A material has Poisson's ratio 0.50. If a uniform rod of it suffers a longitudinal strain of 2 x 10-3 , then the percentage change in volume is
0.6
0.4
0.2
zero
Let L be the length and d be the diameter of cross- section of a wire. Wires of the same material with different L and d are subjected to the same tension along the length of the wire. In which of the following cases, the extension of wire will be the maximum ?
L = 200 cm, d = 0.5 mm
L = 300 cm, d = 1.0 mm
L = 50 cm, d = 0.05 mm
L = 100 cm, d = 0.2 mm
The following four wires are made of the same material. Which of these will have the largest extension when the same tension is applied ?
Length = 50 cm, diameter = 0.5 mm
Length = 100 cm, diameter = 1 mm
Length = 200 cm, diameter = 2 mm
Length= 300 cm, diameter= 3 mm
A metal rod is fixed rigidly at two ends so as to prevent its thermal expansion. If L, α and Y respectively denote the length of the rod, coefficient of linear thermal expansion and Young's modulus of its material, then for an increase in temperature of the rod by ΔT, the longitudinal stress developed in the rod is
inversely proportional to α
inversely proportional to Y
directly proportional to ΔT/Y
independent of L
C.
directly proportional to ΔT/Y
Strain = α . ΔT
Stress Y ∝ ΔT
where L = length of the rod
α = coefficient of linear thermal expansion
Y = Young's modulus of its material
So, the longiyudinal stress developed in the rod is directly proportional to .
The length of a metal wire is L1 when the tension is T1 and L2 when the tension is T2. The unstretched length of wire is