The reflexive property of equality means that all the real numbers are equal to itself. This property is applied for almost every numbers. It is used to prove the congruence in geometric figures. The reflexivity is one of the three properties that defines the equivalence relation. Determine what is reflexive property of equality using the reflexive property of equality definition, example tutorial.
The reflexive property of equality simply states that a value is equal to itself.
Further, this property states that for all real numbers, x = x.
Real numbers include all the numbers on a number line. They include rational numbers and irrational numbers. A rational number is any number that can be written as a fraction. An irrational number, on the other hand, is a real number that cannot be written as a simple fraction. Square roots would be in this category. In fact, real numbers pretty much entail every number possible except for negative square roots because they are imaginary numbers.
Reflexive Property Examples Here are some examples of the reflexive property of equality:
|Reflexive Property of Equality|
|a = a|
|967 = 967|
|8/43 = 8/43|
The reflexive relation is used on a binary set of numbers, where all the numbers are related to each other. Study and determine the property of reflexive relation using reflexive property of equality definition, example tutorial.