Skip to main content
Engineering LibreTexts

14.4.2: The Parabola

  • Page ID
    67365
  • \( \newcommand{\vecs}[1]{\overset { \scriptstyle \rightharpoonup} {\mathbf{#1}} } \) \( \newcommand{\vecd}[1]{\overset{-\!-\!\rightharpoonup}{\vphantom{a}\smash {#1}}} \)\(\newcommand{\id}{\mathrm{id}}\) \( \newcommand{\Span}{\mathrm{span}}\) \( \newcommand{\kernel}{\mathrm{null}\,}\) \( \newcommand{\range}{\mathrm{range}\,}\) \( \newcommand{\RealPart}{\mathrm{Re}}\) \( \newcommand{\ImaginaryPart}{\mathrm{Im}}\) \( \newcommand{\Argument}{\mathrm{Arg}}\) \( \newcommand{\norm}[1]{\| #1 \|}\) \( \newcommand{\inner}[2]{\langle #1, #2 \rangle}\) \( \newcommand{\Span}{\mathrm{span}}\) \(\newcommand{\id}{\mathrm{id}}\) \( \newcommand{\Span}{\mathrm{span}}\) \( \newcommand{\kernel}{\mathrm{null}\,}\) \( \newcommand{\range}{\mathrm{range}\,}\) \( \newcommand{\RealPart}{\mathrm{Re}}\) \( \newcommand{\ImaginaryPart}{\mathrm{Im}}\) \( \newcommand{\Argument}{\mathrm{Arg}}\) \( \newcommand{\norm}[1]{\| #1 \|}\) \( \newcommand{\inner}[2]{\langle #1, #2 \rangle}\) \( \newcommand{\Span}{\mathrm{span}}\)\(\newcommand{\AA}{\unicode[.8,0]{x212B}}\)

    Learning Objectives

    • Graph parabolas with vertices at the origin.
    • Write equations of parabolas in standard form.
    • Graph parabolas with vertices not at the origin.
    • Solve applied problems involving parabolas.

    Did you know that the Olympic torch is lit several months before the start of the games? The ceremonial method for lighting the flame is the same as in ancient times. The ceremony takes place at the Temple of Hera in Olympia, Greece, and is rooted in Greek mythology, paying tribute to Prometheus, who stole fire from Zeus to give to all humans. One of eleven acting priestesses places the torch at the focus of a parabolic mirror (Figure \(\PageIndex{1}\)), which focuses light rays from the sun to ignite the flame.

    This is a photo of the Olympic torch concluding its journey around the world and lighting the Olympic cauldron during the opening ceremony.

     

    Figure \(\PageIndex{1}\): The Olympic torch concludes its journey around the world when it is used to light the Olympic cauldron during the opening ceremony. (credit: Ken Hackman, U.S. Air Force)

    Parabolic mirrors (or reflectors) are able to capture energy and focus it to a single point. The advantages of this property are evidenced by the vast list of parabolic objects we use every day: satellite dishes, suspension bridges, telescopes, microphones, spotlights, and car headlights, to name a few. Parabolic reflectors are also used in alternative energy devices, such as solar cookers and water heaters, because they are inexpensive to manufacture and need little maintenance. In this section we will explore the parabola and its uses, including low-cost, energy-efficient solar designs.

    Graphing Parabolas with Vertices at the Origin

    Conic sections are formed when a plane cuts through a right circular cone as seen below. If the plane is parallel to the edge of the cone, an unbounded curve is formed. This curve is a parabola (Figure \(\PageIndex{2}\)).

    Image shows the conic section, the parabola, being generated by intersecting a plane through a circular cone.

     

    Figure \(\PageIndex{2}\): Parabola created by cutting a plane through a right circular cone.

    Like the ellipse and hyperbola, the parabola can also be defined by a set of points in the coordinate plane. A parabola is the set of all points \((x,y)\) in a plane that are the same distance from a fixed line, called the directrix, and a fixed point (the focus) not on the directrix.

    Key features of the parabola are given in (Figure \(\PageIndex{3}\)). Notice that the axis of symmetry passes through the focus and vertex and is perpendicular to the directrix. The vertex is the midpoint between the directrix and the focus. The line segment that passes through the focus and is parallel to the directrix is called the latus rectum. The endpoints of the latus rectum lie on the curve. By definition, the distanced d from the focus to any point \(P\) on the parabola is equal to the distance from \(P\) to the directrix.

