1. Learning Check What is the length of the wooden stick? 1) 4.5 cm 2) 4.58 cm 3) 4.584 cm

2. Measurement and Significant Figures Every experimental measurement has a degree of uncertainty. The volume, V, at right is certain in the 10’s place, 10mL<V<20mL The 1’s digit is also certain, 17mL<V<18mL A best guess is needed for the tenths place. Chapter Two 2

3. www.chrisjordan.com

4. 106,000 aluminum cans, the number used in the US every 30 seconds. www.chrisjordan.com

5. How many cans are used in a year? www.chrisjordan.com

6. Scientific Notation # from 1 to 9.999 x 10 exponent 800= 8 x 10 x 10 = 8 x 10 2 2531 = 2.531 x 10 x 10 x 10 = 2.531 x 10 3 0.0014 = 1.4 ÷ 10 ÷ 10 ÷ 10 = 1.4 x 10 -3

7. Change to standard form. 1.87 x 10 –5 = 3.7 x 10 8 = 7.88 x 10 1 = 2.164 x 10 –2 = 370,000,000 0.0000187 78.8 0.02164

8. Change to scientific notation. 12,340 = 0.369 = 0.008 = 1,000. = 1.234 x 10 4 3.69 x 10 –1 8 x 10 –3 1.000 x 10 9

9. No Cussing! The following 4-Letter words are forbidden here: Inch Mile Foot Pint Yard Acre And we never swear the BIG F (use o C) Please keep it clean and Metric

10. SI System The International System of Units Derived Units Commonly Used in Chemistry Map of the world where red represents countries which do not use the metric system

11. The International System of Units Lengthmeter m Masskilogram kg Timesecond s Amount of substancemole mol TemperatureKelvin K Electric currentamperes amps Luminous intensitycandela cd QuantityNameSymbol Dorin, Demmin, Gabel, Chemistry The Study of Matter, 3 rd Edition, 1990, page 16

12. NEED TO KNOW Prefixes in the SI System Power of 10 for Prefix SymbolMeaning Scientific Notation _________________________________________________________ mega-M 1,000,00010 6 kilo-k 1,00010 3 deci-d 0.110 -1 centi-c 0.0110 -2 milli-m 0.00110 -3 micro-  0.00000110 -6 nano-n 0.00000000110 -9

13. Significant figures Method used to express accuracy and precision. You can’t report numbers better than the method used to measure them. 67.20 cm = four significant figures Uncertain Digit Certain Digits ???

14. Significant figures The number of significant digits is independent of the decimal point. 255 31.7 5.60 0.934 0.0150 These numbers All have three significant figures!

15. Rules for Counting Significant figures Every non-zero digit is ALWAYS significant! Zeros are what will give you a headache! They are used/misused all of the time. SEE p.24 in your book!

16. Rules for zeros are not Leading zeros are not significant. are always Captive zeros are always significant! 0.421 - three significant figures Leading zero are Trailing zeros are significant … IFdecimal point IF there’s a decimal point in the number ! 114.20 - five significant figures Trailing zero ??? 4,008 - four significant figures Captive zeros ???

17. Examples 250 mg \__ 2 significant figures 120. km \__ 3 significant figures 0.00230 kg \__ 3 significant figures 23,600.01 s \__ 7 significant figures

18. Significant figures: Rules for zeros Scientific notation Scientific notation - can be used to clearly express significant figures. A properly written number in scientific notation always has the proper number of significant figures. 3213.21 0.00321 = 3.21 x 10 -3 Three Significant Figures Three Significant Figures

19. Significant figures and calculations An answer can’t have more significant figures than the quantities used to produce it.Example How fast did you run if you went 1.0 km in 3.0 minutes? speed = 1.0 km 3.0 min = 0.33 km min 0.333333

20. Significant figures and calculations Multiplication and division. Your answer should have the same number of sig figs as the original number with the smallest number of significant figures. 21.4 cm x 3.095768 cm = 66.2 cm 2 135 km ÷ 2.0 hr = 68 km/hr ONLY 3 SIG FIGS! ONLY 2 SIG FIGS!

21. Significant figures and calculations Addition and subtraction Your answer should have the same number of digits to the right of the decimal point as the number having the fewest to start with. 123.45987 g + 234.11 g 357.57 g 805.4 g - 721.67912 g 83.7 g

22. Rounding off numbers After calculations, you may need to round off. If the first insignificant digit is 5 or more, you round up If the first insignificant digit is 4 or less, you round down.

23. If a set of calculations gave you the following numbers and you knew each was supposed to have four significant figures then - 9 2.5795035 becomes 2.580 0 34.204221 becomes 34.20 Examples of rounding off 1st insignificant digit