What is Cartesian: Definition and 558 Discussions

In mathematics, specifically set theory, the Cartesian product of two sets A and B, denoted A × B, is the set of all ordered pairs (a, b) where a is in A and b is in B. In terms of set-builder notation, that is




A
×
B
=
{
(
a
,
b
)

a

A



and



b

B
}
.


{\displaystyle A\times B=\{(a,b)\mid a\in A\ {\mbox{ and }}\ b\in B\}.}
A table can be created by taking the Cartesian product of a set of rows and a set of columns. If the Cartesian product rows × columns is taken, the cells of the table contain ordered pairs of the form (row value, column value).One can similarly define the Cartesian product of n sets, also known as an n-fold Cartesian product, which can be represented by an n-dimensional array, where each element is an n-tuple. An ordered pair is a 2-tuple or couple. More generally still, one can define the Cartesian product of an indexed family of sets.
The Cartesian product is named after René Descartes, whose formulation of analytic geometry gave rise to the concept, which is further generalized in terms of direct product.

View More On Wikipedia.org
Recent contents Top users
  1. S

    Changing cartesian integrals to equivalent polar integrals.

    Homework Statement 6...y ∫...∫ x dx dy 0 ...0 The Attempt at a Solution for reference: π=pi 6...y ∫...∫ x dx dy 0 ...0 y=6=x=6. rcosΘ=6 r=6/cosΘ goes to π/2 6secΘ ∫ ...∫... r cosΘ r dr dΘ π/4...0 π/2.....r=6secΘ ∫ ... [((r^3)/3)cosΘ] dΘ π/4......r=0 π/2...
  2. K

    Conversion of cartesian coords to spherical polars

    Homework Statement Velocity vector, v: v = (yi + xj) / (x^2 + y^2 + z^2)^(3/2) "Re write "v" in spherical polar coordinates and unit vectors" Homework Equations Obviously r = (x^2 + y^2 + z^2)^(1/2) theta = tan^(-1)((x^2 + y^2)^(1/2)/z) phi = tan(^-1)(y/x) The Attempt at a Solution...
  3. G

    Curvilinear & Cartesian Conversions

    I'm trying to create a program which will do these calculations. I am given Latitudes, Longitudes, and ellipsoidal heights for ellipsoids and another set of x, y, and z coordinates. I am so confused looking at how to convert these things. I know I need to iterate in order to go from cartesian to...
  4. C

    4d Cartesian to Polar Transform

    Howdy everyone, I'm on a quest for something that is proving a bit elusive at the moment: a Cartesian to polar transform (along with its inverse) for \mathbb{R}^4. I'm well aware of how to derive the transform for both \mathbb{R}^2 and \mathbb{R}^3, as it is just a matter of looking at the...
  5. K

    Cartesian equation for the Magnetic field resulting from a single current loop?

    Hello I am carrying out some analysis on the magnetic field generated over a 3D region by a single current loop. The present form of the equations is in cylindrical coordinates and is as follows \vec{B}={Brc,0,Bz} There is no angular component in this present from. Note: The following website...
  6. B

    Double integral help please? polar and cartesian

    Homework Statement Okay here's the problem: Consider the region R interior to a circle(of r =2) and exterior to a circle(r=1). 1.Using cartesian coords and double integral, calc the area of annulus. 2. repeat calculation above but using double integral with polar coords The...
  7. 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...
  8. A

    Converting the Electric Field of a Dipole from Cartesian to Spherical Coords

    Homework Statement Show that E_z = \frac{p}{4 \pi \epsilon_0} \left( \frac{3z^2}{r^5} - \frac{1}{r^3} \right) is equivalent to the electric field on the positive z-axis from E_r = \frac{2 p \cos \theta}{4 \pi \epsilon_0 r^3} Homework Equations The unit normal for a sphere, sin0cos%...
  9. U

    Calculus Planes - General Cartesian Equations

    Homework Statement Write down the general cartesian equation of a vertical plane (parallel to the z-axis), a non-vertical plane and a horizontal plane (parallel to the x; y-plane) together with their normal vectors. Find the cartesian equations of the line of intersection of the plane 5x + y ¡...
  10. D