    This image displays key features of the parabola. It points out that the axis of symmetry passes through the focus and vertex and is perpendicular to the directrix. The vertex is the midpoint between the directrix and the focus. The line segment that passes through the focus and is parallel to the directrix is called the latus rectum. The endpoints of the latus rectum lie on the curve.

     

    Figure \(\PageIndex{3}\): Key features of the parabola

    To work with parabolas in the coordinate plane, we consider two cases: those with a vertex at the origin and those with a vertex at a point other than the origin. We begin with the former.

    A vertical upward opening parabola with Vertex (0, 0), Focus (0, p) and Directrix y = negative p. Lines of length d connect a point on the parabola (x, y) to the Focus and the Directrix. The line to the Directrix is perpendicular to it.
    Figure \(\PageIndex{4}\): Parabola graphed at the origin in a coordinate plane.

     

    Let \((x,y)\) be a point on the parabola with vertex \((0,0)\), focus \((0,p)\),and directrix \(y=−p\)  as shown in Figure \(\PageIndex{4}\). The distanced d from point \((x,y)\) to point \((x,−p)\) on the directrix is the difference of the y-values: \(d=y+p\). The distance from the focus \((0,p)\) to the point \((x,y)\) is also equal to \(d\) and can be expressed using the distance formula.

    \[ \begin{align*} d &=\sqrt{{(x−0)}^2+{(y−p)}^2} \\[4pt] &=\sqrt{x^2+{(y−p)}^2} \end{align*} \]

    Set the two expressions for \(d\) equal to each other and solve for \(y\) to derive the equation of the parabola. We do this because the distance from \((x,y)\) to \((0,p)\) equals the distance from \((x,y)\) to \((x,−p)\).

    \[\sqrt{x^2+{(y−p)}^2}=y+p \]

    We then square both sides of the equation, expand the squared terms, and simplify by combining like terms.

    \[ \begin{align*} x^2+{(y−p)}^2 &={(y+p)}^2 \\[4pt] x^2+y^2−2py+p^2 &=y^2+2py+p^2 \\[4pt] x^2−2py &=2py \\[4pt] x^2 &=4py \end{align*} \]

    The equations of parabolas with vertex \((0,0)\) are \(y^2=4px\) when the x-axis is the axis of symmetry and \(x^2=4py\) when the y-axis is the axis of symmetry. These standard forms are given below, along with their general graphs and key features.

    Standard Forms of Parabolas with Vertex at 0,0

    STANDARD FORMS OF PARABOLAS WITH VERTEX \((0,0)\)

    Table \(\PageIndex{1}\) and Figure \(\PageIndex{5}\) summarize the standard features of parabolas with a vertex at the origin.

    Table \(\PageIndex{1}\)
    Axis of Symmetry Equation Focus Directrix Endpoints of Latus Rectum
    x-axis \(y^2=4px\) \((p, 0)\) \(x=−p\) \((p, \pm 2p)\)
    y-axis \(x^2=4py\) \((0, p)\) \(y=−p\) \((\pm 2p, p)\)

    Four figures describing parabolas with different conditions and hence different looks: (a) When p>0 and the axis of symmetry is the x-axis, the parabola opens right. (b) When p<0 and the axis of symmetry is the x-axis, the parabola opens left. (c) When p<0 and the axis of symmetry is the y-axis, the parabola opens up. (d) When p<0 and the axis of symmetry is the y-axis, the parabola opens down.

    Figure \(\PageIndex{5}\): (a) When \(p>0\) and the axis of symmetry is the x-axis, the parabola opens right. (b) When \(p<0\) and the axis of symmetry is the x-axis, the parabola opens left. (c) When \(p>0\) and the axis of symmetry is the y-axis, the parabola opens up. (d) When \(p<0\) and the axis of symmetry is the y-axis, the parabola opens down.

    The key features of a parabola are its vertex, axis of symmetry, focus, directrix, and latus rectum (Figure \(\PageIndex{5}\)). When given a standard equation for a parabola centered at the origin, we can easily identify the key features to graph the parabola. A line is said to be tangent to a curve if it intersects the curve at exactly one point. If we sketch lines tangent to the parabola at the endpoints of the latus rectum, these lines intersect on the axis of symmetry, as shown in Figure \(\PageIndex{6}\).

