Measurement and the Metric System

1. Measurement and the Metric System

2. Standards of Measure • One cubit ?

3. Standards of Measure

4. Standards of Measure • When two people work together, they should both use the same standards of measure.

5. Standards of Measure • http://news.bbc.co.uk/1/shared/spl/hi/sci_nat/03/race_to_mars/timeline/html/1999.stm • September 1999Another Nasa space craft, Mars Climate Orbiter, is lost as it arrives at the Red Planet. A mix-up over units for a key space craft operation is blamed - one team used English units while the other used metric.

6. SI Units

7. Derived SI Units • http://physics.nist.gov/cuu/Units/SIdiagram.html

8. Prefixes for SI Units • http://en.wikipedia.org/wiki/SI • http://en.wikipedia.org/wiki/SI_prefix

9. Prefixes for SI Units • http://en.wikipedia.org/wiki/SI_prefix

10. Metric System • During the 1790s, a decimal system based on our number system, the metric system, was being developed in France. • Easy to use • Easy to remember • Uses prefixes, that made the basic units larger or smaller by multiples or fractions of 10 • For example: 1km = 1000 m = 10,000 dm = 100,000 cm 1 mi = 1760 yd = 5280 ft = 63,360 in • The only country left behind is the USA.

11. Imperial and U.S. customary systems of measurement • http://en.wikipedia.org/wiki/Comparison_of_the_Imperial_and_US_customary_systems • Both the Imperial (UK and Canada) and U.S. customarysystems of measurement derive from earlier English systems. • Comparison of Imperial and U.S. volume measures 1 liquid U.S. gallon = 3.785 411 784 litres ≈ 0.833 Imperial gallon 1 Imperial gallon = 4.546 09 litres ≈ 1.201 liquid U.S. gallons On January 1, 1983, the metric systems and SI units were introduced in Canada.

12. Scientific Notation • Scientists often use very large or very small numbers that can not be conveniently written as fractions or decimal fractions. • For example, the thickness of an oil film on water is about 0.0000001 m • In scientific notation it is 1 x 10-7 m 0.1 = 1 x 10-1 0.001 = 1 x 10-3 10,000 = 1 x 104

13. Systems of Measurement United States Customary System (USCS) • Formally called British System • Used in the US and Burma • Length: foot • Weight/force: pound • Time: second Systeme International (SI) • Also called the Metric or International System • Used everywhere else in the world!

14. Systeme International (SI)

15. SI Conversions • Major advantage – the decimal system – all digits are related to one another – multiples of 10! 1 kilometer = 1000 meters = 100,000 cm 1 meter = 100 cm = 0.001 kilometer

16. Scientific Notation 0.1 = 1 x 10-1 0.001 = 1 x 10-3 10,000 = 1 x 104 • Any number can be written as a product of a number between 1 and 10 and a power of 10. • In general, M x 10n; Where M, is the a number between 1 and 10 and n, is the exponent or power of 10.

17. Metric Length • The basic SI unit of length is the metre (m). • Originally 1m = distance from the equator to either pole/10,000,000 • “The metre is the length pf path traveled by light in a vacuum during a time interval of 1/299,792,458 s • Km • m • cm

18. Conversion Factor • A conversion factor is an expression used to change from one unit to another. • Expressed as a fraction whose numerator and denominator are equal quantities in two different units. • The information necessary for forming a conversion factor is usually found in their conversion table as follows: 1 m = 100 cm • So, the conversion factors are: 1 m and 100 cm 100 cm 1 m

19. Conversion using Conversion Factor • So, convert 5m to cm: 5 m x 100 cm = 500 cm 1 m Where the unit of the denominator should be the same as the original unit, so they cancels out. • So, convert 7 cm to m: 7 cm x 1 m = 0.07 m 100 cm

20. Conversion using units value Or, it can be converted as follows: 5 m = 5 x 1 m = 5 x 100 cm = 500 cm Similarly, 7 cm = 7 x 1 cm = 7 x 1 m = 0.07 m 100 1 m = 100 cm • 100 cm = 1 m • Therefore, 1 cm = (1/100) m

21. Metric-English Conversion To change from an English unit to a metric unit or from a metric unit to an English unit, we use a conversion factor, from the relation 1 in = 2.54 cm. • So, the conversion factors are: 1 in and 2.54 cm 2.54 cm 1 in

22. Area • The area of a plane surface is the number of square units that it contains. • To measure the surface area of an object, you must first decide on a standard unit of area. • Standard units of area are based on the square of standard lengths, for example 1 square m.

