Measurement Accuracy & Precision.

Slides:

Advertisements

Similar presentations

Scientific Notation, Conversions and Significant Digits

Advertisements

IB Chem I Uncertainty in Measurement Significant Figures.

Accuracy, Precision, Signficant Digits and Scientific Notation.

Aim: How can we perform mathematical calculations with significant digits? Do Now: State how many sig. figs. are in each of the following: x 10.

IN THE CHEMISTRY SECTION OF YOUR NOTEBOOK, TAKE CORNELL STYLE NOTES OVER THE INFORMATION PRESENTED IN THE FOLLOWING SLIDES. Measurements in Chemistry Aug.

The Scientific Method 1. Using and Expressing Measurements Scientific notation is written as a number between 1 and 10 multiplied by 10 raised to a power.

I II III I. Using Measurements CH. 2 - MEASUREMENT.

Measurement book reference p Accuracy  The accuracy of the measurement refers to how close the measured value is to the true or accepted value.

Measurement book reference p Accuracy  The accuracy of the measurement refers to how close the measured value is to the true value.  For example,

Significant Figure Notes With scientific notation too.

1 Significant Figures Significant figures tell us the range of values to expect for repeated measurements The more significant figures there are in a measurement,

Significant Figures What do you write?

Significant Figures and Scientific Notation Significant Figures:Digits that are the result of careful measurement. 1.All non-zero digits are considered.

Significant Figures Rules and Applications. Rules for Determining Significant Figures 1.) All Non-Zero digits are Significant. 1.) All Non-Zero digits.

Significant Figures 1.All non-zero digits are significant (2.45 has 3 SF) 2.Zeros between (sandwiched)non- zero digits are significant (303 has 3 SF)

Measurements in Chemistry Scientific notation and Significant Figures.

Chemistry 100 Significant Figures. Rules for Significant Figures  Zeros used to locate decimal points are NOT significant. e.g., 0.5 kg = 5. X 10 2 g.

Significant Figure Rules. Rule Number 1 All non zero digits are significant. Examples 1179 – 4 significant figures significant figures

Measurements in Chemistry Aug 6, 2014 In the chemistry section of your notebook, Take Cornell style notes over the information presented in the following.

Drill – 9/14/09 How many significant figures: Now complete the back of the measurement worksheet from last week (the graduated.

IDENTIFYING AND CALCULATING WITH SIG DIGS Significant Digits.

Uncertainty in Measurement. Significant Figures #1 All non-zero digits are significant. Examples

Significant Figures. Rule 1: Digits other than zero are significant 96 g = 2 Sig Figs 152 g = __________ Sig Figs 61.4 g = 3 Sig Figs g = __________.

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

SIGNIFICANT FIGURES Rules for Significant Figures.

Significant figures A significant figure represents an actual measurement A measurement of all the digits known with certainty, plus one that is estimated.

Rules for Significant Figures

Unit 3 lec 2: Significant Figures

Rules for Significant Figures

Math of Chem I Textbook Chapter 1 Aim:

Significant Figure Rules

Significant Figures Sig Figs.

Significant figures A significant figure represents an actual measurement A measurement of all the digits known with certainty, plus one that is estimated.

Measurement: Significant Figures

Warm –up #2 What is chemistry? Write what you recall about the definition and name 2 areas of study of chemistry.

Class Notes: Significant Figures

Put lab sheet on corner of your desk for me to pick up “Significant Figures” Do these in composition book: – X

Introduction to Chemistry Part 2

(sig figs if you’re cool)

Our Friends, the Significant Figures

Notes Significant Figures!.

Scientific Notation Scientific notation takes the form: M x 10n

Significant Figures General Chemistry.

Significant Digits.

Significant Digits.

Significant figures RULES TO MEMORIZE!.

SIGNIFICANT FIGURES& SCIENTIFIC NOTATION

Significant Figures All non-zero digits are significant (2.45 has 3 SF) Zeros between (sandwiched)non-zero digits are significant (303 has 3 SF)

Unit 1 lec 3: Significant Figures

Introduction to Significant Figures &

-Accuracy & Precision - Significant Digits -Scientific Notation

Significant Measurements

Measurement book reference p

Section 2-3 Using Measurements

5. Significant Figures- = represent the valid digits of a measurement and tells us how good your instrument is.

CH. 2 - MEASUREMENT I. Using Measurements.

