Neutral metal sphere A, of mass 0.10kg, hangs from an insulating wire 2.0m long. An identical metal sphere B, with charge -q is brought into contact with sphere A. Sphere A goes 12 degrees away from Sphere B. Calculate the initial charge on Sphere B.

After the spheres touch, each one acquires a charge of -q/2, and the Coulomb repulsion force pushes them away from each other. If each one hangs inclined A = 12 degrees, and T is the tension in the wire,
T cos A = M g
T sin A = k (Q/2)^2/(2L sinA)^2

k is the Coulomb constant, 8.99 x 10^9 N•m^2/C^2
2L sin A is the separation of the spheres

T can be eliminated by dividind one equation by the other

tan A = k (Q/2)^2/(2L sinA)^2/(Mg)

M g tan A = k Q^2/(16 L sin A)^2

This should let you solve for Q