How do you find the coordinates of the vertices, foci, and the equation of the asymptotes for the hyperbola $y^2/16-x^2/25=1$ ?

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Answer 1 · 2018-06-07T12:56:05

Vertices are at $(0,4) and (0,-4)$ , Focii are at
$(0,6.4) and (0,-6.4)$ Asymptotes are $y= +- 4/5 x$

$y^2/16-x^2/25=1$

The standard equation of vertical hyperbola is

$(y-k)^2/a^2-(x-h)^2/b^2=1:. h=0, k=0 , a=4 , b=5$

Center isat $0,0$ Vertices are at $(0,a) and (0,-a)$ or

Vertices are at $(0,4) and (0,-4)$

$c^2=a^2+b^2 = 4^2+5^2=41 :. c= +-sqrt41~~ +-6.4$

Foci are $c$ units from the center. Therefore,

Focii are at $(0,6.4) and (0,-6.4)$ equation of asymptotes

of vertical hyperbola are $y-k =+- a/b(x-h)$

Asymptotes are : $y-0= +- 4/5( x-0) or y= +- 4/5 x$

graph{y^2/16-x^2/25=1 [-12.67, 12.64, -6.33, 6.33]}

How do you find the coordinates of the vertices, foci, and the equation of the asymptotes for the hyperbola y^2/16-x^2/25=1y^2/16-x^2/25=1?