exam 3

Question 1

Define ANOVA

Answer 1

Analysis of variance between groups

Question 2

Why use ANOVA?

Answer 2

To test more than two groups as opposed to T-test which test only for two groups. The difference between the two groups is that ANOVA compares the difference of more than 2 means while T test compares only the difference between 2 means.
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Question 3

Objective of ANOVA

Answer 3

Test for the difference between the means of two or more groups on one factor/dimension/variable. Each group is only tested once.

Question 4

Question to ask when using ANOVA

Answer 4

is there a difference between the means of the different groups? And is this difference more than we would expect by chance?

Question 5

Hypothesis and ANOVA

Answer 5

Null Hypothesis: There is no difference between groups on variable/measure X except that which is expected by chance.
H0: u1 = u2 = u3
Research Hypothesis: There is a difference between groups on variableX that is more than what is expected by chance; There is at least one difference that is significant. H1: x1 ≠ x2 ≠ x3

Question 6

Hypotheses and ANOVA notes

Answer 6

–(this does not tell us which one of the three differences is responsible for the rejection of the null. It could be one of the three, it could be all of the three)
–“More than what is expected by chance” – we interpret this to mean that it is due to the grouping variable.
Non-directional. All ANOVAs are non-directional.

Question 7

Types of ANOVA we will use

Answer 7

1) Simple Analysis of Variance/one-way analysis of variance

2) Factorial design

Question 8

Simple analysis variance-ANOVA

Answer 8

Where there is one factor or one treatment variable i.e. group membership, this is also called one-way analysis of variance because there is only one grouping dimension.

Question 9

Factorial design-ANOVA

Answer 9

Factorial ANOVA (e.g. 3x2): Effect of exercise (high, medium, low impact) on weight loss by gender.
–Factor 1 (Independent Variable)Treatment (high/medium/low impact exercise)
–Factor 2 (Independent Variable)Gender (male/female)
–Weight Loss Outcome (Dependent Variable)
–Questions to be answered: Main effect of exercise? Main effect of gender? Interaction between exercise & gender?

Question 10

COMPUTING ANOVA

Answer 10

•F Test Statistic

F = MSBetween / MS Within

Question 11

Logic behind this ratio: (test statistics)

Answer 11

• Mean squares are estimates of variance
• Within Group Variance is Due to Chance (individual difference)
• Between Group Variance is due to the grouping category (Independent Variable)
• An increasing F value…

Question 12

STEPS to compute ANOVA

Answer 12

1)A statement of Null and Research Hypotheses
Null H0:  u1 = u2 = u3
 Research H1:  x1 ≠ x2 ≠ x3
2)Level of risk .05 (always)
3)Test statistic  ANOVA 
F =  MSBetween / MS Within
4)Compute the test statistics value

Question 13

•The F ratio definition:

Answer 13

Ratio of variability between groups to variability within groups. To get this we compute the sum of squares for each group of variability between groups; within groups; and the total

Question 14

explain between Groups:

Answer 14

The sum of the differences between the mean of all scores and the mean of each group’s score, squared. (How different is each group’s mean from the overall mean?)

Question 15

explain Within Groups:

Answer 15

The sum of the differences between each individual score in a group and the mean of each group, squared. (How different is each score in a group from the group mean?)

Question 16

Total in ANOVA means:

Answer 16

The sum of the between-group and within-group sum of squares

Question 17

Total sum of squares in ANOVA means:

Answer 17

Sum between –group and within-group sum of square

Question 18

Degrees of freedom definition

Answer 18

approximation of the sample or the group size

Question 19

There are 2 sets of degrees of freedom for ANOVA

Answer 19

• between group k-1 (k equals the number of groups)– groups minus 1
• within group N-k (N equals the total sample size) - total number of people in groups

Question 20

Post-Hoc Comparisons after fact

Answer 20

Each mean is compared with each other mean, type I error is controlled by SPSS (Bonferonni)
Use if you get a significant F; it gives you more info on where the groups lie; and helps you know where that difference is.

Question 21

results Interpretation: (ANOVA)

Answer 21

State out what test you were performing, give the results and then interpret it.

Question 22

LINEAR REGRESSION

Answer 22

1) Regression: is a statistical prediction. It happens when data used on past events such variable correlations1 are applied to future events given the knowledge of only one variable.

Question 23

explain Prediction

Answer 23

using a set of previously collected data, to calculate how correlated the variables are with one another.

