1 / 19

MEASUREMENT (A Quantitative Observation)

MEASUREMENT (A Quantitative Observation). MEASUREMENTS always have 2 things: Number & Unit All measurements have error in them! A measurement consists of all known digits that can be known accurately PLUS one digit that is ESTIMATED .

faraji
Download Presentation

MEASUREMENT (A Quantitative Observation)

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. MEASUREMENT(A Quantitative Observation) MEASUREMENTS always have 2 things: Number & Unit All measurements have error in them! A measurement consists of all known digits that can be known accurately PLUS one digit that is ESTIMATED. The estimated digit is always at the END of the number in a measurement.

  2. MEASUREMENT& Degrees of Error The closer a measurement is to the true value, the more accurate the measurement. Accurate measurements are “more correct” and closer to the true value. Accuracy = Correctness. How close a series of measurements are to one another is called precision. Precise measurements are close in value to one another; repeated measures are precise. Precision = Reproducibility.

  3. Accuracy vs. Precision Another example: a 5 lb bag of potatoes is weighed by 3 people, 3 times each. Person 1 4.9 lbs 4.8 lbs 4.85 lbs Person 2 4.0 lbs 3.5 lbs 5 lbs Person 3 4.0 lbs 4.1 lbs 4.2 lbs Good Accuracy Good Precision Poor Accuracy Poor Precision Poor Accuracy Good Precision

  4. Determining Error • Accepted value is the correct value based on reliable references. • Reference: boiling point of water is 100.0°C • Experimental value: temperature of boiling water measured to be 99.1°C • ERROR = experimental – accepted value

  5. ERROR = (99.1°C – 100.0 °C) = –0.9 °C • (-) means your measurement was less than the number of the true value. • (+) means your measurement is greater than the true value. • PERCENT ERROR is an absolute value: • %ERROR = (0.9/100) x 100 = 0.9%

  6. A way to express very large or very small numbers easily. Example: .0000000000000036333 seconds = 3.6333 x 10-15 seconds SCIENTIFIC NOTATION 9876500000000 minutes = 9.8765 x 1012 minutes

  7. Practice (1) .000565 g • 5.65 x 10-4 g (2) 565000 s • 5.65 x 105 s (3) 43454 min • 4.3454 x 104 min (4) .0010 L • 1.0 x 10-3 L

  8. Measurement Limitations ALL measurements have error in them! A measurement consists of all known digits that can be known accurately PLUS one digit that is estimated. The estimated digit is always at the end of the number in a measurement. All of the digits that are known in a measurement are significant figures. Fewer significant figures = more rounding in a measurement = more error.

  9. What are the following lengths (in meters)? (A) (B) (C)

  10. ANSWERS (A) 0.3 m (1 decimal place) (B) 0.26 m (2 decimal places) (C) 0.260 m (3 decimal places)

  11. What is the density of a sample with a mass of 24.47 g and a volume of 13.2 mL?  A.  1.9 g/mL    B.  1.8537 g/mL    C.  1.854 g/mL    D.  1.85 g/mL APPLYING SIG FIGS to MEASUREMENT: HINT: Your FINAL answer cannot be more accurate than the least accurate measurement.

  12. What is the density of a sample with a mass of 24.47 g and a volume of 13.2 mL?  A.  1.9 g/mL    B.  1.8537 g/mL    C.  1.854 g/mL    D.  1.85 g/mL APPLYING SIG FIGS to MEASUREMENT: Because 13.2 mL is accurate to only one decimal place, the answer can be no more accurate than one decimal place.

  13. Easy Rules To Sig Figs • ALL trailing zeros in a non-decimal are NOT significant (they act as placeholders only) • ALL leading zeros in a decimal are NOT significant (they act as placeholders only) • Sandwhiched zeros count (i.e. 101, 0.101) • In a decimal, if the zero in question has a number 1 thru 9 before it anywhere in the number, it is significant! (i.e. 0.000000100000)

  14. Putting It ALL Together

  15. the speed of light = 299 792 458 m / s 9 significant figures (sig figs) 2.99 792 458 x 108 m/s 8 sig figs = 2.99 792 46 x 108 m/s 7 sig figs = 2.99 792 5 x 108 m/s 6 sig figs = 2.99 792 x 108 m/s 5 sig figs = 2.99 79 x 108 m/s 4 sig figs = 2.99 8 x 108 m/s 3 sig figs = 3.00 x 108 m/s 2 sig figs = 3.0 x 108 m/s 1 sig figs = 3 x 108 m/s

  16. ROUNDING 123 456 789 • 123456790 • 123456800 • 123457000 • 123460000 • 123500000 • 123000000 • 120000000 • 100000000 = 1.2345679 x 108 = 1.234568 x 108 = 1.23457 x 108 = 1.2346 x 108 = 1.235 x 108 = 1.23 x 108 = 1.2 x 108 = 1 x 108

  17. Determine the Significant Figures • 1.0 blah • 100000000.0 blah • 100 blah • 100. blah • 0.10 blah • 0.01 blah • 0.010 blah • 101 blah

  18. Answers • 1.0 blah 2 sig figs • 100000000.0 blah 10 sig figs • 100 blah 1 sig fig • 100. blah 3 sig figs • 0.10 blah 2 sig figs • 0.01 blah 1 sig fig • 0.010 blah 2 sig figs • 101 blah 3 sig figs

  19. Answers in Scientific Notation • 1.0x 100 blah 2 sig figs • 1.000000000x 108 blah 10 sig figs • 1 x 102 blah 1 sig fig • 1.00x 102 blah 3 sig figs • 1.0 x 10-1 blah 2 sig figs • 1x 10-2 blah 1 sig fig • 1.0x 10-2 blah 2 sig figs • 1.01 x 102 blah 3 sig figs

More Related