Ellipse

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Fig. 1. Ellipse (black closed curve). The sum of the lengths of the two red line segments (ending in P₁) is equal to the sum of the lengths of the two blue line segments (ending in P₂).

In mathematics, an ellipse is a planar locus of points characterized by having a constant sum of distances to two given fixed points in the plane. In figure 1, the two fixed points are F₁ and F₂, these are the foci of the ellipse. Consider an arbitrary point P₁ on the ellipse that has distance F₁P₁ to F₁ and distance F₂P₁ to F₂, and let d be the sum of distances of P₁ to the foci,

${\displaystyle d:=\mathrm {F} _{1}\mathrm {P} _{1}+\mathrm {F} _{2}\mathrm {P} _{1},\,}$

then for all points of the ellipse the sum of distances is also d. Thus, for another arbitrary point P₂ on the ellipse with distance F₁P₂ to F₁ and distance F₂P₂ to F₂, by definition, the sum of distances of P₂ to the foci is equal to d,

${\displaystyle \mathrm {F} _{1}\mathrm {P} _{2}+\mathrm {F} _{2}\mathrm {P} _{2}=d.\,}$

The horizontal line segment between S₁ and S₂ in figure 1, going through the foci, is known as the major axis of the ellipse.^[1] Traditionally, the length of the major axis is indicated by 2a. The vertical dashed line segment, drawn halfway between the foci and perpendicular to the major axis, is referred to as the minor axis of the ellipse; its length is usually indicated by 2b. The major and minor axes are distinguished by a ≥ b.^[2]

There are two extreme cases:
(a) The first occurs when the two foci coincide. Then a = b and the ellipse is a circle — a special case of an ellipse — and the coinciding foci are the center of the circle. (In a circle, any diameter can be chosen as the major axis or as the minor axis.
(b) The second extreme case occurs when the distance of the foci equals d. Then a = 0 and the ellipse degenerates to the line segment bounded by the foci. (Remark: Usually, in common language, these extreme cases are not referred to as an ellipse because "circle" and "line segment" describe them better, but in mathematics they are included because they satisfy the definition.)

Clearly both ellipse axes are symmetry axes, reflection about either of them transforms the ellipse into itself. Basically, this is a consequence of the fact that reflection preserves (sums of) distances. The intersection of the axes is the center of the ellipse.

The two foci and the points S₁ and S₂ are connected by reflection about the minor axis. Hence the distance S₂F₂ =: p is, by symmetry, equal to the distance S₁F₁.^[3] The distance of S₂ to F₁ is equal to 2a − p. By the definition of the ellipse their sum is equal to d, hence

${\displaystyle d=(2a-p)+p=2a.\;}$

The sum d of distances from any point on the ellipse to the foci is equal to the length of the major axis.

Conic section

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Fig. 2. Upper shaded (green) section: ellipse; lower shaded (red) section: circle.

In the work of the Greek mathematician Apollonius (c. 262–190 BC) the ellipse arose as the intersection of a plane with a cone. Apollonius gave the ellipse its name, though the term ἔλλειψις (elleipsis, meaning "falling short") was used earlier by Euclid (c. 300 BC) in the construction of parallelograms with areas that "fell short". Apollonius applied the word to the conic section that at present we call ellipse. See Ref.^[4] for the—in modern eyes—complicated reasoning by which Apollonius tied the shape of certain conic sections to Euclid's concept of deficient areas.

In figure 2 a cone with a circular base is shown. It has a vertical symmetry axis, an axis of revolution. A cone can be generated by revolving around the axis a line that intersects the axis of rotation under an angle α (between 0 and 90 degree). A horizontal plane (plane perpendicular to the axis of the cone) — that does not contain the vertex — intersects the cone in a circle (a special ellipse). If the angle between the plane is greater than α (but smaller than a right angle) then it intersects the cone in an ellipse. (Otherwise, the intersection is either a parabola or a hyperbola.)

Eccentricity

The eccentricity e of an ellipse (usually denoted by e or ε) is the ratio of the distance OF₂ (cf. figure 3) to the length a (half the major axis), that is, e := OF₂ / a. Let ${\displaystyle {\vec {a}}}$ be a vector of length a along the x-axis, then

${\displaystyle e{\vec {a}}:={\overrightarrow {\mathrm {OF} }}_{2}.}$

The following two vectors have common endpoint at P, see figure 3,

${\displaystyle {\vec {r}}:={\overrightarrow {\mathrm {OP} }}={\begin{pmatrix}x\\y\end{pmatrix}}\quad {\hbox{and}}\quad {\vec {g}}:={\overrightarrow {\mathrm {F} _{2}\mathrm {P} }}={\overrightarrow {\mathrm {F} _{2}\mathrm {O} }}+{\overrightarrow {\mathrm {O} \mathrm {P} }}=-e{\vec {a}}+{\vec {r}}.}$

