Photonic time bin qubits are well suited to transmission via optical fibres and waveguide circuits. The states take the form $frac{1}{sqrt{2}}(alpha ket{0} + e^{iphi}beta ket{1})$, with $ket{0}$ and $ket{1}$ referring to the early and late time bin respectively. By controlling the phase of a laser driving a spin-flip Raman transition in a single-hole-charged InAs quantum dot we demonstrate complete control over the phase, $phi$. We show that this photon generation process can be performed deterministically, with only a moderate loss in coherence. Finally, we encode different qubits in different energies of the Raman scattered light, demonstrating wavelength division multiplexing at the single photon level.