Proportional reasoning

Proportional Reasoning

Proportionality is a mathematical relation between two quantities. Proportional reasoning is one of the reasoning skills a child acquires when progressing from the stage of concrete operations to the stage of formal operations according to Piaget’s theory of intellectual development.

If you look up proportionality in wikipedia, one of the definitions you find is “In mathematics and in physics, proportionality is a mathematical relation between two quantities.” There are two different views of this “mathematical relation”; one is based on ratios and the other is based on functions.

In many school books proportionality is expressed as an equality of two ratios:

${\displaystyle {\frac {a}{b}}={\frac {c}{d}}.}$

Given the values of any three of the terms, it is possible to solve for the fourth term. Once a student has mastered this arithmetic skill, one is tempted to think the student understands proportional reasoning. Sadly, experimental evidence clearly indicates this may not be the case.

A scientist has a much different view of proportionality. Given the following equation for the force of gravity (according to Newton)

${\displaystyle F=G{\frac {m_{1}m_{2}}{r^{2}}}}$

the scientist would that the force of gravity between two masses is directly proportional to the product of the two masses and inversely proportional to the square of the distance between the two masses. From this perspective proportionality is a functional relationship between variables in a mathematical equation.