example

Identify each term in the expression $9b+15{x}^{2}+a+6$. Then identify the coefficient of each term. Solution: The expression has four terms. They are $9b,15{x}^{2},a$, and $6$.

• The coefficient of $9b$ is $9$.
• The coefficient of $15{x}^{2}$ is $15$.
• Remember that if no number is written before a variable, the coefficient is $1$. So the coefficient of $a$ is $1$.
• The coefficient of a constant is the constant, so the coefficient of $6$ is $6$.

example

Identify the like terms:

1. ${y}^{3},7{x}^{2},14,23,4{y}^{3},9x,5{x}^{2}$
2. $4{x}^{2}+2x+5{x}^{2}+6x+40x+8xy$

Answer: Solution: 1. ${y}^{3},7{x}^{2},14,23,4{y}^{3},9x,5{x}^{2}$ Look at the variables and exponents. The expression contains ${y}^{3},{x}^{2},x$, and constants. The terms ${y}^{3}$ and $4{y}^{3}$ are like terms because they both have ${y}^{3}$. The terms $7{x}^{2}$ and $5{x}^{2}$ are like terms because they both have ${x}^{2}$. The terms $14$ and $23$ are like terms because they are both constants. The term $9x$ does not have any like terms in this list since no other terms have the variable $x$ raised to the power of $1$. 2. $4{x}^{2}+2x+5{x}^{2}+6x+40x+8xy$ Look at the variables and exponents. The expression contains the terms $4{x}^{2},2x,5{x}^{2},6x,40x,\text{and}8xy$ The terms $4{x}^{2}$ and $5{x}^{2}$ are like terms because they both have ${x}^{2}$. The terms $2x,6x,\text{and}40x$ are like terms because they all have $x$. The term $8xy$ has no like terms in the given expression because no other terms contain the two variables $xy$.

example

Simplify the expression: $3x+7+4x+5$.

Answer: Solution:

	$3x+7+4x+5$
Identify the like terms.	$\color{red}{3x}+\color{blue}{7}+\color{red}{4x}+\color{blue}{5}$
Rearrange the expression, so the like terms are together.	$\color{red}{3x}+\color{red}{4x}+\color{blue}{7}+\color{blue}{5}$
Add the coefficients of the like terms.
The original expression is simplified to...	$7x+12$

example

Simplify the expression: $8x+7{x}^{2}-{x}^{2}-+4x$.

Answer: Solution:

	$8x+7{x}^{2}-{x}^{2}-+4x$
Identify the like terms.
Rearrange the expression so like terms are together.
Add the coefficients of the like terms.

These are not like terms and cannot be combined. So $8{x}^{2}+12x$ is in simplest form.