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What do $a$ and $b$ represent in the equation of a hyperbola?

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Feb 3, 2016

In the general equation of a hyperbola
$color(white)("XXX")a$ represents the distance from the vertex to the center
$color(white)("XXX")b$ represents the distance perpendicular to the transverse axis from the vertex to the asymptote line(s).

Explanation:

For a hyperbola with a horizontal transverse axis,
the general formula is:
$color(white)("XXX")(x^2)/(a^2)-(y^2)/(b^2)=1$

For a hyperbola with a vertical transverse axis,
the general formula is:
$color(white)("XXX")(y^2)/(a^2)-(x^2)/(b^2)=1$

Note that the $(a^2)$ always goes with the positive of $x^2$ or $y^2$

The significance of $a$ and $b$ can (hopefully) be seen by the diagrams below:
enter image source here
(the $color(red)("red lines")$ represent the asymptotes and are not part of the hyperbolae)

For a hyperbola with a horizontal transverse axis,
the slopes of the two asymptotes are $b/a$ and $-(b/a)$

For a hyperbola with a vertical transverse axis
the slopes of the two asymptotes are $a/b$ and $-a/b$

{I hope the reason for this is clear from the above diagrams and the definition of slope.]

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