A thermocouple of negligible resistance produces an emf of in the linear range of temperature. A galvanometer of resistance whose sensitivity is is employed with the thermocouple. The smallest value of temperature difference that can be detected by the system will be
(a) (b)
(c) (d)
A cylindrical metallic rod in thermal contact with two reservoirs of heat at its two ends conducts an amount of heat Q in time t. The metallic rod is melted and the material is formed into a rod of half the radius of the original rod. What is the amount of heat conducted by the new rod when placed in thermal contact with the two reserviors in time t ?
(1)Q/4
(2)Q/16
(3)2Q
(4)Q/2
The total radiant energy per unit area per unit time, normal to the direction of incidence, received at a distance R from the centre of a star of radius r,whose outer surface radiates as a black body at a temperature TK is given by
(a) (b)
(c) (d)
(where is Stefan's constant)
A black body at radiates heat at the rate of 7 cal At a temperature of the rate of heat radiated in the same units will be
(1) 60
(2) 50
(3) 112
(4) 80
The two ends of a rod of length L and a uniform cross-sectional area A are kept at two temperatures The rate f heat transfer, through the rod in a steady state is given by
(1)
(2)
(3)
(4)
On a new scale of temperature (which is linear) and called the W scale, the freezing and boiling points of water are and respectively. What will be the temperature on the new scale, corresponding to a temperature of on the Celsius scale?
(1)
(2)
(3)
(4)
To keep constant time, watches are fitted with balance wheel made of -
(1) Invar
(2) Stainless steel
(3) Tungsten
(4) Platinum
A metal bar of length \(L\) and area of cross-section \(A\) is clamped between two rigid supports. For the material of the rod, it's Young’s modulus is \(Y\) and the coefficient of linear expansion is \(\alpha.\) If the temperature of the rod is increased by \(\Delta t^{\circ} \text{C},\) the force exerted by the rod on the supports will be:
1. \(YAL\Delta t\)
2. \(YA\alpha\Delta t\)
3. \(\frac{YL\alpha\Delta t}{A}\)
4. \(Y\alpha AL\Delta t\)
The pressure applied from all directions on a cube is P. How much its temperature should be raised to maintain the original volume ? The volume elasticity of the cube is and the coefficient of volume expansion is -
(1)
(2)
(3)
(4)
Under steady state, the temperature of a body
(1) Increases with time
(2) Decreases with time
(3) Does not change with time and is same at all the points of the body
(4) Does not change with time but is different at different points of the body