What is Spherical coordinates: Definition and 351 Discussions

In mathematics, a spherical coordinate system is a coordinate system for three-dimensional space where the position of a point is specified by three numbers: the radial distance of that point from a fixed origin, its polar angle measured from a fixed zenith direction, and the azimuthal angle of its orthogonal projection on a reference plane that passes through the origin and is orthogonal to the zenith, measured from a fixed reference direction on that plane. It can be seen as the three-dimensional version of the polar coordinate system.
The radial distance is also called the radius or radial coordinate. The polar angle may be called colatitude, zenith angle, normal angle, or inclination angle.
The use of symbols and the order of the coordinates differs among sources and disciplines. This article will use the ISO convention frequently encountered in physics:



(
r
,
θ
,
φ
)


{\displaystyle (r,\theta ,\varphi )}
gives the radial distance, polar angle, and azimuthal angle. In many mathematics books,



(
ρ
,
θ
,
φ
)


{\displaystyle (\rho ,\theta ,\varphi )}
or



(
r
,
θ
,
φ
)


{\displaystyle (r,\theta ,\varphi )}
gives the radial distance, azimuthal angle, and polar angle, switching the meanings of θ and φ. Other conventions are also used, such as r for radius from the z-axis, so great care needs to be taken to check the meaning of the symbols.
According to the conventions of geographical coordinate systems, positions are measured by latitude, longitude, and height (altitude). There are a number of celestial coordinate systems based on different fundamental planes and with different terms for the various coordinates. The spherical coordinate systems used in mathematics normally use radians rather than degrees and measure the azimuthal angle counterclockwise from the x-axis to the y-axis rather than clockwise from north (0°) to east (+90°) like the horizontal coordinate system. The polar angle is often replaced by the elevation angle measured from the reference plane, so that the elevation angle of zero is at the horizon.
The spherical coordinate system generalizes the two-dimensional polar coordinate system. It can also be extended to higher-dimensional spaces and is then referred to as a hyperspherical coordinate system.

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

    Want to clarify polar, spherical coordinates.

    I am always a little confuse in polar, cylindrical and spherical coordinates in vector calculus vs cylinderical and spherical coordinates in vector fields used in Electromagnetics. I want to clarify what my finding and feel free to correct me and add to it. A) Vector calculus: We use x =...
  2. A

    Random walk in spherical coordinates

    Hi, I'm modeling receptors moving along a cell surface that interact with proteins inside of a cell. I figured it would be easier to model the receptors in spherical coordinates, however I'm unsure of how to model a random walk. In cartesian coordinates, I basically model a step as: x = x +...
  3. B

    The p-slash operator in spherical coordinates

    Homework Statement You know the p-slash operator in Cartesian coordinates: {p_{slash}} = {\gamma _\mu }{p^\mu } = {\gamma _0}{p_0} - \vec \gamma \bullet {\bf{\vec p}} ...but what is p-slash operator in spherical coordinates? Homework Equations - spherical coordinate transformation...
  4. beowulf.geata

    Changing order of integration in spherical coordinates

    Homework Statement Let D be the region bounded below by the plane z=0, above by the sphere x^2+y^2+z^2=4, and on the sides by the cylinder x^2+y^2=1. Set up the triple integral in spherical coordinates that gives the volume of D using the order of integration dφdρdθ.Homework Equations The...
  5. M

    Understanding Spherical Coordinates and Their Range

    Homework Statement I am confused about spherical coordinates stuff. For example, we can parametrize a sphere of radius 3 by x = 3 sin \phi cos \theta y = 3 sin \phi sin \theta z = 3cos\phi where 0 \le \theta \le 2 \pi and 0 \le \phi \le \pi . I don't understand about the range...
  6. F

    How Does the Volume Element Change in Spherical Coordinates?

