Y =
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\space X \neq a
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Simplify the following expression and state the condition under which the simplification is valid:
Y = \dfrac{NUMERATOR}{DENOMINATOR}
Y =
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\space X \neq a
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x + 2First factor the expressions in the numerator and denominator.
\dfrac{NUMERATOR}{DENOMINATOR}
= \dfrac{(FACTOR2)(FACTOR1)}{(FACTOR3)(FACTOR1)}
Notice that the term (FACTOR1) appears in both the numerator and denominator.
Dividing both the numerator and denominator by (FACTOR1) gives:
Y = \dfrac{FACTOR2}{FACTOR3} or more simply,
Y = FACTOR2
Y = \dfrac{FACTOR2}{FACTOR3}
Since we divided by (FACTOR1), X \neq -A.
Y = writeExpressionFraction(FACTOR2, FACTOR3); \space X \neq -A