A black body at \(1227^\circ\text{C}\) emits radiations with maximum intensity at a wavelength of \(5000~\mathring {A}\). If the temperature of the body is increased by \(1000^\circ\text{C},\) the maximum intensity will be observed at:
1. \(4000~\mathring {A}\)
2. \(5000~\mathring {A}\)
3. \(6000~\mathring {A}\)
4. \(3000~\mathring {A}\)
A copper rod of \(88\) cm and an aluminium rod of an unknown length have an equal increase in their lengths independent of an increase in temperature. The length of the aluminium rod is:
\(\left(\alpha_{Cu}= 1.7\times10^{-5}~\text{K}^{-1}~\text{and}~\alpha_{Al}= 2.2\times10^{-5}~\text{K}^{-1}\right)\)
1. \(68~\text{cm}\)
2. \(6.8~\text{cm}\)
3. \(113.9~\text{cm}\)
4. \(88~\text{cm}\)
In which of the following phenomenon heat convection does not take place
1. land and sea breeze
2. boiling of water
3. heating of glass surface due to filament of the bulb
4. air around the furnace
A black body is at \(727^\circ\text{C}.\) The rate at which it emits energy is proportional to:
1. | \((727)^2\) | 2. | \((1000)^4\) |
3. | \((1000)^2\) | 4. | \((727)^4\) |
Assuming the sun to have a spherical outer surface of radius \(r,\) radiating like a black body at temperature \(t^\circ \text{C},\) the power received by a unit surface of the earth (normal to the incident rays) at a distance \(R\) from the centre of the sun will be:
(where \(\sigma\) is Stefan's constant)
1. | \(\dfrac{4\pi r^2\sigma t^4}{R^2}\) | 2. | \(\dfrac{r^2\sigma(t+273)^4}{4\pi R^2}\) |
3. | \(\dfrac{16\pi^2r^2\sigma t^4}{R^2}\) | 4. | \(\dfrac{r^2\sigma(t+273)^4}{R^2}\) |
The two ends of a rod of length L and a uniform cross-sectional area A are kept at two temperatures T1 and T2 (T1> T2). The rate of heat transfer through the rod in a steady state is given by:
1.
2.
3.
4.
A black body at \(227^{\circ}~\mathrm{C}\) radiates heat at the rate of \(7~ \mathrm{cal-cm^{-2}s^{-1}}\). At a temperature of \(727^{\circ}~\mathrm{C}\), the rate of heat radiated in the same units will be:
1. \(60\)
2. \(50\)
3. \(112\)
4. \(80\)
The temperature of a body on the Kelvin scale is found to be \(x^\circ~\text K.\) When it is measured by a Fahrenheit thermometer, it is found to be \(x^\circ~\text F,\) then the value of \(x\) is:
1. \(40\)
2. \(313\)
3. \(574.25\)
4. \(301.25\)
In a new temperature scale, freezing point of water is given a value and boiling point of water is . Reading of new temperature scale for a temperature equal to is
1.
2.
3.
4.