What is Cartesian coordinates: Definition and 90 Discussions

A Cartesian coordinate system (UK: , US: ) in a plane is a coordinate system that specifies each point uniquely by a pair of numerical coordinates, which are the signed distances to the point from two fixed perpendicular oriented lines, measured in the same unit of length. Each reference line is called a coordinate axis or just axis (plural axes) of the system, and the point where they meet is its origin, at ordered pair (0, 0). The coordinates can also be defined as the positions of the perpendicular projections of the point onto the two axes, expressed as signed distances from the origin.
One can use the same principle to specify the position of any point in three-dimensional space by three Cartesian coordinates, its signed distances to three mutually perpendicular planes (or, equivalently, by its perpendicular projection onto three mutually perpendicular lines). In general, n Cartesian coordinates (an element of real n-space) specify the point in an n-dimensional Euclidean space for any dimension n. These coordinates are equal, up to sign, to distances from the point to n mutually perpendicular hyperplanes.

The invention of Cartesian coordinates in the 17th century by René Descartes (Latinized name: Cartesius) revolutionized mathematics by providing the first systematic link between Euclidean geometry and algebra. Using the Cartesian coordinate system, geometric shapes (such as curves) can be described by Cartesian equations: algebraic equations involving the coordinates of the points lying on the shape. For example, a circle of radius 2, centered at the origin of the plane, may be described as the set of all points whose coordinates x and y satisfy the equation x2 + y2 = 4.
Cartesian coordinates are the foundation of analytic geometry, and provide enlightening geometric interpretations for many other branches of mathematics, such as linear algebra, complex analysis, differential geometry, multivariate calculus, group theory and more. A familiar example is the concept of the graph of a function. Cartesian coordinates are also essential tools for most applied disciplines that deal with geometry, including astronomy, physics, engineering and many more. They are the most common coordinate system used in computer graphics, computer-aided geometric design and other geometry-related data processing.

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  1. H

    Parametric Representation in Spherical and Cartesian coordinates

    Give a parametric representation of the following surfaces in terms of the given parameter variables: a) The first octant portion of the sphere (x^2) + (y^2) + (z^2) = 16 in terms of the spherical variables theta and phi. b)The graph of the function z = (x^3) - sqrt(y) in terms of the...
  2. X

    Polar to cartesian coordinates for stream function

    Homework Statement Consider a velocity field where the radial and tangenetial components of velocity are V_r=0 and V_theta=cr, respectively, where c is a constant. Obtain the equations of the streamlines. Homework Equations x=rcos(theta) y=rsin(theta) The Attempt at a Solution I...
  3. K

    Calculating Arc Length on a Circle with Cartesian Coordinates

    Homework Statement The Carteian coordinates of a point on a circle with its center at the origin are [0.40, 0.30]. What is the arc length measured counterclockwise on the circle from the positive x-axis to this point? Homework Equations The Attempt at a Solution Wouldn't they be...
  4. E

    Distance from cartesian coordinates and im going wring somewhere.

    Why is \sqrt{9+36} = 3\sqrt{5} and not 6.708 ? I wasnt interested in maths at school but now I'm trying to self teach, so pardon my ignorance. Edit: Ok i feel foolish now, no need to correct me as I've just worked out i WAS correct. I'm still unsure as to why it would be shown...
  5. C

    Resolving a unit vector from Cylindrical coordinates into Cartesian coordinates

    Homework Statement Question 3 (a)A long metal cylinder of radius a has the z-axis as its axis of symmetry.The cylinder carries a steady current of uniform current density J = Jzez. Derive an expression for the magnetic field at distance r from the axis,where r<a. By resolving the...
  6. B

    Cartesian Coordinates in Linear Algebra and Globality

    Hi, Everyone: I just read recently a comment to the effect that Descartes never intented his use of coordinates in his layout of analytic geometry to be used globally; there was also a follow-up comment about " no one really using any coordinates in a global way. Does anyone...
  7. J

    Off-axis magnetic field due to a current loop in cartesian coordinates

    Hi there, a few days ago I derived the probably well-know expression for the magnetic field of a current loop including elliptic integrals of the first and second kind (it can be seen here http://plasmalab.pbworks.com/f/bfield.pdf" ). As I'd like to rotate and shift the position of the...
  8. L

    Electric field in cartesian coordinates

    [SOLVED] Electric field in cartesian coordinates Homework Statement Suppose the electric potential is V(r) = C1 /r + C2 cosθ /r^2 where (r, θ, φ) are the spherical polar coordinates for points in three dimensions. [Data: C1 = 4.3 Vm ; C2 = 1.6 Vm^2 ] (A) Determine the electric...
  9. L

    Polar and cartesian coordinates

    Homework Statement Write the following polar equation in Cartesian coordinates: r= 2/(3cos(theta)-9sin(theta)) Homework Equations r = (x^2 + y^2) ^.5 x=rcos theta y=rsin theta sin^2(x)+cos^2(x) = 1 The Attempt at a Solution I'm stuck on how to do this. Any push in the right...
  10. T