    Say I have a solid given using polar coordinates I want to compute its volume. We know that when switching from cartesian to polar, dV becomes \rho^{2}\sin\phi d\rho d\theta d\phi But I am not converting from cartesian to polar, I am already in polar coordinates. do I still have to...
  7. B

    Divergence in spherical coordinates

    I am stuck on this problem. Use these equations: \textbf{v}(\textbf{r}) = f(r)\textbf{r} \frac{\partial r}{\partial x} = \frac{x}{r} And the chain rule for differentiation, show that: (\nabla\cdot\textbf{v}) = 2f(r) + r\frac{df}{dr} (cylindrical coordinates) Any help greatly...
  8. Shackleford

    Deriving gradient in spherical coordinates

    I looked at my notes, but they're either incomplete or I simply forgot what the professor did to derive the gradient in spherical coordinates. Once I know that, deriving the divergence and curl given the supplementary equations listed is fairly straightforward. It was a little easier but...
  9. V

    Triple Integral with Spherical Coordinates

    Homework Statement Evaluate \int\int\int 1/\sqrt{x^{2}+y^{2}+z^{2}+3} over boundary B, where B is the ball of radius 2 centered at the origin. Homework Equations Using spherical coordinates: x=psin\Phicos\Theta y=psin\Phisin\Theta z=pcos\Phi Integral limits: dp - [0,2] d\Phi -...
  10. S

    How do I Find \nabla in Spherical Coordinates?

    How do I find \nabla in Spherical Coordinates. Please help.
  11. T

    The volume of a solid using spherical coordinates

    Homework Statement using spherical coordinates find the volume of the solid outside the cone z^2=x^2+y^2 and inside the sphere x^2+y^2+z^2=2 Homework Equations ρ=x+y+z ρ^2=x^2+y^2+z^2 dρdφdθ The Attempt at a Solution im lost
  12. C

    Moment of inertia about z-axis in spherical coordinates

    Homework Statement Use spherical coordinates to find the moment of inertia about the z-axis of a solid of uniform density bounded by the hemisphere \rho=cos\varphi, \pi/4\leq\varphi\leq\pi/2, and the cone \varphi=4. Homework Equations I_{z} = \int\int\int(x^{2}+y^{2})\rho(x, y, z) dV...
  13. K

    Translation in Spherical Coordinates

    Hello, this one is doing my head in. I'm trying to plot and play with wavefunctions by moving the originm, but i need to do it in spherical coordinates. Suppose i have a function G(r',theta',phi'), centered at the origin of the system r',theta',phi'. I also have a similar...
  14. T

    Del operator in spherical coordinates

    Homework Statement Write the del operator in spherical coordinates? Homework Equations I wrote the spherical unit vectors: \hat{r}=sin\theta.cos\phi.\hat{x}+sin\theta.sin\phi.\hat{y}+cos\theta.\hat{z} \hat{\phi}=-sin\phi.\hat{x}+cos\phi.\hat{y}...
  15. C

    Setting up a triple integral using cylindrical & spherical coordinates

    Homework Statement Inside the sphere x2 + y2 + z2 = R2 and between the planes z = \frac{R}{2} and z = R. Show in cylindrical and spherical coordinates. Homework Equations \iiint\limits_Gr\,dz\,dr\,d\theta \iiint\limits_G\rho^{2}sin\,\theta\,d\rho\,d\phi\,d\theta The Attempt at a...
  16. E

    Vectors in spherical coordinates

    Hi! I'm studying the selection rules and the spectrum of one-electron atoms. In the textbook it is said: "It is convenient to introduce the spherical components of the vector \epsilon which are given in terms of its Cartesian components by: \epsilon_1=-\frac{1}{\sqrt2}(\epsilon_x+i\epsilon_y)...
  17. P

    Evaluating Integral with Spherical Coordinates Using 4-Vectors

    I want to evaluate the following integral: I(p_{1}, p_{2}, p_{3}) = \int \mathrm{d}^{4} q \mathrm{d}^{4}p \, \dfrac{1}{\left[ p_{2} + q \right]^{2} - i0} \dfrac{1}{\left[ p_{1} - q - p \right]^{2} + i0} \Theta(q^{0}) \delta(q^{2}) \Theta(-p_{2}^{0} -p_{3}^{0} - q^{0} -p^{0})...
  18. N

