Answer:
0.0472A or 47.2mA
Step-by-step explanation:
Given
J = 5.00 * 10^8 r²
Radius, R = 3.50mm
Boundary; r = 0.880R and r = R
The question asks for the current through the area bounded by R and 0.880R.
The area can be calculated by the integral below;
∫J.dA {0.880R,R} where dA = r²2πrdr
= ∫j * r²2πr dr
= ∫2πJr³ dr {0.880R,R}
= 2πJ∫r³ dr {0.880R,R}
Integrate...
= 2πJ[r⁴/4] {0.880R,R}
= ½πJ[r⁴] {0.880R,R}
= ½πJ(R⁴ - (0.880R)⁴)
Substitute J = 5.00 * 10^8 r² and, R = 3.50mm
R = 3.5 * 10^-3 m
= ½ * 5.00 * 10^8 * π ((3.5 * 10^-3)⁴ - (0.880 * 3.5 * 10^-3)⁴)
= ½ * π * 5 * 10^8 * 6.01 * 10^-11
= 0.047202429620186
= 0.0472A or 47.2mA
Hence, the current through the outer section bounded by r = 0.880R and r = R is 0.0472A or 47.2mA