Week 10 Factor Analysis Principle Components Analysis (PCA) Flashcards

Question

Still with Factor Extraction, what does the Scree Plot tell us? (scree = waste)

Answer 1

The scree plot gives a visual representation of how many variables to keep. Where the two lines intersect indicates how many factors to keep and how many to discard (the scree – waste).

Answer 2

*by suppressing the values that are below .3 we are then able to make a more robust component

Answer 3

* a cross loading AKA a complex item: is one that loads on more than one component - it might be that it's not clear what it is tapping into, it also might be that it is tapping 2 items

Answer 4

* carefully look at each component & review the wording of each item. * What does the grouping of these items tell you about the factor so that you may label it? * Bear in mind where loadings are seen to greater on more than one component, this interpretation becomes complex.

Answer 5

* Consider what might Component 1 indicate after reading the information on each item? * Do same with Component 2 * it is important to reflect on what you would think would be appropriate labelling. * If on viewing the rotated components matrix there is a complex variable (e.g. Moon) which cross loads between the other two components. * carefully look at the wording and the intent of the question being posed in the questionnaire. * It might confuse things, so might delete it

Answer 6

Data summarization = derives underlying dimensions that, when interpreted and understood, describe the data in a much smaller number of concepts than the original individual variables. *NB bearly used now

Answer 7

Data reduction = extends the process of data summarization by deriving an empirical value (factor score or summated scale) for each dimension (factor) and then substituting this value for the original values. *NB: is the popular way to go

Answer 8

*The ultimate effect of rotating the factor matrix is to redistribute the variance from earlier factors to later ones to achieve a simpler, theoretically more meaningful factor pattern. Factor rotation = the reference axes of the factors are turned about the origin until some other position has been reached. *unrotated factor solutions extract factors based on how much variance they account for, with each subsequent factor accounting for less variance (less robust).

Answer 9

* Orthogonal rotation methods are the most widely used rotational methods. (Varimax & Promax) * Orthogonal the preferred method when data reduction is the research goal (to either a smaller number of variables or a set of uncorrelated measures for subsequent use in other multivariate techniques). *Oblique rotation methods are best suited to obtaining several theoretically meaningful factors or constructs as very few constructs in the “real world” are uncorrelated.

Answer 10

The major uses of factor analysis are to describe and summarize data (Questionnaire or instrument design). This done by grouping variables (items) that are similar together that are correlated.

Answer 11

The difference between PCA and Factor Analysis is related to variance. In PCA all variance is accounted for in the analysis, whereas in Factor analysis it is only shared variance that is explained.

Answer 12

Yes to find a simple structure or solution. It is often the case that the initial unrotated solution does not provide the simplest structure. Iterations occur that allow for the matrix to be rotated to provide the best grouping of variables.

Answer 13

*Extraction: PCA – the mathematically determined solution with the common, unique and error variances mixed into the components. *Whereas, Principal Factor Extraction estimates communalities in an attempt to eliminate unique and error variances from the variables. *Eigenvalues estimates the proportion of variance in the set of variables accounted for by a component. The eigenvalue divided by the number of variables in the set gives the percentage of variance – also known as Kaiser’s Criterion. *Alternatively, some look to the scree plot, there are a number of options suggested in this lecture. *Different references will suggest different ways of assessing the structure of the analysis.

Answer 14

Generally loadings above .3 are considered important enough to take into account. However, given we are looking for simple structure, Thurstone’s simple structure, so loadings above .3 should not be found on more than one factor.

Answer 15

A factor is labelled not with a convenient summary but a label that identifies the underlying structure of the group of items loading on the factor.

Answer 16

Factor scores are a standardised value that is the weighted according to the component or factor loadings, whereas summated ratings or scales only use the variables/items rating highly as a summative measure for all follow up analyses. * A summated scale is only as good as the items used to represent the construct. While it may pass all empirical tests, it is useless without theoretical justification. * Never create a summated scale without first assessing its unidimensionality with exploratory or confirmatory factor analysis. * Creating Summated Scales – combining several individual variables into a single composite measure. *Dimensionality – Items are unidimensional, strongly associated and measure a single scale. * Whereas, Computing Factor Scores – Factor loadings of all variables on the factor, whereas the summated scale is calculated by combining only selected variables.

Answer 17

*Check Multivariate outliers in Regression – pg 261, Hills *Mahalanobis Distance *Scores identified with MV outliers in excess of the critical value on χ2 of 29.588. Check the df (=number of items) (in this case 10) at p<.001. Our value is 31.127. Go to column to identify the extent of MV outliers. Perhaps sort values for this column making it easier to identify them. *What will you do & what criteria or reference will you use

Answer 18

* Examine Correlation Matrix need correlations above .3 * KMO check should be >.6 * Bartlett’s test of sphericity, should be sig. - Tests the HO that correlations are zero. * Communalities High communalities indicate good representation. * Check Total Variance explained. * Eigenvalue of a factor is the proportion of variance in the set of variables . * Kaiser’s criterion on number of components to retain. * Also check scree plot. Where lines intersect, is the suggested # of components to use, or are you going with Hair et al’s criteria. * Hills explains about the sq’d correlations being additive for SS of communalities

Week 10 Factor Analysis Principle Components Analysis (PCA) Flashcards

To provide an overview of Principle Components Analysis (PCA), which is a type of Factor Analysis (42 cards)