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I have two variables ENERGY and TEMP

I have created two other variables temp2 and temp 3

 > temp2 <- data$temp^2
 > temp3 <- data$temp^3
 >data=cbind(data, energy, temp,temp2,temp3)

Now to create a cubic model would it look just like a linear model?



Ok so I did what you suggested and this is the output:

 > ?poly
 > model<- lm( energy ~ poly(temp, 3) , data=data ) 
 > summary(model)

 lm(formula = energy ~ poly(temp, 3), data = data)

     Min      1Q  Median      3Q     Max 
 -19.159 -11.257  -2.377   9.784  26.841 

                Estimate Std. Error t value Pr(>|t|)    
 (Intercept)       95.50       3.21  29.752  < 2e-16 ***
 poly(temp, 3)1   207.90      15.72  13.221 2.41e-11 ***
 poly(temp, 3)2   -50.07      15.72  -3.184  0.00466 ** 
 poly(temp, 3)3    81.59      15.72   5.188 4.47e-05 ***
 Signif. codes:  0 ‘***’ 0.001 ‘**’ 0.01 ‘*’ 0.05 ‘.’ 0.1 ‘ ’ 1 

 Residual standard error: 15.73 on 20 degrees of freedom
 Multiple R-squared: 0.9137,    Adjusted R-squared: 0.9008 
 F-statistic: 70.62 on 3 and 20 DF,  p-value: 8.105e-11 

I would assume that I would test for the goodness of fit test the same way and look at the Pr(>|t|). This would lead me to believe that all of the variables are significant.

would I be able to use this fitted regression model to predict the average energy consumption for an average difference in temperature?

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You can also use lm(y ~ var + I(var^2) + I(var^3)). – Roman Luštrik Nov 11 '12 at 8:15

Instead of coding up dummy variable you should consider using the poly function:

?poly   # Polynomial contrasts
model<- lm( energy ~ poly(temp, 3) , data=data ) 

If you want to use the same columns as you would have gotten with the dummies approach (which is not good for statistical inference purposes), you can use the 'raw' parameter:

model.r<- lm( energy ~ poly(temp, 3, raw=TRUE) , data=data ) 

Predictions will be the same, but the standard errors will not. This should give you the same estimates as would be returned by @RomanLuštrik's suggestion. The terms will not be orthogonal, so their necessary correlations will be high and you will be unable to make correct inferences about independent effects.

Added question: "would I be able to use this fitted regression model to predict the average energy consumption for an average difference in temperature?"

No. You would need to specify a particular two temperatures and then predict could give you a difference, but that difference will vary depending on what the reference point is, even if the magnitude of the difference is the same.. That was a consequence of using a non-linear term. Maybe you should describe your goals and use a forum that is more geared to methods questions. SO is for coding when you know what you want to do. may be more appropriate when you have formulated your question with more clarity.

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Thanks for the response, I have updated my question with your recommendation. – Clay Nov 11 '12 at 7:50

There are two ways to do polynomial regression with lm:

lm( y ~ x + I(x^2) + I(x^3) )


lm( y ~ poly(x, 3, raw=TRUE) )

(That's cubic. I'm sure you can generalise to quartic, quintic, etc.)

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