Answer to Question #173616 in Astronomy | Astrophysics for ANJU JAYACHANDRAN

We should calculate the gravitational shift due to the difference of the potential energies at the surface and at the height of 2 meters. The difference of potentials will be

"\\Delta U = -\\dfrac{GM}{R} + \\dfrac{GM}{R+h} =- \\dfrac{GMh}{R(R+H)} \\approx -\\dfrac{GMH}{R^2}" .

So the photon will lose this amount of energy, therefore, the change of energy will be

"\\Delta E = h\\Delta \\nu = -\\dfrac{GMH}{R^2}\\cdot \\dfrac{h\\nu}{c^2}," so "\\dfrac{\\Delta \\nu}{\\nu} =- \\dfrac{GMH}{c^2R^2} = -\\dfrac{6.67\\cdot10^{-11}\\cdot2\\cdot2\\cdot10^{30}\\cdot 2}{(3\\cdot10^8)^2\\cdot(1.5\\cdot10^4)^2} = -2.6\\cdot10^{-5}."

So "\\dfrac{\\Delta\\lambda}{\\lambda} =- \\dfrac{\\Delta\\nu}{\\nu}, \\; \\\\\n\\Delta\\lambda = - \\dfrac{\\Delta\\nu}{\\nu} \\cdot\\lambda = 2.6\\cdot10^{-5} \\cdot 6000 \u00c5 = 0.16\u00c5."