Consider the sun to be a perfect sphere ...

Consider the sun to be a perfect sphere of radius `6.8 xx 10^(8)m`. Calculate the energy radiated by sun in one minute. Surface temperature of the sun `= 6200 K`. Stefan's constant `= 5.67 xx 10^(-8) J m^(-2) s^(-1) K^(-4)`.

Similar Questions

Explore conceptually related problems

Considering the sun as a perfect sphere of radius 6.8xx10^(8) m, calculate the energy radiated by it one minute. Take the temperature of sun as 5800 k and sigma = 5.7xx10^(-8) S.I. unit.

Assuming that the sun radiates as a black body, calculate the energy radiated per minute by unit area of its surface. Surface temperature of the sun = 5727^@C and Stefan's constant = 5.7 xx10^-8 Jm^-2K^-4s^-1 .

Calculate the energy radiated in one minute by a blackbody of surface area 200 cm^2 at 127 ""^(@)C ( sigma= 5.7 xx 10^(-8) J m^(-2) s^(-1) K^(-4))

Calculate the energy radiated in 30 seconds by perfectly black sphere of radius5cm maintained at 127^@C . (Stefan's constant s = 5.7 xx 10^-8 J//m^2sk^4)

Calculate the energy radiation by the sun in 2 mins if it is considered to be perfect sphere of radius 6.8 xx 10^8 m and its surface temperature is approximately 6200 K. Take sigma = 5.67 xx 10^(-8) Jm^(-2) s^(-1) K^(-4)

Calculate the temperature at which a perfect black body radiates at the rate of 1 W cm^(-2) , value of Stefan's constant, sigma = 5.67 xx 10^(-8) W m^(-2)K^(-4)

Consider the sun to be a perfect sphere of radius `6.8 xx 10^(8)m`. Calculate the energy radiated by sun in one minute. Surface temperature of the sun `= 6200 K`. Stefan's constant `= 5.67 xx 10^(-8) J m^(-2) s^(-1) K^(-4)`.

Similar Questions

Recommended Questions