    Cant understand integral tranasition to spherical coordinates

    there is a function \Psi =\frac{c}{\sqrt{r}}e^{\frac{-r}{b}} find the probaility in \frac{b}{2}<r<\frac{3b}{2}\\ region the rule states \int_{-\infty}^{+\infty}|\Psi|^2dv=1\\ 1=\int_{-\infty}^{+\infty}|\frac{c}{\sqrt{r}}e^{\frac{-r}{b}}|^2dv then they develop it as...
  19. D

    Triple Integral in Rectangular Coordinates Converting to Spherical Coordinates

    Homework Statement Given that: Write an equivalent integral in spherical coordinates. Homework Equations (Triple integral in spherical coordinates.) (Conversions from rectangular to spherical coordinates.)(What spherical coordinates entail) The Attempt at a Solution The region...
  20. Oddbio

    Solving for Spherical Coordinates: Derivatives and Equations Explained

    Here is a small screenshot of something I'm reading: http://img262.imageshack.us/img262/3585/sphericalcoords.png The first six equations are ok. (I don't think anyone actually needs the figure right? It's just general spherical coordinates). φ is the angle in the x-y plane. I get how the...
  21. K

    Finding the Volume of a tetrahedron using Spherical Coordinates

    Find the volume of a tetrahedron under a plane with equation 3x + 2y + z = 6 and in the first octant. Use spherical coordinates only. The answer is six. x=psin(phi)cos(theta) y=psin(phi)sin(theta) z=pcos(phi) I've been trying to figure out the boundaries of this particular...
  22. J

    Spherical coordinates rewrite help

    Homework Statement Let f(x,y,z) be a continuous function. To rewrite f(x,y,z) as a function of spherical coordinates, the conversion x-rcos(\theta), y=rsin(\theta), and z=rcos(\varphi). Suppose S is a region in 3 dimensions. How would you rewrite _{\int\int\int}s f(x,y,z)dV as the integral of a...
  23. T

    Distance between 2 points in spherical coordinates

    Hello people, I'm creating an algorithm on Matlab and need to find the distance between two points in spherical coordinates where I have (r1,theta1,phi1) for the first point and (r2,theta2,phi2) for the second point. Of course, since I'm programming, I shouldn't use the dummy Cartesian...
  24. I

    Calculating Vector \overline{G} in Spherical Coordinates at Point (3,2,6)

    I can't muster my mind around this. Can you actually plot this vector on a graph at the point? The vector only specifies a length with no direction.
  25. A

    Weird singularities/cylindrical & spherical coordinates

    If you consider the vector function (expressed in cylindrical coordinates) \frac{1}{\rho} \hat{\phi} where \rho = \sqrt{x^2+y^2}, you notice it has a singularity at the origin ONLY. But if you express this in spherical coordinates, what you get is \frac{1}{r\sin \theta} \hat{\phi}, which is...
  26. R

    D/dx in Spherical Coordinates: What am I Missing?

    Homework Statement Hi. I have a simple question. Is it true that \frac{\partial r}{\partial x} = (\frac{\partial x}{\partial r})^{-1} ? Because I'm having some trouble with the conversion between rectangular and spherical coordinates. Homework Equations x = r cos \phi sin \theta...
  27. M

    Cylindrical vs. spherical coordinates

    Hi everyone! There's a question bothering me about the two coordinate systems - cylindrical and spherical: Consider the two systems, i.e. (r, \theta, \phi)\rightarrow\left(\begin{array}{c}r\sin\theta\cos\phi\\r\sin\theta\sin\phi\\r\cos\theta\end{array}\right) and...
  28. D

    Spherical coordinates surface integral

    Hi. I have this integral \int_0^{2\pi}\int_0^\pi \mathbf A\cdot\hat r d\theta d\phi where \hat r is the position unit vector in spherical coordinates and \mathbf A is a constant vector. Is it possible to evaluate this integral without calculating the dot product explicitly, i.e. without...
  29. Y

