타원

개요

• 원뿔의 단면에서 얻어지는 원뿔곡선의 하나
• 이차곡선의 하나이다
• 타원위의 점들은 어떤 두 점(초점)에서의 거리의 합이 일정하다

타원의 방정식

• 타원은 이차곡선 \(ax^2+bxy+cy^2+dx+ey+f=0\)의 판별식이 \(\Delta=b^2-4ac<0\)인 경우
• 타원의 방정식의 표준형
  • \(\frac{x^2}{a^2}+\frac{y^2}{b^2}=1\)
  • \(a=b\) 이면 원이다. \(a>b\) 이면 가로( 축)로 납작한 타원, \(a<b\) 이면 세로로 길쭉한 타원이 된다.
  • 두 축 중 긴 것을 장축, 짧은 것을 단축이라 한다.

• 평행이동, 회전변환에 의해서도 변형해도 여전히 타원이 얻어짐.

\(\frac{1}{4} \left(\frac{\sqrt{3} x}{2}+\frac{y}{2}\right)^2+\left(-\frac{x}{2}+\frac{\sqrt{3} y}{2}\right)^2=1\)

타원 둘레의 길이

• 타원 둘레의 길이 항목 참조

타원내부의 면적

• 다음과 같이 주어진 타원 내부의 면적은 \(\pi a b\) 이다\[\frac{x^2}{a^2}+\frac{y^2}{b^2}\leq 1\]
• 타원의 넓이 항목 참조

배우기 전에 알고 있어야 하는 것들

• 다항식
  • 일차식과 이차식
• 원의 방정식

중요한 개념 및 정리

• 타원 \(\frac{x^2}{a^2}+\frac{y^2}{b^2}=1 (0<b<a)\)을 고려하자.
• 초점 \(f=\sqrt{a^2-b^2}\)라 두면, \((\pm f,0)\)
• 이심률 (eccentricity)
  • 타원이 원에서 멀어지는 것을 재는 양 . 이심률은 \(e=\frac{f}{a}=\frac{\sqrt{a^2-b^2}}{a}=\sqrt{1-\frac{b^2}{a^2}}\)로 주어진다

재미있는 문제

• 타원 \(\frac{x^2}{a^2}+\frac{y^2}{b^2}=1\) 에 외접하는 사각형의 최소 넓이는
• 빛의 반사성 : 한 초점에서 나온 빛은 타원 벽에서 반사되어 다른 초점으로 들어간다.
• 매개변수표현
• 타원과 포물선 가 직교하기 위해서는 를 만족하면 된다.
  • 

관련된 항목들

• 타원내의 격자점 개수 문제

관련된 개념 및 나중에 더 배우게 되는 것들

• 타원과 인간
• 행성운동과 타원

관련있는 다른 과목

• 물리
  • 행성운동
  • 지구는 태양의 주위를, 태양을 하나의 초점으로 하는 타원궤도로 돌고 있음.
• 미술
  • 원근법
  • 원을 바르게 그리려면, 타원으로 그려야 함.

관련된 대학교 수학

• 타원곡선
• 타원적분, 타원함수, 타원곡선

블로그

• 미적분과 인문계(3) : 타원 - 자연, 예술, 인간 (피타고라스의 창)

