1. The SI System of Measurement

2. The Nature of Measurement
A Measurement is a quantitative observation consisting of TWO parts
Part 1 - number
Part 2 - scale (unit)
Examples:
20 grams
6.63 x Joule·seconds

3. The Fundamental SI Units (le Système International, SI)

4. SI Base Units
A base unit is a defined unit in a system of measurement that is based on an object or event in the physical world, and is independent of other units.
Examples:
1 Kg = The Legrand K
1 sec. = radiation frequency
of a cesium-133 atom
1 meter = distance light travels in
1/299,792,458th of
a second.

5. SI Base Units The SI base unit for temperature is the kelvin.
Most often confused with Celsius.
At zero kelvin, there exist virtually no particle motion or kinetic energy. This temperature is known as absolute zero.

6. SI Base Units
A unit that is defined by a combination of base units is called a derived unit.
Volume is a derived unit. Volume is calculated by multiplying (length x width x volume).Volume is measured in cubic meters (m3), but this is very large. A more convenient measure is the liter, or one cubic decimeter (dm3).
Density is a derived unit, g/cm3, the amount of mass per unit volume. Density is calculated by dividing (mass/volume)

7. SI Prefixes Common to Chemistry
Unit Abbr.
Exponent
Kilo k
103
Deci d
10-1
Centi c
10-2
Milli m
10-3
Micro 
10-6

8. Metric Conversions g m L 103 102 101 10-1 10-2 10-3 kilo hecto deka
Base
unit
deci
centi
milli
Conversions in the metric system are merely a matter of moving a decimal point. The “base unit” means the you have a quantity (grams, meters, Liters, etc without a prefix.

9. Metric Conversions g m L 103 102 101 10-1 10-2 10-3 kilo hecto deka
Base
unit
deci
centi
milli 1 2 3
18 L
18 liters = milliliters
Example #1: Convert 18 liters to milliliters

10. Metric Conversions g m L 103 102 101 10-1 10-2 10-3 kilo hecto deka
Base
unit
deci
centi
milli 3 2 1
450 mg = g
450 mg
Example #2: Convert 450 milligrams to grams

11. Metric Conversions g m L 103 102 101 10-1 10-2 10-3 kilo hecto deka
Base
unit
deci
centi
milli 1 2 3 4 5 6
20 kg
20 kg = mg
Example #3: Convert 20 kilograms to milligrams

12. Uncertainty and Significant Figures
Cartoon courtesy of Lab-initio.com

13. Uncertainty in Measurement
A digit that must be estimated is called uncertain. A measurement always has some degree of uncertainty.

14. Why Is there Uncertainty?
Measurements are performed with instruments
No instrument can read to an infinite number of decimal places
Which of these balances has the greatest uncertainty in measurement?

15. Precision and Accuracy
Accuracy refers to the agreement of a particular value with the true value.
Precision refers to the degree of agreement among several measurements made in the same manner.
Neither accurate nor precise
Precise but not accurate
Precise AND accurate

16. Rules for Counting Significant Figures - Details
Nonzero integers always count as significant figures.
3456 has
4 significant figures

17. Rules for Counting Significant Figures - Details
Zeros
- Leading zeros do not count as
significant figures.
has
3 significant figures

18. Rules for Counting Significant Figures - Details
Zeros
- Captive zeros always count as
significant figures.
16.07 has
4 significant figures

19. Rules for Counting Significant Figures - Details
Zeros
Trailing zeros are significant only if the number contains a decimal point.
9.300 has
4 significant figures

20. Rules for Counting Significant Figures - Details
Exact numbers have an infinite number of significant figures.
1 inch = cm, exactly

21. Sig Fig Practice #1 1.0070 m  5 sig figs 17.10 kg  4 sig figs
How many significant figures in each of the following?
m 
5 sig figs
17.10 kg 
4 sig figs
100,890 L 
5 sig figs
3.29 x 103 s 
3 sig figs
cm 
2 sig figs
3,200,000 
2 sig figs

22. Rules for Significant Figures in Mathematical Operations
Multiplication and Division: # sig figs in the result equals the number in the least precise measurement used in the calculation.
6.38 x 2.0 =
12.76  13 (2 sig figs)

23. Sig Fig Practice #2 Calculation Calculator says: Answer 3.24 m x 7.0 m
100.0 g ÷ 23.7 cm3
g/cm3
4.22 g/cm3
0.02 cm x cm
cm2
0.05 cm2
710 m ÷ 3.0 s
m/s
240 m/s
lb x 3.23 ft
lb·ft
5870 lb·ft
1.030 g ÷ 2.87 mL
g/mL
2.96 g/mL

24. Rules for Significant Figures in Mathematical Operations
Addition and Subtraction: The number of decimal places in the result equals the number of decimal places in the least precise measurement. =
 18.7 (3 sig figs)

