I am trying to get an lm fit for my data. The problem I am having is that I want to fit a linear model(1st order polynomial) when the factor is "true" and a second order polynomial when the factor is "false". How can I get that done using only one lm.

```
a=c(1,2,3,4,5,6,7,8,9,10)
b=factor(c("true","false","true","false","true","false","true","false","true","false"))
c=c(10,8,20,15,30,21,40,25,50,31)
DumbData<-data.frame(cbind(a,c))
DumbData<-cbind(DumbData,b=b)
```

I have tried

```
Lm2<-lm(c~a + b + b*I(a^2), data=DumbData)
summary(Lm2)
```

that results in:

```
summary(Lm2)
Call:
lm(formula = c ~ a + b + b * I(a^2), data = DumbData)
Coefficients:
Estimate Std. Error t value Pr(>|t|)
(Intercept) -0.74483 1.12047 -0.665 0.535640
a 4.44433 0.39619 11.218 9.83e-05 ***
btrue 6.78670 0.78299 8.668 0.000338 ***
I(a^2) -0.13457 0.03324 -4.049 0.009840 **
btrue:I(a^2) 0.18719 0.01620 11.558 8.51e-05 ***
---
Signif. codes: 0 ‘***’ 0.001 ‘**’ 0.01 ‘*’ 0.05 ‘.’ 0.1 ‘ ’ 1
Residual standard error: 0.7537 on 5 degrees of freedom
Multiple R-squared: 0.9982, Adjusted R-squared: 0.9967
F-statistic: 688 on 4 and 5 DF, p-value: 4.896e-07
```

here I have I(a^2) for both fits and i want 1 1st order and another with second order polynomials. If one tries with:

```
Lm2<-lm(c~a + b + I(b*I(a^2)), data=DumbData)
Error in `contrasts<-`(`*tmp*`, value = contr.funs[1 + isOF[nn]]) :
contrasts can be applied only to factors with 2 or more levels
In addition: Warning message:
In Ops.factor(b, I(a^2)) : * not meaningful for factors
```

How can I get the proper interaction terms here???

Thanks Andrie, there are still some things I am missing here. In this example the variable b is a logic one, if is a factor of two levels does not work, I guess I have to convert the factor variable in a logic one. The other thing I am missing is the not in the condition, I(!b*a^2) without the ! I get:

```
Call: lm(formula = c ~ a + I(b * a^2), data = dat)
Coefficients: Estimate Std. Error t value Pr(>|t|)
(Intercept) 7.2692 1.8425 3.945 0.005565 **
a 2.3222 0.3258 7.128 0.000189 ***
I(b * a^2) 0.3005 0.0355 8.465 6.34e-05 ***
```

I can not relate the formulas with and without the ! condition, which is a bit strange to me.