Which property is illustrated by the statement, if KL = LM, then LM = KL?
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1 point
Reflexive Property of Equality
Symmetric Property of Equality
Transitive Property of Equality
Division Property of Equality
Symmetric Property of Equality
The property illustrated by the statement, "if KL = LM, then LM = KL" is the Symmetric Property of Equality.
The property illustrated by the statement "if KL = LM, then LM = KL" is the Symmetric Property of Equality.
To understand why, let's break it down:
The Symmetric Property of Equality states that if a = b, then b = a. This property allows us to switch the order of the equality.
In this case, the statement says "if KL = LM." By applying the Symmetric Property, we can write it as "if LM = KL," which is the same statement, just with the terms reversed.
Therefore, the property being illustrated here is the Symmetric Property of Equality, where we can interchange the two sides of the equation and still maintain equality.