What is the common denominator in the expression below? \[ \frac{4 x+8}{x^{2}-64}+\frac{x-5}{x+8} \] \( x+8 \) \( (x+8)(x-8) \) \( (x-8) \) There is no common denominator.

To find the common denominator, first, let's factor the expression in the first fraction. The denominator \(x^2 - 64\) can be rewritten as \((x - 8)(x + 8)\) because it's a difference of squares. Therefore, the common denominator for both fractions in the expression is \((x + 8)(x - 8)\). Now, looking at both denominators, the second fraction is already \(x + 8\). To make them compatible, we can multiply the second fraction by \(\frac{x - 8}{x - 8}\) to get the same denominator for addition. This means we can combine both fractions seamlessly and simplify the expression from there!