DECK 4: UNIT 2 - REGRESSION

Question 1

How do you describe a scatterplot?

Answer 1

DIRECTION

FORM

STRENGTH

and STRANGE

Question 2

describe a scatterplot’s strength?

Answer 2

give the r value (if straight),

or say…

“tightly packed… loosely packed”

Question 3

how do you describe direction?

Answer 3

positive or negative

Question 4

how do you describe form of a scatterplot?

Answer 4

straight or curved?

Question 5

Diff between association or correlation?

Answer 5

association is talking about a relationship.

If you see a pattern in the scatterplot, there is an association.

Correlation is an actual calculated number (two quantitative variables)

Question 6

Why is it called the “least squares regression line?”

the LSRL?

Answer 6

Because, after you find the mean-mean point, you fix the line so that it minimizes the squared vertical distancesto that line from each point.

It minimizes the squared residuals, the least squares….

Question 7

How do you find outliers in regression?

Answer 7

they don’t follow the “flow”

(pinky trick, cover with you pinky.. Then uncover.. Does it follow the flow?)

Question 8

What is homoscedasticity?

Answer 8

equal scatter along the regression line

Question 9

What values can r be?

Answer 9

from -1 to +1

(r near 0 is WEAK)

Question 10

What is the line that you plot?

Answer 10

IT IS A MODEL!

It is the LSRL and it is the model we are talking about

Question 11

what is a linear model?

Answer 11

It is an equation you can use or a line of a graph,

but it is just a model that says what kind of happens,

and can be used to ESTIMATE WHAT MIGHT HAPPEN

Question 12

What does r² tell us?

(r-squared)

Answer 12

It tells us the percent of variablility of y that is explained by the model with x.

Question 13

What if a scatterplot goes straight across horizontally?

Answer 13

NO ASSOCIATION.

That would be like height and IQ, they are independent so each height has about the same IQ.

Question 14

Does r² tell direction?

Answer 14

NO

r² is always positive, so you can’t use it to see if the relationship is negative.

Question 15

Can there be a correlation between grade and music preference?

Answer 15

No, music preference is categorical.

There is an association, however.

Question 16

Does the regression line (LSRL) go through a lot of points?

Answer 16

No, usually it goes through NONE!

It just goes through the center of the cloud of points.

Question 17

Does a high r value mean anything?

(can it look strong, but not be?)

Answer 17

Sure. It can. It tells you strength of LINEAR relationship.

BUT

CHECK THE SCATTER. One outlier or typo can make it look STRONG.

Question 18

what is the LSRL

Answer 18

the “least squares regression line”

that line you plot

OR

That equation

Question 19

What does r tell us?

Answer 19

The direction (+/-) and how strong a LINEAR relationship is between two QUANTITATIVE variables… (when linear)

Question 20

which is response?

Answer 20

y variable,

the Vertical axis..

It “responds” to the x

Question 21

Lurking variable: Why are there more ice cream sales on days that there are more surfing accidents? Is the ice cream putting surfers at risk?

Answer 21

The WEATHER is the lurking variable.

When it is a nice day, more surfers and more ice creams are sold.

So, the WEATHER causes both to go up and down together.

Question 22

Give example of incorrectly using the word “correlation”

Answer 22

“there is a correlation between gender and video game playing”

This person should say “association.”

You can’t say correlation because gender is categorical.

Question 23

what is b₁ and b_o ?

Answer 23

b₁ is the SLOPE,

b_o is the intercept.

Question 24

What’s wrong: Age and height have a correlation of 2.7

Answer 24

WRONG.

Correlation must be between 1 and -1

Question 25

What should we look for in resid plot?

Answer 25

Curve or pattern.

Also, it should have equalish scatter from left to right

It should look RANDOM

Question 26

What if the scatterplot is curved?

Answer 26

Either straighten the scatter and fit a line,

or keep it and fit a curve

Try quadreg, cubicreg, lnreg, logreg and check the graph and the r.

Question 27

What is extrapolation?

Answer 27

Making predictions outside of the x values you have.

Question 28

does correlation mean causation?

Answer 28

NO WAY DUDE

Question 29

What’s up with extrapolation? Is it OK?

Answer 29

Not ideal. Sometimes it’s all you can do, but state CAUTION.

Question 30

If something is associatied is it correlated?

Answer 30

Not necessarily.

It can be associated and have a zero correlation

( parabolic scatterplot)

or categorical variables.

Question 31

will residual plots always show outliers?

(will outliers always have large residuals?)

Answer 31

Not necessarily. Some points have so much leverage, they pull the line up to it…

Question 32

How is r calculated?

Answer 32

r = sum(Z_xZ_y) / (n-1)

it is the sum of rectangle areas on the standardizes Z axes

Question 33

How can you check for “straight enough?”

Answer 33

Residuals plot fool!

check the resids

Question 34

Give example of correlation without causation and explain the lurking variable.

Answer 34

Ski accidents are higher on days with more hot chocolate sales, therefore, hot chocolate must cause ske accidents. (lurking variable: the number of people on the mountain). What is happening is that on days when the mountain is crowded, there are more hot chocolate sales and more ski accidents. So the population on the mountain is causing both to rise and fall together.

Question 35

How do you make a residuals plot? (find RESID?)

Answer 35

stat>plot make a scatterplot, but instead of L1 vs L2, change L2 by putting cursor on it and going to 2nd>lists down to RESID.

You can plot L1 vs RESID

or you can plot L2 vs RESID

Question 36

What are some strong r values and some weak r values

Answer 36

Strong r values are close to 1 or -1, like -0.83 or 0.94. Weak r values are close to zero like 0.10 or -0.06

Question 37

What point is on every regression line?

Answer 37

the mean-mean point. (x bar, y bar).

