Chapter 2 Measurement Units of Measurement SI units

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Chapter 2: Measurement

Chapter 2: Measurement

Units of Measurement • SI units – based on the International System of Units

Units of Measurement • SI units – based on the International System of Units • Base unit – a defined unit based on an object or event in the physical world – Important Base Units to Know: • • Time (second, s) Length (meter, m) Mass (kilogram, kg) Volume (liter, L) Temperature (Kelvin, K) Density (grams/centimeter 3, g/cm 3)

Derived Units Density and Volume are derived units meaning that they are combined units

Derived Units Density and Volume are derived units meaning that they are combined units Ex. The volume of a block of wood can be determined by finding L x W x H therefore the units would be cm x cm or cm 3 Ex. Density is mass divided by volume or g/cm 3

Prefixes (p. 26) Prefix Symbol Factor Scientific Notation Example Giga G 100000 109 gigameter

Prefixes (p. 26) Prefix Symbol Factor Scientific Notation Example Giga G 100000 109 gigameter (Gm) Mega M 1000000 106 megagram (Mg) Kilo k 1000 103 kilometer(km) Deci d 1/10 10 -1 deciliter (d. L) Centi c 1/100 10 -2 centimeter (cm) Milli m 1/1000 10 -3 milligram (mg) Micro µ 1/1000000 10 -6 microgram (µg) Nano n 1/00000 10 -9 nanometer (nm) pico p 1/000000 10 -12 picometer (pm)

DENSITY Density = mass volume Regular objects simply find the mass by using a

DENSITY Density = mass volume Regular objects simply find the mass by using a balance and then find volume by measuring length, width, and height (plug and chug) What about irregularly shaped objects?

Density of Irregularly shaped objects • Measure the mass by using a balance •

Density of Irregularly shaped objects • Measure the mass by using a balance • How do you find volume? – WATER DISPLACEMENT METHOD • Fill a graduated cylinder with certain amount of water (30 m. L) • Slowly lower object into the graduated cylinder and measure the change in water level. • Ex. Suppose cylinder plus object has a volume of 32 m. L – The change in volume is 2 m. L therefore the volume of the object is 2 m. L

Scientific Notation • Expresses numbers as a multiple of two factors – A number

Scientific Notation • Expresses numbers as a multiple of two factors – A number between 1 and 10 – A ten raised to a power or exponent Ex. 5. 0 x 103 5000

Calculations with Scientific Notation • Addition and Subtraction- exponents must be the same so

Calculations with Scientific Notation • Addition and Subtraction- exponents must be the same so you will rewrite the number and then perform operation 4 x 102 + 5 x 103 = 4 x 102 + 50 x 102 = 54 x 102 or 5. 4 x 103 • Multiplication- exponents do not have to equal instead perform operation on the factors and then add exponents (3 x 102) x (4 x 105) = 12 x 107 or 1. 2 x 10 8 • Division- exponents do not have to be the same instead perform operation on the factors and then subtract exponents (1. 5 x 105) / (3 x 103)= 0. 5 x 102 or 5 x 101

Accuracy in Measurement • You cannot be more accurate than the instrument in which

Accuracy in Measurement • You cannot be more accurate than the instrument in which you use to measure • Ex. A bathroom scale measures pounds to the 1/10. Will you ever be able to determine your weight to the 1/1000 with this particular scale? NO

Precision of Calculated Results • calculated results are never more reliable than the measurements

Precision of Calculated Results • calculated results are never more reliable than the measurements they are built from • Multi-step calculations: never round intermediate results! • General rules on rounding: – If it ends in 4 or below, round down to nearest whole number 52. 63 52. 6 – If it ends in 5 or up, round up to nearest whole number 52. 67 52. 7

Uncertainty in Measurements • Making a measurement involves comparison with a unit or a

Uncertainty in Measurements • Making a measurement involves comparison with a unit or a scale of units – It is important to read between the lines – the digit read between the lines is always uncertain – convention: read to 1/10 of the distance between the smallest scale divisions • Significant Figures – definition: all digits up to and including the first uncertain digit – the more significant digits, the more reproducible the measurement is. – counts and defined numbers are exact- they have no uncertain digits!

Rules for Significant Figures • 1. All digits are significant except for zeros at

Rules for Significant Figures • 1. All digits are significant except for zeros at the beginning of the number and possibly terminal zeros. • 2. Terminal zeros to the right of the decimal point are significant • 3. Terminal zeros in a number without an explicit decimal point may or may not be significant. If doubt, write in scientific notation and then do significant figures. • 4. When multiplying or dividing, give as many significant figures in the answer as there are in the measurement with the least number of significant figures. • 5. When adding or subtracting measured quantities, give the same number of decimal places in the answer as there are in the measurement with the least number of decimal places.

Examples of the Rules • Rule 1 example: 9. 12 cm, 0. 912 cm,

Examples of the Rules • Rule 1 example: 9. 12 cm, 0. 912 cm, and 0. 00912 all have 3 sig fig • Rule 2 example: 9. 000 cm, 9. 100 cm, and 900. 0 cm all have 4 sig fig • Rule 3 example: 900 cm could have 1, 2, or 3 sig fig. If it was 900. , then it would be 3. So, write it in sci. notation 9. 00 x 102; therefore, 3 sig fig. • Rule 4 example: 4. 1 x 5. =20. 5=2. x 101 • Rule 5 example: 184. 2 +2. 324 = 186. 5

Conversions Between Units • Use Factor Label Method aka Dimensional Analysis • Must know

Conversions Between Units • Use Factor Label Method aka Dimensional Analysis • Must know relationships among units • These relationships are called conversion factors Ex. 1000 mm = 1 m

Common Factors 1 km=1000 m 1 hm=100 m 1 dam=10 m 1 m=10 dm

Common Factors 1 km=1000 m 1 hm=100 m 1 dam=10 m 1 m=10 dm 1 m=100 cm 1 m=1000 mm kilometers to meters hectometers to meters decameters to meters base meter to decimeter to centimeter to millimeter ** substitute any metric base in place such as liter

Common Factors • • • Tera = 1012 Giga = 109 Mega = 106

Common Factors • • • Tera = 1012 Giga = 109 Mega = 106 Kilo = 103 Hecto = 102 Deca = 101 Deci = 10 -1 Centi = 10 -2 Milli = 10 -3 Micro = 10 -6 Nano = 10 -9 Pico = 10 -12 Symbol: T Symbol: G Symbol: M Symbol: k Symbol: h Symbol: da Symbol: d Symbol: c Symbol: m Symbol: µ Symbol: n Symbol: p

How to Convert EXAMPLE: 4. 5 m = _____hm Xhm = 4. 5 m

How to Convert EXAMPLE: 4. 5 m = _____hm Xhm = 4. 5 m x 1 hm = 0. 045 hm or 4. 5 x 10 -2 hm 100 m 225 cm =____ mm Xmm = 225 cm x 10 mm = 2250 mm or 2. 25 x 103 mm 1 cm Conversion factor is in red

Temperature Conversions REMEMBER: Kelvin is SI base unit for temperature Celsius Kelvin K= o.

Temperature Conversions REMEMBER: Kelvin is SI base unit for temperature Celsius Kelvin K= o. C+ 273. 15 Fahrenheit Celsius o. F=(1. 8 x o. C) +32 Fahrenheit Celsius Kelvin