Parabola in a sentence
Meaning: A symmetrical curve formed by the intersection of a cone with a plane parallel to its side; often used in mathematics.
(1) The evolute of a parabola is a line.
(2) A parabola is a type of conic section.
(3) The parabola is a type of conic section.
(4) The evolute of the parabola is a cissoid.
(5) The shape of a satellite dish is a parabola.
(6) The hodograph of a parabola is a line segment.
(7) The graph of a quadratic function is a parabola.
(8) The graph of a quadratic equation is a parabola.
(9) The latus of a parabola is its axis of symmetry.
(10) The quadratic down parabola had a concave shape.
Parabola sentence
(11) The graph of a quadratic polynomial is a parabola.
(12) The equation y = x^2 represents a simple parabola.
(13) The vertex of a parabola is also called the focus.
(14) The parabola is a key concept in projectile motion.
(15) The graph of a quadratic function forms a parabola.
(16) The conic section known as a parabola has a vertex.
(17) The foci of the parabola determine its orientation.
(18) The scalar equation represents a parabola on a graph.
(19) The major axis of a parabola is the line of symmetry.
(20) The minor axis of a parabola is the line of symmetry.
Parabola make sentence
(21) The curve of the parabola is convex up to the vertex.
(22) The foci of the parabola lie on the axis of symmetry.
(23) The parabola is a fundamental shape in conic sections.
(24) Adjust the shape of the parabola by moving the radius.
(25) The undefined quadric equation represented a parabola.
(26) The shape of a water slide often resembles a parabola.
(27) The vertex of a parabola lies on the axis-of-symmetry.
(28) The biquadratic equation was graphed using a parabola.
(29) The foci of the parabola are always outside the shape.
(30) The graph of the parabola is convex down to the vertex.
Sentence of parabola
(31) The arc of a parabola is a common shape in mathematics.
(32) The vertex of a parabola is a key feature in quadratics.
(33) The vertex of a parabola is the highest or lowest point.
(34) The minor axis of a parabola determines its focal length.
(35) The teacher explained how to find tangents to a parabola.
(36) The equation of a parabola can be written in vertex form.
(37) The quadratic amongst the graphs had the widest parabola.
(38) Search the radius of the parabola to determine its focus.
(39) The path of a thrown ball can be described by a parabola.
(40) The foci of the parabola are equidistant from the vertex.
Parabola meaningful sentence
(41) The graph of a quadratic equation always forms a parabola.
(42) The axis-of-symmetry is a line of symmetry for a parabola.
(43) The vertex of the parabola is the highest or lowest point.
(44) The foci of the parabola are used in reflector telescopes.
(45) The parabola is a type of conic section that has a U-shape.
(46) The midpoint of a parabola's axis of symmetry is the vertex.
(47) The vertex of the parabola is the lowest point on the curve.
(48) The axis-of-symmetry is a line of reflection for a parabola.
(49) The quadratic amongst the geometric shapes was the parabola.
(50) The foci of the parabola are always on the axis of symmetry.
Parabola sentence examples
(51) The vertex of the parabola is the highest point on the curve.
(52) The focus and directrix are important elements of a parabola.
(53) The test included a question about a quadratic down parabola.
(54) Once I graphed the curve, I could see that it was a parabola.
(55) The hyperbola is a curve that is not a parabola or an ellipse.
(56) The arc length of a parabola can be determined using calculus.
(57) The foci of the parabola determine the direction of the curve.
(58) The mathematician graphed the parabola on the coordinate plane.
(59) Decrease the radius of the parabola to make it more compressed.
(60) By moving the radius, you can change the shape of the parabola.
Sentence with parabola
(61) By moving the radius, you can modify the shape of the parabola.
(62) The crunode of the parabola and the hyperbola is at the origin.
(63) The quadratic equation is used to find the vertex of a parabola.
(64) The axis-of-symmetry divides the parabola into two equal halves.
(65) The coordinate plane is used to find the equation of a parabola.
(66) The satellite followed a parabola as it orbited around the Earth.
(67) The quadratic equation was used to find the vertex of a parabola.
(68) The shape of a suspension bridge can be approximated by a parabola.
(69) The first step in shrinking the parabola is to decrease the radius.
(70) The axis-of-symmetry is a line that is symmetrical to the parabola.
Use parabola in a sentence
(71) The graph of the quadratic beside the parabola was a perfect match.
(72) The quadratic formula can be used to find the vertex of a parabola.
(73) The quadratic equation can be used to find the vertex of a parabola.
(74) The quadrature of the parabola is a fundamental concept in calculus.
(75) The curvature of the parabola can be changed by altering the radius.
(76) The foci of a parabola can be used to find its vertex and directrix.
(77) The artist used the parabola as inspiration for her latest sculpture.
