MEASUREMENT AND CALCULATIONS Chapter 9.2
Significant Digits The international agreement about the correct way to record measurements: Record all those digits that are certain plus one uncertain digit, an no more. These “certain-plus-one” digits are called significant digits. The certainty of a measurement is determined by how many certain digits (plus one) are obtained by the measuring instrument.
SIGNIFICANT DIGITS All digits included in a stated value ( except leading zeros) are significant digits. The position of the decimal point is not important when counting significant digits. Examples: 30.95 – 4 sig figs 4.03 – 3 sig figs 0.04 – 1 sig fig ( leading zeros don’t count) 0.5060 – 4 sig figs 120. – 3 sig figs
PRACTICE Significant Digits 1) 1.02 Km = _______ significant Digits 2) 0.32 cm = _______ significant Digits 3) 3600 kg = _______ significant Digits 4) 20.060 L = ______ significant Digits 5) 0.0030 g = ______ significant Digits
Multiplying or Dividing SIGNIFICANT DIGITS When multiplying or dividing significant digits, you round to the value with the least total number of sig. figs. Example: 4.62 x 0.035 = 0.1617 = 0.16 107.45 ÷ 6.40 = 16.7890 = 16.8
ADDING OR SUBTRACTING SIGNIFICANT DIGITS When adding or subtracting, you round to the value with the least number of digits after the decimal. EXAMPLE: 1.2 + 3.08 + 7.60 = 11.88 = 11.9 10.013 – 1.07 = 8.943 = 8.94
PRACTICE 1) (2.4)(6.16) = ______ = _____ 2) 16.1 – 2.4 = ______ = _____ 3) 4.1 ÷ 8.6 = ______ = _____ 4) 6.105 + 0.12 = ____ = _____
ORDER OF OPERATIONS Significant Digits You will come across problems involving both x / ÷ and + / - . This is done step by step using the above rules. EXAMPLE: 4.3 ÷ 1.2 – 6.1 = 3.58333 – 6.1 3.6 – 6.1 2.5
PRACTICE 1) (6.2)(4.3) – 12 6.1 2) 42 – (2.2)(1.3)
ROUNDING NUMBERS If the digit after the digit to be rounded is 5 or larger, round up. If not round down. Example: 9.147 cm rounded to three Sig. Figs. Digits is 9.15 cm. 7.23 g rounded to two Sig. Figs. Digits is 7.2 g.
TRY THESE ROUNDING QUESTIONS 0.0327 rounded to one Sig. Fig. Digit 15.430 rounded to three Sig. Fig. Digits We now can apply these two concepts to basic mathematical calculations.
REARRANGING FORMULAS You must isolate the variable you are trying to solve for. To accomplish this you need to use the opposite operation that is indicated. EXAMPLE: d = vt ( rearrange for v ) Divide by t because vt is multiplication. d = v t
This does not work for equations such as: a = vf – vi OR c = 2πr T There is an easy way to rearrange three part equations using the pie method. EXAMPLE: This does not work for equations such as: a = vf – vi OR c = 2πr T v = d / t t = d / v d = vt D V T
PRACTICE 1) c = m / v ( rearrange for m ) 2) a = ½ bh ( rearrange for h) ANSWER: 1) m = cv 2) h = 2a/b
CONVERTING UNITS You must understand the metric system to effectively convert. Nano Micro Milli Centi Basic Symbols: m, g, L Kilo Mega Giga Examples: 1 m = 100 cm 1 m = 1000 mm Multiply Examples: 1 g = 0.001 kg 1 g = 0.00001 mega grams Divide
However, you may have to use the conversion factor method that does not involve the metric system or has more than one unit. Example: 1)How many hours is 20.5 minutes? 20.5 min x 1 hour = 0.34166 = 0.342 h 60 min 2) How many m/s is 5km/h? 5 km x 1 h x 1000 m = 5000 m=1.388 1m/s h 3600s 1 km 3600 s
STEPS FOR SOLVING WORD PROBLEMS 1) List all the known and the unknown from the problem. 2) Select the best formula which uses the known and unknown. ( be careful of extraneous info.) 3) Substitute the information into the equation. 4) calculate 5) round with appropriate significant digits. 6) Write a sentence answer.
QUESTIONS Text Page 349 #1,3,4,6,7,8,9