Answer:
[tex]\epsilon =71.677V[/tex] induced.
Explanation:
We define all our variables,
[tex]B=1.2T[/tex]
[tex]A=0.27m*0.50m[/tex]
[tex]\theta= 90-37[/tex]
[tex]\Delta T= 0.09s[/tex]
[tex]N= 100[/tex]
EMF induced is given through the expression
[tex]\epsilon = \frac{-N\Delta \Phi}{\Delta t}[/tex]
Here we understand [tex]\Phi[/tex] as
[tex]\Phi = BAcos\theta[/tex]
We proceed to calculate the entire Initial Flow as the final, as well
[tex]\Phi_i=(1.2)(0.27*0.5)cos(90-37) = 0.09749Tm^2[/tex]
Final Flow
[tex]\Phi_f=(1.2)(0.27*0.5)= 0.162Tm^2[/tex]
Now, if [tex]\Delta t = 0.09s[/tex],
[tex]\epsilon= (100)(0.162Tm^2 - 0.09749Tm^2)/(0.09s)[/tex]
[tex]\epsilon =71.677V[/tex] induced.
NOTES:
