What is Parametric: Definition and 673 Discussions

In mathematics, a parametric equation defines a group of quantities as functions of one or more independent variables called parameters. Parametric equations are commonly used to express the coordinates of the points that make up a geometric object such as a curve or surface, in which case the equations are collectively called a parametric representation or parameterization (alternatively spelled as parametrisation) of the object.For example, the equations








x



=
cos

t




y



=
sin

t






{\displaystyle {\begin{aligned}x&=\cos t\\y&=\sin t\end{aligned}}}
form a parametric representation of the unit circle, where t is the parameter: A point (x, y) is on the unit circle if and only if there is a value of t such that these two equations generate that point. Sometimes the parametric equations for the individual scalar output variables are combined into a single parametric equation in vectors:




(
x
,
y
)
=
(
cos

t
,
sin

t
)
.


{\displaystyle (x,y)=(\cos t,\sin t).}
Parametric representations are generally nonunique (see the "Examples in two dimensions" section below), so the same quantities may be expressed by a number of different parameterizations.In addition to curves and surfaces, parametric equations can describe manifolds and algebraic varieties of higher dimension, with the number of parameters being equal to the dimension of the manifold or variety, and the number of equations being equal to the dimension of the space in which the manifold or variety is considered (for curves the dimension is one and one parameter is used, for surfaces dimension two and two parameters, etc.).
Parametric equations are commonly used in kinematics, where the trajectory of an object is represented by equations depending on time as the parameter. Because of this application, a single parameter is often labeled t; however, parameters can represent other physical quantities (such as geometric variables) or can be selected arbitrarily for convenience. Parameterizations are non-unique; more than one set of parametric equations can specify the same curve.

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  1. S

    Please help determine the tangent of the parametric equation.

    Homework Statement A curve C is defined by the parametric equation x=t^2, y=t^3-3t. a) show that C has two tangents at the point (3,0) and find their equations. b) find the points on C where the tangent is horizontal Homework Equations y-y1=m(x1-x), (dy/dt)/(dx/dt)=m, when dy/dt=0...
  2. M

    Finding Length of Curve Represented by Parametric Equations

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  3. R

    Parametric vector form of the line

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  4. A

    Real world applications of Parametric Differentiation.

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  5. H

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  6. Seydlitz

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  7. M

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  8. D

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  9. V

    Derivatives of parametric functions (or whatevs)

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  10. C

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  11. C

    Parametric equations motion problem

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  12. L

    Need help with a small vector and parametric question.

    2. Determine vector and parametric equations for the z-axis. (Just so everyone is clear, The z-axis is actually a line in space. So you need to write the vector and parametric equation of this line)
  13. E

    Parametric equation confusion of d2y/dx2

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  14. A

    Help needed finding vector, parametric, symmetric equation

    Homework Statement Find the vector, parametric and symmetric equations of a line that intersect both line 1 and line 2 at 90°. line 1: x = 4 + 2t y = 8 + 3t z = -1 - 4t line 2: x = 7 - 6t y = 2+ t z = -1 + 2t Homework Equations not sure. I am not asking for the answer...
  15. N

    Parametric equation of a vector passing through a point and parallel to a line

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  16. S

    Linear Integration of a Vector Field over a Parametric Path

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  17. Y

    Explicit form to parametric form

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  18. T

    Parametric definition for a complex integral

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  19. F

    Plotting 3d parametric equations in Matlab

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  20. J

    Find t in a Parametric Equation

    Homework Statement Find parametric equations for the tangent line to the curve with the given parametric equations at the specified point. x = 6 cos t, y = 6 sin t, z = 6 cos 2t; (3√3, 3, 3) Homework Equations The Attempt at a Solution So I understand that r(t)= 6cost t, 6sint...
  21. A

    Transforming from polar to parametric functions

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  22. G

    Find parametric equations given point and two planes

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  23. M

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  24. B

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  25. K

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  26. G

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  27. ElijahRockers

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  28. C

    Equation for this graph - is it parametric?

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  29. Z

    The Parametric Functions of a Bezier Curve

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  30. M

    Area of a parametric surface. (Multiple integral)

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  31. L

    Parametric Sphere Projection: A Function for Projecting Points onto a Sphere

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  32. R

    Parametric equation for 3D circle that's off-axis

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  33. L

    Finding Isometry between Two Parametric Lines in R^3

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  34. F

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  35. W

    Solving Parametric Equations: Eliminate t & Find x-y Cartesian Equation

    Hello forum! I have yet another question concerning calculus and the topic we're doing right now is extremely confusing for me. Homework Statement Eliminate the parameter from the parametric equations x=3t/(1+t3), y=3t2/(1+t3), and hence find an Cartesian equation in x and y for this curve...
  36. T

    Is the momentum conservation law correct in parametric conversion process?

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  37. G

    Exploring Parametric Changes in ODEs: Analytic Way

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  38. S

    Derivatives of a Parametric Equaiton for Motion

    I am exploring the motion of a particle who's path P(x,y) is given by two parametric equations: x = f(t) = a cos(bt) + cd (1) y = g(t) = a sin(bt) (2) To get a tangential velocity for this particle, I differentiated (1) and (2) then combined them using the form sqrt( m2 + n2...
  39. T

    Find the length of the curve given by the parametric representation

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  40. M

    Convert parametric equation into f(x,y,z)

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  41. T

    Finding Max/Min Values on Parametric Functions

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  42. D

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  43. V

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  44. M

    Help with parametric equations

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  45. Y

    Mathematica Parametric plot in mathematica

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  46. S

    A problem on parametric vector form of the plane

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  47. J

    Parametric representation of a vector electric field

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  48. L

    Motion defined by a parametric eqn

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  49. C

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  50. G

    Velocity Using Parametric Equations

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