155,614 views
4 votes
4 votes
CorrectFind the equation of the hyperbola with the following properties. Express your answer in standard form.Foci at (6,8) and (6,14)Vertices at (6,10) and (6, - 12)D

CorrectFind the equation of the hyperbola with the following properties. Express your-example-1
User Patrick Jeon
by
2.7k points

1 Answer

26 votes
26 votes

The standard form of the equation of the hyperbola is


((y-k)^2)/(a^2)-((x-h)^2)/(b^2)=1

(h, k) are the coordinates of the center

(h, k + a), (h, k - a) are the vertices

(h, k + c), (h, k - c) are the foci

Since the foci are (6, -8), (6, -14), then


\begin{gathered} h=6 \\ k+c=-8 \\ k-c=-14 \end{gathered}

Since the vertices are (6, -10), (6, -12), then


\begin{gathered} h=c \\ k+a=-10 \\ k-a=-12 \end{gathered}

To find k we will add the equations of k and a, or k and c


\begin{gathered} k+a+k-a=-10+-12 \\ 2k=-22 \\ (2k)/(2)=(-22)/(2) \\ k=-11 \end{gathered}

Substitute the value of k in the equation of foci to find and vertices to find a and c


\begin{gathered} -11+c=-8 \\ -11+11+c=-8+11 \\ c=3 \end{gathered}
\begin{gathered} -11+a=-10 \\ -11+11+a=-10+11 \\ a=1 \end{gathered}

To find b we will use the equation


c^2=a^2+b^2

Since a = 1 and c = 3, then


\begin{gathered} 3^2=1^2+b^2 \\ 9=1+b \\ 9-1=1-1+b^2 \\ 8=b^2 \end{gathered}

Substitute the value of h, k, a^2, b^2 in the form of the equation above


\begin{gathered} h=6 \\ k=-11 \\ a^2=1 \\ b^2=8 \\ ((y--11)^2)/(1)-((x-6)^2)/(8)=1 \\ (y+11)^2-((x-6)^2)/(8)=1 \end{gathered}

The equation of the hyperbola in the standard form is


(y+11)^2-((x-6)^2)/(8)=1

User Tonjo
by
2.3k points