Extension Lesson: Conics and Foci

Practice Solutions

Identify the ellipse or hyperbola as horizontal or vertical. Then find the focal points.

$\frac{{(x + 5)}^{2}}{289} + \frac{{(y - 6)}^{2}}{64} = 1$

$a^{2} = 289 b^{2} = 64 \begin{matrix} \begin{array}{rcl} a^{2} - b^{2} & = & c^{2} \\ 289 - 64 & = & c^{2} \\ \sqrt{c^{2}} & = & \sqrt{225} \\ c & = & 15 \end{array} \end{matrix} (h, k) : (- 5, 6) (h \pm c, k) : (- 5 \pm 15, 6)$

Horizontal ellipse, foci: $(- 20, 6), (10, 6)$

$\frac{x^{2}}{36} - \frac{{(y + 2)}^{2}}{64} = 1$

$a^{2} = 36 b^{2} = 64 \begin{matrix} \begin{array}{rcl} a^{2} + b^{2} & = & c^{2} \\ 36 + 64 & = & c^{2} \\ \sqrt{c^{2}} & = & \sqrt{100} \\ c & = & 10 \end{array} \end{matrix} (h, k) : (0, - 2) (h, k \pm c) = (0, - 2 \pm 10)$

Vertical hyperbola, foci: $(0, - 12), (0, 8)$

$\frac{{(x + 1)}^{2}}{144} + \frac{{(y - 8)}^{2}}{169} = 1$

$a^{2} = 169 b^{2} = 144 \begin{matrix} \begin{array}{rcl} a^{2} - b^{2} & = & c^{2} \\ 169 - 144 & = & c^{2} \\ \sqrt{c^{2}} & = & \sqrt{25} \\ c & = & 5 \end{array} \end{matrix} (h, k) : (- 1, 8) (h, k \pm c) : (- 1, 8 \pm 5)$

Vertical ellipse, foci: $(- 1, 3), (- 1, 13)$

$\frac{x^{2}}{289} + \frac{y^{2}}{64} = 1$

Horizontal ellipse, foci: $(- 15, 0), (15, 0)$

$\frac{y^{2}}{225} - \frac{x^{2}}{64} = 1$

$a^{2} = 225 b^{2} = 64 \begin{matrix} \begin{array}{rcl} a^{2} + b^{2} & = & c^{2} \\ 225 + 64 & = & c^{2} \\ \sqrt{c^{2}} & = & \sqrt{289} \\ c & = & 17 \end{array} \end{matrix} (h, k) : (0, 0) (h, k \pm c) : (0, 0 \pm 17)$

Vertical hyperbola, foci: $(0, - 17), (0, 17)$

$\frac{{(y - 17)}^{2}}{49} - \frac{{(x + 15)}^{2}}{576} = 1$

$a^{2} = 49 b^{2} = 576 \begin{matrix} \begin{array}{rcl} a^{2} + b^{2} & = & c^{2} \\ 49 + 576 & = & c^{2} \\ \sqrt{c^{2}} & = & \sqrt{625} \\ c & = & 25 \end{array} \end{matrix} (h, k) : (17, - 15) (h, k \pm c) : (17, - 15 \pm 25)$

Vertical hyperbola, foci: $(17, - 40), (17, 10)$

Write the equation for the named conic in standard form.

A horizontal ellipse with vertices at $(15, 0)$ and $(- 15, 0)$ and focal length of 12 units.

$Center : (\frac{15 + (- 15)}{2}, \frac{0 + 0}{2}) = (0, 0) c = 12 \begin{array}{lcl} Find a : & Find b : \\ (0, 0), (15, 0) & a^{2} - b^{2} = c^{2} \\ a = \sqrt{{(15 - 0)}^{2} + {(0 - 0)}^{2}} & \begin{array}{rcl} 15^{2} - b^{2} & = & 12^{2} \end{array} \\ a = 15 & \begin{array}{rcl} 225 - b^{2} & = & 144 \end{array} \\ \begin{array}{rcl} - b^{2} & = & - 81 \end{array} \\ \begin{array}{rcl} b & = & 9 \end{array} \end{array}$

$\frac{x^{2}}{225} + \frac{y^{2}}{81} = 1$

A hyperbola with a horizontal transverse axis of 10 and foci at $(0, 0)$ and $(26, 0)$ .

$Center : (\frac{0 + 26}{2}, \frac{0 + 0}{2}) = (13, 0) Find c : (13, 0), (0, 0) c = \sqrt{{(0 - 13)}^{2} + {(0 - 0)}^{2}} c = 13 \begin{array}{lcl} Find a : & Find b : \\ 2 a = 10 & a^{2} + b^{2} = c^{2} \\ a = 5 & 5^{2} + b^{2} = 13^{2} \\ 25 + b^{2} = 169 \\ b^{2} = 144 \\ b = 12 \end{array}$

$\frac{{(x - 13)}^{2}}{25} - \frac{y^{2}}{144} = 1$

A horizontal ellipse with vertices at $(17, 0)$ and $(- 17, 0)$ and a focal length of 8 units.

