If Wien's constant b = 0.3 cm K, then the temperature of the Sun having a maximum intensity of radiation at `5000Å` wavelength is

The temperature corresponding to maximum intensity of emission of wavelength 4800Å is [Given b = 0.002898 mK]

Solar radiation emitted by the sun resembles the radiations emitted by a black body at the temprature of 6000 K. Maximum intensity is emitted at a wavelength of 4800 Å. If the temperature of the sun decreases from 6000 K to 4000 K , then the peak intensity would occur at a wavelength of

Calculate the temperature of a star which has maximum energy emission at 4500Å . Given temperature of the sun is 6000K and it has maximum energy emission at 5000Å .

A black body emits radiations of maximum intensity at a wavelength of 5000 A, when the temperature of the body is 1227° C. If the temperature of the body is increased by 2227 °C, the maximum intensity of emitted radiation would be observed at

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

Solar radiation emitted by sun resembles that emitted by a body at a temperature of 6000 K Maximum intensity is emitted at a wavelength of about 4800A^(@) If the sun was cooled down from 6000K to 3000K then the peak intensity would occure at a wavelenght of .

A heated body maitained at T K emits thermal radiation of total energy E with a maximum intensity at frequency v. The emissivity of the material is 0.5. If the temperature of the body be increased and maintained at temperature 3T K, then :- (i) The maximum intensity of the emitted radiation will occur at frequency v/3 (ii) The maximum intensity of the emitted radiation will occur at frequency 3v. (iii) The total energy of emitted radiation will become 81 E (iv) The total energy of emitted radiation will become 27 E

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