The period of a particle executing SHM is 8 s . At t=0 it is at the mean position . The ratio of the distances covered by the particle in the 1st second to the 2nd second is

Time period of a particle executing SHM is 8 sec. At t=0 it is at the mean position. The ratio of the distance covered by the particle in the 1st second to the 2nd second is:

The period of a particle in SHM is 8 s . At t = 0 it is in its equilibrium position. (a) Compare the distance travelled in the first 4s and the second 4s . (b) Compare the distance travelled in the first 2s and the second 2s .

The time period of a particle executing SHM is T . After a time T//6 after it passes its mean position, then at t = 0 its :

The displacement of a particle is moving by x = (t - 2)^2 where x is in metres and t in second. The distance covered by the particle in first 4 seconds is.

The displacement of a particle is moving by x = (t - 2)^2 where x is in metres and t in second. The distance covered by the particle in first 4 seconds is.

The amplitude of a executing SHM is 4cm At the mean position the speed of the particle is 16 cm//s The distance of the particle from the mean position at which the speed the particle becomes 8 sqrt(3)cm//s will be

For a stone what is the ratio of the distance covered in its 1st, 3rd and 5th seconds of its free fall.

Time period of a particle executing SHM is 16s.At time t = 2s , it crosses the mean position . Its amplitude of motion is ( 32sqrt(2))/(pi) m . Its velocity at t = 4s is

The period of a particle executing SHM is T . There is a point P at a distance 'x' from the mean position 'O' . When the particle passes P towards OP , it has speed v . Find the time in which it returns to P again.

x - t equation of a particle in SHM is x = (4 cm)cos ((pi)/(2)t) Here , t is in seconds. Find the distance travelled by the particle in first three seconds.