노트

• You see here, we're really, if we're on this point on the ellipse, we're really close to the origin.^[1]
• And the way I drew this, we have kind of a short and fat ellipse you can also have kind of a tall and skinny ellipse.^[1]
• But in the short and fat ellipse, the direction that you're short in that's called your minor axis.^[1]
• If b was larger than a, I would have a tall and skinny ellipse.^[1]
• ; Description Draws an ellipse (oval) to the screen.^[2]
• A straight line drawn through the foci and extended to the curve in either direction is the major diameter (or major axis) of the ellipse.^[3]
• This section focuses on the four variations of the standard form of the equation for the ellipse.^[4]
• We can draw an ellipse using a piece of cardboard, two thumbtacks, a pencil, and string.^[4]
• Place the thumbtacks in the cardboard to form the foci of the ellipse.^[4]
• The derivation of the standard form of the equation of an ellipse relies on this relationship and the distance formula.^[4]
• Eccentricity is a number that describe the degree of roundness of the ellipse.^[5]
• is the line segment passing the foci and intersects with the ellipse.^[5]
• is the line segment perpendicular to the major axis, passing the center of foci, and intersects with the ellipse.^[5]
• The formula for ellipse can be derived in many ways.^[5]
• It is an ellipse! and draw a curve.^[6]
• It goes from one side of the ellipse, through the center, to the other side, at the widest part of the ellipse.^[6]
• Try bringing the two focus points together (so the ellipse is a circle) ...^[6]
• An ellipse is the set of all points \((x,y)\) in a plane such that the sum of their distances from two fixed points is a constant.^[7]
• If \((a,0)\) is a vertex of the ellipse, the distance from \((−c,0)\) to \((a,0)\) is \(a−(−c)=a+c\).^[7]
• It follows that \(d_1+d_2=2a\) for any point on the ellipse.^[7]
• What is the standard form equation of the ellipse that has vertices \((\pm 8,0)\) and foci \((\pm 5,0)\)?^[7]
• Populations of the ellipse are declining across the state, Inoue said.^[8]
• The storm will move into the right entrance region of the jet streak, shown by the large red ellipse.^[8]
• In other words, the orbit can be elliptical, but the ellipse can have any orientation in space.^[8]
• Supermoons occur because the moon orbits the Earth in the shape of an ellipse.^[8]
• In "primitive" geometrical terms, an ellipse is the figure you can draw in the sand by the following process: Push two sticks into the sand.^[9]
• The resulting shape drawn in the sand is an ellipse.^[9]
• Each of the two sticks you first pushed into the sand is a " focus " of the ellipse; the two together are called "foci" (FOH-siy).^[9]
• The points where the major axis touches the ellipse are the " vertices " of the ellipse.^[9]
• An ellipse is the set of all points P in a plane such that the sum of the distances from P to two fixed points is a given constant.^[10]
• The center of the ellipse is the midpoint of the line segment joining its foci.^[10]
• The major axis of the ellipse is the chord that passes through its foci and has its endpoints on the ellipse.^[10]
• The graph of an ellipse can be translated so that its center is at the point ( h , k ) .^[10]
• The ellipse is one of the four classic conic sections created by slicing a cone with a plane.^[11]
• The shape of the ellipse is described by its eccentricity.^[11]
• The larger the semi-major axis relative to the semi-minor axis, the more eccentric the ellipse is said to be.^[11]
• The equation of the ellipse can also be written in terms of the polar coordinates (r, f).^[11]
• The ellipse was first studied by Menaechmus Euclid wrote about the ellipse and it was given its present name by Apollonius .^[12]
• There is no exact formula for the length of an ellipse in elementary functions and this led to the study of elliptic functions.^[12]
• The evolute of the ellipse with equation given above is the Lamé curve.^[12]
• The ellipse is the set of all points R in the plane such that PR + QR is a fixed constant.^[13]
• An ellipse can be constructed using a piece of string.^[13]
• Then with a pencil pull the string so that the string is tight and move the string around to form the ellipse.^[13]
• This number tells us how squished the ellipse is.^[13]
• In other words, the caustic by refraction of the ellipse for rays parallel to the axis reduces to the two foci.^[14]
• Conversely, the ellipse is the boundary of any convex set with oblique axes of symmetry in every direction.^[14]
• An ellipse is the locus of all those points in a plane such that the sum of their distances from two fixed points in the plane, is constant.^[15]
