Experiment #2 – Measurements, Accuracy, and Precision

Laboratory Overview

CHEM 1361

August 2010

Gary S. Buckley, Ph.D.Department of Physical Sciences

Cameron University

PowerPoint Notes

Each lab will be accompanied by a short PowerPoint presentation showing some of the basic ideas of the lab. Viewing is optional to you, but it may give a better idea of what the key aspects of the experiments are if you view the slide show in advance. It may also help with the prelabs.

This first one runs a little long – 17 slides. Most will be on the order of ten slides. If you are running this as a pdf document (Adobe Reader) you may not have the functionality available through the other avenues.

If you are running any of the versions other than pdf simply hit the F5 function key to start the show or Shift-F5 to start from a particular slide. For pdf just hit the Page Down key to advance.

If you have problems with the slide show, please don’t hesitate to contact me.

Dr. Buckleygbuckley@cameron.eduPhone: 580-581-2885

Learning Objectives

•Measure and record length and volume measurements to the proper number of significant figures

•Select the most appropriate piece of lab glassware to make volume measurements to desired accuracy

•Arithmetically manipulate measured quantities to report calculated results to the proper number of significant figures

•Use basic statistical concepts of mean and standard deviation to evaluate precision of measurements

•Work with density to determine volume from mass

Table of Contents (you may click on any of the topics below to go directly to that topic)

•Digital vs. Analog Devices

•Significant Figures

•Using the Balance

•Types of Glassware and its Use

•Glassware Designations

•Measuring and Reading Liquid Volumes

•Density Background

•Accuracy and Precision

•Basic Statistics – Average and Standard Deviation

Digital vs. Analog DevicesThe Definitions

Digital device – a device that indicates the measured quantity directly in numbers. Examples: digital balance, digital thermometer

Analog device – a device that measures continuous information. Examples: a ruler, a mercury-filled thermometer, a bathroom scale with a needle

Digital Balance

Ruler – example of an analog device

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Digital vs. Analog DevicesReading the Devices

A digital device is simply read by recording the indicated digits in its display. The reading on the balance to the right would be recorded as 0.00 g.

An analog device is read by estimating the reading to one decimal place BETWEEN the markings on the device. The reading of the edge of the paper on the ruler below would be recorded as 94.05 cm, or 94.06 cm, or 94.07 cm. The last digit is an estimate and may differ from one person to another.

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Significant Figures

Significant figures in a measurement indicate the precision to which the measurement was made.

In the case of a digital device, all of the digits are considered to be significant and are recorded even if there are trailing zeroes.

With an analog device, the number of significant figures is considered to be the number of divisions on the device plus the one additional figure that is always estimated. For example, on the ruler below the reading might be 94.06 cm, which indicates four significant figures. If the paper had been right on the 94 cm mark, the reading would have been recorded as 94.00 cm, still showing four significant figures.

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Increasing the Number of Significant Figures

The only way to increase the number of significant figures in a measurement is to increase the precision of the measuring device. Consider the picture below with three different markings on the meter sticks.

•Top stick. One estimates the reading for the edge of the paper as, perhaps, 0.94 m. This gives two significant figures, one more decimal place than the markings on the stick.

•Middle stick. The reading on this stickappears to be 94.1 cm, giving threesignificant figures.

•Bottom stick. The reading on this stickappears to be 94.05 cm, giving foursignificant figures.

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Using the Digital Balance

Using the digital balances is pretty straightforward :

•Bring your lab book with you to the balance.•Push the On button to turn the balance on.•Push the →O/T← button to set the balance reading to zero.•Be sure the units on the balance show g, not N. If N shows instead of g, hit the button once to get g.•Place your object on the balance. •When the reading stabilizes, record all of the digits in the balance window in your lab book immediately.

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Types of Glassware and its Use

Three basic functions of glassware:

•Holds liquids without measurement – e.g., beaker

•Holds a fixed volume of liquid, used for preparing solutions, transferring a predetermined volume – e.g., volumetric flasks, volumetric pipettes

•Graduated to allow the measurement of a range of volumes that are contained or delivered – graduated cylinder, buret, Mohr pipet

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Types of Glassware and its Use

•Hold liquid without measurement – the markings on the sides are only very crude measures

•Hold a fixed volume

•Deliver or measure a range of volumes

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BeakerErlenmeyer Flask

Volumetric Flask

Graduated Cylinder

Glassware Designations

Often glassware will be marked with the designation of either TC (To Contain) or TD (To Deliver). There is sometimes a statement indicating an uncertainty in the volume of the vessel and the temperature of the calibration .

Meaning of TC and TD:

•TC (To Contain): Accurate delivery from this sort of vessel requires draining all of the liquid out of the vessel. An example is a volumetric flask.

•TD (To Deliver): These vessels are designed so that the calibrated volume is delivered if no special action is taken to remove remaining liquid. Examples are burets, volumetric pipets, graduated cylinders Return to Table of Contents ↑

Measuring and Reading Liquid Volumes

Measuring liquid volumes requires observance of the meniscus. The meniscus is the result of the adhesive forces of the liquid for the glass compared to the cohesive forces between molecules in the liquid. Some liquids will have a meniscus that curves upward, some downward. The figure to the right illustrates the appearance of the meniscus for water. Volume readings are taken at the bottom of the meniscus.

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Meniscus

Reading: 1.40 mL(Notice this buret has increasing volumes as you go down so the reading is between 1 and 2 mL.)

Density

Density is defined to be the mass of a sample of a substance divided by its volume. In mathematical terms,

If one knows the mass and density of a substance, the volume may be determined by rearranging the above expression to:

massdensity

volume

massvolume

density

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Accuracy and Precision

Measurements in the laboratory are an attempt to find the “real” value of a physical quantity. Two terms used in relation to measurement are:

•Accuracy – the nearness of the measured value to the “real” value

•Precision – the nearness of repeated measurements to each other

Note that a measured result may be accurate, but not precise; not accurate, but precise; both accurate and precise; or neither accurate nor precise.

The next couple of slides give one method for considering accuracy and precision.

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Measures of Accuracy and Precision

Average or mean – the average, sometimes called the mean, is simply the sum of repeated attempts to measure the same quantity divided by the total number of attempts.

Standard deviation – the standard deviation is an indication of the precision of repeated measurements. If one takes N measurements of the same physical quantity , the standard deviation, s, is given by:

where xi represents the ith measurement and x represents the average of all of the measurements.

2

1

( )

1

N

i

i

x x

sN

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Accuracy and Precision – An Example

0.1042 0.1004 0.10330.1026

3

M M Mx M

Suppose you had measured the molarity of a solution (doesn’t matter if you know what molarity is yet or not) and determined the three values of 0.1042 M, 0.1004 M, and 0.1033 M. The average is given by:

The standard deviation would be calculated as:

The result would be reported as 0.1026 ± 0.0020 M, or more properly as 0.103 ± 0.002 M as we try to keep one significant figure in the standard deviation and round the average to match that number of decimal places.

(If you are on your toes, you may find your calculator is capable of doing these calculations if you can figure out how to make it work!)

2 2 2(0.1042 0.1026) (0.1004 0.1026) (0.1033 0.1026)0.0020

3 1s M

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