Answer:
0.405 V
Explanation:
Using Faraday-Lenz law, the emf induced in the coil is given by
[tex]\epsilon=-\frac{\Delta \Phi}{\Delta t}[/tex]
where
[tex]\Delta \Phi[/tex] is the change in flux linkage through the coil
[tex]\Delta t = 8.0 s[/tex]
is the time interval
The change in flux linkage can be written as
[tex]\Delta \phi = NA(B_f - B_i)[/tex]
where
N = 200 is the number of turns
[tex]A=(18 cm)^2 = (0.18 m)^2=0.0324 m^2[/tex] is the area of the squared loop
Bi = 0.50 T is the initial magnetic flux density
Bf = 0.00 T is the final magnetic flux density
Substituting everything into the first equation, we find
[tex]\epsilon=-\frac{(200)(0.0324)(0.00-0.50}{8.0}=0.405 V[/tex]
