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. I

    MHB Calculus with parametric curves

    #1 find the length of the curve $x=3t^2$, $y=2t^3$, $0\le t \le 3$ $L=\int_{\alpha}^{\beta} \ \sqrt{(\frac{dx}{dt})^2+(\frac{dy}{dt})^2}dt$$\frac{dx}{dt}=6t$ $\frac{dy}{dt}=6t^2$$L=\int_{0}^{3} \ \sqrt{(6t)^2+(6t^2)^2}dt$ $=\int_{0}^{3} \ \sqrt{6t^2+6t^4}dt$ $=\int_{0}^{3} \...
  2. I

    MHB Sketch Parametric Curve and Find Cartesian Equation

    sketch the parametric curve and eliminate the parameter to find the cartesian equation of the curve $x=\cos\left({\theta}\right)$, $y=\sec\left({\theta}\right)$, $0\le \theta < \pi/2$ $y=\frac{1}{\cos\left({\theta}\right)}=\frac{1}{x}$ i sketched the curve. how do i do the second part?
  3. N

    Graphing Parametric Equations: Solving for t^2, t^4, and t^6

    t^2,t^4,t^6 Trying to graph this I have the traces x=y^2 for x>=0 in xy Also x=z^3 for z>=0 in xz And z=y^(3/2) for y>=0 in yz Parametricplot3d in mathematics does nothing to get a picture for this graph and drawing is proofing difficult In general what is the best way to plot...
  4. M

    Calculate Arclength of Parametric Curve

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  5. L

    Parametric equation application?

    Homework Statement http://i.imgur.com/oogkT4K.png Homework Equations y = (x-h)^2 + k The Attempt at a Solution y = (x-95)^2 + 10 ? We were assigned this in class but my teacher never taught us anything about these kinds of problems. I've learned basic parabolas and equations...
  6. M

    Parametric Description of a Plane

    I read the definition that a plane is a point and two vectors with the equation being plane sum = {OP + tv + sw} where v and w are vectors and t and s are real numbers. This is called the parametric description of the plane. I haven't seen the equation in this form before though. Can someone...
  7. sheldonrocks97

    Parametric equations for the portion of the parabola y=x^2?

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  8. D

    MHB Double Integral Problem/ Surface Area of parametric surface

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  9. S

    I need the parametric equations for a simple pendulum

    This is for a personal engineering project. I need the parametric equations y(t) and x(t) for a very simple pendulum. Assume no friction, no forcing, no variation in gravity, a point mass, and the tether angle is significantly less than 30 degrees. It has been a while since I did differential...
  10. R

    Slopes of tangent lines of parametric curves.

    1. The problem statement,ll variables and given/known data I have the first and second derivatives of a parametric function and the book is asking for when the slope of the tangent is vertical and horizontal. I get that horizontal is when dy/dx is 0. But what about vertical, is that dy/dx is 1...
  11. BiGyElLoWhAt

    Tangent plane of a parametric function

    Ok, so I'm really hoping someone can help me logic my way through this. I have a function to the effect of: ##r(u,v)=f(u,v)\hat{i} + g(u,v)\hat{j} +h(u,v)\hat{k}## I need to find an equation of a tangent plane at a point ##(u_{0},v_{0})## and quite frankly I'm at a loss on how to do this. So...
  12. MarkFL

    MHB Shane Trulson's Calc Homework: Arc Length of Parametric Curve

    Here is the question: I have posted a link there to this thread so the OP can view my work.
  13. J

    Parametric -> Implicit Equations

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  14. N

    Parametric equation in subspace

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  15. sheldonrocks97

    Concavity of Parametric Equations

    Homework Statement Find dy/dx and d^y/dx^2 x=e^t; y=te^(-t) For which values of t are concave upward? (write your answer in interval notation). Homework Equations The Attempt at a Solution I used the formula to find d^2y/dx^2. d^2y/dx^2= e^(-3t)*(2t-3) Set it to zero: e^(3t)*(2t-3)>0 I...
  16. G

    How to Solve a Parametric Vector Problem Involving Perpendicular Vectors?

    Homework Statement Homework Equations (x,y,z)=(x0,y0,z0) + t(m1,m2,m3) The Attempt at a Solution So at first I thought that since vector P1P2 is at right angles to both lines, both lines must be parallel. Quickly dismissed this idea since their direction vectors are not multiples of...
  17. M

    Parametric equations for circle of curvature at given point.

    Hey guys, I'm new here. I got a problem from my professor that is different from any other problems we have done. I'm stuck and need a little help.Homework Statement r(t) = <cos(t), t, 2sin(t)> Find parametric equations for the circle of curvature at (0, pi/2, 2)The Attempt at a Solution I...
  18. dwn

    Line Integrals and Finding Parametric Equations

    I am having a difficult time finding the parametric equations x = x(t) and y = y(t) for line integrals. I know how to find them when dealing with circles, but when it comes to finding them for anything else, I don't see the method...it all seems very random. I did fine with finding the...
  19. Y

    Parametric Equation of Perpendicular Line Through Point of Intersection L1/L2

    1. The problem statement, all variables and given/known Determine parametric equations of the line that Is perpendicular to the lines L1= 3t-2 2t 3t L2= s-1 2s-7 3s-12 And passes through the point of intersection of lines L1 and L2 2. Homework Equations...
  20. Y

    Parametric Equations: Find Line P Passing Through P

    1. The problem statement, all variables and given/known Find the equation of a line passing through the point P=(-1,2,3) that is parallel to the line of intersection of the planes 3x-2y+z=4 and x+2y+3z=5 . Express your answer in parametric equations . 2. Homework Equations Cross product of...
  21. B

    Parametric equations for roots

    Can I write the parametric equations for the graphs in the following case: on the x-axis, I want to plot a real number 'b'. On the y-axis, I want to plot the roots (all real roots) for x of the equation (7+b2)x3+(6-b)x2+9x-6=0. e.g. when b=1, I plot 1 on the x-axis and x=0.46124674 (the real...
  22. C

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  23. S

    Parametric Derivatives and Normal Equations for a Curve with Gradient 1

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  24. S

    Parametric Derivatives: Understanding Second Derivatives of Parametric Equations

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  25. Calculuser

    Surface Normal and Parametric Surface?

    I've been working on Multivariable Calculus with a few books. In Vector Analysis, I've had some parts which made some questions come up in my mind. I have two questions about them. 1)Can we think of surface normal vector (\vec{n}) as a vector field (\vec{F}) or just a position vector...
  26. applestrudle

    Length of a 3D parametric function

    Homework Statement find the length of a circular helix expressed in parametric form x= cos(t), y=sin(t) and z = t from t = 0 to t =2pi Homework Equations L = integrate ds (ds)^2 = (dx)^2+(dy)^2+(dz)^2 The Attempt at a Solution I got to ds = (1 + (dt)^2)^0.5 but I can't...
  27. B

    Area element vector for parametric surface integrals

    When doing surface integrals of surfaces described parametrically, we use the area element dA = ndS = (rv x rw)dvdw Where dS is the surface area element and v and w are the parameters. I'm fine with the derivation of this (I think) but I don't understand why it's necessary to have n and dS...
  28. Lebombo

    5th power perameter for parametric equations

    Given parametric equations:[g(t)= x = t^{5}-4t^{3}] and [h(t) = y = t^{2}]Since polynomials can only be solved up to the 4th degree as I've just learned here on PhysicsForums, I guess it's not possible to isolate t in terms of x in the g(t) function and substitute into the h function to create...
  29. B

    Writing Parametric Equations from Cartesian Equations

    What is the general method for writing Cartesian equations as parametric equations? For something as simple as y=f(x) we can write x=t and y=f(t) with the same function, but what about something more complicated, generally f(x,y)=0 - how can we make 2 parametric equations to represent a case...
  30. Lebombo

    Change in domain as variable changes in Parametric Equations.

    This question is from the parametric equations chapter of my calc book. I am given x =\frac{1}{\sqrt{t+1}} and y = \frac{t}{t+1}, for (x> -1) Solving the x(t) for t, we get \frac{1- x^{2}}{x^{2}} Eliminating the parameters by substitution, we get y = 1 - x^{2} for (x > 0) My question is...
  31. D

    Parametric hypothesis, uniform distribution

    Homework Statement We are given a sample of size 100. After some tests (histogram, Kolmogorov) we deduce the sample X is distributed uniformly. The next task is to presume the parameters are equal to values of your choice, and test if such hypothesis is true. Homework Equations The Attempt at...
  32. O

    Angular Momentum and Energy from parametric orbit equations

    Homework Statement Given the parametric equations for a satellite in orbit around a spherical mass find angular momentum L in terms of ε, a, k, m, where k=GMm. Also, find the energy E in the same terms. Lastly, I can only use the equations provided and "fundamental definitions." Homework...
  33. S

    Solving Parametric Equations for y=√x

    Even problem in 2nd semester calc book. Homework Statement Come up with three sets of PE for y=√x The Attempt at a Solution This is the first time in my math education that I've come across parametric equations where I am required to give 2 or more sets. The first one: x=t...
  34. A

    Simple question about parametric equations of a plane in 3D

    I'm quite rusty in Linear Algebra. If you have a plane in 3D with the equation ##z=2##, what does ##x## and ##y## equal? Does ##x=t## and ##y=t##? Because if I graph that in Wolfram Alpha, I don't get a horizontal plane in 3D at ##z=2##...
  35. J

    Comparing parametric equations

    Homework Statement Compare the curves represented by the the parametric equations. How do they differ? a.) x =t , y = t^-2 b.) x = cost , y = (sect)^2 c.) x = e^t , y = e^(-2t) Homework Equations So I drew them on the calculator they all look like umm... how do I describe this...
  36. S

    Parametric curve, unique pt. P, tangent at P goes through other point.

