Rational numbers are denoted by a script Q.
numbers

Q
Q stands for
"quotient"
 

definition

A rational number is a number that can be expressed as a fraction p/q where p and q are integers and q ≠ 0. It is the ratio of two integers.

You are familiar with rational numbers from your work with fractions.
properrationals

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definition
A rational expression is an expression that is the ratio of two polynomials. aun14
(where P(x) and Q(x) are polynomials)

properexpression

Rational expressions are algebraic fractions in which the numerator is a polynomial and the denominator is also a polynomial (usually different from the numerator). The polynomials used in creating a rational expression may contain one term (monomial), two terms (binomial), three terms (trinomial), and so on.

Rational Expressions
(monomial/monomial)
Rational Expression
(binomial/binomial)
Rational Expression
(binomial/trinomial)
aun1
unm2
un3

reminder
Expressions that are not polynomials cannot be used in the creation of rational expressions.

For example: aun4 is not a rational expression, since aun5 is not a polynomial.


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beware Since rational expressions represent division, we must be careful to
avoid division by zero.
If a rational expression has a variable in its denominator, we must ensure that any
value (or values) substituted for that variable will not create a zero denominator.

If it is not obvious which values will cause a division by zero error in a rational expression,
set the denominator equal to zero and solve for the variable.

Rational expression: Could it possibly
be undefined? When?
Rational expression: Could it possibly
be undefined? When?
un6
Obviously, when x = 1, the denominator will be zero, making the expression undefined.

Domain: All Real numbers but not x = 1.
un8
Set the denominator = 0
and solve.
a2 - 4 = 0
a
2 = 4

un9
For this rational expression, we must limit the x's which
may be used, to avoid a division by zero error, and
leaving the expression undefined.
Notation: un7read "all x's such that x ≠ 1."
For this rational expression, we must prevent two
x
-values from being used in the expression.
Domain: All Real numbers but not a = 2
nor a = -2.      
un10
Rational expression: Could it possibly
be undefined? When?
Rational expression: Could it possibly
be undefined? When?
un12
Set: 8 - y = 0
         8 = y


Domain: All Real numbers, except y = 8.
un13
Set: x2 + x - 12 = 0
(x - 3)(x + 4) = 0
x - 3 = 0;     x = 3
x + 4 = 0;    x = -4
Domain: All Real numbers, but not x = 3 and not x = -4.

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When rational expressions are "improper", division can be used to simplify the expression into a proper form. For this course, the simplification process will be limited to determining common factors between the numerator and the denominator, and reducing.

properdivide


See Simplifying Rational Expressions.


divider


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