Hyperbola in a sentence
Synonym: conic section, curve.
Meaning: A type of smooth curve lying in a plane, defined by its geometric properties; often used in mathematics.
(1) The evolute of the hyperbola is a strophoid.
(2) The evolute of a hyperbola is a pair of lines.
(3) The hodograph of a hyperbola is a line segment.
(4) The hyperbola is one of the four conic sections.
(5) The hyperbola can have a real or imaginary axis.
(6) The minor axis of a hyperbola determines its width.
(7) The hyperbola can be graphed on a coordinate plane.
(8) To make the hyperbola narrower, decrease the radius.
(9) The hyperbola is a curve that is not a straight line.
(10) The hyperbola can have a major axis and a minor axis.
Hyperbola sentence
(11) The focus of a hyperbola is a point inside the curve.
(12) Move the radius of the hyperbola to modify its shape.
(13) The foci of the hyperbola determine its eccentricity.
(14) The undefined quadric equation represented a hyperbola.
(15) The foci of the hyperbola are used in radar technology.
(16) The foci of the hyperbola are always outside the shape.
(17) The hyperbola is a type of conic section in mathematics.
(18) The hyperbola is a common topic in algebra and calculus.
(19) The hyperbola can have a vertical or horizontal opening.
(20) The conic section known as a hyperbola has two branches.
Hyperbola make sentence
(21) The foci of the ellipse and hyperbola are always paired.
(22) The eccentricity of a hyperbola is always greater than 1.
(23) Decrease the radius of the hyperbola to make it narrower.
(24) The vertex of a hyperbola is where the two branches meet.
(25) The hyperbola is often used to model real-world phenomena.
(26) The hyperbola can have a center that is not at the origin.
(27) The conic section known as a hyperbola has two asymptotes.
(28) The foci of the hyperbola are equidistant from the center.
(29) The hyperbola has two foci that lie on its transverse axis.
(30) The center of a hyperbola is the midpoint between its foci.
Sentence of hyperbola
(31) The latus of a hyperbola is one of its two transverse axes.
(32) The foci of the hyperbola determine the shape of the curve.
(33) The equation of a hyperbola can be written in standard form.
(34) The crunode of the ellipse and the hyperbola is at infinity.
(35) The foci of the hyperbola are always on the transverse axis.
(36) The foci of the hyperbola are located on the transverse axis.
(37) The hyperbola is a curve that is not a parabola or an ellipse.
(38) The hyperbola has two asymptotes that intersect at the center.
(39) The bisector of the hyperbola divides it into two equal parts.
(40) Search the radius of the hyperbola to determine its asymptotes.
Hyperbola meaningful sentence
(41) The center of a hyperbola is the midpoint between the two foci.
(42) The conic section called a hyperbola has two separate branches.
(43) The crunode of the parabola and the hyperbola is at the origin.
(44) The hyperbola has two branches that open in opposite directions.
(45) The hyperbola is a symmetrical curve with two distinct branches.
(46) The hyperbola can have a horizontal or vertical transverse axis.
(47) The hyperbola can be classified as either horizontal or vertical.
(48) The hyperbola can be used to model the trajectory of a satellite.
(49) The hyperbola has two asymptotes that are parallel to the x-axis.
(50) The hyperbola has two asymptotes that are parallel to the y-axis.
Hyperbola sentence examples
(51) The axis of a hyperbola is the line passing through its two foci.
(52) The foci of the hyperbola determine the orientation of the curve.
(53) The equation of a hyperbola is typically written in standard form.
(54) The foci of the hyperbola can be found using the distance formula.
(55) The hyperbola can have a focus that is inside or outside the curve.
(56) The hyperbola can have an equation that is written in general form.
(57) The hyperbola can have a center that is located at a specific point.
(58) The minor axis of a hyperbola passes through the center of the curve.
(59) The vertex of the hyperbola is the point where the two branches meet.
(60) The minor axis of a hyperbola intersects the major axis at its center.
Sentence with hyperbola
(61) The foci of the hyperbola determine the eccentricity of the hyperbola.
