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When working with rational expressions, it is often best to write them in the simplest possible form. For example, the rational expression
can be reduced to the simpler expression
for all
except
.
From our discussion of equality of fractions in Section
[link] , we know that
when
. This fact allows us to deduce that, if
since
(recall the commutative property of multiplication). But this fact means that if a factor (in this case,
) is common to both the numerator and denominator of a fraction, we may remove it without changing the value of the fraction.
The process of removing common factors is commonly called cancelling .
can be reduced to
. Process:
Remove the three factors of 1;
Notice that in
, there is no factor common to the numerator and denominator.
can be reduced to
. Process:
Remove the factor of 1;
.
Notice that in
, there is no factor common to the numerator and denominator.
can be reduced to
. Process:
Remove the factor of 1;
.
Notice that in
there is no factor common to the numerator and denominator.
cannot be reduced since there are no factors common to the numerator and denominator.
Problems 1, 2, and 3 shown above could all be reduced. The process in each reduction included the following steps:
We know that we can divide both sides of an equation by the same nonzero number, but why should we be able to divide both the numerator and denominator of a fraction by the same nonzero number? The reason is that any nonzero number divided by itself is 1, and that if a number is multiplied by 1, it is left unchanged.
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