How do you graph $f (v) = \frac{2 v - 9}{5 v + 6}$ $f (v ) = \frac { 2v - 9} { 5v + 6}$ ?

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How do you graph $f (v) = \frac{2 v - 9}{5 v + 6}$ $f (v ) = \frac { 2v - 9} { 5v + 6}$ ?

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Answer 1 · 2017-12-24T19:25:54

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Explanation:

Graphing $y = f (v)$ $y=f(v)$ :

To graph a rational function (with algebra-only knowledge), we can find key features. These features are

v- and y-intercepts (horizontal and vertical axis intercepts)
holes
asymptotes (vertical, horizontal, slant/oblique)
end behavior and behavior around asymptote

v-intercept (horizontal axis intercept)

To find possible v-intercepts, set the function to equal zero to find the zeros.

$f (v) = \frac{2 v - 9}{5 v + 6}$ $f(v) = \frac{2v-9}{5v+6}$
$0 = \frac{2 v - 9}{5 v + 6}$ $0 = \frac{2v-9}{5v+6}$

Multiply both sides by 5v+6

$0 = 2 v - 9$ $0 = 2v-9$
$9 = 2 v$ $9 = 2v$
$v = \frac{9}{2} = 4.5$ $v = \frac{9}{2} = 4.5$

So we have an intercept on the v-axis at $(4.5, 0)$ $(4.5,0)$ .

y-intercept (vertical axis intercept)

To find possible y-intercepts, evaluate $f (0)$ $f(0)$ .

$f (v) = \frac{2 v - 9}{5 v + 6}$ $f(v) = \frac{2v-9}{5v+6}$
$f (0) = \frac{2 (0) - 9}{5 (0) + 6}$ $f(0) = \frac{2(0)-9}{5(0)+6}$
$f (0) = \frac{- 9}{6}$ $f(0) = \frac{-9}{6}$
$f (0) = \frac{- 3}{2} = - 1.5$ $f(0) = \frac{-3}{2} = -1.5$

So we have an intercept on the y-axis at $(0, - 1.5)$ $(0,-1.5)$ .

holes

There are no holes. Nothing can be factored or "canceled out."

vertical asymptote

Find what value of $v$ $v$ results in an undefined answer.

The denominator of $f (v) = \frac{2 v - 9}{5 v + 6}$ $f(v) = \frac{2v-9}{5v+6}$ cannot be zero. So the asymptote is at

$5 v + 6 = 0 \Leftrightarrow v = - \frac{6}{5} = - 1.2$ $5v+6=0 \Leftrightarrow v = -\frac{6}{5} = -1.2$

VA at $v = - 1.2$ $v = -1.2$

horizontal asymptote

For this rational function, the degree of the numerator and denominator are the same. So the horizontal asymptote is the ratio of the leading coefficients.

Since $f (v) = \frac{2 v - 9}{5 v + 6}$ $f(v) = \frac{2v-9}{5v+6}$ , the leading coefficient of the numerator is 2 and the leading coefficient of the denominator is 5.

HA at $y = \frac{2}{5} = 0.4$ $y=\frac{2}{5} = 0.4$

end behavior

Using a calculator, substituting big positive numbers into the formula shows that it is below the horizontal asymptote as $v \to \infty$ $v \to \infty$ .

Substituting big negative numbers into the formula shows that it is above the horizontal asymptote as $v \to - \infty$ $v \to -\infty$ .

behavior around vertical asymptote

Using a calculator, substituting numbers slightly less than (to the left of) the vertical asymptote into the formula shows that $y \to + \infty$ $y \to +\infty$ as $v \to - {1.2}^{-}$ $v \to -1.2^-$ .

substituting numbers slightly bigger than (to the right of) the vertical asymptote into the formula shows that $y \to - \infty$ $y \to -\infty$ as $v \to - {1.2}^{+}$ $v \to -1.2^+$ .

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How do you graph $f (v) = \frac{2 v - 9}{5 v + 6}$ $f (v ) = \frac { 2v - 9} { 5v + 6}$ ?

1 Answer

Explanation:

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