## What is a simplified expression in algebra?

Simplifying an expression is just another way to say solving a math problem. When you simplify an expression, you’re basically trying to write it in the simplest way possible. At the end, there shouldn’t be any more adding, subtracting, multiplying, or dividing left to do. For example, take this expression: 4 + 6 + 5.

**What does simplify the expression mean?**

To simplify an expression means to write an equivalent expression which contains no similar terms. This means that we will rewrite the expression with the fewest terms possible.

**What are the steps to simplify an expression?**

Here are the basic steps to follow to simplify an algebraic expression: remove parentheses by multiplying factors. use exponent rules to remove parentheses in terms with exponents. combine like terms by adding coefficients. combine the constants.

### How do you simplify expressions by combining like terms?

Simplify an algebraic expression by combining like terms. Like terms have the same variable raised to the same exponent (or power). Identify the like terms by their variable form, then combine the coefficients. Remember when combining like terms that only the coefficients are combined, the variable form stays the same.

**How do you simplify the expression with exponents?**

Simplifying Expressions with Exponents. To simplify an expression with exponents, first simplify each term according to multiplication, division, distribution, and power to power rules. Then, combine like terms and arrange the terms, putting those with variables first, in order of highest exponent.

**How do I solve algebraic expressions?**

Solve an algebraic expression with fractions. If you want to solve an algebraic expression that uses fractions, then you have to cross multiply the fractions, combine like terms, and then isolate the variable. Here’s how you would do it: (x + 3)/6 = 2/3 First, cross multiply to get rid of the fraction.