Find the speed at which the kinetic energy of a particle will differ by 1% from nonrelativistic value` 1/ 2 m_0 V^(2)`.

Express the de Broglie wavelength in terms of the kinetic energy of a relativistic particle. What is the kinetic energy for which the nonrelativistic formula leads to an error of less than 1% ?

When the linear momentum of a particle is increased by 1% its kinetic energy increases by x%. When the kinetic energy of the particle is increased by 300%, its linear momentum increases by y%. The ratio of y to x is

Kinetic energy of a particle is increased by (a) 50% (b) 1% Find percentage change in linear momentum.

Kinetic energy of a particle is increased by (a) 50% (b) 1% Find percentage change in linear momentum.

In the reference frame K two particles travel along the x axis, one of mass m_1 with velocity v_1 , and the other of mass m_2 with velocity v_2 . Find: (a) the velocity V of the reference frame K^' in which the cumulative kinetic energy of these particles is minimum, (b) the cumulative kinetic energy of these particles in the K^' frame.

The kinetic energy of a particle of mass m moving with speed v is given by K=(1)/(2)mv^(2) . If the kinetic energy of a particle moving along x-axis varies with x as K(x)=9-x^(2) , then The region in which particle lies is :

The kinetic energy of a particle of mass m moving with speed v is given by K=(1)/(2)mv^(2) . If the kinetic energy of a particle moving along x-axis varies with x as K(x)=9-x^(2) , then The region in which particle lies is :

The kinetic energy of a particle of mass m moving with speed v is given by K=(1)/(2)mv^(2) . If the kinetic energy of a particle moving along x-axis varies with x as K(x)=9-x^(2) , then The region in which particle lies is :

Find the mass of a body which has 5J of kinetic energy while moving at a speed of 2m/s (AS_(1))