Answer:
a. 0
b. 8.4N/C
c. 5.04N/C
d. 3.6 N/C
e. 1.8N/C
Explanation:
The following data are given
inner cylindrical radius,r=5cm
outer cylindrical radius R=8cm
Charge density,p=7pc/m
radius of rod= 1cm
a. at distance 0.5cm from the center of the rod, this point falls on the rod itself and since the charge spread out on the surface of the rod, there wont be any electric field inside the rod itself
Hence E=0 at 0.5cm
b. at 1.5cm i.e 0.015m
the electric field is expressed as
[tex]E=\frac{2*charge density}{4\pi E_{0}r}\\E=\frac{2*7*10^{-12} *9*10^{9}}{0.015}\\E=8.4N/C[/tex]
The direction of the field depends on the charge on the rod
c. at 2.5cm i.e 0.025m
the electric field is expressed as
[tex]E=\frac{2*charge density}{4\pi E_{0}r}\\E=\frac{2*7*10^{-12} *9*10^{9}}{0.025}\\E=5.04N/C[/tex]
The direction of the field depends on the charge on the rod
d. at 3.5cm i.e 0.035m this point is still within the rod and the inner cylinder
the electric field is expressed as
[tex]E=\frac{2*charge density}{4\pi E_{0}r}\\E=\frac{2*7*10^{-12} *9*10^{9}}{0.035}\\E=3.6N/C[/tex]
The direction of the field depends on the charge on the rod
e. at 7cm which is a point outside the rod and the cylinder, the electric field is
[tex]E=\frac{2*charge density}{4\pi E_{0}r}\\E=\frac{2*7*10^{-12} *9*10^{9}}{0.07}\\E=1.8N/C[/tex]
The direction of the field depends on the charge on the rod
