Complete Question
The complete question is shown on the first uploaded image
Answer:
The maximum emf is [tex]\epsilon_{max}= 26.8 V[/tex]
The emf induced at t = 1.00 s is [tex]\epsilon = 24.1V[/tex]
The maximum rate of change of magnetic flux is [tex]\frac{d \o}{dt}|_{max} =26.8V[/tex]
Explanation:
From the question we are told that
The number of turns is N = 44 turns
The length of the coil is [tex]l = 15.0 cm = \frac{15}{100} = 0.15m[/tex]
The width of the coil is [tex]w = 8.50 cm =\frac{8.50}{100} =0.085 m[/tex]
The magnetic field is [tex]B = 745 \ mT[/tex]
The angular speed is [tex]w = 64.0 rad/s[/tex]
Generally the induced emf is mathematically represented as
[tex]\epsilon = \epsilon_{max} sin (wt)[/tex]
Where [tex]\epsilon_{max}[/tex] is the maximum induced emf and this is mathematically represented as
[tex]\epsilon_{max} = N\ B\ A\ w[/tex]
Where [tex]\o[/tex] is the magnetic flux
N is the number of turns
A is the area of the coil which is mathematically evaluated as
[tex]A = l *w[/tex]
Substituting values
[tex]A = 0.15 * 0.085[/tex]
[tex]= 0.01275m^2[/tex]
substituting values into the equation for maximum induced emf
[tex]\epsilon_{max} = 44* 745 *10^{-3} * 0.01275 * 64.0[/tex]
[tex]\epsilon_{max}= 26.8 V[/tex]
given that the time t = 1.0sec
substituting values into the equation for induced emf [tex]\epsilon = \epsilon_{max} sin (wt)[/tex]
[tex]\epsilon = 26.8 sin (64 * 1)[/tex]
[tex]\epsilon = 24.1V[/tex]
The maximum induced emf can also be represented mathematically as
[tex]\epsilon_{max} = \frac{d \o}{dt}|_{max}[/tex]
Where [tex]\o[/tex] is the magnetic flux and [tex]\frac{d \o}{dt}|_{max}[/tex] is the maximum rate at which magnetic flux changes the value of the maximum rate of change of magnetic flux is
[tex]\frac{d \o}{dt}|_{max} =26.8V[/tex]