Now choose P as the intersection P₁ of the positive y-axis with the ellipse; then its position vector is:

${\displaystyle {\vec {r}}_{1}={\begin{pmatrix}0\\b\end{pmatrix}}.}$

By symmetry, the distance of this point P₁ to either focus is equal, thus the length of the corresponding vector ${\displaystyle {\vec {g}}_{1}}$ (with endpoint on the y-axis) is equal to the length a of the semi-major axis. For the following two inner products (indicated by a centered dot) we find,

${\displaystyle {\vec {r}}_{1}\cdot (e{\vec {a}})=0\quad {\hbox{and}}\quad {\vec {r}}_{1}\cdot {\vec {r}}_{1}=b^{2}.}$

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Fig. 3. An ellipse situated such that the major and minor axis are along Cartesian axes. The center of the ellipse coincides with the origin O.

Hence, (in fact the Pythagoras theorem applied to POF₂),

${\displaystyle a^{2}=|{\vec {g}}_{1}\;|^{2}=({\vec {r}}_{1}-e{\vec {a}}\;)\cdot ({\vec {r}}_{1}-e{\vec {a}}\;)={\vec {r}}_{1}\cdot {\vec {r}}_{1}-2({\vec {r}}_{1}\cdot e{\vec {a}})+e{\vec {a}}\cdot e{\vec {a}}=b^{2}+e^{2}a^{2},}$

so that the eccentricity is given by

${\displaystyle e={\sqrt {\frac {a^{2}-b^{2}}{a^{2}}}}\quad {\hbox{with}}\quad 0\leq e\leq 1.}$

Algebraic form

Consider an ellipse that is located with respect to a Cartesian frame as in figure 3 (major axis on x-axis, minor axis on y-axis). For a point P=(x,y) of the ellipse it holds that

${\displaystyle {\frac {x^{2}}{a^{2}}}+{\frac {y^{2}}{b^{2}}}=1.}$

Note that this equation is reminiscent of the equation for a unit circle. An ellipse may be seen as a unit circle in which the x and the y coordinates are scaled independently, by 1/a and 1/b, respectively.

Proof

Introduce the vectors

${\displaystyle {\begin{aligned}{\overrightarrow {\mathrm {F} _{1}\mathrm {P} }}={\overrightarrow {\mathrm {F} _{1}\mathrm {O} }}+{\overrightarrow {\mathrm {O} \mathrm {P} }}=&\;e{\vec {a}}+{\vec {r}}\\{\overrightarrow {\mathrm {F} _{2}\mathrm {P} }}={\overrightarrow {\mathrm {F} _{2}\mathrm {O} }}+{\overrightarrow {\mathrm {O} \mathrm {P} }}=&-e{\vec {a}}+{\vec {r}}={\vec {g}}\\\end{aligned}}}$

By definition of ellipse, the sum of the lengths is 2a

${\displaystyle 2a=|{\vec {r}}+e{\vec {a}}|+|{\vec {r}}-e{\vec {a}}|\qquad \qquad \qquad \qquad (1)}$

Multiplying equation (1) by

${\displaystyle |{\vec {r}}+e{\vec {a}}|-|{\vec {r}}-e{\vec {a}}|}$

gives

${\displaystyle 2a\left(|{\vec {r}}+e{\vec {a}}|-|{\vec {r}}-e{\vec {a}}|\right)}$

${\displaystyle =\left(|{\vec {r}}+e{\vec {a}}|+|{\vec {r}}-e{\vec {a}}|\right)\cdot \left(|{\vec {r}}+e{\vec {a}}|-|{\vec {r}}-e{\vec {a}}|\right)=|{\vec {r}}+e{\vec {a}}|^{2}-|{\vec {r}}-e{\vec {a}}|^{2}}$

${\displaystyle =4e{\vec {r}}\cdot {\vec {a}}}$

Hence

${\displaystyle |{\vec {r}}+e{\vec {a}}|-|{\vec {r}}-e{\vec {a}}|={2e{\vec {r}}\cdot {\vec {a}} \over a}}$

and since

${\displaystyle {\frac {{\vec {r}}\cdot {\vec {a}}}{a}}=x}$

(the first coordinate of the vector ${\displaystyle {\vec {r}}}$) we obtain

${\displaystyle |{\vec {r}}+e{\vec {a}}|-|{\vec {r}}-e{\vec {a}}|=2ex\qquad \qquad \qquad \qquad (2)}$