    Cartesian Coordinates: Solving & Verifying w/ Pythagorean Theorem

    We learned about cartesian coordinates briefly in class and i didnt completely understand them. I am not looking for an answer but rather the process on how to get to an answer in cartesian coordinates, for instance, in this example: A point on a polar coordinate system is located at r=2.0...
  11. U

    Finding vectors in Cartesian Coordinates

    Homework Statement The vector V is given by V = (5.0x-12.0y )m. What is W such that V + W = -5|V|x? Homework Equations |v| = (vx2 + vy2)1/2 The Attempt at a Solution I was unsure of what I did to subtract vector v- I know the negative vector has the same magnitude but opposite...
  12. Telemachus

    Espheric to cartesian coordinates

    Homework Statement Hi there. Well, I have the next exercise, which I've solved, but I don't know if the solution I got is the right one. It says Given the next region on spheric coordinates find the expression for it in rectangular coordinates, and plot...
  13. U

    Converting Polar coordinates to Cartesian coordinates

    Homework Statement Write the vectors B,D, and F in the figure in Cartesian form, with unit vectors. (See attachments) Homework Equations ax = a cos theta ay = a sin theta where a = magnitude of vector a, and theta = the angle vector a makes with the positive direction of the x axis...
  14. Telemachus

    Cylindrical coordinates to cartesian coordinates

    Homework Statement Hi there. Hi have in cylindrical coordinates that \theta=\displaystyle\frac{\pi}{3}, and I must make the graph, and take it into cartesian coordinates. How should I do? I've tried this way: \begin{Bmatrix}x=r\cos\displaystyle\frac{\pi}{3}\\y=r\sin\displaystyle\frac{\pi}{3}...
  15. S

    Differential Cartesian Coordinates Into Cylindrical Coordinates

    Has to convert B6-1 into B6-2 Source Transport Phenomenon 2nd ed -
  16. N

    The volume of a spherical cap by integrating and using Cartesian coordinates

    Dear all, How can I derive the volume of a spherical cap by integration and using the Cartesian coordinate system. The sphere is located at the (0,0,0) coordinates and its radius is set to r. The height of the cap is also set to (r-h). I googled a lot but I couldn't find it. I would...
  17. K

    Doing General Relativity with Cartesian coordinates?

    Is it possible to do general relativity but avoid the difficult mathematics of generalized coordinates, tensors, and computing the metric of a space-time manifold by using ordinary cartesian coordinates in a 5 dimensional space? We can picture a curved 4 dimensional spacetime as being...
  18. N

    Find gradient in spherical and cartesian coordinates

    Homework Statement Find the gradient of 3r^2 in spherical coordinates, then do it in Cartesian coordinates Homework Equations \nabla f=\hat r \frac{\partial f}{\partial r} + \hat \theta \frac{1}{r} \frac{\partial f}{\partial \theta}+ \hat \phi \frac{1}{r\sin \theta}\frac{\partial...
  19. C

    Conversion of cartesian coordinates to polar coordinates

    [b]1. Was wondering if anyone could help me confirm the polar limits of integration for the below double integral problem. The question itself is straight forward in cartesian coordinates, but in polar form, I'm a bit suspect of my theta limits after having sketched the it out. any help much...
  20. J

    HFinding Z-Limits in a Solid Horn Rotated Around the Y-Axis

    Homework Statement Solid horn obtained by rotating the points {[x=0], [0 \leq y \leq 4], [0 \leqz \leq \frac{1}{8}y^{2}] } circles around y-axis of radius \frac{1}{8}y^2. Set up the integral dzdxdy.Homework Equations Cartesian coordinates.The Attempt at a Solution I don't understand how the...
  21. M

    Cartesian coordinates vs. The rest of the world?

    So I wonder why the gradient in coordniates other than cartesian ones bears coefficients. Let's take spherical coordinates for example. We have (Source) - Sorry if image doesn't work - too lazy to get the TeX right. From what I know, I don't see anything that raises cartesian coordinates...
  22. R

    Kerr metric, singularities in Boyer-Lindquist and Cartesian coordinates

    I've found a fairly concise review of the Kerr metric at http://www.physics.mcmaster.ca/phys3a03/The%20Kerr%20Metric.ppt The Kerr Metric for Rotating, Electrically Neutral Black Holes: The Most Common Case of Black Hole Geometry. Ben Criger and Chad Daley. On slide 6 they give the usual...
  23. D

    Triple Integral in Cartesian Coordinates

    Homework Statement Use a triple integral to find the volume of the solid enclosed by the paraboloid x=y^2+z^2 and the plane x=16 Note: The triple integral must be performed in Cartesian coordinates. Homework EquationsThe Attempt at a Solution I calculated the answer numerically using...
  24. C

    Screen Coordinates to Cartesian Coordinates

    Hello. Is there some easy way to convert screen coordinates (origin at the top left corner) to Cartesian coordinates?
  25. D

    Converting F to Cartesian Coordinates

    Homework Statement Convert F into cartesian coordinates from spherical F = -4*theta*e_r + 1e_phi r(t) = 2, theta(t) = 4t, phi(t) = pi / 2 Homework Equations x = rsin(theta)cos(phi) y = rsin(theta)sin(phi) z = rcos(phi) The Attempt at a Solution Where I'm having problem is converting F into...
  26. V

    Convert a cylindrical coordinate vector to cartesian coordinates

    Homework Statement Convert the following cylindrical coordinate vector to a Cartesian vector: \overrightarrow{A}\,=\,\rho\,z\,sin\,\phi\,\hat{\rho}\,+\,3\,\rho\,cos\,\phi\,\hat{\phi}\,+\,\rho\,cos\,\phi\,sin\,\phi\,\hat{z} Homework Equations...
  27. V

    The Visual Representation of a Cartesian 3D Axis System

    How do you draw an Cartesian 3D-axis-system? The Y-axis seems to have some perspective; what's the position of the observer? What's the 'way' of placement, and why? All 'links' are welcome. Dank u.
  28. J

    Latitude Longitude -&gt; Polar Form -&gt; Cartesian Coordinates

    [SOLVED] Latitude Longitude -&gt; Polar Form -&gt; Cartesian Coordinates Homework Statement I need to convert 46 Degrees North 80 Degrees west into Cartesian coordinates, based on the assumption that the Earth is a sphere (althought it's not). Homework Equations...
  29. C

    Converting Polar Coordinates to Cartesian Coordinates

    Homework Statement The polar coordinates of a point are r=6.00 m and theta 250. What are the Cartesian coordinates? X=? Y=? Homework Equations Cos=adj./hyp. sin=opp./hyp The Attempt at a Solution Would I just need to calculate the cos and sin? That is, I would just do sin...
  30. R

    Infinite Cubical Well in Cartesian Coordinates

    Homework Statement Use separation of variables in cartesian coordinates to solve the infinite cubical well (or "particle in a box"): V(x,y,z) = \{^{0, if x, y, z are all between 0 and a;}_{\infty , otherwise.} Homework Equations Well, I've been trying to use \frac{1}{2}mv^{2} + V =...
  31. Loren Booda

    Sequence of circumscribed Cartesian coordinates

    What is the sequence described by the counts of integer Cartesian coordinates (x, y) within circles of successive whole number radii centered at the origin?
  32. T

    Converted Cartesian coordinates to polar coordinates

    I don't know where have I gone wrong... I converted Cartesian coordinates to polar coordinates: \frac{\partial^2\Psi}{\partial x^2} +\frac{\partial^2\Psi}{\partial y^2}= \frac{1}{2}(\frac{\partial^2}{\partial x^2}+\frac{\partial^2 }{\partial y^2})\Psi^2 - \Psi(\frac{\partial^2}{\partial...
  33. CarlB

    Painleve orbits in Cartesian Coordinates

    With the success of my effort to write the orbits of the Schwarzschild metric in "Cartesian" coordinates, (see https://www.physicsforums.com/showthread.php?t=126996 ) it is now time to compute the orbits for Painleve coordinates. When I'm done, I will have an applet that allows the computation...
  34. CarlB

    Schwarzschild Orbits in Cartesian coordinates

    My Java applet gravity simulator http://www.gaugegravity.com/testapplet/SweetGravity.html draws beautiful orbits, however the GR simulation is very badly broken as one can tell when comparing it with Newton at long distances. The source code is at...
  35. Z

    What's the meaning of the Cartesian coordinates of the atom?

    How to get the Cartesian coordinates of an atom? Dear friends, Such a question confused me when reading!:confused: "xi,yi and zi are the Cartesian coordinates of the ith atom" How to get the coordinate of an atom? For example: carbon, oxygen? I think the atom is only a dot! What's the way...
  36. R

    Cartesian coordinates and torque

    This section I don't understand at all... but the problem is What is the torque tau_B due to force F_vec about the point B? (B is the point at Cartesian coordinates (0, b), located a distance b from the origin along the y axis.) Express the torque about point B in terms of F, theta, phi, pi...
  37. P

    Cartesian coordinates and in polar coordinates?

    Are Cartesian coordinates two or three dimensional?
  38. G

    Cartesian coordinates in 3D problem.

    I've no idea what to do with this, the examples didn't have anything of this style: The point A has coordinates (3,0,0), the point B has coordinates, (0,3,0), the point C has coordinates (0,0,7). Find, to 0.1 degrees, the sizes of the angle between the planes OAB and ABC, where O is the...
  39. M

    Ball coordinates to cartesian coordinates

    I am struggeling with the following problem: give the x,y,z coordinates from the following ball points/vectors 1. (r, theta, phi) = (sqrt3, 3/4pi, 3/4pi) 2. (r, theta, phi) = (1, 1/6pi, 1 1/6pi) the sollutions I found in my reader are as followed: 1. (x, y, z) = (-1/2 sqrt3, 1/2...
  40. R

    Can someone help me with calculating cartesian coordinates for a moving object?

    Hi. I was just wondering if anyone could help me with a formula to solve the following problem. I have two locations (L1 and L2), which I know the cartesian coordinates of, situated in a three dimensional space. I also have a distance (D) which I also know the value of. D is not the...
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