    Converting vector in cartesian to cylindrical coordinates

    Homework Statement This seems like a trivial question (because it is), and I'm just not sure if I'm doing it right. I have vector in cartesian coordinate system: \vec{a}=2y\vec{i}-z\vec{j}+3x\vec{k} And I need to represent it in cylindrical and spherical coord. system Homework...
  11. R

    Converting a Cartesian equation to polar form

    Homework Statement Convert the following Cartesian equation to polar form. x^2/9 + y^2/4 = 1 Homework Equations r*cos(t)=x r*sin(t)=y r=Sqrt(x^2 + y^2) y/x = Arctan(t) The Attempt at a Solution I get ugly looking things like r^2(cos^2(t)/9 + sin^2(t)/4) = 1 but being a simple ellipse (edit...
  12. H

    Conversion from Polar to Cartesian equations

    I just did a quiz in a lecture and walked out crying. There was one question (which probably seems very easy to most :/ ) were you had to convert polar equations to cartesian ones. We also had to draw the cartesian graphs (2D). a) rcos(th) b)r=2asin(th) c)r^2sin2(th)=2k...
  13. J

    Abstract Algebra, rings, zero divisors, and cartesian product

    The problem states: Let R and S be nonzero rings. Show that R x S contains zero divisors. I had to look up what a nonzero ring was. This means the ring contains at least one nonzero element. R x S is the Cartesian Product so if we have two rings R and S If r1 r2 belong to R and s1 s1...
  14. M

    Solving Cartesian Vector Problems: |D|, |E|, D+E, E-D

    Homework Statement If D=3i–2j and E=–7i+5j … (a) What is |D|? (b) What is |E|? (c) What are the vectors D+E and E–D? !THERE ARE SUPPOSED TO BE HATS OVER THE VARIABLES! I would put up an attempt at the problem if I even knew how to attempt it.
  15. J

    Finding the Cartesian Equation of a Hyperplane

    Homework Statement Give the Cartesian equation of the following hyperplane: The plane spanned by (1,1,1) and (2,1,0) and passing through (1,1,2)Homework Equations The Attempt at a Solution I keep getting 4 = -2x(sub1) + -2x(sub2) +x(sub3). However, the answer is x(sub1) - 2x(sub2) + x(sub3) =...
  16. J

    Desperate for love and affection- converting a parametric equation to Cartesian

    Homework Statement Give a Cartesian equation of the given hyperplane The plane passing through (1,2,2) and orthogonal to the line x = (5,1,-1) + t(-1,1,-1)Homework Equations The Attempt at a Solution So I've looked at this for a few hours and still can't figure out how to do it. It's supposed...
  17. H

    What is the difference between a Cartesian Product and a Direct Sum

    Homework Statement 17. Let U = f(x; y; 0) : x 2 R; y 2 Rg, E1 = f(x; 0; 0) : x 2 Rg, and E3 = f(0; 0; x) : x 2 Rg: Are the following assertions true or false? Explain. (a) U + E1 is a subspace of R3: (b) U  E1 is a direct sum decomposition of U + E1: (c) U  E3 is a direct sum...
  18. L

    How Do I Convert Polar Functions to Cartesian Functions?

    I'm having issues getting converting Polar functions to Cartesian functions. Take for example: rcos(\theta)=1 I just figured that since it was going to always equal the same thing, and because x=rcos(\theta) that the Cartesian equation was x=1, and I was right. However logic fails...
  19. 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...
  20. 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...
  21. 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...
  22. P

    Vector Problem involving Cartesian plane

    My main issue is trying to understand the question being asked (is it asking for the magnitude of the resultant vector for speed?) Homework Statement Particle 1 is moving on the x-axis with an acceleration of 5.00 m/s^2 in the positive x- direction. Particle 2 is moving on the y- axis with...
  23. M

    Expressing cartesian curves in polar form

    Express the following in cartesian curves in polar form i) 4x-5y=2 Not sure how to do this ii) (x-3)^2+(y-4)^2=25 r=9cos16(theta) Is this correct ? Any help would be great
  24. 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}...
  25. P

    Draw diagrams in th plane of Cartesian products

    Homework Statement In the attachments, you will see the problem and my answer. Is my answer correct?
  26. D

    Equivalence relation on the Cartesian plane

    Homework Statement A relation p is defined on R^2 (fancy R, as in Reals) by (a,b)p (c,d) if a+d=b+c Show that p is an equivalence relation. b) Consider R^2 to be the Cartesian Plane. Describe p's equivalence classes geometrically. (Consider which points will be in the particular...
  27. S

    Differential Cartesian Coordinates Into Cylindrical Coordinates

    Has to convert B6-1 into B6-2 Source Transport Phenomenon 2nd ed -
  28. J

    Cartesian product of R^n and R^m

    This is going to be a weird question, but in textbooks when we're given the two spaces R^n and R^m, and they say something about R^(n+m), then are they referring to ordered pairs of ordered pairs? That is, if x is in R^n and y is in R^m, then R^(n+m) is the set of all ordered pairs (x,y). So for...
  29. K

    Representation of angular momentum matrix in Cartesian and spherical basis

    The two sets of matrices: {G_1} = i\hbar \left( {\begin{array}{*{20}{c}} 0 & 0 & 0 \\ 0 & 0 & { - 1} \\ 0 & 1 & 0 \\ \end{array}} \right){\rm{ }}{G_2} = i\hbar \left( {\begin{array}{*{20}{c}} 0 & 0 & 1 \\ 0 & 0 & 0 \\ { - 1} & 0 & 0 \\ \end{array}} \right){\rm{...
  30. S

    Determining the cartesian equations

    Homework Statement determine the cartesian equation of the plane that contains the following lines: L1: r= (4,4,5) + t(5,-4,6) L2: r= (4,4,5) + s(2,-3,-4) Homework Equations I kno I'm supposed to use the equation Ax + By + Cz + D. but i don't know how to use it with this type of...
  31. 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...
  32. C

    Cartesian components of ellipsoid's gravity field - looking for info

    I'm posting here, in the math forum, because my question is about handling the math of the problem. On my website there are a number of simulations (in the form of Java applets), and among them is a http://www.cleonis.nl/physics/ejs/ballistics_simulation.php" . The ballistics simulation is...
  33. A

    Finding the Cartesian Equation of a Plane for Vectors Exam Prep

    Homework Statement Write the Cartesian equation for the plane containing the point (2,-1,8) and perpendicular to the line [x,y,z] = [1,-2,-3] + s[5,-4,7]. The Attempt at a Solution The situation is that I have my Calc. + Vectors exam tomorrow morning and I'm just going through some...
  34. E

    Double Integral - Going from Cartesian to Polar

    Homework Statement See attachment. Change the Cartesian integral into an equivalent polar integral, then evaluate the integral. I have no problems at all converting the actual function I am integrating or the integration itself, it is just the limits I cannot do. I've posted two...
  35. F

    Why does the Cartesian diver sink when the bottle is turned upside down?

    Hi, I follow the instruction in wikipedia to make a Cartesian diver (Coca Cola bottle + eyedropper), and it works well. I press the bottle, the eyedropper sinks; I release, it floats. However, if I turn the bottle upside down, the eyedropper sinks and it never floats again. That means the...
  36. Q

    Proving vector identities using Cartesian tensor notation

    Homework Statement 1. Establish the vector identity \nabla . (B x A) = (\nabla x A).B - A.(\nabla x B) 2. Calculate the partial derivative with respect to x_{k} of the quadratic form A_{rs}x_{r}x_{s} with the A_{rs} all constant, i.e. calculate A_{rs}x_{r}x_{s,k} Homework Equations The...
  37. P

    Conversion from cartesian to fractional coordinates

    Hi all, I have been trying to write code to convert from cartesian to fractional coordinates. I think everything is correct in my code (i have used wikipedia as reference - http://en.wikipedia.org/wiki/Fractional_coordinates), but still, the code doesn't work for some test values. The code is...
  38. F

    Convert Cartesian To Cylindrical Limits

    Homework Statement Hi I am converting from Cartesian co-ordinates to cylindrical co-ordinates systems and can do the conversion fine, but am unsure about how to convert the limits. Q) Region V is given in Cartesian by: F(x,y,z) = xi+yj+z(x^{2}+y^{2})k Where x^{2}+y^{2} \leq 1...
  39. I

    Check my proof for cartesian product (set theory)

    Homework Statement Prove that \forall sets A, B, C , if B\subseteq C, then A \times B \subseteq A \times CHomework Equations The Attempt at a Solution Haven't done set theory proofs in a while. Does this suffice in proving the statement?: Let x \in B be arbitrary. Assuming B \subseteq C...
  40. S

    Finding the Second Force and Angle in Cartesian Vector Calculus

    Homework Statement Two forces act on an object at an angle of 50°. One force is 150 N. The resultant force is 200 N. Find the second force and the angle that it makes with the resultant, using only cartesian vectors. Homework Equations The Attempt at a Solution Over here, I am very confused...
  41. S

    Prove Midpoints of Quadrilateral Form Parallelogram

    Homework Statement Use Cartesian vectors in two-space to prove that the line segments joining midpoints of the consecutive sides of a quadrilateral form a parallelogram. Homework Equations We could say vectors a and b a = [a1, a2] b = [b1, b2] The Attempt at a Solution Am...
  42. M

    Transform flow around a cylinder to cartesian

    Homework Statement A flow field is considered to be steady two-dimensional and can be described by the following velocity components in the xy- or r\theta-plane at the front half of the cylinder: u_r=V\cos\theta\left(1-\frac{a^2}{r^2}\right)...
  43. F

    Finding the Cartesian Equation of a Perpendicular Line

    Homework Statement Find the vector equation of the line that passes through the point Q(2,0,-5) and is perpendicular to both the vectors m=(0,1,4) and n=(-2,-1,3). Homework Equations vector equation of a line: (x, y, z)=(x0,y0,z0) + t(a,b,c) cartesian equation of a line...
  44. K

    Possible to derive Lat and Lon or Cartesian X,Y,Z from Azimuth and Elevation?

    Homework Statement Is there a univeral conversion formulae to convert Azimuth and Elevation to Lat Lon or Cartesian X,Y,Z? Homework Equations So far, I have only been able to source out and successfully convert Cartesian X,Y,Z to Lat Long Alt. The Attempt at a Solution No findings...
  45. K

    Does cartesian velocity contribute to Lat Long conversion?

    We understand that Lat Long Alt can be derived from 3D Cartesian (X,Y,Z) but does a 5D Cartesian (X, Y, Z, Vx, Vy) does the extra mile to provide a more precise conversion to Lat Long Alt with the additional velocity data?
  46. Y

    Cartesian scalar equation of plane

    Just wanted to confirm. Cartesian scalar equation of plane refers to equation of plane right? As in Ax+By+Cz=D. which i think is the vector equation of a plane. I'm getting confused and need clarification thank you edit= ok sorry.. i think i got it figured out =p scalar is there because...
  47. S

    How to convert a Cartesian vector to polar coordinates and differentiate it?

    Hi I pretty much can't get past the first chapter in my physics book until I master the vector representation of polar coordinates. Every explanation I've read thus far has confused me, I keep thinking in Cartesian terms so I think it'd be great to convert a vector equation from cartesian to...
  48. fluidistic

    Show the Solution to a Cartesian Oval Homework Problem

    Homework Statement See the picture for the situation of the problem. I'm told that any ray starting from S and getting through the "Cartesian Oval" reach point P. I must show that the equation of the interface curve is l_0n_1+l_i n_2=K where K is a constant. So far I've showed that...
  49. C

    How to Express Null(A) in Cartesian Form?

    Hi there, just a pretty straight forward query I need cleared up... If a question asks for the null space of A in cartesian form how do I set it out? This is what I've got: X = ( -2; 1; 1)*x3 for all values of x3 Therefore, Null(A) corresponds geometrically to the line through the...
  50. M

    Relation between force in cartesian, polar.

    Goldstein(3rd) 1.15 Generalized potential, U as follows. U( \stackrel{\rightarrow}{r} ,\stackrel{\rightarrow}{v})=V(r)+\sigma\cdot L L is angular momentum and \sigma is a fixed vector. (b) show thate the component of the forces in the two coordinate systems(cartesin, spherical...
Back
Top