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Simplifying the Expression (3 + 5/x)(9 - 15/x + 25/x^2)
This article will guide you through the process of simplifying the algebraic expression (3 + 5/x)(9 - 15/x + 25/x^2).
Expanding the Expression
The first step is to expand the expression using the distributive property or FOIL method:
(3 + 5/x)(9 - 15/x + 25/x^2) =
- 3(9 - 15/x + 25/x^2) + (5/x)(9 - 15/x + 25/x^2)
Now, distribute each term:
- 27 - 45/x + 75/x^2 + 45/x - 75/x^2 + 125/x^3
Combining Like Terms
Next, identify and combine like terms:
- 27 + (-45/x + 45/x) + (75/x^2 - 75/x^2) + 125/x^3
This simplifies to:
- 27 + 125/x^3
Final Simplified Expression
Therefore, the simplified form of the expression (3 + 5/x)(9 - 15/x + 25/x^2) is 27 + 125/x^3.
Important Note: This expression is defined for all real values of x except x = 0, as the denominator cannot be zero.