Find out the location (x, 0) where the potential V becomes zero in the x-axis. There is such a point other than infinitely-far-way places. ((Please explain conceptually rather than just solving for the equation, i'm really trying to understand it!))
Find out the location (x, 0) where the potential V becomes zero in the x-axis. There...
Repeat the above problems in case of one charge -0 located at (, y) - (-a, 0) and the other charge +20 located at (ta, 0). a) Find the potential Vat (x, y)- (0, 0). (Assume V0 at infinitely-far-way places.) b) Find the potential V at point P (0, +a). o) Find out the location (ar, 0) where the potential V becomes zero in the x-axis. There is such a point other than infinitely-far-way place d) What is the total...
Two point charges are located as shown below. One has charge +40 and located at (x, y)-(-a, 0). The other has charge-Q and located at (ta, 0). a) b) c) Find the potential Vat (x, y) (0, 0). (Assume V- 0 at infinitely-far-way places.) Find the potential V at point P-(0, +a). Find out the location (x, 0) where the potential V becomes zero in the x-axis. There is such a point other than infinitely-far-way places d) What is the...
' the charge changed, so remember to do it based on what is listed in the question and not the picture. P (0, +a) +4Q -Q -a 2 weekend Homework #1 Repeat the above problems in case of one charge -Q located at (x, y) - (-a, 0 and the other charge +20 located at (ta, 0) Find the potential V at (x. У)-(0, 0). (Assume V-0 at infinitely-far-way places.) Find the potential V at point P= (0,ta) Find out...
e) Find the electric Field vector at point (0, +a) (Calculate the magnitude, and draw the vector.) f Sketch the electric field lines. g) Find the electric Field at (x, 0) for「a. h) Find out the location (x, y) where the electric Field E becomes zero. (Hint: Use the solution of e).) +4Q -Q
e) Find the electric Field vector at point (0, +a) (Calculate the magnitude, and draw the vector.) f Sketch the electric field lines. g) Find the electric Field at (x, 0) for「a. h) Find out the location (x, y) where the electric Field E becomes zero. (Hint: Use the solution of e).) +4Q -Q
4. Charges on x-axis produce an electric potential V(x) = 450x2 along the x-axis, where x is in meters and V is in volts. A particle of charge q 60 nC and mass m = - 1.5 g moves in this potential with turning points at +8.0 cm. (a) What is the total energy of the particle in this potential? (b) What is the speed of the particle at x = 3.0 cm? (c) What is the magnitude and direction...
Suppose a particle has zero potential energy for x < 0, a constant value V, for 0 ≤ x ≤ L, and then zero for x > L. Sketch the potential. Now suppose that wavefunction is a sine wave on the left of the barrier, declines exponentially inside the barrier, and then becomes a sine wave on the right, being continuous everywhere. Sketch the wavefunction on your sketch of the potential energy.
Suppose a particle has zero potential energy for x < 0, a constant value V, for 0 ≤ x ≤ L, and then zero for x > L. Sketch the potential. Now suppose that wavefunction is a sine wave on the left of the barrier, declines exponentially inside the barrier, and then becomes a sine wave on the right, being continuous everywhere. Sketch the wavefunction on your sketch of the potential energy.