To avoid using denominators

To make fractions look more complex

To visualize fractions as parts of a whole

To compare fractions without using numbers

Comparing fractions with different numerators

Using different shapes for area models

Only comparing the numerators

Ignoring the numerators

To make the fractions look more interesting

To ensure fairness in representation

To make the numerators equal

To simplify the fractions

By increasing the numerator

By dividing each part into equal smaller parts

By changing the shape of the model

By shading more parts

Two-eighths

Four-eighths

Five-eighths

Three-eighths

Five-sixteenths

Three-sixteenths

Six-sixteenths

Four-sixteenths

That one-half is larger

That they are not comparable

That they are equivalent

That two-fourths is larger