Show that average value of radiant flux density `S` over a single period 'T' is given by `S=1/(2cmu_0)E_0^2`.

Poynting vectors vec(S) is defined as vec(S)=(1)/(mu_(0))vec(E)xx vec(B) . The average value of 'vec(S)' over a single period 'T' is given by

The average value of current for the current shown for time period 0 to (T)/(2) is

A plane EM wave travelling along z direction is described by E=E_0sin (kz-omegat) hati and B=B_0 sin (kz-omegat)hatj . show that (i) The average energy density of the wave is given by u_(av)=1/4 epsilon_0 E_0^2+1/4 (B_0^2)/(mu_0) . (ii) The time averaged intensity of the wave is given by I_(av)=1/2 cepsilon_0E_0^2 .

A plane EM wave travelling along z direction is described by E=E_0sin (kz-omegat) hati and B=B_0 sin (kz-omegat)hatj . show that (i) The average energy density of the wave is given by u_(av)=1/4 epsilon_0 E_0^2+1/4 (B_0^2)/(mu_0) . (ii) The time averaged intensity of the wave is given by I_(av)=1/2 cepsilon_0E_0^2 .

The average value of a saw-tooth voltage V=V_(0) ((2t)/(T)-1) Over 0 to (T)/(2) , (T- time period) is given by

If the time period t of the oscillation of a drop of liquid of density d, radius r, vibrating under surface tension s is given by the formula t=sqrt(r^(2b)s^(c)d^(a//2)) . It is observed that the time period is directly proportional to sqrt((d)/(s)) . The value of b should therefore be :

The average velocity of CO_(2) at T K is 9 xx 10^(4) cm s^(-1) . The value of T is

Show that for a particle in linear S.H.M., the average kinetic energy over a period of oscillation equals the average potential energy over the same period.

If oint_(s) E.ds = 0 Over a surface, then

If oint_(s) E.ds = 0 Over a surface, then