The Moon and Earth rotate about their common center of mass, which is located about R_CM = 4700 km from the center of Earth. (This is 1690 km below the surface.) Take the distance from the center of the earth to the center of the moon to be 3.84x10⁸ m, and the mass of the moon to be 7.35x10²² kg. 

a) Write an expression for the general acceleration due to the Moon’s gravity at the center of mass of the system (similar to how g is the general acceleration due to the Earth's gravity at the surface of the Earth). Write your equation using variables from the problem statement as well as M as the mass of the moon, R as the distance between the center of the Earth and the center of the Moon, and any constants required.  

b)  Calculate this acceleration, in meters per second squared.  

c) Calculate the centripetal acceleration of the center of Earth as it rotates about their common center of mass once each lunar month (about 27.3 d) in m/s².