25. Sig Fig Practice #3 Calculation Calculator says: Answer 3.24 m + 7.0 m
100.0 g g
76.27 g
76.3 g
0.02 cm cm
2.391 cm
2.39 cm
713.1 L L L
709.2 L
lb lb lb lb
2.030 mL mL
0.16 mL
0.160 mL

26. Scientific Notation

27. Scientific Notation In science, we deal with some very LARGE numbers:
1 mole =
In science, we deal with some very SMALL numbers:
Mass of an electron = kg

28. Imagine the difficulty of calculating the mass of 1 mole of electrons!kg x
???????????????????????????????????

29. Scientific Notation:
A method of representing very large or very small numbers in the form:
M x 10n
M is a number between 1 and 10
n is an integer

30. . 9 8 7 6 5 4 3 2 1
Step #1: Insert an understood decimal point
Step #2: Decide where the decimal must end
up so that one number is to its left
Step #3: Count how many places you bounce
the decimal point
Step #4: Re-write in the form M x 10n

31. 2.5 x 109
The exponent is the number of places we moved the decimal.

32. 0.0000579 1 2 3 4 5 Step #2: Decide where the decimal must end
up so that one number is to its left
Step #3: Count how many places you bounce
the decimal point
Step #4: Re-write in the form M x 10n

33. 5.79 x 10-5
The exponent is negative because the number we started with was less than 1.

34. PERFORMING CALCULATIONS IN SCIENTIFIC NOTATION
ADDITION AND SUBTRACTION

35. Review: M x 10n Scientific notation expresses a number in the form:
n is an integer
1  M  10

36. IF the exponents are the same, we simply add or subtract the numbers in front and bring the exponent down unchanged.
4 x 106
+ 3 x 106 7
x 106

37. The same holds true for subtraction in scientific notation.
4 x 106
- 3 x 106 1
x 106

38. If the exponents are NOT the same, we must move a decimal to make them the same.

39. 4.00 x 106
4.00 x 106
x 105
+ .30 x 106
4.30
x 106
Move the decimal on the smaller number!

40. A Problem for you…
2.37 x 10-6
x 10-4

41. Solution…
x 10-6
2.37 x 10-6
x 10-4

42. Solution…
x 10-4
x 10-4
x 10-4

43. Metric Conversion Practice

44. Problem #1 Convert 400 mL to Liters 400 mL 1 L .400 L = 1 000 mL
= 4x10-1 L

45. Problem #2 Convert 10 meters to mm 10 m 1 000 mm 10 000 mm = 1 m
= 1x104 mm

46. Problem #3 Convert 73 grams to kg 73 g 1 kg 0.073 kg = 1 000 g
= 7.3x10-2 kg

47. Problem #4 Convert 0.02 kilometers to m 0.02 km 1 000 m 20 m = 1 km
= 2x101 m

48. Problem #5 Convert 20 centimeters to m 20 cm 1 m 0.20 m = 100 cm
= 2x10-1 m

49. Problem #6
Convert 450 milliliters to dL
450 mL 1 dL
4.5 dL =
100 mL

50. Problem #7 Convert 10 kilograms to grams 10 kg 1 000 g 10 000 g = 1 kg
= 1x104 g

51. Problem #8 Convert 935 mg to cg 1 935 mg cg 93.5 cg = 10 mg
= 9.35x101 cg

52. Problem #9 Convert 5.2 kg to mg 5.2 kg 1 000 000 mg mg = 1 kg
= 5.2x106 mg

53. Problem #10 Convert 175 mL to cm3 1 cm3 175 mL 175 cm3 = 1 mL
= 1.75x102 cm3

54. Representing Data: Graphs
A graph is a visual display of data that makes trends easier to see than in a table.

55. Parts of A Graph Title Description of variables
Y- Axis: Dependent Variable
X- Axis : Independent Variable
Description of variables

56. Types of Graphs
There are 3 main types of graphs that are used in science.
Bar Graph
Pie Chart/ Circle Graph
Line Graph

57. Bar Graph
A bar graph is a visual display used to compare the amounts or frequency of occurrence of different characteristics of data.
This type of display allows us to: compare groups of data, and. to make generalizations about the data quickly.

58. Pie Chart/ Circle Graph
A circle graph, or pie chart, has wedges that visually represent percentages of a fixed whole.

59. Line Graph
A line graph is useful for displaying data or information that changes continuously over time. Another name for a line graph is a line chart.
This is typically the most popular in science.

60. Graph Interpretation What is this graph about?
At what age to teens have the most cell phones?
At what age do teens have the least amount of cell phones?
How many cell phones do 15 yr. olds have?
How many cell phones do 16.5 yr. olds have?
What is the greatest number of cell phones at any age?
What is the lowest number of cell phones at any age?

61. Graph Interpretation How many sectors does this graph have?
What percentage of people preferred chocolate Ice Cream?
If 50 people were surveyed how many people preferred Vanilla?