    Spherical coordinates equation

    Homework Statement Identify surface whose equation in spherical coordinates is given p = sin(theta)*sin(fi) The Attempt at a Solution I know that y = r*sin(theta)*sin(fi). and thus, y = rp. This yields y = (x2 + y2)0.5*(x2 + y2+z2)0.5 However, this is rather ugly. The answer is...
  30. J

    Find Volume of Sphere using Spherical Coordinates

    Homework Statement Using Spherical coordinates, find the volume of the solid enclosed by the sphere x^2 + y^2 + z^2 = 4a^2 and the planes z = 0 and z = a. Homework Equations I have the solutions to this problem, and it is done by integrating two parts: V = V_{R=const.} + V_{z = const.} The...
  31. S

    Unit vectors in Spherical Coordinates

    Does anyone know a good sight that explains, step-by-step, how to derive unit vectors in spherical coordinates? I am at that unfortunate place where I have been looking at it for so long I know the answer from sheer memorization, but don't understand the derivation. From the definitions I am...
  32. C

    Surface integral in spherical coordinates question

    Homework Statement Find the surface area of the portion of the sphere x^2 + y^2 + z^2 = 3c^2 within the paraboloid 2cz = x^2 + y^2 using spherical coordinates. (c is a constant)Homework Equations The Attempt at a Solution I converted all the x's to \rho sin\phi cos\theta, y's to \rho sin\phi...
  33. H

    Workspace Volume in Spherical Coordinates

    Hey all, I'm having trouble calculating a "workspace" volume. The volume is easiest modeled by using spherical co-ordinates, and is defined by these boundaries: (assume variables r, theta, phi) \rho: 1 to 1.1 meters \theta: 0.05 radians \phi: 0.1 radians Here's how I've set up my...
  34. Matterwave

    Angle in Spherical coordinates

    I have to proove something in QM but I'm stuck on a bit of math. Say I have two vectors: \vec{a} = (r_a,\theta_a,\phi_a) and \vec{b} = (r_b,\theta_b,\phi_b) What is the cosine of the angle between them? If my proof is to work the cosine of the angle between them have to be...
  35. G

    Spherical coordinates, angle question

    Hey guys, Im trying to figure out how the angles for the following sphere are obtained. x^{2} + y^{2} + z^{2} = 4, y = x, y = \sqrt[]{3}x, z = 0 I understand that the integral is: \int_{0}^{\pi/2}\int_{\pi/4}^{?}\int_{0}^{2} However, I can't not see how the "?" interval is...
  36. M

    Spherical Coordinates Conversion and Region Analysis

    After converting a surface over the region that \rho=sin\phicos\theta/a + sin\phisin\theta/b + cos\phi/c I also have that this region is equal to 1. I can't seem to get anywhere..
  37. T

    Converting Rectangular to Spherical Iterated Integrals | Help Needed

    Hi everyone, I am REALLY confused and lost on where about to begin a conversion of a rectangular iterated integral to a spherical iterated integral. Can someone kind of guide me through on what to do first? Like for example, I drew the initial iterated integral in both 2d and 3d...
  38. T

    Spherical Coordinates: Integrating a Hemisphere/Paraboloid

    Homework Statement The outermost integral is: -2 to 2, dx The middle integral is: -sqrt(4-x^2) to sqrt(4-x^2), dy The inner most integral is: x^+y^2 to 4, dz The attempt at a solution Drawing the dydx in a simple 2d (xy) plane, it is circular with a radius of 2. So...
  39. D

    Cross Product in Spherical Coordinates - Getting conflicting oppinions

    Hey all, I really need some clarification here. I've seen problems dealing with the Angular Momentum of a particle, working in spherical coordinates. Wolfram says that there is no simple way to perform this and do the determinant, and you will find many people and other websites claiming...
  40. C

