Answer:
Explanation:
Given that
A ring of radius 15cm
r=0.15m
A charge of Q=3.5×10^-12C
Angular velocity is given as
w=17rad/s
Power is given as
P=IV, Electrical power
And the rate of charge I is given as
I=Q/t
Also, the potential difference V, for a point charge is given as
V=kQ/r
Therefore, power can be rewritten as
P=IV
P=(Q/t) × (kQ/r)
P=kQ²/tr
Note, t is the period and is given as
w=2πf
Then, f=1/t
w=2π/t,
So, 1/t=w/2π
P=kQ²/tr
P=(kQ²/r)(1/t) = (kQ²/r)(w/2π)
P=(kQ²/r)(w/2π)
K is a constant and it value is 9×10^9Nm²/C²
P=(9×10^9×3.5×10^-12×3.5×10^-12)(17/2π)
P=1.1025×10^-13×17/2π
P=2.98×10^-13 Watts
Given Information:
Radius = r = 15 cm = 0.15 m
Charge = q = 3.5x10⁻¹² C
Angular velocity = ω = 17 rad/s
Required Information:
Power radiated = P = ?
Answer:
Power radiated = 1.987x10⁻¹² W
Explanation:
We know that power is given by
P = VI
Where V is the potential due to charge and is given by
V = kq/r
Where k is the coulomb constant 8.98x10⁹ N.m²/C²
V = (8.98x10⁹*3.5x10⁻¹²)/0.15
V = 0.2095 V
we know that the rate of charge flow is current
I = q/t
where t is found by the relation
ω = 2π/t
t = 2π/ω
t = 2π/17
t = 0.369 s
so current is
I = q/t = 3.5x10⁻¹²/0.369
I = 9.485x10⁻¹² A
Therefore, the amount of power radiated is
P =VI
P = 0.2095*9.485x10⁻¹²
P = 1.987x10⁻¹² W