     Example of a tangent line where the line touches the parabola at one point only. The two tangent lines above intersect at the axis of symmetry, the x-axis.

     

    Figure \(\PageIndex{6}\): Example of a tangent line where the line touches the parabola at one point only. The two tangent lines above intersect at the axis of symmetry, the x-axis.

    How to: Given a standard form equation for a parabola centered at \((0,0)\), sketch the graph

    1. Determine which of the standard forms applies to the given equation: \(y^2=4px\) or \(x^2=4py\).
    2. Use the standard form identified in Step 1 to determine the axis of symmetry, focus, equation of the directrix, and endpoints of the latus rectum.
      • If the equation is in the form \(y^2=4px\), then
        • the axis of symmetry is the \(x\)-axis, \(y=0\)
        • set \(4p\) equal to the coefficient of \(x\) in the given equation to solve for \(p\). If \(p>0\), the parabola opens right. If \(p<0\), the parabola opens left.
        • use \(p\) to find the coordinates of the focus, \((p,0)\)
        • use \(p\) to find the equation of the directrix, \(x=−p\)
        • use \(p\) to find the endpoints of the latus rectum, \((p,\pm 2p)\). Alternately, substitute \(x=p\) into the original equation.
      • If the equation is in the form \(x^2=4py\),then
        • the axis of symmetry is the \(y\)-axis, \(x=0\)
        • set \(4p\) equal to the coefficient of \(y\) in the given equation to solve for \(p\). If \(p>0\), the parabola opens up. If \(p<0\), the parabola opens down.
        • use \(p\) to find the coordinates of the focus, \((0,p)\)
        • use \(p\) to find equation of the directrix, \(y=−p\)
        • use \(p\) to find the endpoints of the latus rectum, \((\pm 2p,p)\)
    3. Plot the focus, directrix, and latus rectum, and draw a smooth curve to form the parabola.

    x-axis as the Axis of Symmetry

    Graph \(y^2=24x\). Identify and label the focus, directrix, and endpoints of the latus rectum.

    Solution

    The standard form that applies to the given equation is \(y^2=4px\). Thus, the axis of symmetry is the x-axis. It follows that:

    • \(24=4p\), so \(p=6\). Since \(p>0\), the parabola opens right
    • the coordinates of the focus are \((p,0)=(6,0)\)
    • the equation of the directrix is \(x=−p=−6\)
    • the endpoints of the latus rectum have the same x-coordinate at the focus. To find the endpoints, substitute \(x=6\) into the original equation: \((6,\pm 12)\)

    Next we plot the focus, directrix, and latus rectum, and draw a smooth curve to form the parabola (Figure \(\PageIndex{7}\)).

    A graph of the solution to the problem presented herein.

     

    Figure \(\PageIndex{7}\): A graph of the solution to the problem presented herein.

    Exercise \(\PageIndex{1}\)

    Graph \(y^2=−16x\). Identify and label the focus, directrix, and endpoints of the latus rectum.

    Answer
    • Focus: \((−4,0)\)
    • Directrix: \(x=4\)
    • Endpoints of the latus rectum: \((−4,\pm 8)\)
    A graph of the solution to the problem presented herein.

     

    Figure \(\PageIndex{8}\): A graph of the solution to the problem presented herein.

    y-axis as the Axis of Symmetry

    Graph \(x^2=−6y\). Identify and label the focus, directrix, and endpoints of the latus rectum.

    Solution

    The standard form that applies to the given equation is \(x^2=4py\). Thus, the axis of symmetry is the \(y\)-axis. It follows that:

    • \(−6=4p\),so \(p=−\dfrac{3}{2}\). Since \(p<0\), the parabola opens down.
    • the coordinates of the focus are \((0,p)=(0,−\dfrac{3}{2})\)
    • the equation of the directrix is \(y=−p=\dfrac{3}{2}\)
    • the endpoints of the latus rectum can be found by substituting \(y=\dfrac{3}{2}\) into the original equation, \((\pm 3,−\dfrac{3}{2})\)

    Next we plot the focus, directrix, and latus rectum, and draw a smooth curve to form the parabola.

    A graph of the solution to the problem presented herein.

     

    Figure \(\PageIndex{9}\): A graph of the solution to the problem presented herein.

