A carrom board `(4ftxx4ft )` has the queen at the centre. The queen hit by the striker moves to the front edge, rebounds and goes in the hole behind the striking line. Find the magnitude of displacement of the queen a. from the centre to the front edge b. from the front edge to the hole and c. from the centre to the hole.

Find the centre of mass of a uniform disc of radius a from which a circualr section of radius b has been removed. The centre of hole is at a distance c from the centre of the disc.

A mosquito net over a 7ftxx4ft bed is 3 ft high. The net hs a hole at one corner of the bed through which diagonally opposite upper corner of the net. A. Find the magnitude of the displaceentof the mosquito. B. Taking the hole as the origin, the length of the bed as the X-axis, its width as teh Y-axis, and verticallup as the Z-axis, write the components of the displacement vector.

A queen is placed at the centre of carom-board which has side of length a . It is hit from a position with a striker such that after rebounding from the front end, it goes into the hole in the opposite end. Find the distance traveled by the queen

Three atoms A, B and C crystallize in a cubic solid lattice where A atoms are present at the body centre, B atoms are present at the edge centre as well as at the corners of the cube and C atoms are present at the face centres of the cube. Now if all the atoms are removed from the two 4-fold axis and the one 2-fold axis passing through the cube, then the formula of the compound is

A long, straight wire, carrying a current 200A, runs through a cubical wooden box, entering and leaving through holes in the centre of opposite faces (as shown in Fig). The length of each side of the box is 20 cm. Consider an element dl,0.100 cm long of the wire at the centre of the box. Compute the magnitude dB of the magnetic field produced by this element at the point a, b,c,d and e as shown fig. Points a,c, and dare at the centres of the faces of the cube, point b is at the midpoint of one edge, and point e is at a corner. Copy the figure and show the direction and relative magnitudes of field vectors.

In triangle ABC, a = 4 and b = c = 2 sqrt(2) . A point P moves within the triangle such that the square of its distance from BC is half the area of rectangle contained by its distance from the other two sides. If D be the centre of locus of P, then

An air puck of mass m_(1) is tied to a string allowed to revolved in a circle of radius R on a frictionless horizontal table . The other end of the string passes through a small hole in the centre of the table , and a load of mass m_(2) is tied to the string? The suspended load remains in equilibrium while the pack on the tabletop revolves. a. Find the tension in the string b. Find the radial force acting on the puck c. Find the speed of the puck d. Qualitaively describe what will happen in the motion of the puck if the value of m_(2) is somewhat increased by placing an additional load on it. e.Qualitaively describe what will happen in the motion of the puck if the value of m_(2) is instead decreased removing a part from the hanging load.

A disc of radis R is cut out from a larger disc of radius 2R in such a way that the edge of the hole touches the edge of the disc. Locate the centre of mass of the residual disc.

A uniform disc (of mass M and radius a ) has a hole (of radius b ) drilled through it. The centre of the hole is at a distance c from the centre of the original disc. What is the moment of inertia of the disc about an axis through the centre of the disc and perpendicular to its plane ?

Figure shows a uniform disc of radius R , from which a hole of radius R/2 has been cut out from left of the centre and is placed on the right of the centre of the disc. Find the CM of the resulting disc.