By adding and subtracting equations (1) and (2) we find expressions for the distance of P to the foci,

${\displaystyle {\begin{aligned}|{\overrightarrow {\mathrm {F} _{1}\mathrm {P} }}|&=|{\vec {r}}+e{\vec {a}}|&=a+ex&\\|{\overrightarrow {\mathrm {F} _{2}\mathrm {P} }}|&=|{\vec {r}}-e{\vec {a}}|&=a-ex&\qquad \qquad \qquad \quad (3)\\\end{aligned}}}$

Squaring both equations

${\displaystyle {\begin{aligned}r^{2}+e^{2}a^{2}+2e{\vec {r}}\cdot {\vec {a}}&=a^{2}+e^{2}x^{2}+2eax\\r^{2}+e^{2}a^{2}-2e{\vec {r}}\cdot {\vec {a}}&=a^{2}+e^{2}x^{2}-2eax\\\end{aligned}}}$

adding them, substituting the earlier derived value for e², and reworking gives

${\displaystyle r^{2}+e^{2}a^{2}=a^{2}+e^{2}x^{2}}$

${\displaystyle \Rightarrow r^{2}+{\frac {a^{2}-b^{2}}{a^{2}}}a^{2}=a^{2}+{\frac {a^{2}-b^{2}}{a^{2}}}x^{2}}$

${\displaystyle \Rightarrow x^{2}+y^{2}=r^{2}=a^{2}+{\frac {a^{2}-b^{2}}{a^{2}}}(x^{2}-a^{2})=b^{2}+x^{2}-x^{2}{\frac {b^{2}}{a^{2}}}}$

${\displaystyle \Rightarrow y^{2}=b^{2}-x^{2}{\frac {b^{2}}{a^{2}}}}$

Division by b² finally gives

${\displaystyle {\frac {x^{2}}{a^{2}}}+{\frac {y^{2}}{b^{2}}}=1.}$

Second degree equation

The algebraic form of the previous section describes an ellipse in a special position. Rotation and translation transforms it into an equation of second degree in x and y:

${\displaystyle f(x,y):=Ax^{2}+2Bxy+Cy^{2}+2Dx+2Ey+F=0,\,}$

(all variables are real). Such an equation always describes a conic.

It represents an ellipse if and only if the following conditions are satisfied:

• ${\displaystyle AC-B^{2}>0}$

• ${\displaystyle (A+C)f_{t}<0}$

or, equivalently, ${\displaystyle \quad f_{t}:=f(t_{1},t_{2})\neq 0\quad \mathrm {with} \quad f_{t}>0\Rightarrow A+C<0\quad \mathrm {and} \quad f_{t}<0\Rightarrow A+C>0}$

where t₁ and t₂ are defined as the solutions of the following system of linear equations:

${\displaystyle {\begin{matrix}At_{1}+Bt_{2}&=-D\\Bt_{1}+Ct_{2}&=-E\end{matrix}}}$.

(These equations have a unique solution since, by the first condition, the determinant AC − B² ≠ 0.)

Proof

We now switch to matrix-vector notation and write f(x,y) as

${\displaystyle f(\mathbf {r} )=\mathbf {r} ^{\mathrm {T} }\mathbf {Q} \mathbf {r} +\mathbf {a} ^{\mathrm {T} }\mathbf {r} +\mathbf {r} ^{\mathrm {T} }\mathbf {a} +F,}$

with

${\displaystyle \mathbf {r} :={\begin{pmatrix}x\\y\\\end{pmatrix}},\quad \mathbf {Q} :={\begin{pmatrix}A&B\\B&C\\\end{pmatrix}},\quad \mathbf {a} :={\begin{pmatrix}D\\E\\\end{pmatrix}}.}$

The superscript T stands for transposition (row vector becomes column vector and vice versa).

Since, by assumption, the determinant det(Q) = AC−B² ≠ 0, the matrix Q is invertible. With the help of the inverse Q⁻¹ the equation for f can be rewritten to

${\displaystyle f(\mathbf {r} )=\left(\mathbf {r} +\mathbf {Q} ^{-1}\mathbf {a} \right)^{\mathrm {T} }\mathbf {Q} \left(\mathbf {r} +\mathbf {Q} ^{-1}\mathbf {a} \right)-\mathbf {a} ^{\mathrm {T} }\mathbf {Q} ^{-1}\mathbf {a} +F\quad .}$

Note that this uses

${\displaystyle \mathbf {Q} ^{\mathrm {T} }=\mathbf {Q} \quad \Longrightarrow \quad \left(\mathbf {Q} ^{-1}\right)^{\mathrm {T} }=\mathbf {Q} ^{-1},}$

i.e., that both the matrix Q and its inverse are symmetric.

