If two independent continuous variables, say x and z, both influence a dependent variable y, and if the extent of the effect of each independent variable depends on the level of the other independent variable then the regression equation can be written as:

${\displaystyle y_{i}=a+bx_{i}+cz_{i}+d(x_{i}z_{i})+e_{i},}$ 

where i indexes observations, a is the intercept term, b, c, and d are effect size parameters to be estimated, and e is the error term.

If this is the correct model, then the omission of any of the right-side terms would be incorrect, resulting in misleading interpretation of the regression results.

With this model, the effect of x upon y is given by the partial derivative of y with respect to x; this is ${\displaystyle b+dz_{i}}$ , which depends on the specific value ${\displaystyle z_{i}}$  at which the partial derivative is being evaluated. Hence, the main effect of x – the effect averaged over all values of z – is meaningless as it depends on the design of the experiment (specifically on the relative frequencies of the various values of z) and not just on the underlying relationships. Hence:

• In the case of interaction, it is wrong to try to test, estimate, or interpret a "main effect" coefficient b or c, omitting the interaction term.^[4]

In addition:

• In the case of interaction, it is wrong to not include b or c, because this will give incorrect estimates of the interaction.^[5][6]

• General linear model
• Analysis of variance