Answer:
Current in outer circle will be 15.826 A
Explanation:
We have given number of turns in inner coil [tex]N_I=170[/tex]
Radius of inner circle [tex]r_i=0.0095m[/tex]
Current in the inner circle [tex]I_i=8.9A[/tex]
Number of turns in outer circle [tex]N_o=150[/tex]
Radius of outer circle [tex]r_o=0.015m[/tex]
We have to find the current in outer circle so that net magnetic field will zero
For net magnetic field current must be in opposite direction as in inner circle
We know that magnetic field is given due to circular coil is given by
[tex]B=\frac{N\mu _0I}{2r}[/tex]
For net magnetic field zero
[tex]\frac{N_I\mu _0I_I}{2r_I}=\frac{N_O\mu _0I_0}{2r_O}[/tex]
So [tex]\frac{170\times \mu _0\times 8.9}{2\times 0.0095}=\frac{150\times \mu _0I_O}{2\times 0.015}[/tex]
[tex]I_O=15.92A[/tex]
