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Introduction to Significant Figures &. Scientific Notation. Scientific Method. Logical approach to solving problems by. observing. collecting data. formulating a hypotheses. testing Hypotheses. Formulating theories. Significant Figures.
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Introduction to Significant Figures& Scientific Notation
Scientific Method Logical approach to solving problems by observing collecting data formulating a hypotheses testing Hypotheses Formulating theories
Significant Figures • Scientist use significant figures to determine how precise a measurement is • Significant digits in a measurement include • all of the known digits plus one estimated digit
For example… • Look at the ruler below • Each line is 0.1cm • You can read that the arrow is on 13.3 cm • However, using significant figures, you must estimate the next digit • That would give you 13.30 cm
Let’s try this one • Look at the ruler below • What can you read before you estimate? • 12.8 cm • Now estimate the next digit… • 12.85 cm
The same rules apply with all instruments • The same rules apply • Read to the last digit that you know • Estimate the final digit
Let’s try graduated cylinders • Look at the graduated cylinder below • What can you read with confidence? • 56 ml • Now estimate the last digit • 56.0 ml
One more graduated cylinder • Look at the cylinder below… • What is the measurement? • 53.5 ml
Rules for Significant figuresRule #1 • All non zero digits are ALWAYS significant • How many significant digits are in the following numbers? • 3 Significant Figures • 5 Significant Digits • 4 Significant Figures • 274 • 25.632 • 8.987
Rule #2 • All zeros between significant digits are ALWAYS significant • How many significant digits are in the following numbers? 3 Significant Figures 5 Significant Digits 4 Significant Figures 504 60002 9.077
Rule #3 • All FINAL zeros to the right of the decimal ARE significant • How many significant digits are in the following numbers? 3 Significant Figures 5 Significant Digits 7 Significant Figures 32.0 19.000 105.0020
Rule #4 • All zeros that act as place holders are NOT significant • Another way to say this is: zeros are only significant if they are between significant digits OR are the very final thing at the end of a decimal
0.0002 6.02 x 1023 100.000 150000 800 1 Significant Digit For example How many significant digits are in the following numbers? 1 Significant Digit 3 Significant Digits 6 Significant Digits 2 Significant Digits
Rule #5 • All counting numbers and constants have an infinite number of significant digits • For example: 1 hour = 60 minutes 12 inches = 1 foot 24 hours = 1 day
0.0073 100.020 2500 7.90 x 10-3 670.0 0.00001 18.84 2 Significant Digits 6 Significant Digits 2 Significant Digits 3 Significant Digits 4 Significant Digits 1 Significant Digit 4 Significant Digits How many significant digits are in the following numbers?
Rules Rounding Significant DigitsRule #1 • If the digit to the immediate right of the last significant digit is less than 5, do not round up the last significant digit. • For example, let’s say you have the number 43.82 and you want 3 significant digits • The last number that you want is the 8 – 43.82 • The number to the right of the 8 is a 2 • Therefore, you would not round up & the number would be 43.8
Rounding Rule #2 • If the digit to the immediate right of the last significant digit is greater that a 5, you round up the last significant figure • Let’s say you have the number 234.87 and you want 4 significant digits • 234.87 – The last number you want is the 8 and the number to the right is a 7 • Therefore, you would round up & get 234.9
Rounding Rule #3 • If the number to the immediate right of the last significant is a 5, and that 5 is followed by a non zero digit, round up • 78.657 (you want 3 significant digits) • The number you want is the 6 • The 6 is followed by a 5 and the 5 is followed by a non zero number • Therefore, you round up • 78.7
Rounding Rule #4 • If the number to the immediate right of the last significant is a 5, and that 5 is followed by a zero, you look at the last significant digit and make it even. • 2.5350 (want 3 significant digits) • The number to the right of the digit you want is a 5 followed by a 0 • Therefore you want the final digit to be even • 2.54
Say you have this number • 2.5250 (want 3 significant digits) • The number to the right of the digit you want is a 5 followed by a 0 • Therefore you want the final digit to be even and it already is • 2.52
