Maximum permissible load of given wire, if area of cross section`=pir^(2)` and breaking stress is `F` is

If breaking stress of a wire of length L and radius of cross-section r is P N//m^(2) , then breaking stress of wire of same material of length 2 L and radius of cross section (r/2) will be

A body of mass 500 g is fastened to one end of a steel wire of length 2m and area of cross-section 2m m^(2) . If the breaking stress of the wire is 1.25 xx 10^(7) N//m^(2) , then the maximum angular velocity with which the body can be rotated in a horizontal circle is

Two block of mass m and M are connected means of a metal of a metal wire passing over a frictionless fixed pulley. The area of cross section of the wire is 6.67xx10^(-9)m^(2) and its breaking stress is 2xx10^(9)Nm^(-2) . If m = 1kg. Find the maximum value of M in kg for which the wire will not break. (g=10m//s^(2)) .

Braking froce per unit area of cross section of a wire is called

The breaking stress on a unit cross sectional area is

A 20kg load is suspended by a wire of cross section 0.4mm^(2) . The stress produced in N//m^(2) is

Two bodies of masses 2kg and 3kg are connected by a metel wire of cross section 0.04 mm^(2) . Breaking stress of metel wire is 2.5 Gpa. The maximum force F that can be applied to 3kg block so that wire does not break is :

Figure shows a cubical block of side 10 cm and relative density 1.5 suspended by a wire of cross sectional area 10^(-6) m^(2) . The breaking stress of the wire is 7 xx 10^(6) N//m^(2) . The block is placed in a beaker of base area 200 cm^(2) and initially i.e. at t = 0, the top surface of water & the block coincide. There is a pump at the bottom corner which ejects 2 cm^(3) of water per sec. Find the time at which the wire will break.

A 20kg" load is suspended by a wire of cross section 0.4mm^(2).The stress produced in N/m ' is