significant digits 20.05 4 significant digits 1.003 6 significant digits 102001
Try These! 9.000000000 10 significant digits 85.00 4 significant digits 6 significant digits 9.98000
Try These! 250 2 significant digits 780,000,000 2 significant digits 2 significant digits 90.
Practice 46800 3 significant figures Rule: Trailing zeroes in a number with no decimal are not significant
Practice 126.48 5 significant figures Rule: All nonzero integers are significant
Practice 1.0005 5 significant figures Rule: Captive zeroes are always significant
Practice 90.0 3 significant figures • Rules: • Trailing zeroes in a decimal number are significant. • Zeroes at the end of a number count if there is a written decimal point.
Practice 192 3 significant figures Rule: All nonzero integers are significant
Practice 0.000004 1 significant figure Rule: Leading zeroes are never significant
Practice 0.01006 4 significant figures • Rules: • Leading zeroes are never significant • Captive zeroes are always significant
Question For Thought Using two different rulers, I measured the width of my hand to be 4.5 centimeters and 4.54 centimeters. Explain the difference between these two measurements.
The first measurement implies that my hand is somewhere between 4.5 and 4.9 cm long. There is a uncertainty in this number because we have to estimate. The second measurement implies that my hand is between 4.5 and 4.6 cm long. This measurement is more certain due to its greater precision.
Significant figures are necessary to reduce uncertainty in our measurements. Significant figures indicate the precision of the measured value!!