Which person is more overweight?
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Which person is more overweight?. - PowerPoint PPT Presentation
Transcript of Which person is more overweight?
http://www.google.com/imgres?um=1&hl=en&biw=1280&bih=518&tbm=isch&tbnid=dNfWVpb9fRhIZM:&imgrefurl=http://www.telegraph.co.uk/health/dietandfitness/5291684/Parents-think-their-overweight-children-are-normal-size.html&docid=HtoEfnu-K5RLjM&imgurl=http://i.telegraph.co.uk/multimedia/archive/01398/obese_father_son_1398520c.jpg&w=460&h=288&ei=0PidT4atK4Sk8gSamb2bDw&zoom=1&iact=hc&vpx=104&vpy=161&dur=3221&hovh=178&hovw=284&tx=119&ty=200&sig=115570204253221903032&page=1&tbnh=146&tbnw=215&start=0&ndsp=11&ved=1t:429,r:0,s:0,i:68
Which person is more overweight?
http://en.wikipedia.org/wiki/Skewness Normal DistributionBell Curve
The mean is below the median The mean is above the median
34 % 34 %
13.5%13.5%2% 2%
.5% .5%
Mean
0-4 5-9 10-14 15-19 20-25 26-30 30 +0
1
2
3
4
5
6
Years of Teaching Experienc e at Forsyth High School
<5051-60
61-7071-80
81-90
91-100
101-110
111-120
121-130
131-140
141-150>150
05
101520
IQ's of Randomly Selected People
Number of Shoes Owned per Person
Frequency
0-5 1
6-10 6
11-15 10
16-20 11
21-25 9
>26 8
Determine if the following examples are Normally Distributed, Positively Skewed, or Negatively Skewed.
Place the following under negatively skewed, normally distributed, or positively skewed, or
random?A) The amount of potato chips in a bag
B) The sum of the digits of random 4-digit numbers?
C) The number of D1’s that students in this class have gotten?
D) The weekly allowance of students
E) Age of people on a cruise this week
Which of the following best describes the ages of people on Earth?
A. Positively SkewedB. Negatively SkewedC. Normally Distributed
Understanding the Mean
7
2009 3.17c
Taken from Virginia Department o f Education “Mean Balance Point”
Where is the balance point for this data set?
X
XXX X X
8Taken from Virginia Department o f Education “Mean Balance Point”
Where is the balance point for this data set?
XXXX X
X
9Taken from Virginia Department o f Education “Mean Balance Point”
Where is the balance point for this data set?
X
XXX XX
10Taken from Virginia Department o f Education “Mean Balance Point”
Where is the balance point for this data set?
XXX
XXX
11Taken from Virginia Department o f Education “Mean Balance Point”
Where is the balance point for this data set?
XXX
X
X
X
3 is theBalance Point
12Taken from Virginia Department o f Education “Mean Balance Point”
Where is the balance point for this data set?
X
XXX X X
13
MEANSum of the distances above the mean2 + 3 = 5
Sum of the distances below the mean1+1+1+2 = 5
Taken from Virginia Department o f Education “Mean Balance Point”
4 is the Balance Point
Move 2 Steps
Move 2 Steps Move 2 Steps
Move 2 Steps
Where is the balance point for this data set?
14Taken from Virginia Department o f Education “Mean Balance Point”
The Mean is the Balance Point
We can confirm this by calculating:
2 + 2 + 2 + 3 + 3 + 4 + 5 + 7 + 8 = 36
36 ÷ 9 = 4
15
The Balance Point is between 10 and 11 (closer to 10). Move 2 Steps
Move 2 StepsMove 1 Step
Move 1 Step
Where is the balance point for this data set? If we could “zoom in” on the
space between 10 and 11, we could continue this process to arrive at a decimal value for the balance point.
16Taken from Virginia Department o f Education “Mean Balance Point”
• Place the 9 sticky notes as a group so that exactly 3 are ‘16’, and one is ’12’. Place the remaining five numbers so that the balance point is 16. Then find the sum of deviations from the center.
• Place the 9 sticky notes as a group so that exactly 1 is ‘11’, two are ‘17’ and two are ’16’. None of the remaining ones have ’16’ Place the remaining four numbers so that the balance point is 16. Then find the sum of the deviations from the center.
Taken from Virginia Department o f Education “Mean Balance Point”
Standard deviation: Sx for a sample size (we’ll use) for the population.Way to measure the variability. Closer to zero is better!
xZscore: How many standard deviations something is from the mean. The higher the absolute value of it, the more unique it is. Score= Z*(Std. dev) + mean
Variability: How far the data is spread out
Which of the following will have the highest variability?
A. [Heights of people in this room]B. [Ages of people in this room]C. [The number of countries that people have
been to in this room?]
Variability: How close the numbers are together.
