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What is the equation for a hyperbola with transverse axis of length 24 and centered at the origin?
Wiki User
∙ 11y ago
The standard form of the equation of a hyperbola with center at the origin is
x2/a2 - y2/b2 = 1 where the transverse axis lies on the x-axis,
or
y2/a2 - x2/b2 = 1 where the transverse axis lies on the y-axis.
The vertices are a units from the center and the foci are c units from the center.
For both equations, b2 = c2 - a2. Equivalently, c2 = a2 + b2.
Since we know the length of the transverse axis (the distance between the vertices), we can find the value of a (because the center, the origin, lies midway between the vertices and foci).
Suppose that the transverse axis of our hyperbola lies on the x-axis.
Then, |a| = 24/2 = 12
So the equation becomes x2/144 - y2/b2 = 1.
To find b we need to know what c is.
Wiki User
∙ 11y ago
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What is the equation of a hyperbola that has a transverse axis of length 28 and is centered at the origin?
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x2/242-y2/62=1
If a hyperbola has a transverse axis of length 10 and is centered at the origin what is the equation?
y2/52 - x2/72 = 1
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x2/242-y2/62=1
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