(62) The hyperbola has a center point that is equidistant from its vertices.
(63) The hyperbola has two directrices that are equidistant from its center.
(64) The asymptotes of a hyperbola help define its shape as a conic section.
(65) The conic section known as a hyperbola can have different orientations.
(66) The quadratures of a hyperbola are used in the study of conic sections.
(67) The conic section known as a hyperbola has two foci and two directrices.
(68) The parabola, ellipse, and hyperbola are the three main types of conics.
(69) The osculating ellipse of the hyperbola was tangent to it at two points.
(70) The foci of the hyperbola can be used to find the vertices of the curve.
Use hyperbola in a sentence
(71) The hyperbola can have a directrix that is a vertical or horizontal line.
(72) The directrix of a hyperbola is a line that is equidistant from the foci.
(73) The conic section of a hyperbola can be seen in the shape of a horseshoe.
(74) The conic section known as a hyperbola can have different eccentricities.
(75) The equation of a hyperbola can be derived from its foci and eccentricity.
(76) The foci of a hyperbola are the points that define the shape of the curve.
(77) The foci of the hyperbola can be used to find the asymptotes of the curve.
(78) The conic section of a hyperbola can be seen in the shape of an open curve.
(79) The hyperbola has two asymptotes that intersect at the center of the graph.
(80) The quadrature of the hyperbola requires knowledge of advanced mathematics.
Sentence using hyperbola
(81) The hyperbola is a curve that is formed by intersecting a cone with a plane.
(82) The bisectrix of a hyperbola's arc is a line that passes through its center.
(83) The conic section of a hyperbola can be seen in the shape of a comet's path.
(84) The quadrature of the hyperbola is a topic of study in advanced mathematics.
(85) The conic section of a hyperbola can be used to model the behavior of light.
(86) The hyperbola can be used to solve problems involving ellipses and parabolas.
(87) The graph of a hyperbola is a curve that resembles two intersecting branches.
(88) Hyperbolas have two asymptotes that intersect at the center of the hyperbola.
(89) The foci of the hyperbola can be used to find the asymptotes of the hyperbola.
(90) The vertex of a hyperbola is the point where the two branches of the curve meet.
Hyperbola example sentence
(91) The foci of the hyperbola can be used to find the distance between the vertices.
(92) The online tutorial demonstrated how to calculate the intercept with a hyperbola.
(93) The foci of the hyperbola can be found using the distance formula and the center.
(94) The conic section known as a degenerate hyperbola has eccentricity greater than 1.
(95) The conic section of a hyperbola can be seen in the shape of a pair of headphones.
(96) The transverse axis of a hyperbola is the line segment connecting the two vertices.
(97) The standard form equation of a hyperbola can be derived from the distance formula.
(98) The vertex of the hyperbola, where the two branches meet, is the point of symmetry.
(99) The asymptotes of a hyperbola are lines that the curve approaches but never touches.
(100) The directrix of a hyperbola is a line that is perpendicular to the transverse axis.
Sentence with word hyperbola
(101) The shape of a hyperbola can be visualized by plotting points on a coordinate plane.
(102) The eccentricity of a hyperbola determines how stretched or compressed its shape is.
(103) The conic section of a hyperbola can be seen in the shape of a rocket's flight path.
(104) The equation of a hyperbola can be transformed by translation, rotation, or dilation.
(105) The foci of the hyperbola determine the distance between the vertices and the center.
(106) The arc length of a hyperbola can be found using its eccentricity and semi-major axis.
(107) The standard form of a hyperbola equation can be derived from its geometric properties.
(108) The coordinates of a point on a hyperbola can be found using its foci and eccentricity.
(109) The conic section known as a degenerate hyperbola collapses into two intersecting lines.
(110) The major axis of a hyperbola is the line passing through the center and the two vertices.
Sentence of hyperbola
(111) The vertices of a hyperbola are the points where the curve intersects the transverse axis.
(112) Before proceeding with the calculations, we need to determine the radius of the hyperbola.