    Find the volume of a cone using spherical coordinates

    Find the volume of the portion of cone z^2 = x^2 + y^2 bounded by the planes z = 1 and z = 2 using spherical coordinates I am having trouble coming up with the limits Relevant equations dV = r^2*sin(theta)*dr*d(theta)*d(phi) r = sqrt(x^2+y^2+z^2) the problem is actually 2...
  41. P

    Radial component of del^2 in spherical coordinates? (again)

    I'm doing a question on a 3D isotropic harmonic oscillator. At one point I need to find write the radial component of del^2. Lecturer has written \frac{1}{r^{2}} \frac{d}{dr} \left( r^{2} \frac{d}{dr} \right) where the del^2 used to be in the set of equations...
  42. P

    Radial component of del^2 in spherical coordinates?

    I'm doing a question on a 3D isotropic harmonic oscillator. At one point I need to find write the radial component of del^2. The lecturer has written 1/r^2 * d/dr * (r^2 * d/dr) I don't understand cause it looks like he hasn't actually changed anything, r^2 over r^2 ?
  43. O

    Need help setting up triple integral in spherical coordinates

    Homework Statement Use spherical coordinates to find the volume of the solid bounded above by the sphere with radius 4 and below by the cone z=(x^2 + y^2)^(1/2).Homework Equations All general spherical conversions Cone should be \phi=\pi/4The Attempt at a Solution So far I think the triple...
  44. B

    Wave Function Spherical Coordinates Probabilities

    Homework Statement A system's wave function has the form \psi(r, \theta, \phi) = f(t, \theta)cos\phi With what probability will measurement of L_z yield the value m = 1? Homework Equations L_z|\ell, m> = m|\ell, m> The Attempt at a Solution I feel like there may be a typo...
  45. S

    Finding Mass and Center of Mass in a Solid Hemisphere

    Homework Statement Use Spherical Coordinates. Let H be a solid hemisphere of radius a whose density at any point is proportional to its distance from the center of the base. a) Find the mass of H. b) Find the center of mass of H. Homework Equations M=\int\int_D\int\delta dV...
  46. X

    Very difficult kinematics problem involving spherical coordinates

    Homework Statement A satellite is in motion over the Earth. The Earth is modeled as a sphere of radius R that rotates with constant angular velocity "\Omega" in the direction of Ez, where Ez, lies in the direction from the center of the Earth to the North Pole of the Earth at point N. The...
  47. D

    Describing a Solid in Spherical Coordinates

    Homework Statement A solid lies above the cone z=\sqrt{x^2+z^2} and below the sphere x^2+y^2+z^2=z. Describe the solid in terms of inequalities involving spherical coordinates.Homework Equations In spherical coordinates, x=\rho\sin\phi\cos\theta, y=\rho\sin\phi\sin\theta, and z=\rho\cos\phiThe...
  48. H

    Difference between Two Vectors, Spherical Coordinates

    Homework Statement I'm doing a problem that involves expressing, for two arbitrary vectors \vec{x} and \vec{x'}, |\vec{x}-\vec{x'}| in spherical coordinates (\rho,\theta,\phi). Homework Equations Law of Cosines: c^{2}=a^{2}+b^{2}-2ab\cos\gamma where \gamma is the angle between a and b...
  49. Saladsamurai

    Triple Integral Spherical Coordinates?

    I don't think so since it's not a sphere (disk). I have not learned about cylindrical coordinates and Cartesian is just a pain, so I am assuming I am supposed to use polar or something. Can someone clear up my confusion? \int\int\int_E y\,dV where E lies above the plane z=0, under the plane...
  50. Philosophaie

    Sphere in Spherical Coordinates

    Looking for the equation in spherical coordinates and the spherical equation with the unit vectors: Frr + FӨӨ + FØØ = constant The equation is: x^2 + y^2 + z^2 = r^2 is the equation for a sphere radius = r centered at the origin. What is the cartesian equation? x*x + y*y + z*z = r...
Back
Top