In: Physics
Two positive charges of 1.1e-10 C are placed on the x axis at distances +30 cm and -30 cm from the origin, respectively. A third positive charge of 2e-11 C can be moved along the y axis. At what value of y is the electrostatic force on the third charge is maximal?
Let's call the two stationary charges q, and the other charge Q.
Call the distance from q to the origin L.
Now for any point on the y-axis y, the force on Q has two
components - one in the x direction and on in the y. But by the
symmetry of the problem, the force in the x direction is always
zero. So we only need to look at the force in y. The magnitude of
the force due to each charge q is:
F = kqQ/r^2. where r = √(y^2 +L^2)
Now the component of force in the y-direction is given by the
cosine angle, a, each force vector makes witht he y-axis and the
magnitude of teh force, F
Fy = kqQ/r^2 cos(a) But cos(a) can be found from the geometry of
the problem
cos(a) = y/sqrt(y^2+L^2) so
Fy = kqQ y/(y^2+L^2)^(3/2)
Since there are two charges q, the total force in y is
Fty = 2*Fy = 2*kqQ y/(y^2+L^2)^(3/2)
Now the maximum force occurs when
dFty/dy = 0 = 2kqQ/(y^2+L^2)^(3/2) - 6kqQ y^2/(y^2+L^2)^(5/2)
0 = 1 - 6y^2/(y^2+L^2) ---> 6y^2 - y^2 - L^2 = 5y^2 - L^2 =
0
y = +/- L/√(5)
y = +/- 60/√5