This point is generally not one of the points on the scatterplot.

Usually none of the scatterplot points are on the regression line.

Question 38

Which is explanatory variable?

Answer 38

the x

the horizontal axis.

it “explains” what happens to y

Question 39

What do we look for in a residuals plot?

Answer 39

To proceed, it should look random.

if there is a pattern, then find a new model or proceed with caution.

Question 40

What is a residual?

Answer 40

Vertical distance to the LSRL.

ACTUAL-PREDICTED,

A-P, like this class AP (get it?)

Take y data found and from that, subtract the y you get from plugging the x into the model (equation).

Question 41

If something is correlated is it associated?

Answer 41

Yes.

If it is correlated then it must be associated.

However, if it is associated, it may not be correlated.

Question 42

is r sensitive to outliers?

Answer 42

yes. A single outlier can make it seem like there is a relationship ( if way out in x direction), or even seem like there is no relationship.

Question 43

what is leverage?

Answer 43

Far right or left from the middle.

leverage just means it is far away from x-bar

Some leverage points are not influential if they go along with the flow of the scatter.

Question 44

Interpret residual: Points below the line/negative resid

Answer 44

“the model overpredicted”

or

“Actual value was below the the expected (or predicted)”

Question 45

Interpret residual: Points above the line/positive resid

Answer 45

“the model underpredicted” or “actual performance was above the expected performance

Question 46

If r= 0.8.

An x value that is 2 standard deviations above the mean will have a predicted y value that is _______

Answer 46

1.6 standard deviations above the mean in the Y direction

Question 47

Does high r squared mean a good model?

Answer 47

CHECK SCATTER FIRST..

Make sure model “FITS” the data.

You should check your scatterplot and residuals plot to make sure model is appropriate and no outliers present… then it means something

So YES, but after you check the resids.

Question 48

How do you interpret slope?

Answer 48

For an increase of 1 [unit of x] there is an (increase/decrease) of [SLOPE] [units of y].

You can write “SLOPE UNITS Y/ ONE UNITS X” to help

Question 49

How do you interpret slope EQUATION?

rSy/Sx

Answer 49

for each increase of 1 st dev in x direction,

you go r st dev in y direction.

2st dev in x, you go 2r st. dev in y.

3st dev in x, you go 3r st. dev in y.

Question 50

what does influential mean?

Answer 50

It impacts the SLOPE.

It means that the point, when added or removed to data, will influence the SLOPE.

Generally these are outliers in the x direction. Far left or right.

Question 51

if you switch x and y does r change?

Answer 51

NO. The strength stays the same.

Question 52

Can you predict an X by using a Y?

Answer 52

NOT WITH THE SAME EQUATION!

BE CAREFUL!! Don’t just solve for x…

You have to change the entire equation and start from scratch.

(run LinReg L₂, L₁)

Question 53

Interpret r squared

Answer 53

r squared % of variability in y can be explained by the model with x. The rest is in residuals…

Question 54

If there is a crazy outlier, what can you do?

Answer 54

Run the analysis with and without the outlier and write about both.

Question 55

how do you interpret y intercept?

Answer 55

The model predicts that if there were no [x stuff] this is how much [y stuff] you’d have

Question 56

First step in interpreting slope

Answer 56

Write “slope units y over 1 unit x” and look at it.

Question 57

How do you get equation from computer output?

variable coeff indep: age

constant 7.2

Height 3.5

Answer 57

For this case:

age = 7.2 + 3.5 (height)

Question 58

If you switch x and y will slope change?

Answer 58

YES (but not just reciprocal)

slope is rsy/sx ,

to get new slope you can use shortcut:

r²/old slope

(reciprocal times r²)

Question 59

Computer ouput:

What does “constant” mean?

Answer 59

It is the y intercept

Question 60

Computer Output:

What is “S”

Answer 60

The average, or typical residual..

Standard deviation of the residuals

typical distance from actual value to the model’s prediction.

About how far off your prediction is likely to be.

Question 61

How do you undo squares or cubes?

like if you have x²= stuff

or x³= stuff

Answer 61

^ 1/2 or ^ 1/3

(raise stuff to these powers to get x)

Question 62

How do you undo sqrt when solving?

like

sqrt(x) = stuff

Answer 62

^2

(raise stuff to power of 2 to get x)

Question 63

How do you undo a log when solving?

log x = stuff

or

log x = m

Answer 63

10^ stuff

10^stuff

that will get you x

or

x= 10^m

Question 64

How can you straighten data?

Answer 64

Do stuff to the y (square it, root it, log it, etc) and recheck the plot. Remember to put the transformation into your equation. Example Sqrt y = 4.33 - 2.03 x

Question 65

How do you undo an ln (natural log) when solving?

ex: ln x = stuff
or: ln x = m

Answer 65

e^stuff

or

e^m

Question 66

if you mult or divide the x’s or y’s (shift/scale) does r change?

Answer 66

no. the strength remains the same. (If you log or square it, it will change, but just adding or multiplying won’t change it)

Question 67

What other regressions does your calculator do?

Answer 67

Quadreg, cubicreg, lnreg, etc.

just be careful when substituting while writing the equation given.

Question 68

Height and weight has an r value of 0.7. You would expect a person with a height that is 2 st. dev above the mean in height to have a weight that is only___St. Dev above the mean weight.

Answer 68

only 1.4 S.D above the mean for weight.

(for each SD in the x direction you change r SD in the y direction)

Question 69

How do you get equation from computer output?

variable coeff indep: doc

constant 0.005

genet - 0.233

Answer 69

doc = 0.005 - 0.233 (genet)

Question 70

How do you undo and exponent?

Example

stuff^x= other

a^x=b

Answer 70

log other / log stuff

that gives you x

or

x = (log b) / (log a)