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Fig. 4. r′ = r − t

Define

${\displaystyle \mathbf {t} :=-\mathbf {Q} ^{-1}\mathbf {a} \quad \Longrightarrow \quad \mathbf {Q} \mathbf {t} =-\mathbf {a} ,}$

and

${\displaystyle \mathbf {r} ':=\mathbf {r} -\mathbf {t} .}$

In the definition of t the minus sign is introduced to get the translation of the origin as depicted in figure 4.

Now we substitute r′ in the expression for f. (This corresponds to shifting the origin of the coordinate system to the center of the ellipse):

${\displaystyle f(\mathbf {r} )=\left(\mathbf {r} -\mathbf {t} \right)^{\mathrm {T} }\mathbf {Q} \left(\mathbf {r} -\mathbf {t} \right)-\mathbf {a} ^{\mathrm {T} }\mathbf {Q} ^{-1}\mathbf {a} +F=\left(\mathbf {r} '\right)^{\mathrm {T} }\mathbf {Q} \mathbf {r} '+f_{t}}$

with

${\displaystyle f_{t}:=f(\mathbf {t} )=-\mathbf {a} ^{\mathrm {T} }\mathbf {Q} ^{-1}\mathbf {a} +F.}$

Thus, by translation of the origin over t   the linear terms in f(r) have been eliminated, only two quadratic terms (in x′ := x−t₁ and y′ := y−t₂), one bilinear term, and one constant term (f_t) appear in the equation for f. (The "price paid" for it is the requirement det(Q) ≠ 0.)

In the next step we rotate the coordinate system (around the origin in O') such that the coordinate axises coincide with the axises of the ellipse. This will eliminate the bilinear term and "decouple" x′ and y′, the components of r′.

Let us recall that a real symmetric matrix may be diagonalized by an orthogonal matrix. For the (2×2)-case:

${\displaystyle \mathbf {R} ^{\mathrm {T} }\mathbf {Q} \mathbf {R} ={\begin{pmatrix}\alpha _{1}&0\\0&\alpha _{2}\end{pmatrix}}\quad {\hbox{with}}\quad \mathbf {R} ^{\mathrm {T} }\mathbf {R} =\mathbf {R} \mathbf {R} ^{\mathrm {T} }=\mathbf {I} ,}$

where the last matrix on the right is the identity matrix I. Now

${\displaystyle f=\left(\left(\mathbf {r} '\right)^{\mathrm {T} }\;\mathbf {R} \right)\left(\mathbf {R} ^{\mathrm {T} }\;\mathbf {Q} \;\mathbf {R} \right)\left(\mathbf {R} ^{\mathrm {T} }\;\mathbf {r} '\right)+f_{t}=\left(\mathbf {r} ''\right)^{\mathrm {T} }{\boldsymbol {\alpha }}\mathbf {r} ''+f_{t}}$

with

${\displaystyle {\boldsymbol {\alpha }}:={\begin{pmatrix}\alpha _{1}&0\\0&\alpha _{2}\end{pmatrix}},\quad {\hbox{and}}\quad \mathbf {r} '':=\mathbf {R} ^{\mathrm {T} }\mathbf {r} '.}$

Switching back to a quadratic equation

${\displaystyle \left(\mathbf {r} ''\right)^{\mathrm {T} }{\boldsymbol {\alpha }}\mathbf {r} ''+f_{t}=\alpha _{1}(x'')^{2}+\alpha _{2}(y'')^{2}+f_{t}=0.}$

we see that an ellipse is obtained if (and only if) the parameters α₁, α₂, and f_t are non-zero and if the signs of α₁ and α₂ are equal and opposite to the sign of f_t.

It is known that the determinant of a matrix is invariant under similarity transformations, hence

${\displaystyle \det(\mathbf {Q} )=AC-B^{2}=\alpha _{1}\alpha _{2}>0}$

holds if (and only if) the signs of α₁ and α₂ are equal. (Thus det(Q) > 0 is a necessary condition.)

The trace A+C of the matrix is also invariant under similarity transformations. There are two possibilities in order that the equation f(x,y) = 0 represents an ellipse

${\displaystyle {\begin{aligned}\alpha _{1},\alpha _{2}<0&\Longrightarrow A+C=\alpha _{1}+\alpha _{2}<0\quad {\hbox{then}}\quad f_{t}>0\\\alpha _{1},\alpha _{2}>0&\Longrightarrow A+C=\alpha _{1}+\alpha _{2}>0\quad {\hbox{then}}\quad f_{t}<0.\\\end{aligned}}}$

This shows that the conditions given are borth necessary and sufficient for a second order equation to represent an ellipse.