(78) The mathematician derived the equation for a parabola using calculus.
(79) The trajectory of a cannonball fired into the air follows a parabola.
(80) By shifting the radius, you can modify the curvature of the parabola.
Sentence using parabola
(81) The vertex of a parabola is the highest or lowest point on the curve.
(82) The parabola is a curve that can be described by a quadratic equation.
(83) The quadratic polynomial can be used to find the vertex of a parabola.
(84) The conic section known as a parabola has a single focus and directrix.
(85) The conic section known as a degenerate parabola collapses into a line.
(86) The equation of a parabola can be derived from its focus and directrix.
(87) The equation y = ax^2 + bx + c represents a general form of a parabola.
(88) The first thing you need to do is determine the radius of the parabola.
(89) The conic section known as a parabola can be open upwards or downwards.
(90) The conic section known as a parabola can have different focal lengths.
Parabola example sentence
(91) The physics teacher explained how to calculate the vertex of a parabola.
(92) The mathematician demonstrated how to graph a parabola using key points.
(93) The quadratures of a parabola can be found using integration techniques.
(94) The vertex of a parabola is the point where the curve changes direction.
(95) The parabola, ellipse, and hyperbola are the three main types of conics.
(96) The foci of the parabola can be used to find the directrix of the curve.
(97) The directrix of a parabola is a line that is equidistant from the focus.
(98) The quadratic function had a maximum value at the vertex of the parabola.
(99) The math problem required students to derive the equation for a parabola.
(100) The coordinates of the vertex of a parabola are important in graphing it.
Sentence with word parabola
(101) The axis-of-symmetry is a line that runs through the focus of a parabola.
(102) Before drawing the parabola, we need to validate the radius of the curve.
(103) The foci of the parabola can be found using the focus-directrix property.
(104) The foci of the parabola can be found using the vertex and focus formula.
(105) The parabola is a versatile shape that appears in various fields of study.
(106) The quadratic equation is used to find the axis of symmetry of a parabola.
(107) The foci of the parabola are located at the same distance from the vertex.
(108) The foci of the parabola can be used to find the focus-directrix property.
(109) The foci of the parabola can be used to find the focus-directrix distance.
(110) The parabola is a symmetrical curve that opens either upwards or downwards.
Sentence of parabola
(111) The mathematician explained how to find the axis of symmetry of a parabola.
(112) The quadratic polynomial can be used to find the y-intercept of a parabola.
(113) The bisectrix of a parabola's arc is a line that passes through its vertex.
(114) The quadratic function y = x^2 represents a simple upward-opening parabola.
(115) The coordinate plane is used to find the focus and directrix of a parabola.
(116) Paraboloids are a type of three-dimensional shape that resemble a parabola.
(117) The quadratic equation was used to find the axis of symmetry of a parabola.
(118) The student struggled to understand the concept of a parabola in math class.
(119) The quadratic polynomial can be used to find the x-intercepts of a parabola.
(120) The minor axis of a parabola is the line segment passing through its vertex.
Parabola used in a sentence
(121) The axis-of-symmetry is always perpendicular to the directrix of a parabola.
(122) If you graph a quadratic function, you will notice that it forms a parabola.
(123) The conic section known as a degenerate parabola has eccentricity equal to 1.
(124) The architect incorporated a parabola into the design of the building's roof.
(125) The conic section of a parabola can be seen in the shape of a water fountain.
(126) The concavity of the parabola determines whether it opens upward or downward.
(127) The conic section of a parabola can be found in many real-world applications.
(128) The foci of the parabola determine the distance between the vertex and focus.
(129) The foci of the parabola are located at the same distance from the directrix.
(130) The quadratic equation can be used to find the axis of symmetry of a parabola.
Parabola sentence in English
(131) The directrix of a parabola is a line that is parallel to the axis of symmetry.
(132) The conic section of a parabola can be seen in the shape of a suspension cable.
(133) The axis-of-symmetry is a line that is parallel to the directrix of a parabola.
(134) The foci of the parabola can be used to find the axis of symmetry of the curve.
(135) The quadratic polynomial can be used to find the axis of symmetry of a parabola.
(136) The conic section of a parabola can be seen in the shape of a suspension bridge.
(137) The axis-of-symmetry is a line that divides a parabola into two congruent parts.
(138) The foci of the parabola determine the focus-directrix property of the parabola.
(139) The axis-of-symmetry is a line that is perpendicular to the axis of the parabola.
(140) The latus of a parabola is equal to the distance from the focus to the directrix.
(141) The osculating circle of the parabola was tangent to the curve at a single point.
(142) Factorize round the quadratic expression to determine the vertex of the parabola.
(143) The mathematician used the quadratic formula to solve for the roots of a parabola.
