How do you graph the hyperbola $y^2/16-x^2/9=1$ ?

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How do you graph the hyperbola $y^2/16-x^2/9=1$ ?

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Answer 1 · 2017-08-08T18:42:32

Crosses at $y=+-4$

Explanation:

As this equation is already in the correct format, put $x and y$ equal to zero and you will see that when $x=0$ , $y^2=16$ which gives the y intercepts.

If you put $y=0$ , you get $x^2=-9$ which doesn't give any real roots. The graph will therefore be a hyperbola in the shape of a V and an upside down V (as opposed to being on their sides like ><).

You can use the formula: $x/a = +-y/b$ to determine the equations of the asymptotes where $a=sqrt(9), b=sqrt(16)$ and you will get $y=+-(4/3)x$

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How do you graph the hyperbola $y^2/16-x^2/9=1$ ?

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Explanation:

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How do you graph the hyperbola $y^2/16-x^2/9=1$ ?