Remark
Clearly, in order to determine a priori whether the quadratic equation represents an ellipse, it is not necessary to actually perform the diagonalization of Q. It is sufficient to check the condition and determine the sign of f_t = f(t) by solving the equation given for the vector t.

Polar representation relative to focus

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Fig. 5. Polar representation

The length g of a vector (cf. figure 5) from the focus F₂ to an endpoint P on the ellipse

${\displaystyle {\overrightarrow {\mathrm {F} _{2}\mathrm {P} }}=:{\vec {g}}=(ea+g\cos \theta ,\;g\sin \theta )}$

is given by the polar equation of an ellipse

${\displaystyle g={\frac {\ell }{1+e\cos \theta }}\quad {\hbox{with}}\quad \ell :={\frac {b^{2}}{a}},}$

where 2ℓ is known as the latus rectum (lit. erect side) of the ellipse; it is equal to 2g for θ = 90^° (twice the length of the vector ${\displaystyle {\vec {g}}}$ when it makes a right angle with the major axis).

Proof

Earlier [Eq. (3)] it was derived for the distance from the right focus F₂ to P that

${\displaystyle |{\overrightarrow {\mathrm {F} _{2}\mathrm {P} }}|=|{\vec {g}}|=g=a-ex.}$

Expressing x from

${\displaystyle x=ea+g\cos \theta =ea+(a-ex)\cos \theta \,}$

gives

${\displaystyle x={\frac {ea+a\cos \theta }{1+e\cos \theta }},}$

so that

${\displaystyle g=a-ex=a-{\frac {e^{2}a+ea\cos \theta }{1+e\cos \theta }}={\frac {a(1-e^{2})}{1+e\cos \theta }}.}$

Substitute

${\displaystyle a(1-e^{2})=a\left(1-{\frac {a^{2}-b^{2}}{a^{2}}}\right)={\frac {b^{2}}{a}}=\ell }$

and the polar equation for the ellipse follows.

Trammel construction

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Fig. 6. A trammel in theory

Before drafting was done almost exclusively by the aid of computers, draftsmen used a simple device for drawing ellipses, a trammel. Basically, a trammel is a rigid bar of length a (semi-major axis). In the top drawing of figure 6 the bar is shown as a blue-red line segment bounded by a black and a blue bead. On this bar a segment of length b (semi-minor axis) is marked; this is the red segment on the bar. Two beads fixed to the rigid bar move back and forth along the x-axis and y-axis, respectively. The blue bead fixed at one end of the bar moves along the y-axis, the red bead, which marks the beginning of the red segment of length b, moves along the x-axis. The endpoint of the bar (the black bead in figure 6) moves along an ellipse with semi-major axis a and semi-minor axis b and typically has a pen fixed to it.

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Fig. 7. A trammel in practice

The fact that the trammel construction works is proved very easily, cf. the bottom drawing in figure 6,

${\displaystyle x=a\;\cos \theta \quad {\hbox{and}}\quad y=b\;\sin \theta .}$

Hence

${\displaystyle {\frac {x^{2}}{a^{2}}}+{\frac {y^{2}}{b^{2}}}=\cos ^{2}\theta +\sin ^{2}\theta =1,}$

which indeed is the equation for an ellipse.

A device called a trammel point is used to guide a woodworking router in making elliptical cuts.

Gardener's construction

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Fig. 8. Gardener's construction

It is possible to construct an ellipse of given major and minor axis by the aid of a compass, a ruler, three thumbtacks, and a piece of string, see figure 8.

First draw the major axis AB, and then obtain with the compass its perpendicular bisector intersecting AB in the midpoint E. Along the bisector one measures off the length of the minor axis CD. Given that the distances CF and CG are the semi-major axis (AB/2), one can determine the foci by drawing an arc with the compass using C as center and AB/2 as radius. One now pins the thumbtacks in the foci and the point C and fixes a piece of string around the triangle F₁F₂C (i.e, its length equals the perimeter of the triangle). Removing the thumbtack at C, and keeping the string taut, one draws the ellipse by moving the pencil from C to A, D, B, and back to C.

Clearly this procedure can be used in the garden to create an elliptic lawn or flowerbed, which is why the procedure is sometimes referred to as the gardener's construction.

Notes

Figures 7 and 8 are from George Watson Kittredge, The New Metal Worker Pattern Book, David Williams Company, New York, (1901) Online