A blockbody emits radiation at the rate P when its temperature is T. AT this temperture, the wavelength at which it radiates the maximum intensity is `lambda_(0)`. At another temperature T', the total power rasiated is P' and wavelength corresponding to the maximum intensity is `(lambda_(0))/(2)`. Then

A black body emits radiation at the rate P when its temperature is T. At this temperature the wavelength at which the radiation has maximum intensity is lamda_0 , If at another temperature T' the power radiated is P' and wavelength at maximum intensity is (lamda_0)/(2) then

A black body emits radiation at the rate P when its temperature is T. At this temperature the wavelength at which the radiation has maximum intensity is lamda_0 , If at another temperature T' the power radiated is P' and wavelength at maximum intensity is (lamda_0)/(2) then

The temperature (approx) of the body omitting wavelength 0.3 mum corresponding to maximum intensity is

If the temperature of the body is increases from 27°C to 327°C then wavelength corresponding to maximum intensity becomes

If lambda_(m) denotes the wavelength at which the radiative emission from a black body at a temperature T K is maximum, then

The power radiated by a blackbody is P at a certain temperature. If power radiated by this body becomes 1/16 th the times. then wavelength corresponding to maximum intensity becomes

A black body emits maximum radiation of wavelength lambda_(1) at a certain temperature T_(1) . On increasing the temperature, the total energy of radiation emitted is increased 16 times at temperature T_(2) . If lambda_(2) is the wavelength corresponding to which maximum radiation is emitted at temperature T_(2) . Calculate the value of ((lambda_(1))/(lambda_(2))) .

A black body emits radiation of maximum intensity at a wavelength of 5000A when the temperature of the body is 1227^(@) C. If the temperature of the body is increased by 1000^(@) C, calculate the wavelength corresponding to the maximum intensity.

Power radiated by a black body is P_0 and the wavelength corresponding to maximum energy is around lamda_0 , On changing the temperature of the black body, it was observed that the power radiated becames (256)/(81)P_0 . The shift in wavelength corresponding to the maximum energy will be

Power radiated by a black body is P_0 and the wavelength corresponding to maximum energy is around lamda_0 , On changing the temperature of the black body, it was observed that the power radiated becames (256)/(81)P_0 . The shift in wavelength corresponding to the maximum energy will be