Module 8: Linear least squares regression practice problems


Module 8: Linear least squares regression practice problems

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Module 8: Linear least squares regression practice problems

Ordinary least squares estimators from intermediate values

(The attached PDF file has better formatting.)

** Exercise 1.1: Ordinary Least Squares Estimates

We have 4 pairs of points

i

Xi

Yi

1

0.5

1.5

2

1.0

2.5

3

1.5

3.5

4

2.0

5.5

Note that = 5.0, = 13.0, = 19.5, and = 7.5

What is (xi – )2?

What is (xi – )(yi – )?

What is B, the ordinary least squares estimate of â?

What is A, the ordinary least squares estimate of á?

Part A: Derive from and as

= – ()2 / N = 7.5 – 5.02 / 4 = 7.5 – 25/4 = 1.250

Part B: Derive from , , and .as

= – × / N = 19.5 – 5 × 13 / 4 = 3.250

Part C: B = = 3.250 / 1.250 = 2.600

Alternatively, we use the formula involving the expressions above:

B = =

= [ 19.5 – 4 × 5/4 × 13/4 ] / (7.5 – 4 × (5/4)2 ] = 2.600

Part D: B = 2.600, so A = – B× = ¼ × 13 – 2.6 × ¼ × 5 = 0.000.

Jacob: Could we also solve this problem by regressing the four y values on the four x values?

Rachel: This exercise is deliberately simple, so you can verity the computation using the intermediate values with a regression analysis (using Excel or R or any statistical package) of the four observations. Final exam problems may give just the intermediate values (not the raw observations), with an N or 100 or 200.


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