How do you find the domain of $h (x) = \frac{x - 1}{[x^{3}] - 9 x}$ $h(x) = (x-1) / ( [x^3] - 9x)$ ?

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How do you find the domain of $h (x) = \frac{x - 1}{[x^{3}] - 9 x}$ $h(x) = (x-1) / ( [x^3] - 9x)$ ?

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Answer 1 · 2018-04-01T00:35:19

$(- \infty, - 3) U (- 3, 0) U (0, 3) U (3, \infty)$ $(-oo, -3) U (-3,0) U (0,3) U (3,oo)$

Explanation:

For this function, we can plug in any value of $x$ $x$ and get an output, except for any values of $x$ $x$ which cause the denominator $x^{3} - 9 x$ $x^3-9x$ to equal zero.

So, to determine the domain, solve the denominator for zero:

$x^{3} - 9 x = 0$ $x^3-9x=0$

$x (x^{2} - 9) = 0$ $x(x^2-9)=0$

$x = 0$ $x=0$

$x^{2} - 9 = 0$ $x^2-9=0$

$x^{2} = 9$ $x^2=9$

$x = \pm 3$ $x=+-3$

So, the domain does not include $x = - 3, 0, 3$ $x=-3, 0, 3$ . In interval notation, the domain is

$(- \infty, - 3) U (- 3, 0) U (0, 3) U (3, \infty)$ $(-oo, -3) U (-3,0) U (0,3) U (3,oo)$

Answer 2 · 2018-04-01T00:39:37

See below

Explanation:

Well let's factor the function first:
$h (x) = \frac{x - 1}{x^{3} - 9 x}$ $h(x)=(x-1)/(x^3-9x)$

$h (x) = \frac{x - 1}{x (x^{2} - 9)}$ $h(x)=(x-1)/(x(x^2-9))$

$h (x) = \frac{x - 1}{x (x + 3) (x - 3)}$ $h(x)=(x-1)/(x(x+3)(x-3))$

No removable discontinuities, so x cannot equal $0, - 3, 3$ $0, -3, 3$ as they would have the denominator equal $0$ $0$ and these will be the vertical asymptotes:

So Domain in interval notation can be said to be:
$(- \infty, - 3) \cup (- 3, 0) \cup (0, 3) \cup (3, \infty)$ $(-∞, -3)∪(-3, 0)∪(0, 3)∪(3,∞)$

Or in Set builder:
${x|x∈ℝ, x ≠-3, 0, 3}$

Graph:
graph{(x-1)/(x^3-9x) [-8.54, 11.46, 11, 21]}

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How do you find the domain of $h (x) = \frac{x - 1}{[x^{3}] - 9 x}$ $h(x) = (x-1) / ( [x^3] - 9x)$ ?

2 Answers

Explanation:

Explanation:

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