Use a given information to create equation for the rational function. The function is written in factored form to help see how they given information shapes the equation. If the…

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asked Jun 6, 2023 193k views

1 Answer

Jpertino · Answer 1 · 2023-06-09T17:51:50+0000

Recall that a rational function:

has a vertical asymptote at x₀ if and only if:

Also, the roots of the above rational function are the same as P(x).

Since the rational function has a vertical asymptote at x=-1, we get that its denominator must be:

$Q(x)=x+1\text{.}$

Since the rational function has a double zero at x=2 we get that its numerator must be of the form:

$P(x)=k(x-2)(x-2)\text{.}$

Finally, since the rational function has y-intercept at (0,2) we get that:

$2=(P(0))/(Q(0))=(k(0-2)(0-2))/(0+1)\text{.}$

Simplifying the above equation we get:

$\begin{gathered} (k(-2)(-2))/(1)=2, \\ 4k=2. \end{gathered}$

Dividing the above equation by 4 we get:

$\begin{gathered} (4k)/(4)=(2)/(4), \\ k=(1)/(2)\text{.} \end{gathered}$

Therefore, the rational function that satisfies the given conditions is:

$f(x)=((1)/(2)(x-2)(x-2))/(x+1)\text{.}$

Answer:

The numerator is:

The denominator is: