The length of a rod is 22.4 m out of it 2.543m is cut out. The remaining length of the rod according to the idea of significant figures is

A length 5.997 m rounded off to three significant figures is written as

The length of a rod is 2.5 cm and diameter is 2.5 mm. The volume of the rod with due consideration to significant figures is

What will be the length of a metre stick of 5.602 m when 2.8 m portion is cut from it ? Express the result to the appropriate significant figures.

The length of an iron rod is (16.4+-0.1)cm . If a small piece of length (1.2+-0.1)cm is cut out, what is the length of the remaining rod?

A rod has variable co-efficient of linear expansion alpha = (x)/(5000) . If length of the rod is 1 m . Determine increase in length of the rod in (cm) on increasing temperature of the rod by 100^(@)C .

From a rope of length 20""1/2 m, a piece of length 3""5/8 m is cut off. Find the length of the remaining rope.

Moment of inertia of a rod of mass m and length l about its one end is I . If one-fourth of its length is cut away, then moment of inertia of the remaining rod about its one end will be

A non-uniform rod AB has a mass M ad length 2l. The mass per unit length of the rod is mx at a point of the rod distant x from A. find the moment of inertia of this rod about an axis perpendicular to the rod (a) through A (b) through the mid-point of AB.

A thin rod of negligible mass and area of cross section S is suspended vertically from one end. Length of the rod is L_(0) at T^(@)C . A mass m is attached to the lower end of the rod so that when temperature of the rod is reduced to 0^(@)C its length remains L_(0) Y is the Young’s modulus of the rod and alpha is coefficient of linear expansion of rod. Value of m is :

A rod is of mass M = 3kg and length 2a (a = 2m). Find moment of inertia about an axis through the centre of the rod and perpendicular to the rod. (b) parallel to the rod and distant d = 2m from it?