Question 24

prediction requirements

Answer 24

we need an already established correlation and we need to have data on one of the variables. The higher the coefficient, the more accurate the prediction is of one variable from the other based on that correlation.

Question 25

Purpose

Answer 25

Regression uses our knowledge of relationships between variables to predict the value of one variable from another

Question 26

regression line

ne

Answer 26

•(RG): reflects our best guess as to what score on the Y variable (dependent variable/when you will dye) would be predicted by a score on the X variable (independent variable/amount of cigarettes smoked). It is the line drawn based on the values in the regression equation
allows us our best guess at estimating

Question 27

What is another name for the regression line?

Answer 27

the line of best fit, because it minimizes the distance between each individual point and the regression line minimizes the error in prediction.

Question 28

What is an error in prediction

Answer 28

Directly related to correlation, it is the distance between each individual data. QuestionWhat would the line look like if the correlation was perfect?

Question 29

What is the role of the Regression equation?

Answer 29

It allows us to plot this line correctly.

The equation that defines the points and the line that are closes to the actual scores.

Question 30

Regression equation

Answer 30

Y’ = bX + a
a&b could be calculated from data
Y ‘= dependent variablethe predicted score or criterion
X = independent variablethe score being used as the predictor (you know this value)
b = the slope direction and “steepness” of the line
a = the interceptpoint at which the line crosses the y-axis
X Y X2 Y2 XY

Question 31

How to calculate the Slope and Intercept From your Data

Answer 31

B=∑ XY– [(∑ X* ∑Y)/n] / ∑X2 – [(∑ X)2/n]

A = ∑ Y – b(∑ X) / n

Question 32

How good is our prediction?

Answer 32

• Look at the absolute value of the correlation our prediction is based on
• Look at the difference between the predicted value (Y’) and the actual value (Y) from the data set.–>error of estimate

Question 33

What is an error of estimate?

Answer 33

the difference between the predicted value (Y’) and the actual value (Y) from the data set.

Question 34

What is a MULTIPLE REGRESSION?

Answer 34

Predicting an outcome from 2 or more variables rather than one.

Question 35

Multiple regression equation

Answer 35

Y’ = bX1 + bx2 + a
X1value for the first independent variable
X2value for the second independent variable
bregression weight for each variable

Question 36

Rules for the new independent variables

Answer 36

• should be adding something unique to the equation
• should be correlated to dependent variable (should share something in common)
• The 2 (or more) variables should be independent from each other, but related to the outcome variable.

Question 37

What is a Chi Square?

Answer 37

non-parametric tests that allow you to determine if what you observe in a distribution of frequencies (i.e. rates, percentages, looking at fair allocation) is what would be expected by chance alone.

Question 38

Types of Chi-Square

Answer 38

One Sample vs. Two Sample Test: Number of Dimensions

i.e. average GPA and average GPA by college level

Question 39

how do you Compute a Chi Square

Answer 39

You can easily compute what you would expect by chance

Compares what is observed in the data by what would be expected by chance

Question 40

CHI SQUARE equation

Answer 40

X2 = ∑ (O-E)2/ E

∑=summation sign
X2 = Test statistic
O = Observed Frequency
E = Expected Frequency (By chance)

Question 41

STEPS TO COMPUTE Chi Square

Answer 41

• Null and Research Hypothesis (Words and Symbols)
• Compute the Test Statistic
• Determine if it is significant or not
• Write a 2-3 sentence results section, including a numerical X2 statement.

Question 42

Hypotheses

Answer 42

Null hypothesis H0: P1 = P2 = P3 percentage of occurrence in any one category
Research hypothesis  H1: P1  P2  P3states that there is a difference in the frequency/proportion of occurrences in each category

Question 43

How to Compute the Test Statistic?

Answer 43

Test Statistic
category Observed Expected Difference D squared D squared/E
Total Total=Obtained value

Question 44

Significant?

Answer 44

•Determine if it is significant or not
Degrees of freedom r-1 (r equals rows)
Obtained value exceeds the critical valuesignificantreject NULLaccept researchresults not due to chance
Obtained value below the critical valuenon-significantaccept NULLresults due to chance

Question 45

Write a 2-3 sentence results

Answer 45

In Chi square The Null hypothesis is we expected it to be chance
Do not say there will be equal; because it is already said use equal rates instead.
The research hypothesis  rates not due to chance

Question 46

numerical X2 statement.

Answer 46

x2(2) = 20.6, p < .05
•x2  represents the test statistic
•2 is the number of degrees of freedom
•20.6 is the obtained value
•p < .05 is the probability