How do you graph $\frac{6 x^{2} + 10 x - 3}{2 x + 2}$ $(6x^2 + 10x - 3) /( 2x + 2)$ ?

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How do you graph $\frac{6 x^{2} + 10 x - 3}{2 x + 2}$ $(6x^2 + 10x - 3) /( 2x + 2)$ ?

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Answer 1 · 2015-08-12T12:52:16

When plotting graphs, I usually find the axis intercept points, the asymptotes, the stationary points and the points of inflection.

Explanation:

$f (x) = \frac{6 x^{2} + 10 x - 3}{2 x + 2} = 3 x + 2 - \frac{7}{2 x + 2}$ $f(x) = (6x^2+10x-3)/(2x+2) = 3x+2-7/(2x+2)$

To find the axis intercept points solve $f (x) = 0$ $f(x) = 0$ and $f (0)$ $f(0)$ :
$f (x) = 0$ $f(x) = 0$
$6 x^{2} + 10 x - 3 = 0$ $6x^2+10x-3 = 0$
$x = \frac{- 5 \pm \sqrt{43}}{6}$ $x = (-5 pm sqrt(43))/6$

$f (0) = - \frac{3}{2}$ $f(0) = -3/2$

Vertical asymptotes (denominator of f(x) = 0):
$2 x + 2 = 0$ $2x+2 = 0$
$x = - 1$ $x = -1$
$lim_(x rarr -1^(+-)) f(x) = ""_+^(-) oo$

No horizontal asymptotes since:
$lim_(x rarr pm oo} f(x) = pm oo$

However:
$g(x) = 3x+2$ is an asymptote since $lim_(x rarr pm oo) -7/(2x+2) = 0^(""^(""_+^-))$

$lim_(x rarr pm oo} f(x) rArr lim_(x rarr pm oo} g(x)^(""^(""_+^-))$

Stationary points (first derivative is equal to zero):
$(df)/dx ne 0, x in RR$
So there are no stationary points.

Points of inflection (second derivative is equal to zero):
$(d^2f)/dx^2 ne 0, x in RR$
So there are no points of inflection.

graph{(6x^2+10x-3)/(2x+2) [-5, 5, -25, 25]}

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How do you graph $\frac{6 x^{2} + 10 x - 3}{2 x + 2}$ $(6x^2 + 10x - 3) /( 2x + 2)$ ?

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