Practice 1 Solutions

6. Graph the hyperbola: $\frac{x^2}{9}–\frac{{\left(y–3\right)}^2}{25}=1$

$$\begin{gathered} \mathrm{C}\mathrm{enter}: \left(0, 3\right) \\ a=3 \\ b=5 \\ \mathrm{S}\mathrm{lope} \mathrm{of} \mathrm{asymptote}: \pm \frac{5}{3} \end{gathered}$$

7. Graph the hyperbola: $16x^2–64x–36y^2+72y=116$

$$\begin{gathered} 16\left(x^2–4x\right)–36\left(y^2–2y\right)=116 \\ 16\left(x^2–4x+\boxed{{\left(–\frac{4}{2}\right)}^2}\right)–36\left(y^2–2y+\boxed{{\left(–\frac{2}{2}\right)}^2}\right)=116+16\boxed{{\left(–\frac{4}{2}\right)}^2}–36\boxed{{\left(–\frac{2}{2}\right)}^2} \\ 16{\left(x–2\right)}^2–36{\left(y–1\right)}^2=116+64–36 \\ 16{\left(x–2\right)}^2–36{\left(y–1\right)}^2=144 \\ \frac{{\left(x–2\right)}^2}{9}–\frac{{\left(y–1\right)}^2}{4}=1 \\ \mathrm{C}\mathrm{enter}: \left(2, 1\right) \\ a=3 \\ b=2 \\ \mathrm{S}\mathrm{lope} \mathrm{of} \mathrm{asymptotes}:\hspace{0.17em}\pm \frac{2}{3} \end{gathered}$$

8. Graph: $\frac{y^2}{49}–\frac{x^2}{81}=1$

$$\begin{gathered} \mathrm{C}\mathrm{enter}: \left(0, 0\right) \\ a=7 \\ b=9 \\ \mathrm{S}\mathrm{lope} \mathrm{of} \mathrm{asymptotes}: \pm \frac{7}{9} \end{gathered}$$

9. Graph the horizontal hyperbola with asymptotes:$y–6=\pm \frac{6}{7}\left(x+1\right)$

$$\begin{gathered} \mathrm{C}\mathrm{enter}: \left(–1, 6\right) \\ a=7 \\ b=6 \\ \mathrm{T}\mathrm{ransverse} \mathrm{horizontal} \mathrm{axis} \\ \frac{{\left(x+1\right)}^2}{49}–\frac{{\left(y–6\right)}^2}{36}=1 \end{gathered}$$

10. Graph the hyperbola with vertices at $(–8, 0)$ and $(8, 0)$ and co-vertices at $(0, 3)$ and $(0, –3)$.

$$\begin{gathered} \mathrm{C}\mathrm{enter}: \left(0, 0\right) \\ a=8 \\ b=3 \\ \mathrm{Horizontal} \\ \frac{x^2}{64}–\frac{y^2}{9}=1 \end{gathered}$$

11. Mike was asked to write the hyperbola $9x^2–36x–16y^2–96y=252$ in standard form. Verify or find the error in his solution. If there is an error, determine the correct equation.

    
    $$\begin{gathered} 9x^2–36x–16y^2–96y=252 \\ 9\left(x^2–4x\right)–16\left(y^2–6y\right)=252 \\ 9\left(x^2–4x+\boxed{{\left(–\frac{4}{2}\right)}^2}\right)–16\left(y^2+6y+\boxed{{\left(\frac{6}{2}\right)}^2}\right)=252+9\boxed{{\left(–\frac{4}{2}\right)}^2}+16\boxed{{\left(\frac{6}{2}\right)}^2} \\ 9{\left(x–2\right)}^2–16{\left(y–3\right)}^2=432 \\ \frac{{\left(x–2\right)}^2}{48}–\frac{{\left(y–3\right)}^2}{27}=1 \end{gathered}$$

$$\begin{gathered} 9\left(x^2–4x+\boxed{{\left(–\frac{4}{2}\right)}^2}\right)–16\left(y^2+6y+\boxed{{\left(\frac{6}{2}\right)}^2}\right)=252+9\boxed{{\left(–\frac{4}{2}\right)}^2}\overline{)–}16\boxed{{\left(\frac{6}{2}\right)}^2} \\ \mathrm{Mike} \mathrm{should} \mathrm{have} \mathrm{subtracted} 16\left(9\right). \\ 9{\left(x–2\right)}^2–16{\left(y–3\right)}^2=144 \\ \frac{{\left(x–2\right)}^2}{16}–\frac{{\left(y–3\right)}^2}{9}=1 \end{gathered}$$

12. $x^2–12x+y^2–2y=–1$

$A=C$

B

13. $x^2–y^2+4y=13$

A and C have different signs.

C

14. $6x^2+y^2+4y=9$

$A\ne C$ and have the same sign.

A

15. $8y+2–x^2=x–1$

$A=–1, C=0$

Parabola

16. $3y^2–6y=3x^2+15$

$A=–3, C=3$
A and C have different signs.

Hyperbola

17. $4x^2=–9y^2+36y$

$$\begin{gathered} 4x^2+9y^2–36y=0 \\ A=9, C=4 \end{gathered}$$

Ellipse

18. $x=2y^2+4$

$A=0, C=2$

Parabola