• The shape of the ellipse is in an oval shape and the area of an ellipse is defined by its major axis and minor axis.^[15]
• The ellipse is one of the conic sections, that is produced, when a plane cuts the cone at an angle with the base.^[15]
• In geometry, an ellipse is a two-dimensional shape, that is defined along its axes.^[15]
• An ellipse is the set of points in a plane such that the sum of the distances from two fixed points in that plane stays constant.^[16]
• The midpoint of the segment joining the foci is called the center of the ellipse.^[16]
• When an ellipse is written in standard form, the major axis direction is determined by noting which variable has the larger denominator.^[16]
• Graph the following ellipse.^[16]
• We know that an ellipse is characterized by its squished circle or oval shape.^[17]
• An ellipse eccentricity measures how imperfectly round or squished an ellipse is.^[17]
• As the foci of an ellipse are moved towards the center, the shape of the ellipse becomes closer to that of the circle.^[17]
• If the foci of the ellipse are at the center, i.e. c = 0, then the value of eccentricity will become 0.^[17]
• The set of all points in a plane, the sum of whose distances from two fixed points in the plane is constant is an ellipse.^[18]
• These two fixed points are the foci of the ellipse (Fig. 1).^[18]
• We know that both points P and Q are on the ellipse.^[18]
• Hence, the ellipse becomes a circle.^[18]
• An ellipse is a circle that has been stretched in one direction, to give it the shape of an oval.^[19]
• But not every oval is an ellipse, as shown in Figure 1, below.^[19]
• There is a specific kind of stretching that turns a circle into an ellipse, as we shall see on the next page.^[19]
• Figure 2 hints at the nature of the type of stretching that creates an ellipse.^[19]
• The major axis is the segment that contains both foci and has its endpoints on the ellipse.^[20]
• An ellipse looks like a circle that has been squashed into an oval.^[21]
• An ellipse is defined by two points, each called a focus.^[21]
• If you take any point on the ellipse, the sum of the distances to the focus points is constant.^[21]
• In the figure above, drag the point on the ellipse around and see that while the distances to the focus points vary, their sum is constant.^[21]
• The term ellipse has been coined by Apollonius of Perga, with a connotation of being "left out".^[22]
• There are many ways to define an ellipse.^[22]
• We cite several common definitions, prove that all are equivalent, and, based on these, derive additional properties of ellipse.^[22]
• The ellipse touches the sides at the points (± a 1 ± a 2 cos δ) and (± a 1 cos δ, ± a 2 ).^[23]
• We distinguish two cases of polarization, according to the sense in which the end point of the electric vector describes the ellipse.^[23]
• F2​ are called the foci of the ellipse (singular: focus).^[24]
• F2​ is called the major axis of the ellipse, and the axis perpendicular to the major axis is the minor axis.^[24]
• A tunnel opening is shaped like a half ellipse.^[24]
• Find the equation of the ellipse assuming it is centered at the origin.^[24]
• is the line segment through the center of an ellipse defined by two points on the ellipse where the distance between them is at a minimum.^[25]
• If the major axis of an ellipse is parallel to the x-axis in a rectangular coordinate plane, we say that the ellipse is horizontal.^[25]
• If the major axis is parallel to the y-axis, we say that the ellipse is vertical.^[25]
• However, the ellipse has many real-world applications and further research on this rich subject is encouraged.^[25]
• As such, it generalizes a circle, which is the special type of ellipse in which the two focal points are the same.^[26]
• The midpoint C {\displaystyle C} of the line segment joining the foci is called the center of the ellipse.^[26]
• An arbitrary line g {\displaystyle g} intersects an ellipse at 0, 1, or 2 points, respectively called an exterior line, tangent and secant.^[26]
• \displaystyle w} which is different from P {\displaystyle P} cannot be on the ellipse.^[26]
• Click on the blue point on the ellipse and drag it to change the figure.^[27]
• The eccentricity of an ellipse is a measure of how much it is changed from a circle.^[27]
• The ellipse was first studied by Menaechmus, investigated by Euclid, and named by Apollonius.^[28]
• The focus and conic section directrix of an ellipse were considered by Pappus.^[28]
• In 1602, Kepler believed that the orbit of Mars was oval; he later discovered that it was an ellipse with the Sun at one focus.^[28]
• Let an ellipse lie along the x-axis and find the equation of the figure (1) where and are at and .^[28]

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