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Pertemuan 12Regresi Linear dan Korelasi

Matakuliah : I0262 – Statistik Probabilitas

Tahun : 2007

Versi : Revisi

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Learning Outcomes

Pada akhir pertemuan ini, diharapkan mahasiswa

akan mampu :

• Mahasiswa akan dapat menghasilkan persamaan regresi dugaan untuk peramalan.

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Outline Materi

• Konsep dasar : regresi dan korelasi

• Metode kuadrat terkecil

• Inferensia koefisien regresi dan ramalan

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Simple Linear Regression

• Simple Linear Regression Model• Least Squares Method • Coefficient of Determination• Model Assumptions• Testing for Significance• Using the Estimated Regression Equation

for Estimation and Prediction• Computer Solution• Residual Analysis: Validating Model Assumptions• Residual Analysis: Outliers and Influential Observations

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The Simple Linear Regression Model

• Simple Linear Regression Model

y = 0 + 1x +

• Simple Linear Regression Equation

E(y) = 0 + 1x

• Estimated Simple Linear Regression Equation

y = b0 + b1x

^̂

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Least Squares Method

• Least Squares Criterion

where:

yi = observed value of the dependent variable

for the ith observation

yi = estimated value of the dependent variable

for the ith observation

min (y yi i )2min (y yi i )2

^̂

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• Slope for the Estimated Regression Equation

• y-Intercept for the Estimated Regression Equation

b0 = y - b1xwhere:

xi = value of independent variable for ith observation

yi = value of dependent variable for ith observation x = mean value for independent variable

y = mean value for dependent variable n = total number of observations

________

bx y x y n

x x ni i i i

i i1 2 2

( )/

( ) /b

x y x y n

x x ni i i i

i i1 2 2

( )/

( ) /

____

The Least Squares Method

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Contoh Soal: Reed Auto Sales• Simple Linear Regression

Reed Auto periodically has a special week-long sale. As part of the advertising campaign Reed runs one or more television commercials during the weekend preceding the sale. Data from a sample of 5 previous sales are shown below.

Number of TV Ads Number of Cars Sold1 143 242 181 173 27

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• Slope for the Estimated Regression Equation

b1 = 220 - (10)(100)/5 = 5

24 - (10)2/5

• y-Intercept for the Estimated Regression Equation

b0 = 20 - 5(2) = 10

• Estimated Regression Equation

y = 10 + 5x^̂

Contoh Soal: Reed Auto Sales

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Contoh Soal: Reed Auto Sales

• Scatter Diagram

y = 5x + 10

0

5

10

15

20

25

30

0 1 2 3 4TV Ads

Ca

rs S

old

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The Coefficient of Determination

• Relationship Among SST, SSR, SSE

SST = SSR + SSE

• Coefficient of Determination

r2 = SSR/SST

where:

SST = total sum of squares

SSR = sum of squares due to regression

SSE = sum of squares due to error

( ) ( ) ( )y y y y y yi i i i 2 2 2( ) ( ) ( )y y y y y yi i i i 2 2 2^̂^̂

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• Coefficient of Determination

r2 = SSR/SST = 100/114 = .8772

The regression relationship is very strong since 88% of the variation in number of cars sold can be explained by the linear relationship between the number of TV ads and the number of cars sold.

Contoh Soal: Reed Auto Sales

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The Correlation Coefficient

• Sample Correlation Coefficient

where:

b1 = the slope of the estimated regression

equation

21 ) of(sign rbrxy 21 ) of(sign rbrxy

ionDeterminat oft Coefficien ) of(sign 1brxy ionDeterminat oft Coefficien ) of(sign 1brxy

xbby 10ˆ xbby 10ˆ

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Contoh Soal: Reed Auto Sales

• Sample Correlation Coefficient

The sign of b1 in the equation is “+”.

rxy = +.9366

21 ) of(sign rbrxy 21 ) of(sign rbrxy

ˆ 10 5y x ˆ 10 5y x

=+ .8772xyr =+ .8772xyr

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Model Assumptions

• Assumptions About the Error Term – The error is a random variable with mean of

zero.– The variance of , denoted by 2, is the

same for all values of the independent variable.

– The values of are independent.– The error is a normally distributed random

variable.

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• Selamat Belajar Semoga Sukses.