    Exercise \(\PageIndex{2}\)

    Graph \(x^2=8y\). Identify and label the focus, directrix, and endpoints of the latus rectum.

    Answer
    • Focus: \((0,2)\)
    • Directrix: \(y=−2\)
    • Endpoints of the latus rectum: \((\pm 4,2)\).
    CNX_Precalc_Figure_10_03_008
    Figure \(\PageIndex{10}\): A graph of the solution to the problem presented herein.

    Writing Equations of Parabolas in Standard Form

    In the previous examples, we used the standard form equation of a parabola to calculate the locations of its key features. We can also use the calculations in reverse to write an equation for a parabola when given its key features.

    How to: Given its focus and directrix, write the equation for a parabola in standard form

    1. Determine whether the axis of symmetry is the \(x\)- or \(y\)-axis.
      1. If the given coordinates of the focus have the form \((p,0)\), then the axis of symmetry is the \(x\)-axis. Use the standard form \(y^2=4px\).
      2. If the given coordinates of the focus have the form \((0,p)\), then the axis of symmetry is the \(y\)-axis. Use the standard form \(x^2=4py\).
    2. Multiply \(4p\).
    3. Substitute the value from Step 2 into the equation determined in Step 1.

    Example \(\PageIndex{3}\): Writing the Equation of a Parabola in Standard Form Given its Focus and Directrix

    What is the equation for the parabola with focus \((−\dfrac{1}{2},0)\) and directrix \(x=\dfrac{1}{2}\)?

    Solution

    The focus has the form \((p,0)\), so the equation will have the form \(y^2=4px\).

    • Multiplying \(4p\), we have \(4p=4(−\dfrac{1}{2})=−2\).
    • Substituting for \(4p\), we have \(y^2=4px=−2x\).=

    Therefore, the equation for the parabola is \(y^2=−2x\).

    Exercise \(\PageIndex{3}\)

    What is the equation for the parabola with focus \(\left(0,\dfrac{7}{2}\right)\) and directrix \(y=−\dfrac{7}{2}\)?

    Answer

    \(x^2=14y\).

    Graphing Parabolas with Vertices Not at the Origin

    Like other graphs we’ve worked with, the graph of a parabola can be translated. If a parabola is translated \(h\) units horizontally and \(k\) units vertically, the vertex will be \((h,k)\). This translation results in the standard form of the equation we saw previously with \(x\) replaced by \((x−h)\) and \(y\) replaced by \((y−k)\).

    To graph parabolas with a vertex \((h,k)\) other than the origin, we use the standard form \({(y−k)}^2=4p(x−h)\) for parabolas that have an axis of symmetry parallel to the \(x\)-axis, and \({(x−h)}^2=4p(y−k)\) for parabolas that have an axis of symmetry parallel to the \(y\)-axis. These standard forms are given below, along with their general graphs and key features.

    Standard Forms of Parabolas with Vertex at (h,k)

    STANDARD FORMS OF PARABOLAS WITH VERTEX \((H, K)\)

    Table \(\PageIndex{2}\) and Figure \(\PageIndex{11}\) summarize the standard features of parabolas with a vertex at a point \((h,k)\).

    Table \(\PageIndex{2}\)
    Axis of Symmetry Equation Focus Directrix Endpoints of Latus Rectum
    \(y=k\) \({(y−k)}^2=4p(x−h)\) \((h+p, k)\) \(x=h−p\) \((h+p, k\pm 2p)\)
    \(x=h\) \({(x−h)}^2=4p(y−k)\) \((h, k+p)\) \(y=k−p\) \((h\pm 2p, k+p)\)

    Four graphs of parabolas with the conditions that make each graph different. This is the same as previously shown except know there is an extra term that shifts the parabola off the x or y axis. (a) When \(p > 0\) and the axis of symmetry is the x-axis, the parabola opens right. (b) When \(p < 0\) and the axis of symmetry is the x-axis, the parabola opens left. (c) When \(p > 0\) and the axis of symmetry is the y-axis, the parabola opens up. (d) When \(p < 0\) and the axis of symmetry is the y-axis, the parabola opens down.

    Figure \(\PageIndex{11}\): (a) When \(p > 0\), the parabola opens right. (b) When \(p < 0\), the parabola opens left. (c) When \(p > 0\), the parabola opens up. The equation to this becomes more familiar as \(y = ax^2 + bx + c\). (d) When \(p < 0\), the parabola opens down.

