The figure below shows a circular region of radius R = 0.0227 m which has a spatially constant magnetic field that can be expressed as a function of time as B = bt where b is a positive constant. Find the time at which the energy density of the magnetic field is equal to that of the induced electric field at the perimeter of the circular region. i S OOOO OOOO OOOOOOO
The figure below shows a circular region of radius R = 0.0227 m which has a spatially constant magnetic field that can be expressed as a function of time as B = bt where b is a positive constant. Find the time at which the energy density of the magnetic field is equal to that of the induced electric field at the perimeter of the circular region. i S OOOO OOOO OOOOOOO
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![The figure below shows a circular region of radius R = 0.0227 m which has a spatially constant magnetic
field that can be expressed as a function of time as B = bt where b is a positive constant. Find the time at
which the energy density of the magnetic field is equal to that of the induced electric field at the perimeter of
the circular
region. i
S
OO O
O O
OOOO
OOOO
OO
0 0
OO](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F6e1dcbc3-ab6e-4ff7-99fc-95b576d2b6be%2Fa6225d83-428f-4785-ba89-461f8cee57bc%2Fq2v3nhp_processed.jpeg&w=3840&q=75)
Transcribed Image Text:The figure below shows a circular region of radius R = 0.0227 m which has a spatially constant magnetic
field that can be expressed as a function of time as B = bt where b is a positive constant. Find the time at
which the energy density of the magnetic field is equal to that of the induced electric field at the perimeter of
the circular
region. i
S
OO O
O O
OOOO
OOOO
OO
0 0
OO
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