Graph the hyperbola $y^2 - 9x^2 = 1$ by solving for $y$ and graphing the two equations corresponding to the positive and negative squareroots.
$
\begin{equation}
\begin{aligned}
y ^2 - 9x^2 &= 1 && \text{Model}\\
\\
y^2 &= 1 + 9x^2 && \text{Add } 9x^2 \\
\\
y &= \pm \sqrt{1 + 9x^2} && \text{take the square root}
\end{aligned}
\end{equation}
$
Thus, the hyperbola is described by the graphs of two equations
$y = \sqrt{1+9x^2}$ and $y = -\sqrt{1+9x^2}$
The first equation represents the positive half of the hyperbola because $y \geq 0$ while the second represents the negative half. If we graph the first equation in the viewing recatngle $[-2,2]$ by $[-3,3]$ then we get...
The graph of the second equation is
Graphing these half portions together on the same viewing screen, we get the full hyperbola
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