Multiplication Property of Equality
Define multiplicative Property of equality.
The Multiplication Property of Equality is an equation’s of two sides that will stay equal if you multiply them both by the same non-zero value.
Can you multiply both sides of an equation by any number?
No, you can’t multiply both sides of an equation by any number because division by zero is undefinable and you cannot multiply an equation’s of both sides by zero.
Can you provide an example of how to use the Multiplication Property of Equality?
For instance, in the equation 3x = 9, you can use the Multiplication Property of Equality by dividing both sides by 3 to find that x = 3.
Is it necessary to use a non-zero number when applying the Multiplication Property of Equality?
Yes, it’s crucial to use a non-zero number to ensure that the equality remains valid. Multiplying both sides by zero would result in an undefined equation.
Multiplication Property of Equality
Multiplication Property of Equality is when two sides of an equation are multiplied by the same value, and equality will remain true. It is one of the many properties of equality such as Addition, Subtraction, Division, Reflexive, Transitive, etc.
In this article, we will discuss the Multiplication Property of Equality in detail including its definition as well as converse.
Table of Content
- What is the Property of Equality?
- What is the Multiplicative Property of Equality?
- Converse of the Multiplication Property of Equality
- Multiplication Property of Equality with Fractions
- FAQs on Multiplication Property of Equality