Equal values remain equal even when they switch sides in an equation.

If  a = b, then b = a. Which property of equality describes this situation?
A.Reflexive Property of Equality
B.Symmetric Property of Equality
C.Transitive Property of Equality
D.Substitution Property of Equality

The property that describes the situation "if \( a = b \), then \( b = a \)" is the **Symmetric Property of Equality**.

So, the correct answer is:
**B. Symmetric Property of Equality**

Would you like further details or have any other questions? Here are five related questions to deepen your understanding:

1. What is the **Reflexive Property** of equality, and how does it differ from the Symmetric Property?
2. Can you provide an example of the **Transitive Property** of equality?
3. How does the **Substitution Property** of equality work in solving algebraic equations?
4. Is the Symmetric Property applicable in inequalities, and if so, how?
5. Why are these properties important in algebraic proofs?

**Tip:** When solving equations, always keep these properties in mind to justify each step logically.

If a = b, then b = a. Which property of equality describes this situation?
A. Reflexive Property of Equality
B. Symmetric Property of Equality
C. Transitive Property of Equality
D. Substitution Property of Equality

Understand the Symmetric Property of Equality, which states that if a = b, then b = a. This concept is essential in algebra and helps in solving equations logically. Suitable for students in Grades 6-8, this guide covers related properties like Reflexive and Transitive Properties.

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