Which would have a lower standard deviation? (Be prepared to explain):
A. [The heights of students in this class]B. [The heights of students in this school]
21
Sum of Distances from Center: -2,-2,-2,-1,-1,0,1,3,4 = 0 Sum of Squares of distances: 4,4,4,1,1,0,1,9,16=40 from center: Average (with one less member) of the squares of the distance from the center: VARIANCE 40/8=5Square root of the VARIANCE: 2.23 so the STANDARD DEVIATION (Sx) is 2.23
Now find the STANDARD DEVIATION of your Poster
Calculator Method • To Find the Standard Deviation and Mean• 1) Put the numbers into STAT EDIT• 2) Do STAT CALC 1-VAR STATS.• The is the “mean”• The Sx is the standard deviation we will use• The n is the amount of data (good way of checking)• The ‘med’ is the median (scroll down)
To find the % of people within a certain range:• NORMALCDF (lower value, upper value, mean,
standard deviation) To find the percentile: The lower value is 0• NORMALCDF (0, upper value, mean, standard
deviation)
x
Grams of FatBig Mac: 31BK Whopper: 46Taco Bell Beef Taco: 10Subway Sub w/toppings: 44.5Dominoes Med. Cheese Pizza: 39KFC Fried Chicken: 19Wendy’s Hamburger: 20Arby’s Roast Beef Sandwich: 19Hardee’s Roast Beef Sandwich: 10Pizza Hut Medium Cheese Pizza: 39
Taken from Core Plus Mathematics
1) What is the mean and standard deviation?
2) What percentage of these items have between 25-35 grams of fat?
3) What percentile is a Big Mac?
27.75; 13.86
NormalCDF(25,35,27.75,13.86)= 27.8%
NormalCDF(0,31, 27.75, 13.86)= 57.0%
The following is the amount of black M&M’s in a bag: 12, 13,14, 15, 15, 16, 17, 20, 21,22,23,24,25
Find the mean and standard deviation
A. [18.23, 4.46]B. [18.23, 4.28]
http://en.wikipedia.org/wiki/File:Standard_deviation_diagram.svg
Normal DistributionBell Curve
The SAT’s are Normally Distributed with a mean of 500 and a standard deviation of 100.A) Give a Title and fill in the bottom row
SAT Scores
B) What percentage of students score above a 600 on the SAT? C) What percentage of students score between 300 and 500?D) If Jane got a 700 on the SAT, what percentile would she be?E) Mt. Tabor has 1600 students, how many students are expected to get at least a 700?F) What is the Zscore of 300?G) What is the percentile of a student who got a 550 on the SAT?
H) What percentage of students got between a 650 and 750 (use the calculator)
15.847.7
100-2.2= 97.8
.022*1600 = 35 students-2
NormalCDF(0,550,500,100)=69.14 NormalCDF(650,750,500,100)=6.1
34 %34 %
13.5%13.5%2% 2%.5% .5%
5000600 700 800500 200 300 400
5000
The IQ’s are Normally Distributed with a mean of 100 and a standard deviation of 16.667.
IQ’s of Humans
100 116.7 133.3 150 50 66.7 83.3
A) What percentage of people have an IQ below 66.7? B) A genius is someone with IQ of at least 150? What percentage?C) If Tom’s IQ is 83.3, what percentile would he be?D) Spring School has 1000 students, how many students are expected to have at least a 133.3 IQ? E) What number represents a Z-score of 1.5?
2.2.1
15.8
.022 * 1000 = 22100+1.5(16.667) = 125
The following is the amount of black M&M’s in a bag: 12, 13,14, 15, 15, 16, 17, 20, 21,22,23,24,25
What percentage is above 22.6 black M&M’s (use the bell curve)?
15.80.3
Adult female dalmatians weigh an average of 50 pounds with a standard deviation of 3.3 pounds. Adult female boxers weigh an average of 57.5 pounds with a standard deviation of 1.7 pounds. The dalmatian weighs 45 pounds and the boxer weighs 52 pounds. Which dog is more underweight? Explain using z scores
http://www.rossmanchance.com/applets/NormalCalcs/NormalCalculations.html
One way to measure light bulbs is to measure the life span. A soft white bulb has a mean life of 700 hours and a standard deviation of 35 hours. A standard light bulb has a mean life of 675 hours and a standard deviation of 50 hours. In an experiment, both light bulbs lasted 750 hours. Which light bulb’s span was better?
http://www.rossmanchance.com/applets/NormalCalcs/NormalCalculations.html
Memory GameDog, cat, monkey, pig, turtle, apple, melon, banana, orange, grape, desk, window, gradebook, pen, graph paper,Stove, oven, pan, sink, spatula,Shoes, tie, bracelet, necklace, boot
A) Find the mean and standard deviation with your calculatorB) Is it positively skewed, negatively skewed, or normally skewed?C) Find your percentile:
Debate:
• Side 1) You are trying to convince your teacher to always curve test grades to a standard deviation
• Side 2) You are trying to convince your teacher to never curve test grades to a standard deviation
A) Describe in words how to find the standard deviation.
B) What happens to the standard deviation as you increase the sample size?
C) Which measures of variation (range, interquartile range, standard deviation) are resistant to outliers. Explain
D) If a deviation of a data point from the mean is positive, what do you know about its value? What if the deviation is zero?
E) What do you know about the sum of all the deviations of the mean?
F) Suppose you have two sets of data with an equal sample size and mean. The first data set has a larger deviation than the second one. What can you conclude?
Summarize the Mathematics
Think back to the two overweight people shown on the first slide. How could we now determine which one is more overweight?
