The wavelength of maximum energy released during an atomic axplosion was `2.93xx10^(-10)m`. Given that Wien's constant is `2.93xx10^(-3)m-K`, the maximum temperature attained must be of the order of

If the wavelength corresponding to maximum energy radiated from the moon is 14 micron, and wien's constant is 2.8xx10^(-3)mK , then temperature of moon is

the maximmum temperature reached during an atomic explosion was of the order of 10^(7) K. Calculate the wavelength of maximum energy b = 0.293 cm K.

If wavelengths of maximum intensity of radiations emitted by the sun and the moon are 0.5xx10^(-6)m " and " 10^(-4) m respectively, the ratio of their temperature is ……………

If wavelength of maximum intensity of radiation emitted by sun and moon are 0.5xx10^(-6) m and 10^(-4) m respectively. Calculate the ratio of their temperatures

The wavelength of greatest radiation intensity inside a greenhouse is 9.66xx10^(-6) m. Calculate the corresponding temperature. Wien's constant is 0.00289 mK.

The interatomic distance for a metal is 3 xx 10^(-10) m. If the interatomic force constant is 3.6 xx 10^(-9) N//Å . The the Young's modulus in N//m^(2) will be

A steel scale is to be prepared such that the millimeter intervals are to be accurate within 6 xx10^(-5)mm . The maximum temperature variation form the temperature of calibration during the reading of the millimeter marks is (alpha = 12 xx 10^(-6)//"^(@)C)

A steel scale is to be prepared such that the millimeter intervals are to be accurate within 6 xx10^(-5)mm . The maximum temperature variation form the temperature of calibration during the reading of the millimeter marks is (alpha = 12 xx 10^(-6)//"^(@)C)

Calculate the effective temperature of the sun . Given that the wavelength of maximum energy in the solar spectrum is 475 mm and Wien's constant is 2.898xx10^(-3) mK.

Calculate the colour temperautre of the sun assuming that the wavelength of maximum energy in the solar spectrum is 0.48 micron and the Wien's constant is 0.228xx10^(-2) mK.