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

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 ……………

Two stars radiate maximum energy at wavelength 3.6xx10^(-7) m and 4.8xx10^(-7) m respectively. What is the ratio of their temperatures ?

The distance of two planets from the sun are 10^(13) and 10^(12) m respectively. The ratio of the periods of the planet is

The uncertainty in the position and velocity of a particle are 10^(-10)" m and "5.27 xx 10^(-24)" m s"^(-1) respectively. Calculate the mass of the particle (h = 6.625 xx 10^(-34)" Js").

At what distance (in metre) from the centre of the Moon,the intensity of gravitational field will be zero? (Take, mass of Earth and Moon as 5.98xx10^(24) kg and 7.35xx10^(23) kg respectively and the distance between Moon and Earth is 3085xx106(8) m)

The temperature of sun is 5500 K and it emits maximum intensity radiation in the yellow region (5.5 xx10^(-7)m) . The maximum radiation from a furnace occurs at wavelength 11 xx 10^(-7)m The temperature of furnace is

The wavelength lambda_(m) of maximum intensity of emission of solar radiation is lambda_(m) = 4753 Å and from moon is lambda_(m) = 14 mum The surface temperature of sun and moon are (given b = 2.898 xx 10^(-3) meter/Kelvin)

The wavelength of maximum intensity of radiation emitted by a star is 289.8 nm . The radiation intensity for the star is : (Stefan’s constant 5.67 xx 10^(-8)Wm^(-2)K^(-4) , constant b = 2898 mu m K )-

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

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.