200.99 (want 3 SF) 18.22 (want 2 SF) 135.50 (want 3 SF) 0.00299 (want 1 SF) 98.59 (want 2 SF) 201 18 136 0.003 99 Let’s try these examples…
Scientific Notation • Scientific notation is used to express very large or very small numbers • It consists of a number between 1 & 10 followed by x 10 to an exponent • The exponent can be determined by the number of decimal places you have to move to get only 1 number in front of the decimal
Large Numbers • If the number you start with is greater than 1, the exponent will be positive • Write the number 39923 in scientific notation • First move the decimal until 1 number is in front – 3.9923 • Now at x 10 – 3.9923 x 10 • Now count the number of decimal places that you moved (4) • Since the number you started with was greater than 1, the exponent will be positive • 3.9923 x 10 4
Small Numbers • If the number you start with is less than 1, the exponent will be negative • Write the number 0.0052 in scientific notation • First move the decimal until 1 number is in front – 5.2 • Now at x 10 – 5.2 x 10 • Now count the number of decimal places that you moved (3) • Since the number you started with was less than 1, the exponent will be negative • 5.2 x 10 -3
99.343 4000.1 0.000375 0.0234 94577.1 9.9343 x 101 4.0001 x 103 3.75 x 10-4 2.34 x 10-2 9.45771 x 104 Scientific Notation Examples Place the following numbers in scientific notation:
Going from Scientific Notation to Ordinary Notation • You start with the number and move the decimal the same number of spaces as the exponent. • If the exponent is positive, the number will be greater than 1 • If the exponent is negative, the number will be less than 1
3 x 106 6.26x 109 5 x 10-4 8.45 x 10-7 2.25 x 103 3000000 6260000000 0.0005 0.000000845 2250 Going to Ordinary Notation Examples Place the following numbers in ordinary notation:
Significant Digits Calculations
Significant Digits in Calculations • Now you know how to determine the number of significant digits in a number • How do you decide what to do when adding, subtracting, multiplying, or dividing?
Rules for Addition and Subtraction • When you add or subtract measurements, your answer must have the same number of decimal places as the one with the fewest • For example: 20.4 1.322 83 = 104.722
Addition & Subtraction Continued • Because you are adding, you need to look at the number of decimal places 20.4 + 1.322 + 83 = 104.722 (1) (3) (0) • Since you are adding, your answer must have the same number of decimal places as the one with the fewest • The fewest number of decimal places is 0 • Therefore, you answer must be rounded to have 0 decimal places • Your answer becomes • 105
1.23056 + 67.809 = 23.67 – 500 = 40.08 + 32.064 = 22.9898 + 35.453 = 95.00 – 75.00 = 69.03956 69.040 - 476.33 -500 72.1440 72.14 58.4428 58.443 20 20.00 Addition & Subtraction Problems
Rules for Multiplication & Division • When you multiply and divide numbers you look at the TOTAL number of significant digits NOT just decimal places • For example: 67.50 x 2.54 = 171.45
Multiplication & Division • Because you are multiplying, you need to look at the total number of significant digits not just decimal places 67.50 x 2.54 = 171.45 (4) (3) • Since you are multiplying, your answer must have the same number of significant digits as the one with the fewest • The fewest number of significant digits is 3 • Therefore, you answer must be rounded to have 3 significant digits • Your answer becomes • 171
890.15 x 12.3 = 88.132 / 22.500 = (48.12)(2.95) = 58.30 / 16.48 = 307.15 / 10.08 = 10948.845 1.09 x 104 3.916977 3.9170 141.954 142 3.5376 3.538 30.47123 30.47 Multiplication & Division Problems
18.36 g / 14.20 cm3 105.40 °C –23.20 °C 324.5 mi / 5.5 hr 21.8 °C + 204.2 °C 460 m / 5 sec = 1.293 g/cm3 = 82.20 °C = 59 mi / hr = 226.0 °C = 90 or 9 x 101 m/sec More Significant Digit Problems
1. How many significant digits are in each of the following? a. 12.5 b. .00230 c. .01000 d. 100.025 e. 100.000 3 3 4 6 6 2. Round each of the following to three sig figs. a. 125.365 b. .3002536458 c. 455.5 d. 278.96 e. 9.96543 .300 456 279 9.97 125 3. Change each of the following to scientific notation. a. 100.00 b. .0020 c. 1000000 d. .02500 e. 70 360.4 360.4 1.0000 x 102 2.0 x 10-3 1 x 106 2.500 x 10-2 7 x 101 4. Add the following using sig figs. a. 110.1 b. 78.59681 250.32610. 89 360.4
5. Subtract each of the following using sig figs . a. 125.63 b. 56.056 25.36425.4 100.27 30.7 • Multiply each of the following using sig figs. • a. 200.00 x 30.0 b. 25.11 x 5.0 130 6.00 x 103