Remember to calculate the potential of the spring in "r" coordinates.
Write the Lagrangain for the coordinates in "r" and "zeta"
Write the equation of movements of lagrange in the coordinates "r" and "zeta"
Remember to calculate the potential of the spring in "r" coordinates. Write the Lagrangain for the...
2. (35 points) A pendulum consists of a point mass (m) attached to the end of a spring (massless spring, equilibrium length-Lo and spring constant- k). The other end of the spring is attached to the ceiling. Initially the spring is un-sketched but is making an angle θ° with the vertical, the mass is released from rest, see figure below. Let the instantaneous length of the spring be r. Let the acceleration due to gravity be g celing (a) (10...
#49,53,57
3- lar coordinates to polar coordinates will Polar Coordinates Convert blar coordinates with r> 0 and the ove describe of the the rectangular con 050<27. 37. (-1,1) be app 39. (V8, V8) 41. (3.4) 38. (3V3,-3) 40. (-V6, -V2) 42. (1,-2) 44. (0, -V3) your a (a) Yo (b) YO 43. (-6,0) Rectangular Equations to Polar Equations Convert the equation to polar form. 45. x = y *.47. y = x² 49. x = 4 46. x² + y2...
Solve Laplace's Equation with polar coordinates please
Problem (3pt). In the disk {(r,(): r < 3, 0 < 0 < 2n} find solution (if solution does not exist, explain why) Au=0, Ur|r=3 = 0, u(0) = 0.
Particle in a cylindrically symmetrical potential Let p, o, z be the cylindrical coordinates of a spinless 1. (x = ? coso, y = ? sin ?, p 0, 0 <p < 2?). Assume that the potential en of this particle depends only on , and not on ? and z. Recall that: a. Write, in c ylindrical coordinates, the differential operator associated with the Hamiltonian. Show that H commutes with L, and P. Show fr the wave functions chosen...
Write the vector differential operator "DEL-V in Cartesian coordinates Cylindrical coordinates Spherical coordinates. 2. Show for any "nice" scalar function (x,y,z), the Curl of the gradient of (x,y,z) is Zero.. VxVo = 0 Hint: assume the order of differentiation can be switched 3. Find the volume of a sphere of radius R by integrating the infinitesimal volume element of the sphere. 4. Write Maxwell's equations for the case of electro and magneto statics (the fields do not change in time)...
4. The Lagrangian for the central force problem of a mass m traveling in polar coordinates (0,0) in a cental potential V() is given as L(0,0, , 0, t) = (2 +p202) – V(p). Find the two Lagrange Equations of motion. Find all conserved quan- tities. Find the functions Ap) and B() for the two equations P= A() À = B(e).
1.18. Points P and P' have spherical coordinates (r,0,y) and (r,θ,φ), cylindrical coordinates (p, p, z) and (p',p',z'), and Cartesian coordinates (x, y, z) and (x',y',z'), respectively. Write r - r in all three coordinate systems. Hint: Use Equation 1.2) with a r r and r and r' written in terms of appropriate unit vectors.
Convert the following equation to Cartesian coordinates. Describe the resulting curve. 2 cos0-6 sin 0 r Write the Cartesian equation.
Convert the following equation to Cartesian coordinates. Describe the resulting curve. 2 cos0-6 sin 0 r Write the Cartesian equation.
m₂ >m, Calculate the and write the (There is no for u, and the Lagragean for the system Lagrange motion equations. fretion). (Use the "x"roodnate "y" coordinade for Mo.
2. Potential Inside a Sphere We are interested in the electric potential inside a spherical shell that is radius a and centered on the origin. There are no charges inside the she, so the potential satisfies the Laplace equation, However, there is an external voltage applied to the surface of the shell which holds the potential on the surface to a value which depends on θ: As a result, the potential Ф(r,0) -by symmetry, it does not depend on ф-is...