    How to: Given a standard form equation for a parabola centered at \((h,k)\), sketch the graph

    1. Determine which of the standard forms applies to the given equation: \({(y−k)}^2=4p(x−h)\) or \({(x−h)}^2=4p(y−k)\).
    2. Use the standard form identified in Step 1 to determine the vertex, axis of symmetry, focus, equation of the directrix, and endpoints of the latus rectum.
      • If the equation is in the form \({(y−k)}^2=4p(x−h)\),then:
        • use the given equation to identify \(h\) and \(k\) for the vertex, \((h,k)\)
        • use the value of \(k\) to determine the axis of symmetry, \(y=k\)
        • set \(4p\) equal to the coefficient of \((x−h)\) in the given equation to solve for \(p\). If \(p>0\),the parabola opens right. If \(p<0\), the parabola opens left.
        • use \(h\), \(k\), and \(p\) to find the coordinates of the focus, \((h+p, k)\)
        • use \(h\)  andp p to find the equation of the directrix, \(x=h−p\)
        • use \(h\), \(k\), and \(p\) to find the endpoints of the latus rectum, \((h+p,k\pm 2p)\)
      • If the equation is in the form \({(x−h)}^2=4p(y−k)\),then:
        • use the given equation to identify \(h\) and \(k\) for the vertex, \((h,k)\)
        • use the value of \(h\) to determine the axis of symmetry, \(x=h\)
        • set \(4p\) equal to the coefficient of \((y−k)\) in the given equation to solve for \(p\). If \(p>0\), the parabola opens up. If \(p<0\), the parabola opens down.
        • use \(h\), \(k\), and \(p\) to find the coordinates of the focus, \((h, k+p)\)
        • use \(k\) and \(p\) to find the equation of the directrix, \(y=k−p\)
        • use \(h\), \(k\), and \(p\)  to find the endpoints of the latus rectum, \((h\pm 2p, k+p)\)
    3. Plot the vertex, axis of symmetry, focus, directrix, and latus rectum, and draw a smooth curve to form the parabola.

    Example \(\PageIndex{4}\): Graphing a Parabola with Vertex \((h, k)\) and Axis of Symmetry Parallel to the \(x\)-axis

    Graph \({(y−1)}^2=−16(x+3)\). Identify and label the vertex, axis of symmetry, focus, directrix, and endpoints of the latus rectum.

    Solution

    The standard form that applies to the given equation is \({(y−k)}^2=4p(x−h)\). Thus, the axis of symmetry is parallel to the \(x\)-axis. It follows that:

    • the vertex is \((h,k)=(−3,1)\)
    • the axis of symmetry is \(y=k=1\)
    • \(−16=4p\),so \(p=−4\). Since \(p<0\), the parabola opens left.
    • the coordinates of the focus are \((h+p,k)=(−3+(−4),1)=(−7,1)\)
    • the equation of the directrix is \(x=h−p=−3−(−4)=1\)
    • the endpoints of the latus rectum are \((h+p,k\pm 2p)=(−3+(−4),1\pm 2(−4))\), or \((−7,−7)\) and \((−7,9)\)

    Next we plot the vertex, axis of symmetry, focus, directrix, and latus rectum, and draw a smooth curve to form the parabola (Figure \(\PageIndex{10}\)).

    This is the graph labeled (y minus 1) squared = negative 16(x + 3), a horizontal parabola opening to the left with Vertex (negative 3, 1), Focus (negative 7, 1), and Directrix x = 1. The Latus Rectum is shown, a vertical line passing through the Focus and terminating on the parabola at (negative 7, negative 7) and (negative 7, 9). The Axis of Symmetry, the horizontal line y = 1, is also shown, passing through the Vertex and the Focus.
    Figure \(\PageIndex{12}\): A graph of the solution to the problem presented herein.

     

    Exercise \(\PageIndex{4}\)

    Graph \({(y+1)}^2=4(x−8)\). Identify and label the vertex, axis of symmetry, focus, directrix, and endpoints of the latus rectum.

    Answer
    • Vertex: \((8,−1)\)
    • Axis of symmetry: \(y=−1\)
    • Focus: \((9,−1)\)
    • Directrix: \(x=7\)
    •  Endpoints of the latus rectum: \((9,−3)\) and \((9,1)\).
    A graph of the solution to the problem presented herein.

