The simplified form of an expression is a way of expressing the same mathematical statement using fewer terms and operations. This can often be done by combining like terms, canceling out terms, or removing parentheses. It is a useful tool for simplifying complicated equations and making them easier to work with.
Definition of Simplified Form
A simplified form of an expression refers to the same mathematical statement being expressed in fewer terms and operations. This can be done by combining like terms, canceling out terms, or removing parentheses. The simplified form of an expression can help make complicated equations easier to work with.
Simplifying Expressions
In order to simplify an expression, there are a few steps that can be taken. First, like terms should be combined. This means that any terms with the same variable and exponent should be added or subtracted together. Next, any terms that are being multiplied or divided by the same number can be cancelled out. Finally, any parentheses can be removed if they are not necessary. By following these steps, the expression can be simplified into its most basic form.
Simplifying an expression can be a useful tool for making complicated equations easier to work with. By combining like terms, cancelling out terms, and removing parentheses, an expression can be simplified into its most basic form. This can help to make the equation more manageable and easier to understand.