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Scientific Notation And Significant Figures. Scientific Notation. Scientific notation consists of two parts:. A number between 1 and 9 A power of 10 N x 10 x. * Examples *. Given: 289,800,000 Use: 2.898 (moved 8 places) Answer: 2.898 x 10 8 Given: 0.000567
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Scientific Notation And Significant Figures
Scientific notation consists of two parts: • A number between 1 and 9 • A power of 10 N x 10x
* Examples * • Given: 289,800,000 • Use: 2.898 (moved 8 places) • Answer: 2.898 x 108 • Given: 0.000567 • Use: 5.67 (moved 4 places) • Answer: 5.67 x 10-4
Learning Check • Express these numbers in Scientific Notation: • 405789 • 0.003872 • 3000000000 • .00000002 • 0.478260 4.05789 x 105 3.872 x 10-3 3 x 109 2 x 10-8 4.7826 x 10-1
Significant Figures • AKA (also know as): • Sig Figs • Significant Digits
Definition: • A method of rounding off calculated measurements • No answer can be more precise than the least precise measurement
Rounding rules • Look at the number behind the one you’re rounding. • If it is 0 to 4 don’t change it • If it is 5 to 9 make it one bigger
Rounding 5.9 • 5.87192 • Round 2 digits • Round 3 digits • Round 4 digits • 7.9237439 • Round 1 digits • Round 2 digits • Round 4 digits • Round 5 digits 5.87 5.872 8 7.9 7.924 7.9237
1 2 3 4 5 Significant Figures • How many numbers mean anything • When we measure something, we can (and do) always estimate between the smallest marks.
Significant Figures • The more marks the better we can estimate. • Scientist always understand that the last number measured is actually an estimate 1 3 4 5 2
Significant Figures • How do we read the ruler? • 4.5515 cm? • 4.551 cm? • 4.55 cm? • 4.5 cm? • 4 cm? • We needed a set of rules to decide 1 3 4 5 2
Rules for Working with Significant Figures: • Leading zeros are never significant. Imbedded zeros are always significant. Trailing zeros are significant only if the decimal point is specified. Hint: Change the number to scientific notation. It is easier to see. • Addition or Subtraction:The last digit retained is set by the first doubtful digit. • Multiplication or Division:The answer contains no more significant figures than the least accurately known number.
Significant Figure Rules Rule #1:All real numbers (1, 2, 3, 4, etc.) count as significant figures. • Therefore, you only have to be concerned with the 0 • Whether a 0 is significant or not depends on the location of that 0 in the number
Which zeros count? Rule #2:Zeros at the end of a number without a decimal point don’t count • 12400 g (3 sig figs) Rule #3:Zeros after a decimal without a number in front are not significant. • 0.045 g (2 sig figs)
Which zeros count? Rule #4: Zeros between other sig figs do count. • 1002 g (4 sig figs) Rule #5: Zeroes at the end of a number after the decimal point do count • 45.8300 g (6 sig figs)
Other Information about Sig Figs • Only measurements have sig figs. • A a piece of paper is measured 11.0 inches tall. • Counted numbers are exact • A dozen is exactly 12 • Being able to locate, and count significant figures is an important skill.
Learning Check A. Which answers contain 3 significant figures? 1) 0.4760 cm 2) 0.00476 cm 3) 4760 cm B. All the zeros are significant in 1) 0.00307 mL 2) 25.300 mL 3) 2.050 x 103 mL C. 534,675 g rounded to 3 significant figures is 1) 535 g 2) 535,000 g 3) 5.35 x 105 g
Learning Check In which set(s) do both numbers contain the same number of significant figures? 1) 22.0 and 22.00 2) 400.0 and 40 3) 0.000015 and 150,000 4) 63,000 and 2.1 5) 600.0 and 144 6) 0.0002 and 2000 NO NO YES- 2 YES- 2 NO YES-1
Learning Check How many sig figs in the following measurements? 458 g 4850. g 4850 g 0.0485 g 0.004085 g 40.004085 g 3 4 3 3 4 8
Next we learn the rules for calculations Unfortunately, there are different rules for addition and subtraction and for multiplication and division
Your answer must have the same number of digits to the right of the decimal point as there are in the measurement having the fewest digits to the right of the decimal point in the problem. WOW!!! What does that mean?
Example: 2.515 cm 1.3 cm + 12.00 cm 15.815 cm Answer stops here
Another Example If 27.93 mL of NaOH is added to 6.6 mL of HCL, what is the total volume of your solution? • First line up the decimal places • Then do the adding • Find the estimated numbers in the problem • This answer must be rounded to the tenths place 27.96 mL + 6.6 mL 34.56 mL 34.6 mL
Your answer MUST have the same number of sig figs as the least number of sig figs in the numbers from the problem. What the heck does that mean?
Example: 135 cm x 32 cm = 4320 cm2 3 S.F. 2 S.F. 2 S.F. Round off the answer to 4300 cm3 which is 2 sig figs.
Another Example 610 m x 6.20 m = 3782 m2 2 S.F. 2 S.F. 3 S.F. What is the correct answer? 3800 m2
Learning Check 1. 2.19 m X 4.2 m = A) 9 m2 B) 9.2 m2C) 9.198 m2 2. 4.311 cm2 ÷ 0.07 cm = A)61.58cmB) 62 cm C) 60 cm 3. (2.54 mL X 0.0028 mL) = 0.0105 mL X 0.060 mL A.) 11.3 mLB)11 mL C) 0.041mL