Show that the angle made by the string with the vertical in a conical pendulum is given by `costheta=(g)/(Lomega^(2))` , where `L` is the string and `omega` is the angular speed.

Fig. show a conical pendulum. If the length of the pendulum is l , mass of die bob is m and theta is the angle made by the string with the vertical show that the angular momentum of the pendulum about the point of support is: L = sqrt((m^(2)gl^(3) sin^(4)theta)/(cos theta))

A conical pendulum has length 100 cm and the angle made by the string with the vertical is 10^@ .The mass of the bob is 200 g, find The centripetal force on the bob

The angle made by the string of a simple pendulum with the vertical depends on time as theta=pi/90sin[(pis^-1)t] . Find the length of the pendulum if g=pi^2ms^-2

The angle made by the string of a simple pendulum with the vertical depends on time as theta=pi/90sin[(pis^-1)t] . Find the length of the pendulum if g=pi^2ms^-2

The angle made by the string of a simple pendulum with the vertical depends on time as theta=pi/90sin[(pis^-1)t] . Find the length of the pendulum if g=pi^2ms^-2

What is conical pendulum? Show that its time period is given by 2pi sqrtfrac(lcostheta)(g) , where l is the length of the string, theta is the angle that the string makes with the vertical and g is the acceleration due to gravity.

A conical pendulum has length of 1.1 m and the angle subtended by the string with the vertical is 25^(@)31 . Find (i) the angular speed (ii)the frequency of circular motion of the bob.

A conical pendulum has length 100 cm and the angle made by the string with the vertical is 10^@ . The mass of the bob is 200 g, find frequency of circular motion of the bob.