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Statistics
The POWER of Data
Statistics: Definition
Statistics is the mathematics of the collection, organization, and interpretation of numerical data.
Data
• Data is information, in the form of facts or figures, used as a basis for making calculations or drawing conclusions
• Data can be quantitative or qualitative.
• Data can be obtained by a variety of methodologies:– Random Sample– Quadrat Study– Questionnaires– Experiments
Types of Data: Qualitative
• Information that relates to characteristics or descriptions (observable qualities)
• Examples– Species of plant– Type of insect– Shades of color– Rank of flavor in taste
testing
• Qualitative data can be “scored” and evaluated numerically
IB Junior Class
Qualitative data:• friendly demeanors • Hard workers • environmentalists • positive school spirit
Types of Data: Quantitative
• Quantitative – measured using a naturally occurring numerical scale
• Measurements are often displayed graphically
• Examples– Chemical
concentration– Temperature– Length– Weight…etc.
http://www.swiftchart.com/example.htm
Error Analysis• ALL measurements are subject to
uncertainties and this must always be stated.
– Measure someone’s height. Are they slouching? Wearing shoes? Standing on even ground? Is it morning or night?
– Measuring multiple times REDUCES the error!!
• The limits of the equipment used add some uncertainty to the data collected. All equipment has a certain magnitude of uncertainty. For example, is a ruler that is mass-produced a good measure of 1 cm? 1mm? 0.1mm?
• For quantitative testing, you must indicate the level of uncertainty of the tool that you are using for measurement!!
Instrument Error
Most measurements in the lab are done with devices that have a marked scale. Here we are measuring the length of a pendulum. Even using this idealized, zoomed-in picture, we cannot tell for sure whether the length to the end of the mass is 128.89 cm or 128.88 cm. However, it is certainly closer to 128.9 cm than to 128.8 cm or 129.0 cm. Thus we can state with absolute
confidence that the length L is 128.9cm + 0.1cm
Error and Electronics
• ALL devices have an error potential; sometimes it is written on the instrument itself
• The error of an electronic device is usually half of the last precision digit.
Error and Graphing
• Error bars are a graphical representation of the variability of data.
• Error bars may show confidence intervals, standard errors, standard deviations, range of data or other quantities.
• More trials = less error
Significant Figures
• Be sure that the number of significant digits in the data table/graph reflects the precision of the instrument used (for ex. If the manufacturer states that the accuracy of a balance is to 0.1g – and your average mass is 2.06g, be sure to round the average to 2.1g) Your data must be consistent with your measurement tool regarding significant figures.
Creating Error Bars on Graphs
• When we need an accurate measurement, we usually repeat the measurement several times and calculate an average value
• Then we do the same for the next measurement
Average
•Once the two averages are calculated for each set of data, the average values can be plotted together on a graph, to visualize the relationship between the two!
Comparing Averages
Creating Error Bars
The simplest way to draw an The simplest way to draw an error bar is to use the mean as error bar is to use the mean as the central point, and to use the central point, and to use the distance of the the distance of the measurement that is furthest measurement that is furthest from the average as the from the average as the endpoints of the data barendpoints of the data bar
Error Bars
• Error bars that overlap can suggest that there is not a significant difference
Other Data Calculations
• mode: value that appears most frequently
• median: When all data are listed from least to greatest, the value at which half of the observations are greater, and half are lesser.
• The most commonly used measure of central tendency is the mean, or arithmetic average (sum of data points divided by the number of points)
• You should be able to find the mean, mode and quartiles of your data and this should be shown on your graphs or in your data charts.
• 13, 18, 13, 14, 13, 16, 14, 21, 13
• mean: 15median: 14mode: 13range: 8
Standard Deviation
• Standard deviation is used to summarize the spread of values around the mean
• For normally distributed data, about 68% of all values lie within ±1 standard deviation of the mean. This rises to about 95% for ±2 standard deviations.
• A small standard deviation indicates that the data is clustered closely around the mean value.
• Conversely, a large standard deviation indicates a wider spread around the mean.
• Standard deviation can also be used in drawing error bars
Calculating Standard Deviation
• You can use the old formula for calculating standard deviation or the much easier calculator button!
• We will practice using the formula.
Calculating Standard Deviation
• Standard Deviation can be calculated:– on your calculator– In Microsoft excel (type the
following code into the cell where you want the standard deviation result, using the “unbiased,” or “n-1” method: STDEV(A1:A30) (substitute (substitute the cell name of the first the cell name of the first value in your dataset for value in your dataset for A1, and the cell name of A1, and the cell name of the last value for A30.)the last value for A30.)
– On your computer: On your computer: http://www.pages.drexel.edhttp://www.pages.drexel.edu/~jdf37/mean.htmu/~jdf37/mean.htm
Let’s measure some people!!
Is our data reliable enough to support a conclusion?
Imagine we chose two children at random from two class rooms…
210 211
… and compare their height …
210 211… we find that
one pupil is taller than the
other
WHY?
REASON 1: There is a significant difference between the two groups, so pupils in 211 are taller than
pupils in 210210
Ninth Grade
211
11th grade
REASON 2: By chance, we picked a short pupil from 210 and a tall one from 211
210 211
Heather
(11th grade)
Alex
(11th grade)
How do we decide which reason is most likely?
MEASURE MORE STUDENTS!!!
If there is a significant difference between the two groups…
210 211… the average or mean height of the two groups should
be very…
… DIFFERENT
If there is no significant difference between the two groups…
210 211… the average or mean height of the two groups should
be very…
… SIMILAR
Remember:
Living things normally show a lot of variation, so…
It is VERY unlikely that the mean height of our two samples will be exactly the same
211 Sample
Average height = 162 cm
210 Sample
Average height = 168 cm
Is the difference in average height of the samples large enough to be significant?
We can analyze the spread of the heights of the students in the samples by drawing histograms
Here, the ranges of the two samples have a small overlap, so…
… the difference between the means of the two samples IS probably significant.
2
4
6
8
10
12
14
16
Fre
quen
cy
140-149
150-159
160-169
170-179
180-189
Height (cm)
211 Sample
2
4
6
8
10
12
14
16
Fre
quen
cy
140-149
150-159
160-169
170-179
180-189
Height (cm)
210 Sample
Here, the ranges of the two samples have a large overlap, so…
… the difference between the two samples may NOT be significant.
The difference in means is possibly due to random sampling error
2
4
6
8
10
12
14
16
Fre
quen
cy
140-149
150-159
160-169
170-179
180-189
Height (cm)
211 Sample
2
4
6
8
10
12
14
16
Fre
quen
cy
140-149
150-159
160-169
170-179
180-189
Height (cm)
210 Sample
To decide if there is a significant difference between two samples we must compare the mean height for each sample…
… and the spread of heights in each sample.
Statisticians calculate the standard deviation of a sample as a measure of the spread of a sample
Sx =Σx2 -
(Σx)2 n
n - 1
Where:Sx is the standard deviation of sampleΣ stands for ‘sum of’x stands for the individual measurements in
the samplen is the number of individuals in the sample
You can calculate standard deviation using the formula
Student’s t-test
The Student’s t-test compares the averages and standard deviations of two samples to see if there is a significant difference between them.
We start by calculating a number, t
t can be calculated using the equation:
( x1 – x2 )
(s1)2
n1
(s2)2
n2
+
t =Where:
x1 is the mean of sample 1s1 is the standard deviation of sample 1n1 is the number of individuals in sample 1x2 is the mean of sample 2s2 is the standard deviation of sample 2n2 is the number of individuals in sample 2
Worked Example: Random samples were taken of pupils in 211 and 210
Their recorded heights are shown below…
Students in 211 Students in 210
Student Height (cm)
145 149 152 153 154 148 153 157 161 162
154 158 160 166 166 162 163 167 172 172
166 167 175 177 182 175 177 183 185 187
Step 1: Work out the mean height for each sample
161.60211: x1 = 168.27210: x2 =
Step 2: Work out the difference in means
6.67x2 – x1 = 168.27 – 161.60 =
Step 3: Work out the standard deviation for each sample
211: s1 = 10.86 210: s2 = 11.74
Step 4: Calculate s2/n for each sample
(s1)2
n1
=211:
10.862 ÷ 15 = 7.86
(s2)2
n2
=210:
11.742 ÷ 15 = 9.19
Step 5: Calculate (s1)2
n1
+(s2)2
n2
(s1)2
n1
+(s2)2
n2
= (7.86 + 9.19) = 4.13
Step 6: Calculate t (Step 2 divided by Step 5)
t =
(s1)2
n1
+(s2)2
n2
=
x2 – x1
6.67
4.13= 1.62
Step 7: Work out the number of degrees of freedom
d.f. = n1 + n2 – 2 = 15 + 15 – 2 = 28
Step 8: Find the critical value of t for the relevant number of degrees of freedom
Use the 95% (p=0.05) confidence limit
Critical value = 2.048
Our calculated value of t is below the critical value for 28d.f., therefore, there is no significant difference between the height of students in samples from 211 and 210
http://www.graphpad.com/quickcalcs/ttest1.cfm
Ethics in Statistics
• Statistics are funny things; they can be misused and used to prove almost anything.– 50% of the population
of the US has below average intelligence!
– 4 of 5 doctors recommend….
Ways of Misusing Data
• Recreate experiment until the numbers say what you want. (interview MANY groups of 5 dentists)
• NEVER IGNORE DATA THAT DOESN’T SEEM TO MATCH YOUR BELIEFS!!!!!
Misusing Data: Dos and Don’ts
• The amount of data matters! More data is more reliable
• Avoid bias! Don’t have a perceived idea of what will happen (this is hard!)
• Accidents occur! 5% of results are likely to happen by accident (False alarm probability)
• Don’t discard some data; all data is important even if unexpected.
• Don’t over generalize (All apples are red)• Don’t manipulate• Don’t make up “better” data
Misusing Data
• Correlations don’t equal Causation!!– Experiments don’t
PROVE; they merely suggest correlations
*People with more moles live longer.
Data Misuse Examples
• Bell Curve– There are substantial individual and group
differences in intelligence; these differences profoundly influence the social structure and organization of work in modern industrial societies, and they defy easy remediation.
FREAKONOMICS
• Schoolteachers and Sumo wrestlers have a lot in common.
• The Ku Klux Klan and Real Estate Agents work under the same principles
• Abortion lessons crime!• Do names matter?
– Low education parents: Ricky, Terry, Larry, Jazmine, Misty, Mercedes
– High education parents: Marie-Claire, Glynnis, Aviva, Finnegan, MacGregor, Harper
– ???: Loser, Winner, Temptress, Sir John, Precious