Understanding Correlation, R-Square, and Linear Regression in Financial Analysis
Continuing our review of meta quiz topics, after discussing coefficient of determination and its relationships, let's explore the connection between correlation and R-square.
In simple linear regression, where we have a function like Y = aX + b with one independent variable X, we can examine the relationship between X and Y in two ways:
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Through Correlation:
- Calculate using: Correlation = Covariance(X,Y) / √(Variance(X) × Variance(Y))
- Correlation ranges between -1 and +1
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Through R-square:
- For simple linear regression with X and Y
- Take the square root of R-square to get the absolute value of correlation
- Use the slope coefficient (a) to determine if correlation is positive or negative
For example: If correlation is 0.8, then R-square = 0.8² = 0.64 This means X explains 64% of Y's variance
To find correlation from R-square:
- Take square root of R-square (√0.64 = 0.8)
- Look at slope coefficient (a):
- If a is positive: correlation = +0.8
- If a is negative: correlation = -0.8
This process helps determine both the strength and direction of the relationship between variables.