23. Area • Find the area of a rectangle 5 m long and 3 m wide. • By simply counting the number of squares, we find the area of the rectangle is 15 m2. • Or, by using the formula A = l x w = 5 m x 3 m = (5 x 3) (m x m) = 15 m2

24. Volume • The volume of a figure is the number of cubic units that it contains. • Standard units of volume are based the cube of standard lengths, such as cubic meter, cubic cm, cubic in.

25. Volume • Find the volume of a rectangular prism 6 cm long, 4 cm wide, and 5 cm high. • To find the volume of the rectangular solid, count the number of cubes in the bottom layer and then multiply by the number of layers. • Or, V = l w h = 6 x 4 x 5 cm x cm x cm = 120 cm3

26. Mass • The mass of an object is the quantity of material making up the object. • One unit of mass in the metric system is the gram (g). • The gram is defined as the mass of 1 cm3 of water at its maximum density (at 4 C). • Since the gram is so small, kg is the basic unit of mass in SI (Système international d'unités) .

27. Weight • The weight of an object is a measure of the gravitational force or pull acting on an object. • The weight unit in the metric system is the newton (N). • An apple weighs about one newton. • A newton is the amount of force required to accelerate a mass of one kilogram by one meter per second squared. 1 N = 1 kg·m/s² • The pound (lb), a unit of force, is one of the basic English system units. It is defined as the pull of the earth on a cylinder of a platinum-iridium alloy that is stored in a vault at the U.S. Bureau of Standards. • 1 N = 0.225 lb • 1 lb = 4.45 N

28. kg with weight • When the weight of an object is given in kilograms, the property intended is almost always mass. • Occasionally the gravitational force on an object is given in "kilograms", but the unit used is not a true kilogram: it is the deprecated kilogram-force (kgf), also known as the kilopond (kp). • An object of mass 1 kg at the surface of the Earth will be subjected to a gravitational force of approximately 9.80665 newtons (the SI unit of force). • http://en.wikipedia.org/wiki/Kilogram • http://en.wikipedia.org/wiki/Newton

29. Time • The basic unit of time is second (s) in both system. • It was defined as 1/86400 of a mean solar day. • Now the standard second is defined more precisely in terms of frequency of radiation emitted by cesium atoms when they pass between two particular states; that is , the time required for 9,192,631,770 periods of this radiation.

30. Electrical Units • The ampere (A) is the basic unit and is measure of the amount of electric current. Derived units are: Columb (C) – is a measure of the amount of electrical charge Volt (V) – is a measure of electric potential Watt (W) - is a measure of power

31. Accuracy vs. Precision • Accuracy: A measure of how close an experimental result is to the true value. • Precision: A measure of how exactly the result is determined. It is also a measure of how reproducible the result is. • Absolute precision: indicates the uncertainty in the same units as the observation • Relative precision: indicates the uncertainty in terms of a fraction of the value of the result

32. Accuracy • Physicists are interested in how closely a measurement agrees with the true value. • This is an indication of the quality of the measuring instrument. • Accuracy is a means of describing how closely a measurement agrees with the actual size of a quantity being measured.

33. Error • The difference between an observed value and the true value is called the error. • The size of the error is an indication of the accuracy. • Thus, the smaller the error, the greater the accuracy. • The percentage error determined by subtracting the true value from the measured value, dividing this by the true value, and multiplying by 100.

34. Error

35. Significant Digits • The accuracy of a measurement is indicated by the number of significant digits. • Significant digits are those digits in the numerical value of which we are reasonably sure. • More significant digits in a measurement the accurate it is:

36. Significant Digits • More significant digits in a measurement the accurate it is: E.g., the true value of a bar is 2.50 m Measured value is 2.6 m with 3 significant digits. The percentage error is (2.6-2.50)*100/2.50 = 4% E.g., the true value of a bar is 2.50 m Measured value is 2.55 m with 3 significant digits. The percentage error is (2.55-2.50)*100/2.50 = 0.2% Which one is more accurate? The one which has more significant digits

37. Rules for Determining “Significant Digits” • All non zero digits are significant • All zeros between significant non zero digits are significant. 450.09  5 significant digits • A zero in a number (> 1) which is specially tagged, such as by a bar above it, is significant. 250,000  3 significant digits • Zeros at the right in whole number. 5600  2 significant digits • All zeros to the right of a significant digits and a decimal point. 5120.010  7 significant digits • Zeros at the left in measurements less than 1 are not significant. 0.00672  5 significant digits

38. Determine the “Accuracy” and “Precision” 3463 m 4 S.D.s 1m 3005 km 36000  8800 V 1349000 km 0.00632 kg 0.0060 g 14.20 A 30.00 cm 100.060 g 6 SDs 0.001 g 0.00004 m 2.4765 m

39. Precision • Being precise means being sharply defined. • The precision of a measuring instrument depends on its degree of fineness and the size of the unit being used. • Using an instrument with a more finely divided scale allows us to take a more precise measurement.

