Answer:
194 V/m
Explanation:
In order to find electric field, we can use the formula of power density
i.e Pd = E^2 / Z
where:
Pd = power density in W/m^2
E = electric field strength in V/m
Z = impedance of free space = 120 * π
E = sqrt(Pd * Z) -----> re-arranging it for E
before solving, convert Pd unit into W/m^2 Â
Pd= 5mW/cm^2 = 50 W/m^2 Â Â
Solving for E:
E= sqrt(50 * 120 * π)
E = 137.3 V/m Â
the above value is RMS value
In order to find the peak amplitude of the oscillating field will therefore be 137.3 * sqrt(2) = 194 V/m
Answer:
E_peak = 194 N/C
Explanation:
Given:-
- The Power density Pd = 5.0 mW/cm^2
- The impedance of free space Z_o = 376.73 ohms
Find:-
If microwave radiation outside an oven has the maximum value, what is the amplitude of the oscillating electric field?
Solution:-
- The oscillating electric field strength E root mean squared can be determined by the Power Density formula applied for electromagnetic waves in free space. We have:
                    Pd = E^2_rms / Z_o
                    E_rms = sqrt ( Pd * Z_o )
- Solve for electric field strength E_rms:
                    E_rms = sqrt ( 50 * 376.73 )
                    E _rms= 137.24612 N / C
- The E obtained is the rms value. To obtained the peak value of E, we need to multiply the transformation factor √2.
                   E_peak = E_rms * √2
                   E_peak = 137.24612 * √2
                   E_peak = 194 N/C
