Learn on PengienVision, Mathematics, Grade 7Chapter 4: Generate Equivalent Expressions

Lesson 3: Simplify Expressions

In this Grade 7 enVision Mathematics lesson from Chapter 4, students learn how to simplify algebraic expressions by combining like terms using the Commutative and Associative Properties of operations. The lesson covers combining like terms with integer coefficients, rational coefficients (including fractions and decimals), and expressions with two variables. Students practice identifying and grouping like terms to write equivalent expressions in simplest form.

Section 1

Adding and Subtracting Like Terms

Property

To add like terms: Add the numerical coefficients of the terms. Do not change the variable factors of the terms.
To subtract like terms: Subtract the numerical coefficients of the terms. Do not change the variable factors of the terms.
Replacing an expression by a simpler equivalent one is called simplifying the expression.

Examples

  • To simplify 7b+4b7b + 4b, we add the coefficients: (7+4)b=11b(7+4)b = 11b. We have combined the like terms into a single, simpler term.
  • To simplify 12k(3k)12k - (-3k), we subtract the coefficients: (12(3))k=(12+3)k=15k(12 - (-3))k = (12+3)k = 15k. The variable factor kk remains unchanged.
  • We cannot simplify 8p+5q8p + 5q because 8p8p and 5q5q are not like terms. Their variable factors are different.

Explanation

When combining like terms, you only perform the operation on their coefficients. The variable part just tells you what 'family' of terms you're counting. It's like adding 4 apples and 5 apples to get 9 apples.

Section 2

Using Properties to Group Like Terms

Property

When we have to simplify algebraic expressions, we can often make the work easier by applying the Commutative or Associative Property first.
We can rearrange an expression so the like terms are together.
For example, we simplify 3x+7+4x+53x + 7 + 4x + 5 by rewriting it as 3x+4x+7+53x + 4x + 7 + 5 and then combining like terms to get 7x+127x + 12.
We were using the Commutative Property of Addition.

Examples

  • To simplify 18p+6q+(15p)+5q18p + 6q + (-15p) + 5q, reorder the terms: 18p+(15p)+6q+5q18p + (-15p) + 6q + 5q. This combines to 3p+11q3p + 11q.
  • To simplify 715823157\frac{7}{15} \cdot \frac{8}{23} \cdot \frac{15}{7}, reorder the factors to group reciprocals: 715157823\frac{7}{15} \cdot \frac{15}{7} \cdot \frac{8}{23}. This becomes 1823=8231 \cdot \frac{8}{23} = \frac{8}{23}.

Section 3

Simplifying Expressions with Rational Coefficients

Property

The process for combining like terms is the same for rational coefficients (fractions and decimals).
Use the Distributive Property to add or subtract the coefficients, and keep the variable part unchanged: ax+bx=(a+b)xax + bx = (a+b)x.

Examples

Lesson overview

Expand to review the lesson summary and core properties.

Expand

Section 1

Adding and Subtracting Like Terms

Property

To add like terms: Add the numerical coefficients of the terms. Do not change the variable factors of the terms.
To subtract like terms: Subtract the numerical coefficients of the terms. Do not change the variable factors of the terms.
Replacing an expression by a simpler equivalent one is called simplifying the expression.

Examples

  • To simplify 7b+4b7b + 4b, we add the coefficients: (7+4)b=11b(7+4)b = 11b. We have combined the like terms into a single, simpler term.
  • To simplify 12k(3k)12k - (-3k), we subtract the coefficients: (12(3))k=(12+3)k=15k(12 - (-3))k = (12+3)k = 15k. The variable factor kk remains unchanged.
  • We cannot simplify 8p+5q8p + 5q because 8p8p and 5q5q are not like terms. Their variable factors are different.

Explanation

When combining like terms, you only perform the operation on their coefficients. The variable part just tells you what 'family' of terms you're counting. It's like adding 4 apples and 5 apples to get 9 apples.

Section 2

Using Properties to Group Like Terms

Property

When we have to simplify algebraic expressions, we can often make the work easier by applying the Commutative or Associative Property first.
We can rearrange an expression so the like terms are together.
For example, we simplify 3x+7+4x+53x + 7 + 4x + 5 by rewriting it as 3x+4x+7+53x + 4x + 7 + 5 and then combining like terms to get 7x+127x + 12.
We were using the Commutative Property of Addition.

Examples

  • To simplify 18p+6q+(15p)+5q18p + 6q + (-15p) + 5q, reorder the terms: 18p+(15p)+6q+5q18p + (-15p) + 6q + 5q. This combines to 3p+11q3p + 11q.
  • To simplify 715823157\frac{7}{15} \cdot \frac{8}{23} \cdot \frac{15}{7}, reorder the factors to group reciprocals: 715157823\frac{7}{15} \cdot \frac{15}{7} \cdot \frac{8}{23}. This becomes 1823=8231 \cdot \frac{8}{23} = \frac{8}{23}.

Section 3

Simplifying Expressions with Rational Coefficients

Property

The process for combining like terms is the same for rational coefficients (fractions and decimals).
Use the Distributive Property to add or subtract the coefficients, and keep the variable part unchanged: ax+bx=(a+b)xax + bx = (a+b)x.

Examples