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Chapter 0: Problem 54

Add or subtract as indicated. $$\frac{x}{x^{2}-2 x-24}-\frac{x}{x^{2}-7 x+6}$$

Short Answer

Expert verified
\(\frac{4x}{(x-6)(x+4)(x-1)}\)

Step by step solution

01

Factorise the Denominators

The first step is to factorise the denominators of both fractions. The factorised form of \(x^{2}-2 x-24\) is \((x-6)(x+4)\) and for \(x^{2}-7 x+6\) is \((x-6)(x-1)\). So, we have \(\frac{x}{(x-6)(x+4)}-\frac{x}{(x-6)(x-1)}\).
02

Determine the LCD

After factorisation, we can determine the Least Common Denominator (LCD) of the fractions. The LCD is the least common multiple of \((x-6)(x+4)\) and \((x-6)(x-1)\). The LCD will be \((x-6)(x+4)(x-1)\).
03

Create Equivalent Fractions with the LCD

Next, create equivalent fractions that have the LCD as the denominator. Rewrite each fraction with the LCD. So the equivalent fractions will be \(\frac{x(x-1)}{(x-6)(x+4)(x-1)}-\frac{x(x+4)}{(x-6)(x+4)(x-1)}\).
04

Combine the Fractions

Now, you can subtract the two fractions as they have the same denominator. \(\frac{x(x-1)-x(x+4)}{(x-6)(x+4)(x-1)}\). You simplify the numerator expression to obtain \(\frac{4x}{(x-6)(x+4)(x-1)}\).
05

Simplify

Be mindful to ensure the expression \(4x\) cannot be further simplified. The denominator must also be multiplied out careful - it remains as \((x-6)(x+4)(x-1)\).

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