    Homework Statement Problem: A curve given parametrically by (x, y, z) = (2 + 3t, 2 – 2t^2, -3t – 2t^3). There is a unique point P on the curve with the property that the tangent line at P passes through the point (-10, -22, 76). Answer: P = (-4, -6, 22) What are the coordinates of...
  37. C

    Finding total length of a parametric curve

    Homework Statement Find the total length of the curve t --> (cos^3(t), sin^3(t)), and t is between 0 and ∏/2 where t is in radians. Find also the partial arc length s(t) along the curve between 0 and ∏/2 Homework Equations The length is given by: S = ∫\sqrt{xdot^2 + ydot^2} dt...
  38. M

    Cardiod parametric equation problem

    Homework Statement . Let ##C_a## a cardioid given in polar coordinates by ##r_a= a+cos(\theta)## with a being a parameter, and ##\theta## ##\in [0,2\Pi]## a)Prove that, for a>1, ##C_a## is a smooth curve. b)Calculate the tangent line to the curve ##C_a## in the cartesian coordinates point...
  39. PsychonautQQ

    Parametric equations to find surface area

    Homework Statement Which of the following integrals represents the area of the surface obtained by rotating the parametric curve x=t-t^2 y=(4/3)t^(3/2) 1<t<2 Homework Equations A = integral ( 2pi(y) * sqrt( 1+ (dy/dx)^2))dx The Attempt at a Solution I solved for dy/dx and got...
  40. PsychonautQQ

    Find dy/dx as a function of t for the parametric equations

    Homework Statement find dy/dx as a function of t for the parametric equations x=cos^7(t) y=6sin^2(t) Homework Equations The Attempt at a Solution well I'm looking for dy/dx.. so first i found dy dy = 12sin(t)cos(t) and dx dx = -7cos^6(t)sin(t) dy/dx = 12sin(t)cos(t) /...
  41. Dethrone

    MHB Understanding Parametric equations

    I have a few trivial questions regarding finding equations of the tangent line: 1) Find an equation of the tangent line to the parametric curve: x = 2 sin 2t y= 2 sin t at the point (\sqrt{3}, 1) The textbook says that point "corresponds to the parameter value t= \frac{pi}{6}" How do they...
  42. MarkFL

    MHB Joe's questions at Yahoo Answers regarding parametric equations

    Here are the questions: I have posted a link there to this topic so the OP can see my work.
  43. S

    Arc Length of Parametric Curve: t = 0 to t = 1

    Homework Statement Find the arc length of a curve given parametrically from t = 0 to t = 1. Curve given by x = 4t^2, y = 2t Homework Equations [I think] parametric arclength = integral from t = b to t = a of sqrt( (dx/dt)^2 + (dy/dt)^2)dt The Attempt at a Solution dx/dt =...
  44. F

    How can you guess solutions of parametric resonance equation?

    Hi, first time asking questions in this forum. I am self-learning classic mechanics this summer using Laudau's book and so far I feel everything is pretty interesting and makes sense for me. But still, I have some questions that needed to be answered. One of them is about the parametric...
  45. S

    I came up with a cool parametric equation

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  46. J

    Finding Parametric equations for the line of intersection of two plane

    Homework Statement Find the parametric equations for the line of intersection of two planes Homework Equations Equations for the two planes... z=x+y,-------(1) 2x-5y-z=1 -----(2) The Attempt at a Solution My answers are not correct so I guess I'm going about it the wrong way. Someone...
  47. A

    Constant tangential speed along arbitrary parametric curve

    Hi everyone, I've been racking my brain about this problem, but can't seem to figure it out. It seems like it should be easy, but I keep getting confused. Let's say I have an arbitrary parametric curve r(t)=<x(t), y(t)>. I want the velocity in the tangential direction to be constant. That...
  48. M

    Can a 2nd degree parametric equation be turned into cartesian?

    Let's say i have a parametric equation: x = t^2 y = t^3 + 4t Even though this is a 2nd and 3rd degree parametric equation, i can isolate and express in terms of y = f(x) because the parametric equation for x involves only one term for t. Thus: t = sqrt(x) and y = sqrt(x)^3 + 4(sqrt(x))...
  49. B

    Trying to integrate a non one-to-one parametric function

    Hi, I'm working on an independent research project - and am trying to integrate this (with respect to x between some arbitrary m and infinite). http://www.wolframalpha.com/input/?i=+x+%3D%28t%2B2%29%2F%281%2Be%5E%28t-r%29%29%2C+y%3D%28e%5E%28-t%5E2%2F2%29%29%2Fsqrt%282*pi%29 If you graph this...
  50. P

    Parametric Equations finding largest radius

    Homework Statement Suppose that r = f (θ) defines a polar graph. Find an expression for dx/dθ. It should not involve the letter r. Explain a procedure to determine the farthest that the graph r = f (θ) extends to the left and to the right (Hint: If x = x0 is the x - value of the point that...
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