40. Precision • The precision of a measuring refers to the smallest unit with which a measurement is made, that is, the position of the last significant digit. • In most cases it is the number of decimal places. e.g., • The precision of the measurement 385,000 km is 1000 km. (the position of the last significant digit is in the thousands place.) • The precision of the measurement 0.025m is 0.001m. (the position of the last significant digit is in the thousandths place.)

41. How precise do we need? • Physicists are interested in how closely a measurement agrees with the true value. • That is, to achieve a smaller error or more accuracy. • For bigger quantities, we do not need to be precise to be accurate.

42. How precise do we need? • For bigger quantities, we do not need to be precise to be accurate. E.g., the true value of a bar is 25 m Measured value is 26 m with 2 significant digits. The percentage error is (26-25)*100/25 = 4% E.g., the true value of a bar is 2.5 m Measured value is 2.6 m with 2 significant digits. The percentage error is (2.6-2.5)*100/2.5 = 4% Which one is more precise? The one which has the precision of 0.1m Which one is more accurate? Both are same accurate as both have 2 significant digits

43. Accuracy or Relative Precision • An accurate measurement is also known as a relatively precise measurement. • Accuracy or Relative Precisionrefers to the number of significant digits in a measurement. • A measurement with higher number of significant digits closely agrees with the true value.

44. Estimate • Any measurement that falls between the smallest divisions on the measuring instrument is an estimate. • We should always try to read any instrument by estimating tenths of the smallest division.

45. Accuracy or Relative Precision • In any measurement, the number of significant figures are critical. • The number of significant figures is the number of digits believed to be correct by the person doing the measuring. • It includes one estimated digit. • A rule of thumb: read a measurement to 1/10 or 0.1 of the smallest division. • This means that the error in reading (called the reading error) is 1/10 or 0.1 of the smallest division on the ruler or other instrument. • If you are less sure of yourself, you can read to 1/5 or 0.2 of the smallest division. • http://www.astro.washington.edu/labs/clearinghouse/labs/Scimeth/mr-sigfg.html

46. Exact vs. Approximate numbers • An exact number is a number that has been determined as a result of counting or by some definition. • E.g., 41 students are enrolled in this class • 1in = 2.54 cm • Nearly all data of a technical nature involve approximate numbers. • That is numbers determined as a result of some measurement process, as with a ruler. • No measurement can be found exactly.

47. Calculations with Measurements • The sum or difference of measurements can be no more precise than the least precise measurement. 54 mm Using a ruler, Precision of the ruler is 1 mm But actually it can be anywhere between 53.50 to 54.50 mm 42.28 mm Using a micrometer This means that the tenths and hundredths digits in the sum 96.28 mm are really meaningless, the sum should be 96 mm with a precision of 1 mm

48. Calculations with Measurements • The sum or difference of measurements can be no more precise than the least precise measurement. • Round the results to the same precision as the least precise measurement. 54 mm Using a ruler, Precision of the ruler is 1 mm But actually it can be anywhere between 53.50 to 54.50 mm 42.28 mm Using a micrometer This means that the tenths and hundredths digits in the sum 96.28 mm are really meaningless, the sum should be 96 mm with a precision of 1 mm

49. Calculations with Measurements • The product or quotient of measurements can be no more accurate than the least accurate measurement. • Round the results to the same number of significant digits as the measurement with the least number of significant digits. • http://www.astro.washington.edu/labs/clearinghouse/labs/Scimeth/mr-sigfg.html Length of a rectangle is 54.7 m Width of a rectangle is 21.5 m Area is 1176.05 m2 Area should be rounded to 1180 m2 To express with same accuracy

50. Rounding Numbers • To round a number to a particular place value: • If the digit in the next place to the right is less than 5, drop that digit and all other following digits. Replace any whole number places dropped with zeros. • If the digit in the next place to the right is 5 or greater, add 1 to the digit in the place to which you are rounding. Drop all other following digits. Replace any whole number places dropped with zeros