(113) The foci of the ellipse, hyperbola, and parabola are important concepts in conic sections.
(114) The conchoid of a hyperbola is a curve that is generated by a point on the transverse axis.
(115) The conchoid of a hyperbola segment is a curve that is generated by a point on the segment.
(116) The coordinates of a point on a hyperbola can be found using the equation of the hyperbola.
(117) The shape of the hyperbola can be transformed by changing the radius of the transverse axis.
(118) The standard form equation of a hyperbola can be used to find important properties of the curve.
(119) The latus of a hyperbola is equal to the distance from the center to the end of its transverse axis.
(120) The osculating hyperbola of a curve is the hyperbola that best approximates the curve at a given point.
Hyperbola used in a sentence
(121) The equation of a hyperbola can also be written in general form as Ax^2 + Bxy + Cy^2 + Dx + Ey + F = 0.
(122) The foci of a hyperbola are always equidistant from the center, so they can be used to find the vertices.
(123) The directrix of a hyperbola is a line perpendicular to the transverse axis and equidistant from the foci.
(124) Analytical geometry provides a method for finding the equation of a hyperbola given its foci and asymptotes.
(125) The shape of a hyperbola can be determined by the values of 'a', 'b', and 'c' in the standard form equation.
(126) The vertex of the hyperbola is the point where the two branches intersect, and it is also the center of the shape.
(127) The distance between the center and each focus of a hyperbola is equal to the value of 'c' in the standard form equation.
(128) The distance between the center and each vertex of a hyperbola is equal to the value of 'a' in the standard form equation.
(129) The conjugate axis of a hyperbola is the line segment perpendicular to the transverse axis and passing through the center.
(130) The bisectrix of a hyperbola's angle is a line that passes through the center of the hyperbola and divides the angle into two equal parts.
Hyperbola meaning
Hyperbola is a mathematical term that refers to a type of curve that is formed when a plane intersects with two cones that have the same vertex. This curve is characterized by two branches that are symmetrical and open in opposite directions. Hyperbolas are commonly used in mathematics, physics, and engineering to describe various phenomena, such as the orbits of planets, the trajectories of projectiles, and the behavior of electromagnetic waves. If you are looking to use the word hyperbola in a sentence, there are several tips that you can follow to ensure that your sentence is clear, concise, and accurate. Here are some of the most important tips to keep in mind:
1. Understand the meaning of hyperbola: Before you can use the word hyperbola in a sentence, it is important to have a clear understanding of what it means. Take some time to research the definition of hyperbola and its various applications in different fields. This will help you to use the word correctly and in the appropriate context.
2. Use hyperbola in a mathematical context: Hyperbola is a term that is primarily used in mathematics, so it is important to use it in a mathematical context.
For example, you might say "The equation of the hyperbola is y = a/x," or "The focus of the hyperbola is located at (0, c)."
3. Use hyperbola in a physics or engineering context: Hyperbolas are also commonly used in physics and engineering to describe various phenomena.
For example, you might say "The trajectory of the projectile can be described by a hyperbola," or "The electromagnetic waves propagate along a hyperbolic path."
4. Use hyperbola to describe a figurative or rhetorical device: In addition to its mathematical and scientific applications, hyperbola can also be used as a figurative or rhetorical device in literature and speech.
For example, you might say "The politician's claims were so exaggerated that they bordered on hyperbola," or "The author used hyperbola to create a sense of drama and tension in the story."
5. Be clear and concise: When using the word hyperbola in a sentence, it is important to be clear and concise. Avoid using overly complex language or convoluted sentence structures that might confuse your reader. Instead, aim for simplicity and clarity, and use hyperbola in a way that is easy to understand. By following these tips, you can use the word hyperbola in a sentence with confidence and accuracy. Whether you are describing a mathematical concept, a physical phenomenon, or a rhetorical device, hyperbola is a versatile and useful term that can add depth and precision to your writing and speech.
The word usage examples above have been gathered from various sources to reflect current and historical usage of the word Hyperbola. They do not represent the opinions of TranslateEN.com.