Sunday, November 25, 2018

CHARACTERISTICS OF CORRELATIONAL DESIGN


CHARACTERISTICS OF CORRELATIONAL DESIGN
1.      Display of scores.(Scatterplot and Metrics)
2.      Association between scores.(Direction, Form and Strength)
3.      Multiple variable analysis.(Partial correlation and Multiple regression)

Display of scores
Plot the scores on a graph (Scatterplot) or present the scores in a table (correlation matrix.)

Scatterplot.
·         Researchers plot scores for two variables on a graph to provide a visual picture of the form of the scores.
·         This allows researchers to identify the type of association among variables and locate extreme scores.
·         Provide useful information about the form of association. Eg: scores are linear (straight line) curvilinear (U shaped).
·         Scatterplot are also called scatter diagram.
·          It is a pictorial image on a graph of two sets of scores for participants.

Correlation matrix.
·         A correlational matrix presents a visual display of scores of the correlation coefficients for all variables in a study. We list all variables on both a horizontal row and vertical column in the table.

Association between scores
After correlation researchers graph scores and produce a correlation matrix. They can then interpret the meaning of association between scores. This calls for understanding the direction of the association, the form of the distribution, the degree and strength of association.

            Direction of association.
·         It is very important to identify the intersection, or movement in a graph.
·         There is positive correlation and negative correlation.
·         Positive correlation – the points move the same direction. X increases Y also increases and X decreases Y also decreases.
·         Negative correlation ­­- the points moves opposite direction. When X increase Y decrease; X decrease, Y increase.

                        Form of the association.
                                    Correlational researchers identify the form of the plotted scores as linear or non linear.

(a)    Positive linear relationship
(b)   Negative linear relationship
(c)    No correlation
(d)   and (e) Curvilinear
Positive linear relationship
Low/high scores on one variable relate to low/high scores on the second variable.
Negative linear relationship
Low scores on one variable relate to high scores on the other variable.
No correlation
Scores on one variable does not tell us or predict any information about the possible scores on other variable.
Curvilinear
An increase, plateau, and decline in Y axis variable with the increasing values of the X axis variable.
Degree and strength of association.
The association between two variables or sets of scores is a correlation coefficient of -1 to +1, with 0.00 indicating no linear association at all. This association between two sets of scores reflects whether there is constant, predictable association between the scores.
If, correlation=  -1 or +1 = perfect linear correlation, values between -1 and +1 = predictable or constant, values are 0.00 = no linear or no relationship.
           
            Multiple variable analysis
In many correlational studies, researchers predict outcomes based on more than one predictor variable. Thus they need to account for the impact of each variable. Two multiple variable analysis approaches are partial correlation and multiple regression. Here predictor variable means independent variable.

            Partial correlation.
·         We study three, four or five variables as predictors of outcomes.
·         The type of variable called a ‘mediating’ or ‘intervening’ variable.
·         Stands between independent and dependent variable and influence them.
·         This variable is different from control variable that influence the outcomes in an experiment.
·         We use partial correlation to determine the amount of varience that an intervening variable explains in both in independent and dependent variable.
Multiple regression.
It is a statistical procedure for examining the combined relationship of multiple independent variable with a single dependent variable.




REFERENCE
John, W., Creswell. Educational research: planning, conducting and evaluating quantitative and qualitative research (4th ed.) 342-353