A quantity X is given by`epsilon0L(/_\v)/v` , where is`epsilon0` permitivity of free space , L is length , `/_\V` is p.d. and `/_\V`is time interval . The dimensional formula of X is the same as that of

Prove the result that the velocity v of translation of a rolling body (like a ring, disc, cylinder or sphere) at the bottom of an inclined plane of a height h is given by v^2=(2gh)/ (i+k^2^l R^3 Using dynamical consideration (i.e. by consideration of forces and torques). Note k is the radius of gyration of the body about its symmetry axis, and R is the radius of the body. The body starts from rest at the top of the plane.

Establish by dimensional analysis that v= sqrt(T/m) where v is the velocuty of wave along the stretched wire.T is tension applied and m is mass per unit length of the wire.

The potential energy function for a particle executing linear simple harmonic motion is given by V(x) =kx^2/2, where k is the force constant of the oscillator. For k = 0.5 N ^-1 , the graph of V(x) versus x is shown in Fig. 6.12. Show that a particle of total energy 1 J moving under this potential must ‘turn back’ when it reaches x = ± 2 m.,br>

In the above diagram, a particle of mass"m" and charge(-q) initially moving along X-axis with velocity "v". The length of the plave system is "L" and uniform electric filed between the plates is "E". What is the vertical deflext of the particle at the far edge of the plate?

A famous relation in physics relates ‘moving mass' m to the ‘rest mass’ m_0 of a particle in terms of its speed v and the speed of light, c. (This relation first arose as a consequence of s'pecial relativity due to Albert Einstein). A boy recalls the relation almost correctly but forgets where to put the constant c. He writes: m = m_0/(1-v^2)^(1/2)