A body of mass 10 kg is connected to a wire of length 0.3 m and Its breaking stress is `4.8 x 10^7`N/m^2. The area of cross section of the wire is 10^−6 m^2. The maximum angular velocity with which it can be rotated in a horizontal circle without breaking is

A bob of mass 10 kg is attached to wire 0.3 m long. Its breaking stress is 4.8 xx 10^(7) N//m^(2) . The area of cross section of the wire is 10^(-6) m^(2) . The maximum angular velocity with which it can be rotated in a horizontal circle

A bob of mass 10 kg is attached to wire 0.3 m long. Its breaking stress is 4.8 xx 10^(7) N//m^(2) . The area of cross section of the wire is 10^(-6) m^(2) . The maximum angular velocity with which it can be rotated in a horizontal circle

A bob of mass 10 kg is attached to a wire 0.3 m long. Its breaking stress is 4.8xx10^(7) N//m^(2) . Then area of cross-section of the wire is 10^(-6) m^(2) . What is the maximum angular velocity with which it can be rotated in a horizontal circle?

A wire of length l = 3m and area of cross section 10^(-2) cm^2 and breaking stress 4.8xx10^(-7) N/m^2 is attached with block of mass 10kg. Find the maximum possible value of angular velocity with which block can be moved in circle with string fixed at one end.

A body of mass m = 10 kg is attached to a wire of length 0.3m. The maximum angular velocity with which it can be rotated in a horizontal circle is (Given, breaking stress of wire = 4.8 xx 10^(7) Nm^(-2) and area of cross-section of a wire = 10^(-6) m^(2) )

A particle of mass 100 g tied to a string is rotated along the circle of radius 0.5 m. The breaking tension of the string is 10 N. The maximum speed with which particle can be rotated without breaking the string is

The breaking stress of steel is 7.85 xx 10^(8) N//m^(2) and density of steel is 7.7 xx 10^(3) kg//m^(3) . The maximum frequency to which a string 1 m long can be tuned is

A wire of cross-sectional area A breaks due to its own weight when length of the wire is l. If area of cross-section of the wire is made 3A then maximum length of the wire can be hung without breaking is

A thin uniform copper rod length l and mass m rotates unifomly with an angular velocity omega about a vertical axis passing through one of its ends as shown in the figure. Young's modulus of copper is Y. Breaking stress is sigma_(max) , cross sectional area of rod is A and density of rod is uniform. Based on above information, answer the following questions The maximum angular velocity with which the rod can rotate so that is won't break, is

A mass of 20kg is attached to one end of a steel wire 50cm long and is rotated in a horizontal circle. The area of cross-section of the wrie is 10^(-6) m^(2) and the breaking stress for it is 4.8 xx 10^(7) Pa. Calculate the maximum velocity with which the mass can be rotated.