The voltage over a cycle varies as
`V=V_(0)sin omega t` for `0 le t le (pi)/(omega)`
`=-V_(0)sin omega t` for `(pi)/(omega)le t le (2pi)/(omega)`
The average value of the voltage one cycle is

The average value of an alternating voltage V=V_(0) sin omega t over a full cycle is

Find the rms value of current i=I_(m)sin omegat from (i) t=0 "to" t=(pi)/(omega) (ii) t=(pi)/(2omega) "to" t=(3pi)/(2omega)

In a given AC circuit through a specific branch the current varies as a function of time given as i=i_(0)sin^(2)omegat " " 0 le omega t lt pi and i=i_(0) sin omega t " " pi le omegat lt 2 pi Calculate the average current per cycle of this AC.

The average value of current i=I_(m) sin omega t from t=(pi)/(2 omega ) to t=(3 pi)/(2 omega) si how many times of (I_m) ?

Evaluate the integral,x=int_(0)^((pi)/(4))(1-sin omega t)dt (A) (pi-1)/(omega) (B) (pi-2)/(omega) (C) (pi+1)/(omega) (D) (pi+2)/(omega)

What is the average value of atlernating current, I = I_(0) sin omega t over time interval t = pi//omega to t = pi//omega ?

The average value of a.c. voltge E =E_(0) sin omega t over the time interval t = 0 to t = pi//omega is

Position of a particle varies as y = cos^(2) omega t - sin^(2) omega t . It is

Give expression for average value of a.c. voltage V = V_(0) sin omega t over interval t = 0 to t = (pi)/(omega)