There is only one vartical asymptote of the curve: $y = \frac{2 x + 1}{x^{2} - x + k}$ $y=(2x+1)/(x^2-x+k)$ What is the sum of values that $k$ $k$ can have?

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There is only one vartical asymptote of the curve: $y = \frac{2 x + 1}{x^{2} - x + k}$ $y=(2x+1)/(x^2-x+k)$ What is the sum of values that $k$ $k$ can have?

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Answer 1 · 2015-10-03T21:16:21

Refer to explanation

Explanation:

Since there is only one vertical asymptote that means that the trinomial $x^{2} - x + k$ $x^2-x+k$ must have one double root hence its discriminant must be zero .

No the discriminant is equal to

$D = \sqrt{b^{2} - 4 a c} = \sqrt{{(- 1)}^{2} - 4 k} = \sqrt{1 - 4 k}$ $D=sqrt(b^2-4ac)=sqrt((-1)^2-4k)=sqrt(1-4k)$

but we want $D = 0 \Rightarrow 1 - 4 k = 0 \Rightarrow k = \frac{1}{4}$ $D=0=>1-4k=0=>k=1/4$

Now for $k = \frac{1}{4}$ $k=1/4$ we have that

$y = \frac{2 x + 1}{x^{2} - x + \frac{1}{4}} = \frac{2 x + 1}{{(x - \frac{1}{2})}^{2}}$ $y=(2x+1)/(x^2-x+1/4)=(2x+1)/(x-1/2)^2$

Now we see that for $x \to \frac{1}{2}$ $x->1/2$ $y \to \infty$ $y->oo$ hence $x = \frac{1}{2}$ $x=1/2$ vertical asymptote.

There is another possibility that results in a single vertical asymptote: If $x^{2} - x + k$ $x^2−x+k$ is divisible by $2 x + 1$ $2x+1$ then there will be just the one asymptote. This occurs when $k = - \frac{3}{4}$ $k=−3/4$ and $x^{2} - x - \frac{3}{4} = (2 x + 1) (\frac{1}{2} x - \frac{3}{4})$ $x^2−x−3/4=(2x+1)(1/2x−3/4)$ (*)

(*) Credits to George C. for this addition

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There is only one vartical asymptote of the curve: $y = \frac{2 x + 1}{x^{2} - x + k}$ $y=(2x+1)/(x^2-x+k)$ What is the sum of values that $k$ $k$ can have?

1 Answer

Explanation:

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There is only one vartical asymptote of the curve: y=(2x+1)/(x^2-x+k)y=2x+1x2−x+ky=(2x+1)/(x^2-x+k) What is the sum of values that kkk can have?

1 Answer

Explanation:

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There is only one vartical asymptote of the curve: $y = \frac{2 x + 1}{x^{2} - x + k}$ $y=(2x+1)/(x^2-x+k)$ What is the sum of values that $k$ $k$ can have?