     

    Figure \(\PageIndex{13}\): A graph of the solution to the problem presented herein.

    Example \(\PageIndex{5}\): Graphing a Parabola from an Equation Given in General Form

    Graph \(x^2−8x−28y−208=0\). Identify and label the vertex, axis of symmetry, focus, directrix, and endpoints of the latus rectum.

    Solution

    Start by writing the equation of the parabola in standard form. The standard form that applies to the given equation is \({(x−h)}^2=4p(y−k)\). Thus, the axis of symmetry is parallel to the \(y\)-axis. To express the equation of the parabola in this form, we begin by isolating the terms that contain the variable \(x\) in order to complete the square.

    \[ \begin{align*} x^2−8x−28y−208&=0 \\[4pt] x^2−8x &=28y+208 \\[4pt] x^2−8x+16 &=28y+208+16 \\[4pt] (x−4)^2 &=28y+224 \\[4pt] (x−4)^2 &=28(y+8) \\[4pt] (x−4)^2&= 4⋅7⋅(y+8) \end{align*}\]

    It follows that:

    • the vertex is \((h,k)=(4,−8)\)
    • the axis of symmetry is \(x=h=4\)
    • since \(p=7\), \(p>0\)  and so the parabola opens up
    • the coordinates of the focus are \((h,k+p)=(4,−8+7)=(4,−1)\)
    • the equation of the directrix is \(y=k−p=−8−7=−15\)
    • the endpoints of the latus rectum are \((h\pm 2p,k+p)=(4\pm 2(7),−8+7)\), or \((−10,−1)\) and \((18,−1)\)

    Next we plot the vertex, axis of symmetry, focus, directrix, and latus rectum, and draw a smooth curve to form the parabola (Figure \(\PageIndex{14}\)).

    This is the graph labeled (x minus 4)squared = 28 times (y + 8), a vertical parabola opening upward with Vertex (4, negative 8), Focus (4, negative 1), and Directrix y = negative 15. The Latus Rectum is shown, a horizontal line passing through the Focus and terminating on the parabola at (negative 10, negative 1) and (18, negative 1). The Axis of Symmetry, the vertical line x = 4, is also shown, passing through the Vertex and the Focus.
    Figure \(\PageIndex{14}\): A graph of the solution to the problem presented herein.

    Exercise \(\PageIndex{5}\)

    Graph \({(x+2)}^2=−20(y−3)\). Identify and label the vertex, axis of symmetry, focus, directrix, and endpoints of the latus rectum.

    Answer
    • Vertex: \((−2,3)\)
    • Axis of symmetry: \(x=−2\)
    • Focus: \((−2,−2)\)
    • Directrix: \(y=8\)
    • Endpoints of the latus rectum: \((−12,−2)\) and \((8,−2)\).
    A graph of the solution to the problem presented herein.

     

    Figure \(\PageIndex{15}\): A graph of the solution to the problem presented herein.

    Solving Applied Problems Involving Parabolas

    As we mentioned at the beginning of the section, parabolas are used to design many objects we use every day, such as telescopes, suspension bridges, microphones, and radar equipment. Parabolic mirrors, such as the one used to light the Olympic torch, have a very unique reflecting property. When rays of light parallel to the parabola’s axis of symmetry are directed toward any surface of the mirror, the light is reflected directly to the focus (Figure \(\PageIndex{16}\)). This is why the Olympic torch is ignited when it is held at the focus of the parabolic mirror.

    A parabolic reflector is shown with its Focus labeled. Rays of sunlight parallel to the Axis of Symmetry all bounce off the reflector and pass through the Focus
    Figure \(\PageIndex{16}\): Reflecting property of parabolas

    Solar Cookers

    Parabolic mirrors have the ability to focus the sun’s energy to a single point, raising the temperature hundreds of degrees in a matter of seconds. Thus, parabolic mirrors are featured in many low-cost, energy efficient solar products, such as solar cookers, solar heaters, and even travel-sized fire starters.

    Example \(\PageIndex{6}\): Solving Applied Problems Involving Parabolas

    A cross-section of a design for a travel-sized solar fire starter is shown in Figure \(\PageIndex{17}\). The sun’s rays reflect off the parabolic mirror toward an object attached to the igniter. Because the igniter is located at the focus of the parabola, the reflected rays cause the object to burn in just seconds.

