QUESTION IMAGE
Question
identify whether each value of x is a discontinuity of the function by typing asymptote, hole, or neither.\\(\frac{5x}{x^{3}+5x^{2}+6x}\\)\\(x = -3\\)\\(x = -2\\)\\(x = 0\\)\\(x = 2\\)\\(x = 3\\)\\(x = 5\\)
Step1: Factor denominator
Factor $x^3 + 5x^2 + 6x$:
$x(x^2 + 5x + 6) = x(x+2)(x+3)$
The function becomes $\frac{5x}{x(x+2)(x+3)}$
Step2: Simplify the function
Cancel common factor $x$ (for $x
eq 0$):
$\frac{5}{(x+2)(x+3)}$
Step3: Identify discontinuities
- Holes occur at canceled common factors: $x=0$
- Vertical asymptotes occur at remaining zeroes of denominator: $x=-2, x=-3$
- Values not making denominator zero are neither: $x=2,3,5$
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$x=-3$: asymptote
$x=-2$: asymptote
$x=0$: hole
$x=2$: neither
$x=3$: neither
$x=5$: neither