A particle describes a horizontal circle on the smooth surface of an inverted cone, the height of the plane of the circle above the vertex is 9.8 cm. Find the speed of the particle (g= `9.8 m//s^2`) [See Fig.] (a) given in the answer section]

A particle describes a horizontal circle of radius r on the smooth surface of an inverted cone as shown. The height of plane of circle above vertex is h. The speed of particle should be

A particle describes a horizontal circle in a conical funne whoses inner surface is smooth with speed of 0.5m//s . What is the height of the plane of circle from vertex the funnel?

A particle describes a horizontal circle in a conical funne whoses inner surface is smooth with speed of 0.5m//s . What is the height of the plane of circle from vertex the funnel?

A particle is describing circular motion in a horizontal plane in contact with the smooth surface of a fixed rigid circular cone with its axis vertical and vertex down. The heigh of the plane of motion above the vertex is h h and the semi-vertical angle of the cone is alpha The period of revolution of the particle

The area of the curved surface of a cone is 60pi\ c m^2dot If the slant height of the cone be 8cm, find the radius of the base.

A particle of mass 'm' is moving in horizontal circle inside a smooth inverted fixed vertical cone above height 'h' from apex. Angle of cone is theta , then

Find the horizontal velocity of the particle when it reach the point Q. Assume the block to be frictionless. Take g=9.8 m//s^(2) .

What is the value of g at a height 8848 m above sea level. Given g on the surface of the earth is 9.8 ms^(-2) . Mean radius of the earth = 6.37 xx 10^(6) m .

A particle is launched from a height 8R above the surface of earth and it is given a speed ((GM)/(8R)) parallel to the surfaces then

Find the value of 'g(i)' at a height of 100 km (ii) at height 6400 km from the surface of the earth. (Radius of the earth = 6400 km, g on the surface of the earth = 9.8 ms^(-2) .