How do you graph and find the discontinuities of $y = \frac{- 4 x - 3}{x - 2}$ $y=(-4x-3)/(x-2)$ ?

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How do you graph and find the discontinuities of $y = \frac{- 4 x - 3}{x - 2}$ $y=(-4x-3)/(x-2)$ ?

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Answer 1 · 2015-08-17T13:43:13

$f (x) = - \frac{4 x + 3}{x - 2}$ $f(x) = -(4x+3)/(x-2)$
$= - \frac{4 x - 8 + 8 + 3}{x - 2}$ $= -(4x-8+8+3)/(x-2)$
$= - 4 - \frac{11}{x - 2}$ $= -4-11/(x-2)$

A discontinuity at $x = a$ $x = a$ occurs when:
1. $f (a)$ $f(a)$ does not exist
2. $lim_(x rarr a^+) f(x) ne lim_(x rarr a^-) f(x)$
3. $lim_(x rarr a) f(x) ne f(a)$

In this case, discontinuity at $x = 2$ since $f(2)$ does not exist.

To plot the graph:
$x$ -axis intercept
$f(x) = 0$
$x = -3/4$

$y$ -axis intercept
$f(0) = 3/2$

Vertical aysmptote at $x = 2$
$lim_(x rarr 2^(""_+^-)) f(x) = +- oo$

Horizontal asymptote at $y = -4$
$lim_(x rarr ""_+^(-)oo) f(x) = -4^(+-)$

No stationary points since there are no real values of $x$ that satisfy $f'(x) = 0$ .

graph{(-4x-3)/(x-2) [-5, 5, -20, 10]}

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How do you graph and find the discontinuities of $y = \frac{- 4 x - 3}{x - 2}$ $y=(-4x-3)/(x-2)$ ?

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How do you graph and find the discontinuities of $y = \frac{- 4 x - 3}{x - 2}$ $y=(-4x-3)/(x-2)$ ?