Rotation of axes for a hyperbola Use rotation of axes to write y = 1/x in the standard form for a hyperbola.

Question

Rotation of axes for a hyperbola

Use rotation of axes to write y = 1/x in the standard form for a hyperbola.

Accepted Answer

Since y = 1/x is equivalent to xy - 1 = 0, we have A = 0, B = 1, and C = 0. Use [latex] \cot 2 heta=\frac{A-C}{B}[/latex] to get [latex] \cot 2 heta=0[/latex] or [latex] heta=\pi / 4[/latex]. Now find x and y in terms of x’ and y’:

[latex] \begin{aligned} x &=x^{\prime} \cos \frac{\pi}{4}-y^{\prime} \sin \frac{\pi}{4} & y &=x^{\prime} \sin \frac{\pi}{4}+y^{\prime} \cos \frac{\pi}{4} \ &=x^{\prime} \frac{\sqrt{2}}{2}-y^{\prime} \frac{\sqrt{2}}{2} & &=x^{\prime} \frac{\sqrt{2}}{2}+y^{\prime} \frac{\sqrt{2}}{2} \ &=\frac{x^{\prime}-y^{\prime}}{\sqrt{2}} & &=\frac{x^{\prime}+y^{\prime}}{\sqrt{2}} \end{aligned}[/latex]

Substitute these expressions for x and y into xy - 1 = 0:

[latex] \begin{aligned} \left(\frac{x^{\prime}-y^{\prime}}{\sqrt{2}} ight)\left(\frac{x^{\prime}+y^{\prime}}{\sqrt{2}} ight)-1 &=0 \ \frac{\left(x^{\prime} ight)^{2}-\left(y^{\prime} ight)^{2}}{2}-1 &=0 \ \frac{\left(x^{\prime} ight)^{2}}{2}-\frac{\left(y^{\prime} ight)^{2}}{2} &=1 \end{aligned}[/latex]

In the x’y’-coordinate system, [latex] \frac{\left(x^{\prime} ight)^{2}}{2}-\frac{\left(y^{\prime} ight)^{2}}{2}=1[/latex] is the equation of a hyperbola centered at the origin with vertices at [latex] (\pm \sqrt{2}, 0)[/latex], as shown in Fig. 10.45. The asymptotes are [latex] y^{\prime}=\pm x^{\prime}[/latex], which are the original x- and y-axes. To find the xy-coordinates of the vertices, let [latex] x^{\prime}=\pm \sqrt{2}[/latex] and y’ = 0 in the equations

[latex] x=\frac{x^{\prime}-y^{\prime}}{\sqrt{2}}[/latex] and [latex] y=\frac{x^{\prime}+y^{\prime}}{\sqrt{2}}[/latex]

to get the vertices (1, 1) and (-1, -1) in the xy-coordinates.

Question 10.4.5: Rotation of axes for a hyperbola Use rotation of axes to wri...

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