What concept describes that linear regression assumes straight-line relationships, while real-life relationships can be curved or change direction?

• A. Functional Forms
• B. Inappropriateness for Classification
• C. Data Sensitivity
• D. Slope

Answer: (A)

Functional forms describe how the relationship between variables is shaped. Linear regression assumes a straight-line relationship, but real-world data often show curvature or turning points. Recognizing this helps you understand why a straight-line model may misfit and points you toward nonlinear options—polynomials, splines, or other nonlinear functions—that can capture curvature and direction changes. This is why the concept described is functional forms: it emphasizes choosing the right shape for the relationship between variables.

The other ideas don’t fit as well: classification suitability isn’t about the shape of the relationship in a regression context, data sensitivity concerns how results react to data changes rather than the form of the relationship, and slope is simply the constant rate of change in a linear model and doesn’t address nonlinearity.