    1. Find the equation of the parabola that models the fire starter. Assume that the vertex of the parabolic mirror is the origin of the coordinate plane.
    2. Use the equation found in part (a) to find the depth of the fire starter.
    Cross-section of a travel-sized solar fire starter. Shown in this picture is the Igniter at the focal point which is 1.7 inches from the vertex and the length of the solar cooker of 4.5 inches.

     

    Figure \(\PageIndex{17}\) Cross-section of a travel-sized solar fire starter

    Solution

    1. The vertex of the dish is the origin of the coordinate plane, so the parabola will take the standard form \(x^2=4py\),where \(p>0\).  The igniter, which is the focus, is \(1.7\) inches above the vertex of the dish. Thus we have \(p=1.7\). 

    \[\begin{align*} x^2&=4py\qquad \text{Standard form of upward-facing parabola with vertex } (0,0)\\ x^2&=4(1.7)y\qquad \text{Substitute } 1.7 \text{ for } p\\ x^2&=6.8y\qquad \text{Multiply.} \end{align*}\]

    1. The dish extends \(\dfrac{4.5}{2}=2.25\) inches on either side of the origin. We can substitute \(2.25\) for \(x\) in the equation from part (a) to find the depth of the dish.

    \[\begin{align*} x^2&=6.8y\qquad \text{ Equation found in part } (a)\\ {(2.25)}^2&=6.8y\qquad \text{Substitute } 2.25 \text{ for } x\\ y&\approx 0.74\qquad \text{Solve for } y \end{align*}\]

    The dish is about \(0.74\) inches deep.

    Exercise \(\PageIndex{6}\)

    Balcony-sized solar cookers have been designed for families living in India. The top of a dish has a diameter of \(1600\) mm. The sun’s rays reflect off the parabolic mirror toward the “cooker,” which is placed \(320\) mm from the base.

    1. Find an equation that models a cross-section of the solar cooker. Assume that the vertex of the parabolic mirror is the origin of the coordinate plane, and that the parabola opens to the right (i.e., has the x-axis as its axis of symmetry).
    2. Use the equation found in part (a) to find the depth of the cooker.
    Answer a

    \(y^2=1280x\)

    Answer b

    The depth of the cooker is \(500\) mm

    Key Equations

    Parabola, vertex at origin, axis of symmetry on x-axis \(y^2=4px\)
    Parabola, vertex at origin, axis of symmetry on y-axis \(x^2=4py\)
    Parabola, vertex at \((h,k)\),axis of symmetry on x-axis \({(y−k)}^2=4p(x−h)\)
    Parabola, vertex at \((h,k)\),axis of symmetry on y-axis \({(x−h)}^2=4p(y−k)\)

    Key Concepts

    • A parabola is the set of all points \((x,y)\) in a plane that are the same distance from a fixed line, called the directrix, and a fixed point (the focus) not on the directrix.
    • The standard form of a parabola with vertex \((0,0)\) and the x-axis as its axis of symmetry can be used to graph the parabola. If \(p>0\), the parabola opens right. If \(p<0\), the parabola opens left. See Example \(\PageIndex{1}\).
    • The standard form of a parabola with vertex \((0,0)\) and the y-axis as its axis of symmetry can be used to graph the parabola. If \(p>0\), the parabola opens up. If \(p<0\), the parabola opens down. See Example \(\PageIndex{2}\).
    • When given the focus and directrix of a parabola, we can write its equation in standard form. See Example \(\PageIndex{3}\).
    • The standard form of a parabola with vertex \((h,k)\) and axis of symmetry parallel to the \(x\)-axis can be used to graph the parabola. If \(p>0\), the parabola opens right. If \(p<0\), the parabola opens left. See Example \(\PageIndex{4}\).
    • The standard form of a parabola with vertex \((h,k)\) and axis of symmetry parallel to the \(y\)-axis can be used to graph the parabola. If \(p>0\), the parabola opens up. If \(p<0\), the parabola opens down. See Example \(\PageIndex{5}\).
    • Real-world situations can be modeled using the standard equations of parabolas. For instance, given the diameter and focus of a cross-section of a parabolic reflector, we can find an equation that models its sides. See Example \(\PageIndex{6}\).

    Contributors and Attributions


    14.4.2: The Parabola is shared under a CC BY license and was authored, remixed, and/or curated by LibreTexts.