MEASUREMENT Using Measurements C. Johannesson.

Accuracy vs. Precision & Significant Figures

CH. 2 - MEASUREMENT I. Using Measurements.

Using Significant Digits

Objectives C-1.1 Apply established rules for significant digits, both in reading a scientific instrument and in calculating a derived quantity from measurement.

Significant Figures.

Significant Figures & Scientific Notation

I. Using Measurements (pp )

Aim: How do we determine the number of significant figures in a measurement? Warm Up What is the difference between the values of 3, 3.0, and 3.00.

Uncertainty in Measurement

SCIENTIFIC NOTATION 5.67 x 105 Coefficient Base Exponent

SIGNIFICANT FIGURES. Significant Figures Instruments are only so precise. The number of digits reported are considered significant figures. There are.

Significant Figures.

Our Friends, the Significant Figures

Presentation transcript:

Measurement Accuracy & Precision

Accuracy How close a measurement is to the actual value

Precision How close a series of measurements are to each other o

Significant figures We get sig figs from the idea that we can only be a precise as our least precise measurement. Basically, sig figs tell us how Exact our numbers are!

Rules for identifying sig figs All NON-zero digits are significant All zeros between 2 non-zero digits are significant Zeroes to left of understood decimal point are NOT SIGNIFICANT! Ex) 23.45 (4 SF’s) Ex) 2002 (4 SF’s) Ex) 12.002 (5 SF’s) Ex) 1200 (2 sig figs)

Sig figs (cont) 200. (3 SF’s) 12320. (5 SF’s) 0.00045 (2 SF’s) 4. All zeros to the left of a expressed decimal point are significant if number is greater than 1 5. All zeros to right of a decimal point, but left of non-zero digit are NOT SIGNIFICANT! (if number is less than 1) 200. (3 SF’s) 12320. (5 SF’s) 0.00045 (2 SF’s) 0.01 (1 SF)

Sig figs (cont) 0.0300 (3 SF’s) 0.02000 (4 SF’s) 6. All zeros to right of decimal and right of non zero digit are significant 0.0300 (3 SF’s) 0.02000 (4 SF’s)

Sig figs (cont) Ex) 5.334 X 103 (4 SF’s) Ex) 3.00 X 10-5 (3 SF’s) 7. All digits expressed in front of power of 10 in Scientific Notation are significant. Ex) 5.334 X 103 (4 SF’s) Ex) 3.00 X 10-5 (3 SF’s)

Identifying Practice 5.550 g 100 hs 3450 dg 0.000023404 cg 7.650 mm 400. L 230.00 das 3.45 X 1012 kg 9.240 X 10-2 cs 4 1 3 5

Identifying Extra Practice 7.00 0.001 400 21004004 .00340 4.56 X 104 1200. 2300.01 3 1 8 4 6

Rounding For each of the following numbers, round to 3 sig figs .0037421 cm 1367 dg 128,522 kL 1.6683 106 mm 1.56 m .00374 cm 1370 dg 129000 kL 1.67 X 106 mm

Rounding Extra Practice 4500 cs (1) 39020 dg (3) 0.004530 mm (2) 0.000897 kg (2) 450.0069 g (5) 12890 hg (2) 0.00045682 ms (1) 129.95 kL (4) 5000 cs 39000 dg 0.0045 mm 0.00090 kg 450.01 g 13000 hg 0.0005 ms 130.0 kL

S.F. Multiplication/Division Answer can only have the same quantity of sig figs as the least significant number used in the calculation Ex:) 5.33 X 1.2 = 6.396 * Answer can only have 2 S.F.’s, so the answer must be rounded to 6.4

Multiplication/Division Practice Complete the following: 38 g  22.4 g 48.3 mm / 12.0 mm 3.47 cm / 40 cm 428.3 mL  2.4 mL 850 g 4.03 mm 0.09 cm 1000 mL

Addition & Subtraction 2 D.P. FOCUS ON DECIMAL PLACES!! The answer can only have the same number of decimal places as the number used to obtain it with the fewest decimal places 35.09 + 0.2350 35.3250 (Answer can only have 2 D.P) In sig figs= 35.33 4 D.P.

Problems 22.3 cm + 3.45 cm 7.2 s + 15 s 6.0 kg – 5.34 kg 48 m – 0.0025 m 25.8 cm 22 s 0.7 kg 48 m