This module is from Fundamentals of Mathematics by Denny Burzynski and Wade Ellis, Jr. This module discusses algebraic expressions. By the end of the module students should be able to recognize an algebraic expression, be able to distinguish between terms and factors, understand the meaning and function of coefficients and be able to perform numerical evaluation.
Section overview
- Algebraic Expressions
- Terms and Factors
- Coefficients
- Numerical Evaluation
Algebraic expressions
Numerical expression
In arithmetic, a
numerical expression results when numbers are connected by arithmetic operation signs (+, -, ⋅ , ÷). For example,
,
,
, and
are numerical expressions.
Algebraic expression
In algebra, letters are used to represent numbers, and an
algebraic expression results when an arithmetic operation sign associates a letter with a number or a letter with a letter. For example,
,
,
,
, and
are algebraic expressions.
Expressions
Numerical expressions and algebraic expressions are often referred to simply as
expressions .
Terms and factors
In algebra, it is extremely important to be able to distinguish between terms and factors.
Distinction between terms and factors
Terms are parts of
sums and are therefore connected by + signs.
Factors are parts of
products and are therefore separated by ⋅ signs.
While making the distinction between sums and products, we must remember that subtraction and division are functions of these operations.
- In some expressions it will appear that terms are separated by minus signs. We must keep in mind that subtraction is addition of the opposite, that is,
- In some expressions it will appear that factors are separated by division signs. We must keep in mind that
Sample set a
State the number of terms in each expression and name them.
. In this expression,
x and 4 are connected by a "+" sign. Therefore, they are terms. This expression consists of two terms.
. The expression
can be expressed as
. We can now see that this expression consists of the two terms
and
.
Rather than rewriting the expression when a subtraction occurs, we can identify terms more quickly by associating the + or - sign with the individual quantity.
. Associating the sign with the individual quantities, we see that this expression consists of the four terms
, 7,
,
.
. This expression consists of the two terms,
and
. Notice that the term
is composed of the two factors 5 and
. The term
is composed of the two factors
and
.
. This expression consists of one term. Notice that
can be expressed as
or
(indicating the connecting signs of arithmetic). Note that no operation sign is necessary for multiplication.
Practice set a
Specify the terms in each expression.
Coefficients
We know that multiplication is a description of repeated addition. For example,
describes
Suppose some quantity is represented by the letter
. The multiplication
describes
. It is now easy to see that
specifies 5 of the quantities represented by
. In the expression
, 5 is called the
numerical coefficient , or more simply, the
coefficient of
.