A particle falls in a medium whose resistance is propotional to the square of the velocity of the particles. If the differential equation of the free fall is `(dv)/(dt) = g-kv^(2)` (k is constant) then

Spherical rain drop evaporates at a rate proportional to its surface area. The differential equation corresponding to the rate of change of the radius of the rain drop if the constant of proportionality is K >0 is (a) ( b ) (c) (d)(( e ) dy)/( f )(( g ) dt)( h ) (i)+K=0( j ) (k) (b) ( l ) (m) (n)(( o ) d r)/( p )(( q ) dt)( r ) (s)-K=0( t ) (u) (c) ( d ) (e) (f)(( g ) d r)/( h )(( i ) dt)( j ) (k)=K r (l) (m) (d) None of these

Path traced by a moving particle in space is called trajectory of the particle. Shape of trajectiry is decided by the forces acting on the particle. When a coordinate system is associated with a particle motion, the curve equation in which the particle moves [y=f(x)] is called equation of trajectory. It is just giving us the relation among x and y coordinates of the particle i.e. the locus of particle. To find equation of trajectory of a particle, find first x and y coordinates of the particle as a function of time eliminate the time factor. In above the velocity (i.e. (dvec(r))/(dt)) at t=0 is, if r =at i ^ −bt 2 j ^ :-

A particle of mass 0.1kg is launched at an angle of 53^(@) with the horizontal . The particle enters a fixed rough hollow tube whose length is slightly less than 12.5m and which is inclined at an angle of 37^(@) with the horizontal as shown in figure. It is known that the velocity of ball when it enters the tube is parallel to the axis of the tube. The coefficient of friction betweent the particle and tube inside the tube is mu=(3)/(8)[ Take g=10m//g^(2)] The velocity of the particle as it enters the tube is :

A particle of mass 0.1kg is launched at an angle of 53^(@) with the horizontal . The particle enters a fixed rough hollow tube whose length is slightly less than 12.5m and which is inclined at an angle of 37^(@) with the horizontal as shown in figure. It is known that the velocity of ball when it enters the tube is parallel to the axis of the tube. The coefficient of friction betweent the particle and tube inside the tube is mu=(3)/(8)[ Take g=10m//g^(2)] The kinetic energy of the particle when it comes out of the tube is approximately equal to :

If a particle with a = kv^(2) and initial velocity is u then velocity after S displacement. Here k is a constant

An object falling from rest in air is subject not only to the gravitational force but also to air resistance. Assume that the air resistance is proportional to the velocity with constant of proportionality as k >0 , and acts in a direction opposite to motion (g=9. 8 m/(s^2))dot Then velocity cannot exceed. ( a ) 9.8m//k" "m//s (b) 98//km" "m//s (c) k/g m/s (d) None of these

Consider a spherical gaseous cloud of mass density rho(r) in a free space where r is the radial distance from its centre. The gaseous cloud is made of particle of equal mass m moving in circular orbits about their common centre with the same kinetic energy K. The force acting on the particles is their mutual gravitational force. If rho(r) is constant with time. the particle number density n(r)= rho(r) /m is : (g =universal gravitational constant)

A particle of mass 5kg is free to slide on a smooth ring of radius r=20cm fixed in a vertical plane. The particle is attached to one end of a spring whose other end is fixed to the top point O of the ring. Initially, the particle is at rest at a point A of the ring such that /_OCA=60^@ , C being the centre of the ring. The natural length of the spring is also equal to r=20cm . After the particle is released and slides down the ring, the contact force between the particle and the ring becomes zero when it reaches the lowest position B. Determine the force constant (i n xx 10^2Nm^-1) of the spring.

If velocity of particle is given by v=2t^4 , then its acceleration ((dv)/(dt)) at any time t will be given by..

Two particles are simultaneously thrown in horizontal direction from two points on a riverbank, which are at certain height above the water surface. The initial velocities of the particles are v_1= 5m//s and v_2 = 7.5 m//s respectively. Both particles fall into the water at the same time. First particles enters the water at a point s = 10 m from the bank. Determine (a) the time of flight of the two particles, (b) the height from which they are thrown, (c) the point where the second particle falls in water.