Chapter 1.9, Problem 6LC

To determine

Explain why the multiplication and division property of equality can be considered the same property.

Explanation of Solution

Given:

The multiplication and division properties of equality

Concept Used:

The multiplication and division properties of equality state that if you multiply or divide both sides of an equation by the same number, then both sides are still equal.

In other words, if $a+b=c$ , then $d·(a+b)=d·c$

Property	Name of the Property
$a·c=b·c$	Multiplication Property of Equality
$a÷c=b÷c$	Division Property of Equality

They can consider the same property because when you multiply (or divide) each side by a number. It`s mean you are also divide (multiply) each side by the reciprocal of this number.

In my opinion, I think they are the same, it`s belong to the equation to choose which one is more suitable. However, with High school student, the multiplication property is one of the most commonly property for solving equation.

Calculation:

Multiplication Property of Equality: $a·c=b·c$

Division Property of Equality: $a÷c=b÷c$

The principle of equality means that the information on either side of an equals sign must be worth the same amount. Think of it in terms of weight: if we have five apples on one side of a scale, and two melons on the other side, the scale will be balanced:

Thus, multiplication Property of Equality: $a·c=b·c$ and division Property of Equality: $a÷c=b÷c$ are equal.