For a black body at temperature `727^(@)C`. If the temperature of the black body is changed to `1227^(@)C`, then its radiating power will be

A black body radiates 20 W at temperature 227^(@)C . If temperature of the black body is changed to 727^(@)C then its radiating power wil be

For a black body at temperature 727^@C , its radiating power is 60 watt and temperature of surrounding is 227^@C . If temperature of black body is changed to 1227^@C then its radiating power will be-

Calculate the temperature of the black body from given graph.

If the temperature of a black body is increased, then the maximum of the spectrum will

If the temperature of a black body incresese from 7^(@)C to 287^(@)C then the rate of energy radiation increases by

A black body emits radiations of maximum intensity at a wavelength of Å 5000 , when the temperature of the body is 1227^(@)C . If the temperature of the body is increased by 1000^(@)C , the maximum intensity of emitted radiation would be observed at

In a dark room with ambient temperature T_(0) , a black body is kept at a temperature T . Keeping the temperature of the black body constant (at T ), sunrays are allowed to fall on the black body through a hole in the roof of the dark room. Assuming that there is no change in the ambient temperature of the room, which of the following statements (s) is/are correct ?

A black body of mass .0.10 g is kept in a black enclosure or temperature 27^(@) C. The temperature of the body is 127^(@) C and the area of the emittimg surface in 10^(-3) m^(2) . If its specific heat capacity is 420 J kg^(-1)k^(-1) find the rate of cooling of the body . sigma = 5.67xx10^(-8)Wm^(-2)K^(-4) .

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.

The power radiated by a black body is P, and it radiates maximum energy around the wavelength lambda_(0) . If the temperature of the black body is now changed so that it radiates maximum energy around a wavelength 3lambda_(0)//4 , the power radiated by it will increase by a factor of