$Center : (\frac{17 + (- 17)}{2}, \frac{0 + 0}{2}) = (0, 0) c = 8 \begin{array}{lcl} Find a : & Find b : \\ (0, 0), (17, 0) & a^{2} - b^{2} = c^{2} \\ a = \sqrt{{(17 - 0)}^{2} + {(0 - 0)}^{2}} & 17^{2} - b^{2} = 8^{2} \\ a = 17 & 289 - b^{2} = 64 - b^{2} = - 225 b = 15 \end{array}$

$\frac{x^{2}}{289} + \frac{y^{2}}{225} = 1$

An ellipse with focal points at $(- 2, 5)$ and $(- 2, - 11)$ and co-vertices at $(4, - 3)$ and $(- 8, - 3)$ .

$Center : (\frac{- 2 + (- 2)}{2}, \frac{5 + (- 11)}{2}) = (- 2, - 3) Find c : (- 2, - 3), (- 2, 5) c = \sqrt{{(- 2 - (- 2))}^{2} + {(- 3 - 5)}^{2}} = 8 \begin{array}{lcl} Find b : & Find a : \\ (- 2, - 3), (4, - 3) & a^{2} - b^{2} = c^{2} \\ b = \sqrt{{(- 2 - 4)}^{2} + {(- 3 - (- 3))}^{2}} & a^{2} - 6^{2} = 8^{2} \\ b = 6 & a^{2} - 36 = 64 \\ a^{2} = 100 \\ a = 10 \end{array}$

$\frac{{(x + 2)}^{2}}{36} + \frac{{(y + 3)}^{2}}{100} = 1$

A hyperbola with a vertical transverse axis of 48 and foci at $(2, 1)$ and $(2, 51)$ .

$Center : (\frac{2 + 2}{2}, \frac{1 + 51}{2}) = (2, 26) Find c : (2, 26), (2, 1) c = \sqrt{{(2 - 2)}^{2} + {(26 - 1)}^{2}} c = 25 \begin{array}{ccl} Find a : & Find b : \\ 2 a = 48 & a^{2} + b^{2} = c^{2} \\ a = 24 & 24^{2} + b^{2} = 25^{2} \\ 576 + b^{2} = 625 \\ b^{2} = 49 \\ b = 7 \end{array}$

$\frac{{(y - 26)}^{2}}{576} - \frac{{(x - 2)}^{2}}{49} = 1$

An ellipse with focal points at $(2, 8)$ and $(14, 8)$ and vertices at $(0, 8)$ and $(16, 8)$ .

$Center : (\frac{2 + 14}{2}, \frac{8 + 8}{2}) = (8, 8) Find c : (8, 8), (2, 8) c = \sqrt{{(2 - 8)}^{2} + {(8 - 8)}^{2}} c = 6 \begin{array}{lcl} Find a : & Find b : \\ (8, 8), (0, 8) & a^{2} - b^{2} = c^{2} \\ a = \sqrt{{(0 - 8)}^{2} + {(8 - 8)}^{2}} & 8^{2} - b^{2} = 6^{2} \\ a = 8 & 64 - b^{2} = 36 \\ - b^{2} = - 28 \\ b = \sqrt{28} \end{array}$

$\frac{{(x - 8)}^{2}}{64} + \frac{{(y - 8)}^{2}}{28} = 1$

Note

The variable b does not need to be completely simplified because the final answer is written in terms of b-squared.

A hyperbola with a horizontal transverse length of 12 and foci at $(- 7, 0)$ and $(7, 0)$ .

$Center : (\frac{- 7 + 7}{2}, \frac{0 + 0}{2}) = (0, 0) Find c : (0, 0), (- 7, 0) c = \sqrt{{(- 7 - 0)}^{2} + {(0 - 0)}^{2}} c = 7 \begin{array}{lcl} Find a : & Find b : \\ 2 a = 12 & a^{2} + b^{2} = c^{2} \\ a = 6 & 6^{2} + b^{2} = 7^{2} \\ 36 + b^{2} = 49 \\ b^{2} = 15 \\ b = \sqrt{15} \end{array}$

$\frac{x^{2}}{36} - \frac{y^{2}}{15} = 1$

A hyperbola with vertices at $(5, 2)$ and $(1, 2)$ and focal points at $(7, 2)$ and $(- 1, 2)$ .

$Center : (\frac{5 + 1}{2}, \frac{2 + 2}{2}) = (3, 2) Find c : (3, 2), (7, 2) c = \sqrt{{(7 - 3)}^{2} + {(2 - 2)}^{2}} c = 4 \begin{array}{lcl} Find a : & Find b : \\ (3, 2), (5, 2) & a^{2} + b^{2} = c^{2} \\ a = \sqrt{{(5 - 3)}^{2} + {(2 - 2)}^{2}} & 2^{2} + b^{2} = 4^{2} \\ a = 2 & 4 + b^{2} = 16 \\ b^{2} = 12 \\ b = 2 \sqrt{3} \end{array}$

$\frac{{(x - 3)}^{2}}{16} - \frac{{(y - 2)}^{2}}{12} = 1$