(144) The quadratic equation is used to find the maximum or minimum value of a parabola.
(145) The math club discussed the importance of understanding intercept with a parabola.
(146) The student sketched a quadratic curve beside the parabola to compare their shapes.
(147) The conic section known as a parabola can be seen in the shape of a satellite dish.
(148) The conchoid of a parabola is a curve that is generated by a point on the directrix.
(149) The axis-of-symmetry of a parabola is a vertical line that passes through the vertex.
(150) The conic section of a parabola can be seen in the shape of a satellite dish antenna.
(151) The axis-of-symmetry is a straight line that passes through the vertex of a parabola.
(152) The principal axis of a parabola is the line that passes through its focus and vertex.
(153) The conic section of a parabola can be seen in the shape of a projectile's trajectory.
(154) The leading coefficient of a quadratic polynomial determines the shape of the parabola.
(155) The axis-of-symmetry is a vertical line for a parabola that opens upwards or downwards.
(156) The axis of a parabola is the line of symmetry that divides it into two identical halves.
(157) The coordinates of a point on a parabola can be found using the equation of the parabola.
(158) The roller coaster featured a thrilling parabola that sent riders soaring through the air.
(159) The range of a quadratic function depends on the vertex and the direction of the parabola.
(160) The student struggled to remember the formula for calculating the abscissas of a parabola.
(161) The conchoid of a parabola segment is a curve that is generated by a point on the segment.
(162) The foci of the ellipse, hyperbola, and parabola are important concepts in conic sections.
(163) Analytic geometry allows us to determine the equation of a parabola given certain conditions.
(164) The quadratic function y = -x^2 + 5x - 6 has two real solutions and a downward-opening parabola.
(165) The axis-of-symmetry is a line that is equidistant from the focus and the directrix of a parabola.
(166) The graph of a quadratic function is typically a parabola that curves across the coordinate plane.
(167) The shape of a satellite dish is designed to focus signals at the focal point, which is a parabola.
(168) The parabola's vertex, where the curve changes direction, is the point of minimum or maximum value.
(169) Analytical geometry allows us to determine the equation of a parabola given its focus and directrix.
(170) The osculating parabola of a curve is the parabola that best approximates the curve at a given point.
(171) The graph of a polynomial function can have various shapes, such as a straight line, parabola, or curve.
(172) The equation was factorable by completing the square, which allowed us to find the vertex of the parabola.
(173) The vertex of the parabola is the point where the curve changes direction, and it is also the point of symmetry.
(174) The conic section known as a parabola can be formed by intersecting a cone with a plane parallel to one of its sides.
(175) The vertex of a quadratic function is the point where the parabola reaches its highest or lowest point across the x-axis.
(176) The vertex of the graph of a quadratic function is the point where the parabola changes direction, and it is also the point of symmetry.
(177) The mathematician explained that the vertex of a parabola is the point where the curve changes direction, and it is also the point of symmetry.
Parabola meaning
Parabola is a mathematical term that refers to a type of curve that is commonly used in various fields such as physics, engineering, and architecture. It is a symmetrical curve that is formed by the intersection of a plane and a cone. The word parabola is derived from the Greek word "parabole" which means "comparison" or "analogy". If you are looking to use the word parabola in a sentence, there are a few tips that you can follow to ensure that you are using it correctly and effectively. Here are some tips to help you use the word parabola in a sentence:
1. Understand the meaning of the word: Before you use the word parabola in a sentence, it is important to understand its meaning and how it is used in different contexts. Parabola is a mathematical term that refers to a curve that is formed by the intersection of a plane and a cone. It is a symmetrical curve that is commonly used in various fields such as physics, engineering, and architecture.
2. Use the word in a mathematical context: Parabola is a term that is commonly used in mathematics, so it is important to use it in a mathematical context.
For example, you could say "The trajectory of the projectile can be described by a parabola."
3. Use the word in an architectural context: Parabola is also commonly used in architecture, particularly in the design of arches and domes.
For example, you could say "The dome of the Pantheon in Rome is a perfect parabola."
4. Use the word in a physics context: Parabola is also used in physics to describe the path of a projectile.
For example, you could say "The path of a cannonball fired from a cannon can be described by a parabola."
5. Use the word in a figurative context: Parabola can also be used in a figurative sense to describe a situation or event that follows a similar curve.
For example, you could say "The rise and fall of the stock market can be described as a parabola."
In conclusion, parabola is a versatile word that can be used in various contexts. Whether you are using it in a mathematical, architectural, or figurative sense, it is important to understand its meaning and use it correctly in a sentence. By following these tips, you can effectively use the word parabola in your writing and communication.
The word usage examples above have been gathered from various sources to reflect current and historical usage of the word Parabola. They do not represent the opinions of TranslateEN.com.