DECK 3: UNIT 1 part B

Question 1

When can you round?

Answer 1

AT THE VERY END!!! (keep at least 3 digits until end!)

Question 2

What is a standard deviation?

Answer 2

average (typical) distance to the mean (about). It is how far you expect a random value to be away from the middle.

Question 3

What is a Z score?

Answer 3

The number of standard deviaiton away from the mean

Question 4

For information purposes, which gives LEAST… stem-leaf, histogram or box-whisker?

Answer 4

Box/Whisker, BE CAREFUL. you really don’t know how things are distributed. The box and whisker and fish tank give a very GENERAL look.

Question 5

What is the mode?

Answer 5

the peaks of a histogram (the humps). or with categorical data, the most popular category

Question 6

What are the percentiles for Q1, med, and Q3?

Answer 6

25, 50 and 75

Question 7

How do students often mix up IQR and St. Dev

Answer 7

They INCORRECTLY think that Q1 is 1sd below the mean and Q3 is 1sd above the mean. THIS IS NOT TRUE!!! Q1 is only .67 sd above the mean and Q2 is .67 below

Question 8

Does the IQR capture 68% of the data?

Answer 8

NO. it catches the middle 50%.

Question 9

What percentile is the median (aka Q2)?

Answer 9

50th

Question 10

What percent of the data is between Q1 and Q3?

Answer 10

50%

Question 11

If the mean is above the median, the distribution may be

Answer 11

skewed right… the mean follows the tail

Question 12

Another name for “skewed right” is

Answer 12

positively skewed

Question 13

How many SD wide is the IQR in a normal distribution?

Answer 13

NOT 2!!!! Think about it. The middle 68% is 2 sd wide, since the IQR is only the middlest 50% it must be less than 2. try [invnorm(.75)] x2. You find that it is only 1.35 SD wide if the distribution is nearly normal.

Question 14

What symbols do we use for population mean and sample mean?

Answer 14

Mu for population mean, xbar for sample mean.

Question 15

What symbols do we use for population standard deviation and sample standard deviation?

Answer 15

Sigma for population and s for sample.

Question 16

What percent of the data is above Q3?

Answer 16

25%

Question 17

What percent of the data is below the median?

Answer 17

50%

Question 18

What is the difference between categorical VARIABLES and categorical DATA?

Answer 18

The Variable is the overall category. Like “EYE COLOR”. The data is the actual measurement from the subjects. Like “blue, brown, blue”

Question 19

How do you find percentiles and make a boxplot from OGIVE?

Answer 19

Go across till you hit the curve and then STRAIGHT DOWN!

Question 20

Can numbers be CATEGORICAL?

Answer 20

sure. Zip codes, sports jersey numbers, telephone numbers, social security nunmbers, area codes… these are categorical.

Question 21

what is the emperical rule?

Answer 21

mean 68-95-99.7 yeah!

Question 22

When drawing a normal model, what are the PERCENTILES from left to right?

Answer 22

2.5, 16, 50, 84, 97.5

Question 23

are any populations actually normal?

Answer 23

no, nothing is normal, just normalish. The only normal thing is the model we use.

Question 24

If the distribution is skewed (or outliers/not symmetric) what would you use for center and spread statistics?

Answer 24

Median (center) and IQR (spread)

Question 25

If the distribution is bimodal or multimodal, what would you use for center and spread statistics?

Answer 25

Talk about each mode (center) and maybe use the range or IQR. You could also say “one group seems to go from __ to __ and the other from about __ to __”

Question 26

What is the variance?

Answer 26

The average squared distance to the mean. Or the SD2 (It is the SD before you take the square root, so it is the stuff under the radical in the formula)

Question 27

mean/SD/median/IQR. How do I know which ones to use?

Answer 27

when unimodal and symmetric, mean and sd. If skewed or outliers? Median and IQR. If bimodal? Talk about the MODES

Question 28

What percentile is Q1?

Answer 28

25th

Question 29

How do you find the median from an OGIVE?

Answer 29

go halfway up the y axis, then shoot across to the curve, then straight down. It’s at the 50th percentile (halfway up)

Question 30

How do you find 5 number summary from OGIVE?

Answer 30

Split the y axis into quarters. Shoot out to the right from 0, .25, .50, .75 and 1.00 till you hit the line in the ogive, then go straignt down. Those numbers on the x axis below correspond to the 5 numbers.

Question 31

If the distribution is unimodal and symmetric, what would you use for center and spread statistics?

Answer 31

Mean (center) and Standard Deviation (spread)

Question 32

What symbols do we use for population proportion (%) and sample proportion (%)?

Answer 32

p for population and p-hat for sample

Question 33

Why are there different standard deviation formulas for population and sample? Arent they the same thing?

Answer 33

Both equations are actually doing the same thing. They both attempt to calculate the true population proportion. When you have all of the data from the population you just divide by n and get the actual SD. BUT If you only have a sample then you are using that to make a guess (inference) at what the population standard deviation is.. What happens is that samples tend to have less spread so their SD underestimates the population, BUT, when you divide by n-1 instead of n, It gives you a better estimate of what the population standard deviation is.

Question 34

Give a simple example showing that adding a constant doesn’t change the spread, but changes the center. (this always happens)

Answer 34

Data set: 1,2,3,4,5 Spread (range):4, Center: 3
add three and get new data set: 3,4,5,6,7 spread:4 Center: 5 (center went up, spread stayed the same). The IQR and SD will stay the same, but median and mean go up 3. Called shifting, or sliding the data.

Question 35

what happens if you multiply all of a data set by a constant? Think of an example

Answer 35

it is scaled Both center and spread are impacted. Mean/ median/ stand dev/ iqr/ quartiles all multiplied by that constant. Center, spread and all individual values are changed. Consider 1,2,3,4,5 mean of 3 and range of 4. Now multiply by 3: 3,6,9,12,15 and you get a mean of 9 and a range of 12… both multiplied by three.

Question 36

what happens if you ADD a constant to each value in a data set?

Answer 36

it is SHIFTED only. Does not impact spread. This effects all of the data values and measures of center (mean, med) and quartiles, deciles, etc, IT DOES NOT CHANGE THE SPREAD! (IQR, St Dev, Range all stay the SAME).

Question 37

what is a clear example of the medians resiliance and when you would use the median instead of the mean?

Answer 37

(change just the top value). Imagine if we asked eight people how much money they had in their wallet. We found they had {1, 2, 2, 5, 5, 8, 8, 9}. The mean of this set is 5, and the median is also 5. You might say “the average person in this group had 5 bucks.” But imagine the same group the next week, but one of them just got back from the casino and the dist was (1, 2, 2, 5, 5, 8, 8, 9000}, in this case, the median would still be 5, but the mean goes up to over 1000. Which number better describes the amount of money the average person in the group this time? 5 bucks or 1000 bucks? I think 5 is a better description of the average person in this group and the 9000 is simply an outlier.

Question 38

What does SHIFT and SCALE mean?

Answer 38

Shift is when you add or subtract, scale is when you multiply

Question 39

Think of the minimum value, the mean and the standard deviation, what is impacted by shifting (adding a constant)

Answer 39

adding a value shifts the entire histogram to the right, so the min and the mean will increase by that amount, BUT THE SD WILL NOT CHANGE.

Question 40

Think of the minimum value, the median and the IQR, which is impacted by shifting (adding a constant?)

Answer 40

adding a value shifts the entire histogram to the right, so the min and the median will increase by that amount, BUT THE IQR WILL NOT CHANGE.

Question 41

Think of the minimum value, the mean and the standard deviation, what is impacted by scaling (multiplying by a constant)

Answer 41

If you multiply a data set by a number, then the min, mean and the SD will multiply by that number.

Question 42

Think of the minimum value, the median and the IQR, which is impacted by scaling? (multiplying by a constant)

Answer 42

If you multiply a data set by a number, then the min, median and the IQR will multiply by that number.

Question 43

If a distribution is skewed right, what will be greater, the mean or median? WHY?

Answer 43

Mean. The mean moves further to the right to keep balance.

Question 44

How does multiplying by a constant impact the summary statistics of a data set? (or random variable)

Answer 44

It is SCALED. Both center and spread are effected. They all (mean, median, IQR, SD, range) get multiplied by three. (BE CAREFUL, remember the variance is the SD squared, so the variance gets multiplied by 9).

Question 45

How do you match OGIVES to histograms?

Answer 45

RECTANGLE DROP!!

Question 46

How are mean, median and mode positioned in a skewed left histogram?

Answer 46

goes in that order, mean median mode

Question 47

Which is more sensitive to outliers and skewed? Mean, median. Sd or IQR?

Answer 47

Mean and SD are most influenced by outliers. median and IQR are RESISTANT, RESILIENT, ROBUST!!

Question 48

what is the shortcut normcdf?

Answer 48

gives % from raw data, skips Z score. normcdf (low VALUE, high VALUE, mean, sd)

Question 49

what is the shortcut invnorm?

Answer 49

gives data value from percentile, skips Z score. Invnorm (percentile, mean, sd)

Question 50

Why do we plug 999 into normcdf?

Answer 50

It needs a z score, but we can’t plug in infinity. So we go down or up 999 standard deviations and that pretty much gets everything

Question 51

If you want to find percentile for a value, what do you put into normcdf (? ?)

Answer 51

find z score for value, and then normcdf (-999, Zright) like going from negative infinity up to the z score

Question 52

are there any normal samples?

Answer 52

no, nothing is normal, just normalish. The only normal thing is the model we use.

Question 53

If you want to calculate the probability (%) something falls between two values in a normal model, what do you do?

Answer 53

find z scores for both value, and then normcdf (Z LOW, Z HIGH )

Question 54

the output for normcdf(Zleft, Zright) is_______

Answer 54

the area under the normal curve between the given z scores

Question 55

If you want to find % below a value, what do put into normcdf (? ?)

Answer 55

find z score for value, and then normcdf (-999, Zright)

Question 56

What does normcdf do?

Answer 56

It gives you the area under the normal curve between any two z scores

Question 57

What does invnorm do?

Answer 57

It gives you the Z SCORE from a percentile

Question 58

What is the total area under the normal curve?

Answer 58

1 or 1.000

Question 59

Which calculator function gives you a z score?

Answer 59

invnorm(%ile)

Question 60

which calculator function gives you a percent?

Answer 60

normcdf(Z left, Z right)

Question 61

If you want to calculate % above a value, what do you put into normcdf(? ?)

Answer 61

find z score for value, and then normcdf (Z left, 999)