%2F(x-5).jpeg "(x^2-10x+30)/(x-5)")
Analyzing the Rational Expression (x^2 - 10x + 30) / (x - 5)
This article will delve into the analysis of the rational expression (x^2 - 10x + 30) / (x - 5). We will explore its domain, simplification, and potential for factorization.
Domain
The domain of a rational expression is the set of all possible values of x for which the expression is defined. In this case, the expression is undefined when the denominator (x - 5) equals zero. Therefore, the domain is all real numbers except for x = 5.
Simplification
The expression cannot be simplified further by factoring. This is because the quadratic expression in the numerator, x^2 - 10x + 30, does not factor into real numbers.
Polynomial Long Division
We can use polynomial long division to rewrite the expression. Here's how it works:
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Set up the division:
x - 3 x - 5 | x^2 - 10x + 30 -
Divide the leading terms: x^2 divided by x is x.
x - 3 x - 5 | x^2 - 10x + 30 -(x^2 - 5x) -------- -5x + 30 -
Multiply the quotient (x) by the divisor (x - 5): x(x - 5) = x^2 - 5x
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Subtract the result from the dividend: (x^2 - 10x + 30) - (x^2 - 5x) = -5x + 30
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Bring down the next term (30): -5x + 30
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Repeat steps 2-5: -5x divided by x is -5.
x - 3 x - 5 | x^2 - 10x + 30 -(x^2 - 5x) -------- -5x + 30 -(-5x + 25) --------- 5 -
The remainder is 5: The division is complete.
This gives us the following result: (x^2 - 10x + 30) / (x - 5) = x - 3 + 5/(x - 5)
Conclusion
The expression (x^2 - 10x + 30) / (x - 5) is not factorable. We can rewrite it using polynomial long division as x - 3 + 5/(x - 5). Remember that the expression is undefined for x = 5.